аЯрЁБс>ўџ  ўџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџьЅСУ јП,™bjbjaЗaЗ Њeнн8>ИџџџџџџЗžžnnџџџџ...8flв#Ф.лsD–%Tъ>" ? ? ?(SršeLцjЈnrprprprprprpr,vВбx^œrљŽmFOт(SŽmŽmœržqnn ? ?:•sžqžqžqŽmЦn^ ? ?nržqŽmnržqžqЬNžqџџџџАЛлhЖбџџџџToJžqZrЋs0лsžq/yžq/yžqžqžqМŽmŽmŽmœrœržqŽmŽmŽmлsџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџ/yŽmŽmŽmŽmŽmŽmŽmŽmŽmž– 4:    NRICH  HYPERLINK "http://www.nrich.maths.org" www.nrich.maths.org problems linked to the Framework for Secondary Mathematics N.B. This is work in progress - last updated 6 May 2016. Please email any comments to  HYPERLINK "mailto:secondary.nrich@maths.org" secondary.nrich@maths.org Ticked items (() identify problems that have detailed Teachers’ Notes suggesting how they can be integrated into lessons. Asterisked problems (*) appear in two places. Age 11 – 12 …’!’!’!& Age 15 - 16ExtensionNumbers and the number systemUnderstand and use decimal notation and place value; multiply and divide integers and decimals by 10, 100, 1000, and explain the effect HYPERLINK "http://nrich.maths.org/6606"Dicey Operations* ( HYPERLINK "http://nrich.maths.org/11111"Forwards Add Backwards HYPERLINK "http://nrich.maths.org/11110"Add to 200 (  HYPERLINK "http://nrich.maths.org/7208" Always a Multiple?* ( Read and write positive integer powers of 10; multiply and divide integers and decimals by 0.1, 0.01Extend knowledge of integer powers of 10; recognise the equivalence of 0.1, 1/10 and 10-1; multiply and divide by any integer power of 10Express numbers in standard index form, both in conventional notation and on a calculator display HYPERLINK "http://nrich.maths.org/6349" A Question of Scale ( Compare and order decimals in different contexts; know that when comparing measurements the units must be the same  HYPERLINK "http://nrich.maths.org/6605" Nice or Nasty ( Order decimals  Convert between ordinary and standard index form representationsUse standard index form to make sensible estimates for calculations involving multiplication and/or division Round positive whole numbers to the nearest 10, 100 or 1000, and decimals to the nearest whole number or one decimal place Round positive numbers to any given power of 10; round decimals to the nearest whole number or to one or two decimal placesUse rounding to make estimates and to give solutions to problems to an appropriate degree of accuracyRound to a given number of significant figures; use significant figures to approximate answers when multiplying or dividing large numbersUnderstand how errors can be compounded in calculations Understand upper and lower boundsUnderstand negative numbers as positions on a number line; order, add and subtract integers in context Article:  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5947" Adding & Subtracting Negative Numbers   HYPERLINK "https://nrich.maths.org/9941" Up, Down, Flying Around (  HYPERLINK "https://nrich.maths.org/9923" Strange Bank Account (  HYPERLINK "http://nrich.maths.org/7821" Magic Letters (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5865" First Connect Three (Add, subtract, multiply and divide integers  HYPERLINK "http://nrich.maths.org/11012" Making a Difference (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5864" Playing Connect Three (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5958" Weights (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5868" Consecutive Negative Numbers(   HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5798" Difference SudokuRecognise and use multiples, factors, primes (less than 100), common factors, highest common factors and lowest common multiples in simple cases; use simple tests of divisibility  HYPERLINK "http://nrich.maths.org/7520" Sieve of Eratosthenes (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=559&part=index&refpage=monthindex.php"  HYPERLINK "http://nrich.maths.org/559" Dozens (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5468&part=index&refpage=monthindex.php" Factors and Multiples Game (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5448" Factors and Multiples Puzzle(  HYPERLINK "http://nrich.maths.org/7405" What Numbers Can We Make?* (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=796&part=index&refpage=monthindex.php" American Billions ( Article:  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1308" Divisibility TestsUse multiples, factors, common factors, highest common factors, lowest common multiples and primes; find the prime factor decomposition of a number, e.g. 8000 = 26 з 53 HYPERLINK "http://nrich.maths.org/11750"Gabriel’s problem  HYPERLINK "http://nrich.maths.org/11173" Multiple Surprises  HYPERLINK "http://nrich.maths.org/6966" Counting Cogs (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2669&refpage=titlesearch.php" Stars (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6401" Power Mad! (  HYPERLINK "http://nrich.maths.org/6650" How much can we spend? ( Use the prime factor decomposition of a number  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=4903&part=index&refpage=monthindex.php" Product Sudoku (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=740&part=index&refpage=monthindex.php" Funny Factorisation  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=480" 14 Divisors (  HYPERLINK "http://nrich.maths.org/7547" Filling the Gaps (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1866&part=index&refpage=monthindex.php" Take Three from Five (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=602" Differences (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=582" ExpensesRecognise the first few triangular numbers; recognise the squares of numbers to at least 12 з 12 and the corresponding rootsUse squares, positive and negative square roots, cubes and cube roots, and index notation for small positive integer powers  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1163" Sissa's RewardUse ICT to estimate square roots and cube roots HYPERLINK "http://nrich.maths.org/7282" Generating Triples (  Use index notation for integer powers; know and use the index laws for multiplication and division of positive integer powersUse index notation with negative and fractional powers, recognising that the index laws can be applied to these as well Use inverse operations, understanding that the inverse operation of raising a positive number to power n is raising the result of this operation to power 1/n  HYPERLINK "http://nrich.maths.org/6448" Power Countdown (Understand and use rational and irrational numbers Know that nН = "n and nS!= 3"n for any positive number n Express a smaller whole number as a fraction of a larger one; simplify fractions by cancelling all common factors and identify equivalent fractions; convert terminating decimals to fractions, e.g. 0.23=23/100; use diagrams to compare two or more simple fractions Recognise that a recurring decimal is a fraction; use division to convert a fraction to a decimal; order fractions by writing them with a common denominator or by converting them to decimals  HYPERLINK "http://nrich.maths.org/2086" Farey Sequences (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5617" Round and Round and Round Understand the equivalence of simple algebraic fractions; know that a recurring decimal is an exact fractionDistinguish between fractions with denominators that have only prime factors 2 or 5 (terminating decimals), and other fractions (recurring decimals)  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1832" Tiny nines ( Use an algebraic method to convert a recurring decimal to a fraction  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1853&part=index&refpage=monthindex.php" Repetitiously ( Add and subtract simple fractions and those with common denominators; calculate simple fractions of quantities and measurements (whole-number answers); multiply a fraction by an integer  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5467&part=index&refpage=monthindex.php" Fractions Jigsaw (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2312&part=index&refpage=monthindex.php" Peaches Today, Peaches Tomorrow... (Add and subtract fractions by writing them with a common denominator; calculate fractions of quantities (fraction answers); multiply and divide an integer by a fraction  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6540" Keep it Simple* (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1173" Egyptian Fractions* (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6541" The Greedy Algorithm* (  HYPERLINK "http://nrich.maths.org/6700" Diminishing Returns ( Use efficient methods to add, subtract, multiply and divide fractions, interpreting division as a multiplicative inverse; cancel common factors before multiplying or dividing  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2382&part=index&refpage=monthindex.php" Ben's Game (  HYPERLINK "http://nrich.maths.org/708" Fair Shares? (Understand and apply efficient methods to add, subtract, multiply and divide fractions, interpreting division as a multiplicative inverse  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5776" Twisting and Turning  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5777" More Twisting and Turning Understand percentage as the ‘number of parts per 100’; calculate simple percentages and use percentages to compare simple proportions  HYPERLINK "http://nrich.maths.org/public/viewer.php?time=1202216842&obj_id=1249&part=index" Matching Fractions Decimals Percentages (Interpret percentage as the operator ‘so many hundredths of’ and express one given number as a percentage of another; calculate percentages and find the outcome of a given percentage increase or decreaseRecognise when fractions or percentages are needed to compare proportions; solve problems involving percentage changesCalculate an original amount when given the transformed amount after a percentage change; use calculators for reverse percentage calculations by doing an appropriate division Recognise the equivalence of percentages, fractions and decimalsUse the equivalence of fractions, decimals and percentages to compare proportions  Understand the relationship between ratio and proportion; use direct proportion in simple contexts; use ratio notation, simplify ratios and divide a quantity into two parts in a given ratio; solve simple problems involving ratio and proportion using informal strategies  HYPERLINK "http://nrich.maths.org/6870" Mixing Lemonade (Apply understanding of the relationship between ratio and proportion; simplify ratios, including those expressed in different units, recognising links with fraction notation; divide a quantity into two or more parts in a given ratio; use the unitary method to solve simple problems involving ratio and direct proportion Use proportional reasoning to solve problems, choosing the correct numbers to take as 100%, or as a whole; compare two ratios; interpret and use ratio in a range of contexts  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=4793&part=index&refpage=monthindex.php" Mixing Paints  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=4794&part=index&refpage=viewer.php" Mixing More PaintsUnderstand and use proportionality and calculate the result of any proportional change using multiplicative methods  HYPERLINK "http://nrich.maths.org/6882" Ratios and Dilutions (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5611&refpage=titlesearch.php" A Chance to Win? Calculate an unknown quantity from quantities that vary in direct proportion using algebraic methods where appropriate  HYPERLINK "http://nrich.maths.org/309" Areas and Ratios (Understand and use direct and inverse proportion; solve problems involving inverse proportion (including inverse squares) using algebraic methods  HYPERLINK "http://nrich.maths.org/7586" Triathlon and Fitness (Understand and use the rules of arithmetic and inverse operations in the context of positive integers and decimals  HYPERLINK "http://nrich.maths.org/7405" What Numbers Can We Make?* (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=31" Consecutive Numbers (  HYPERLINK "http://nrich.maths.org/746" Where Can We Visit? (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2661&refpage=titlesearch.php" Consecutive Seven ( Understand and use the rules of arithmetic and inverse operations in the context of integers and fractions  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6540" Keep it Simple* (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1173" Egyptian Fractions* (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6541" The Greedy Algorithm* (Understand the effects of multiplying and dividing by numbers between 0 and 1; consolidate use of the rules of arithmetic and inverse operationsRecognise and use reciprocals; understand 'reciprocal' as a multiplicative inverse; know that any number multiplied by its reciprocal is 1, and that zero has no reciprocal because division by zero is not definedUse a multiplier raised to a power to represent and solve problems involving repeated proportional change, e.g. compound interest  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5893" The Legacy  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5636" Dating Made Easier Use the order of operations, including brackets  HYPERLINK "http://nrich.maths.org/11819" Can You Make 100? (Use the order of operations, including brackets, with more complex calculations Understand the order of precedence of operations, including powers  Recall number facts, including positive integer complements to 100 and multiplication facts to 10 з 10, and quickly derive associated division facts  HYPERLINK "http://nrich.maths.org/7382" Missing Multipliers (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6499" Countdown  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1783" Remainders (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6402&part=" The Remainders Game Recall equivalent fractions, decimals and percentages; use known facts to derive unknown facts, including products involving numbers such as 0.7 and 6, and 0.03 and 8 Strengthen and extend mental methods of calculation to include decimals, fractions and percentages, accompanied where appropriate by suitable jottings; solve simple problems mentally  HYPERLINK "http://nrich.maths.org/786" Number Daisy  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1272" Got It ( Strengthen and extend mental methods of calculation, working with decimals, fractions, percentages, squares and square roots, cubes and cube roots; solve problems mentally HYPERLINK "http://nrich.maths.org/11109"Impossibilities  HYPERLINK "https://nrich.maths.org/11112" OverlapsUse known facts to derive unknown facts; extend mental methods of calculation, working with decimals, fractions, percentages, factors, powers and roots; solve problems mentally  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1864" Cinema Problem (Use surds and Р in exact calculations, without a calculator; rationalise a denominator such as 1/"3 = "3/3  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=901" The Root of the Problem Make and justify estimates and approximations of calculationsMake and justify estimates and approximations of calculations  HYPERLINK "http://nrich.maths.org/7500" Place Your Orders* (  HYPERLINK "http://nrich.maths.org/6046" Thousands and Millions* ( Make and justify estimates and approximations of calculationsMake and justify estimates and approximations of calculations by rounding numbers to one significant figure and multiplying or dividing mentally Use efficient written methods to add and subtract whole numbers and decimals with up to two places  HYPERLINK "http://nrich.maths.org/6606" Dicey Operations* (  HYPERLINK "http://nrich.maths.org/11107" Cryptarithms  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=781&refpage=titlesearch.php" Two and Two ( Use efficient written methods to add and subtract integers and decimals of any size, including numbers with differing numbers of decimal places Multiply and divide three-digit by two-digit whole numbers; extend to multiplying and dividing decimals with one or two places by single-digit whole numbers  HYPERLINK "http://nrich.maths.org/5612" Method in Multiplying Madness? (Use efficient written methods for multiplication and division of integers and decimals, including by decimals such as 0.6 or 0.06; understand where to position the decimal point by considering equivalent calculations  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=564" Legs Eleven (  HYPERLINK "http://nrich.maths.org/1785" Largest Product ( Use efficient written methods to add and subtract integers and decimals of any size; multiply by decimals; divide by decimals by transforming to division by an integer  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2032&refpage=titlesearch.php" How Many Miles to Go? ( Carry out calculations with more than one step using brackets and the memory; use the square root and sign change keysCarry out more difficult calculations effectively and efficiently using the function keys for sign change, powers, roots and fractions; use brackets and the memoryUse a calculator efficiently and appropriately to perform complex calculations with numbers of any size, knowing not to round during intermediate steps of a calculation; use the constant, Р and sign change keys; use the function keys for powers, roots and fractions; use brackets and the memory Use an extended range of function keys, including the reciprocal and trigonometric functionsUse calculators to explore exponential growth and decay, using a multiplier and the power keyUse calculators, or written methods, to calculate the upper and lower bounds of calculations in a range of contexts, particularly when working with measurementsEnter numbers and interpret the display in different contexts (decimals, percentages, money, metric measures)  HYPERLINK "http://nrich.maths.org/6651" Going Round in Circles ( Enter numbers and interpret the display in different contexts (extend to negative numbers, fractions, time)Use standard index form, expressed in conventional notation and on a calculator display; know how to enter numbers in standard formCalculate with standard index form, using a calculator as appropriate  Check results by considering whether they are of the right order of magnitude and by working problems backwardsSelect from a range of checking methods, including estimating in context and using inverse operationsCheck results using appropriate methodsCheck results using appropriate methodsCheck results using appropriate methodsCheck results using appropriate methodsAlgebraUse letter symbols to represent unknown numbers or variables; know the meanings of the words term, expression and equation  HYPERLINK "http://nrich.maths.org/2289" Your Number Is… (  HYPERLINK "http://nrich.maths.org/2281" Number Pyramids (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6261" Crossed Ends ( Recognise that letter symbols play different roles in equations, formulae and functions; know the meanings of the words formula and functionDistinguish the different roles played by letter symbols in equations, identities, formulae and functions  Understand that algebraic operations follow the rules of arithmetic Understand that algebraic operations, including the use of brackets, follow the rules of arithmetic; use index notation for small positive integer powers Use index notation for integer powers and simple instances of the index lawsKnow and use the index laws in generalised form for multiplication and division of integer powers Simplify linear algebraic expressions by collecting like terms; multiply a single term over a bracket (integer coefficients)  HYPERLINK "http://nrich.maths.org/7208" Always a Multiple?* (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2282&refpage=titlesearch.php" More Number Pyramids (Simplify or transform linear expressions by collecting like terms; multiply a single term over a bracket  HYPERLINK "http://nrich.maths.org/7283" Perimeter Expressions (  HYPERLINK "http://nrich.maths.org/11164" Fibonacci Surprises  HYPERLINK "http://nrich.maths.org/2129" Special Numbers (  HYPERLINK "https://nrich.maths.org/11118" Reversals (Simplify or transform algebraic expressions by taking out single-term common factors; add simple algebraic fractions  HYPERLINK "http://nrich.maths.org/11215" Puzzling Place Value (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=4716&refpage=titlesearch.php" Harmonic Triangle (Square a linear expression; expand the product of two linear expressions of the form x Б n and simplify the corresponding quadratic expression; establish identities such as a2 " b2 = (a + b) (a " b)  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2278&refpage=titlesearch.php" Pair Products (  HYPERLINK "https://nrich.maths.org/11011" Quadratic Patterns  HYPERLINK "http://nrich.maths.org/742" What’s Possible? (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=658" Plus Minus (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2821&refpage=titlesearch.php" Multiplication Square  HYPERLINK "https://nrich.maths.org/11106" Pythagoras Perimeters Factorise quadratic expressions, including the difference of two squares, e.g. x2 " 9 = (x + 3) (x " 3) and cancel common factors in rational expressions, e.g. 2(x+1)2/(x+1)  HYPERLINK "http://nrich.maths.org/7490" Factorising with Multilink (  HYPERLINK "http://nrich.maths.org/11194" Square Number Surprises  HYPERLINK "https://nrich.maths.org/11120" Difference of Two Squares HYPERLINK "http://nrich.maths.org/11257"Hollow Squares (  HYPERLINK "http://nrich.maths.org/7452" Finding Factors (  HYPERLINK "http://nrich.maths.org/745" Why 24? (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=517" 2-digit square (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2034" Always Perfect  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2286" Perfectly Square  Simplify simple algebraic fractions to produce linear expressions; use factorisation to simplify compound algebraic fractions Construct and solve simple linear equations with integer coefficients (unknown on one side only) using an appropriate method (e.g. inverse operations)  HYPERLINK "http://nrich.maths.org/7216" Your Number Was… (Construct and solve linear equations with integer coefficients (unknown on either or both sides, without and with brackets) using appropriate methods (e.g. inverse operations, transforming both sides in same way)  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1170" Think of Two NumbersConstruct and solve linear equations with integer coefficients (with and without brackets, negative signs anywhere in the equation, positive or negative solution)Solve linear equations in one unknown with integer and fractional coefficients; solve linear equations that require prior simplification of brackets, including those with negative signs anywhere in the equation  HYPERLINK "http://nrich.maths.org/708" Fair Shares* (Solve equations involving algebraic fractions with compound expressions as the numerators and/or denominators  Use graphs and set up equations to solve simple problems involving direct proportionUse algebraic methods to solve problems involving direct proportion; relate algebraic solutions to graphs of the equations; use ICT as appropriate  Introductory work on simultaneous equations  HYPERLINK "http://nrich.maths.org/1053" What’s it worth? ( Solve a pair of simultaneous linear equations by eliminating one variable; link a graph of an equation or a pair of equations to the algebraic solution; consider cases that have no solution or an infinite number of solutions  HYPERLINK "http://nrich.maths.org/4889" Warmsnug Double Glazing* (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2670&part=index&refpage=monthindex.php" Arithmagons ( Explore 'optimum' methods of solving simultaneous equations in different forms  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=849" CD Heaven (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5674" Matchless  HYPERLINK "http://nrich.maths.org/7447" Multiplication Arithmagons (Solve exactly, by elimination of an unknown, two simultaneous equations in two unknowns, where one is linear in each unknown and the other is linear in one unknown and quadratic in the other or of the form x2 + y2 = r2  Solve linear inequalities in one variable; represent the solution set on a number line  HYPERLINK "http://nrich.maths.org/7342" Which Is Cheaper? (Solve linear inequalities in one and two variables; find and represent the solution set  HYPERLINK "http://nrich.maths.org/7344" Which Is Bigger? (  Use systematic trial and improvement methods and ICT tools to find approximate solutions to equations such as x2 + x = 20Solve quadratic equations by factorisation  HYPERLINK "http://nrich.maths.org/631" How Old Am I? (Solve quadratic equations by factorisation, completing the square and using the quadratic formula, including those in which the coefficient of the quadratic term is greater than 1  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=271" Golden Thoughts ( Explore ways of constructing models of real-life situations by drawing graphs and constructing algebraic equations and inequalities  Use simple formulae from mathematics and other subjects; substitute positive integers into linear expressions and formulae and, in simple cases, derive a formulaUse formulae from mathematics and other subjects; substitute integers into simple formulae, including examples that lead to an equation to solve; substitute positive integers into expressions involving small powers e.g. 3x2 + 4 or 2x3; derive simple formulae  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1867&refpage=titlesearch.php" Pick's Theorem* (Use formulae from mathematics and other subjects; substitute numbers into expressions and formulae; derive a formula and, in simple cases, change its subject  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5608" Temperature (Derive and use more complex formulae; change the subject of a formula, including cases where a power of the subject appears in the question or solution, e.g. find r given that A = Рr2  HYPERLINK "http://nrich.maths.org/7366" Training Schedule (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1860&part=index&refpage=monthindex.php" TerminologyDerive and use more complex formulae; change the subject of a formula, including cases where the subject occurs twiceDerive relationships between different formulae that produce equal or related resultsDescribe integer sequences; generate terms of a simple sequence, given a rule (e.g. finding a term from the previous term, finding a term given its position in the sequence)  HYPERLINK "http://nrich.maths.org/7529" Odds, Evens and More Evens(  HYPERLINK "http://nrich.maths.org/6713" Shifting Times Tables (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5525&refpage=titlesearch.php" Triangle Numbers (  HYPERLINK "https://nrich.maths.org/11008" Beach Huts ( Generate terms of a linear sequence using term-to-term and position-to-term rules, on paper and using a spreadsheet or graphics calculator  HYPERLINK "http://nrich.maths.org/7024" Charlie’s Delightful Machine (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2292&refpage=titlesearch.php" Coordinate Patterns* ( Generate terms of a sequence using term-to-term and position-to-term rules, on paper and using ICT  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1019&part=index&refpage=monthindex.php" 1 Step 2 Step (  HYPERLINK "http://nrich.maths.org/6690" Tower of Hanoi ( HYPERLINK "http://nrich.maths.org/7016" A Little Light Thinking ( Generate sequences from patterns or practical contexts and describe the general term in simple cases  HYPERLINK "http://nrich.maths.org/507" Summing Consecutive Numbers (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2275&refpage=titlesearch.php" Picturing Square Numbers (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=4835&refpage=titlesearch.php" Squares in Rectangles ( ATM Article:  HYPERLINK "https://nrich.maths.org/9071" Train Spotters' Paradise Use linear expressions to describe the nth term of a simple arithmetic sequence, justifying its form by referring to the activity or practical context from which it was generated  HYPERLINK "https://nrich.maths.org/1246" Frogs ( HYPERLINK "http://nrich.maths.org/8111"Seven Squares (  HYPERLINK "http://nrich.maths.org/7405" What Numbers Can We Make? NRICH Article:  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5531" Spaces for ExplorationGenerate sequences from practical contexts and write and justify an expression to describe the nth term of an arithmetic sequence  HYPERLINK "http://nrich.maths.org/8280" What Numbers Can We Make Now? (  HYPERLINK "http://nrich.maths.org/2274" Picturing Triangle Numbers (  HYPERLINK "http://nrich.maths.org/6710" Slick Summing (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6390" Elevenses (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=308" Days and Dates (  HYPERLINK "http://nrich.maths.org/11212" Growing SurprisesFind the next term and the nth term of quadratic sequences and explore their properties; deduce properties of the sequences of triangular and square numbers from spatial patterns  HYPERLINK "http://nrich.maths.org/900" Attractive Tablecloths* (  HYPERLINK "http://nrich.maths.org/2322" Painted Cube* (  HYPERLINK "http://nrich.maths.org/6703" Mystic Rose (  HYPERLINK "http://nrich.maths.org/7760" Steel Cables ( HYPERLINK "http://nrich.maths.org/6903" Partially Painted Cube (  HYPERLINK "http://nrich.maths.org/8096" Double Trouble (  HYPERLINK "http://nrich.maths.org/325" Picture Story (  HYPERLINK "http://nrich.maths.org/8054" Summing Geometric Progressions (Express simple functions in words, then using symbols; represent them in mappings Express simple functions algebraically and represent them in mappings or on a spreadsheet  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1867&refpage=titlesearch.php" Pick's Theorem* (Find the inverse of a linear functionPlot the graph of the inverse of a linear function Generate coordinate pairs that satisfy a simple linear rule; plot the graphs of simple linear functions, where y is given explicitly in terms of x, on paper and using ICT; recognise straight-line graphs parallel to the x-axis or y-axis  HYPERLINK "http://nrich.maths.org/6951" Exploring Simple Mappings (Generate points in all four quadrants and plot the graphs of linear functions, where y is given explicitly in terms of x, on paper and using ICT; recognise that equations of the form y = mx + c correspond to straight-line graphs  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6603" How Steep Is the Slope? (  HYPERLINK "http://nrich.maths.org/5609" Parallel Lines ( Generate points and plot graphs of linear functions, where y is given implicitly in terms of x (e.g. ay + bx = 0, y + bx + c = 0), on paper and using ICT; find the gradient of lines given by equations of the form y = mx + c, given values for m and c  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5725" Diamond Collector (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6539" Translating Lines (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6471&part=" Reflecting Lines ( Understand that equations in the form y = mx + c represent a straight line and that m is the gradient and c is the value of the y-intercept; investigate the gradients of parallel lines and lines perpendicular to these lines  HYPERLINK "http://nrich.maths.org/6461" At Right Angles (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5610" Perpendicular Lines (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6544&part=" Surprising Transformations  ( Identify the equations of straight-line graphs that are parallel; find the gradient and equation of a straight-line graph that is perpendicular to a given line  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=494" Doesn’t Add Up ( Plot and interpret the graphs of simple linear functions arising from real-life situations, e.g. conversion graphsConstruct linear functions arising from real-life problems and plot their corresponding graphs; discuss and interpret graphs arising from real situations, e.g. distance–time graphs  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=985&submit=submit" Walk and Ride* ( Construct functions arising from real-life problems and plot their corresponding graphs; interpret graphs arising from real situations, e.g. time series graphs  HYPERLINK "http://nrich.maths.org/7419" Fill Me Up (  HYPERLINK "http://nrich.maths.org/6424" Maths Filler (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=4808&refpage=titlesearch.php" How Far Does it Move? (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=4809&part=index&refpage=viewer.php" Speeding Up, Slowing Down (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=4810&part=index&refpage=viewer.php" Up and Across Understand that the point of intersection of two different lines in the same two variables that simultaneously describe a real situation is the solution to the simultaneous equations represented by the lines  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5871" Negatively Triangular Find approximate solutions of a quadratic equation from the graph of the corresponding quadratic functionKnow and understand that the intersection points of the graphs of a linear and quadratic function are the approximate solutions to the corresponding simultaneous equations Construct the graphs of simple loci, including the circle x2 + y2 = r2; find graphically the intersection points of a given straight line with this circle and know this represents the solution to the corresponding two simultaneous equations Explore simple properties of quadratic functions; plot graphs of simple quadratic and cubic functions, e.g. y = x2, y = 3x2 + 4, y = x3  HYPERLINK "http://nrich.maths.org/6952" Exploring Quadratic Mappings ( Plot graphs of more complex quadratic and cubic functions; estimate values at specific points, including maxima and minimaPlot and recognise the characteristic shapes of graphs of simple cubic functions (e.g. y = x3), reciprocal functions (e.g. y = 1/x, x `" 0), exponential functions (y = kx for integer values of x and simple positive values of k) and trigonometric functions, on paper and using ICT  HYPERLINK "http://nrich.maths.org/7502" What’s That Graph? (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6506" Back Fitter (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=4851" Steady Free Fall  Identify and sketch graphs of linear and simple quadratic and cubic functions; understand the effect on the graph of addition of (or multiplication by) a constantApply to the graph y = f(x) the transformations y = f(x) + a, y = f(ax), y = f(x+a) and y = af(x) for linear, quadratic, sine and cosine functions  HYPERLINK "http://nrich.maths.org/773" Parabolic Patterns  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=802" Cubics  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6481" Tangled Trig Graphs ( Use ICT to explore the graphical representation of algebraic equations and interpret how properties of the graph are related to features of the equation, e.g. parallel and perpendicular lines   Interpret the meaning of various points and sections of straight-line graphs, including intercepts and intersection, e.g. solving simultaneous linear equations Geometry and MeasuresUse correctly the vocabulary, notation and labelling conventions for lines, angles and shapes HYPERLINK "http://nrich.maths.org/11234"Complete the Quadrilateral (Distinguish between conventions, definitions and derived propertiesDistinguish between practical demonstration and proof in a geometrical context HYPERLINK "http://nrich.maths.org/11105"Quadrilateral in a Square (  HYPERLINK "http://nrich.maths.org/6536" Circles in Quadrilaterals ( Show step-by-step deduction in solving more complex geometrical problems  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6323" Partly Circles ( Understand the necessary and sufficient conditions under which generalisations, inferences and solutions to geometrical problems remain valid HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2287"Squirty ( Identify parallel and perpendicular lines; know the sum of angles at a point, on a straight line and in a triangle; recognise vertically opposite anglesIdentify alternate angles and corresponding angles; understand a proof that: the angle sum of a triangle is 180Аand of a quadrilateral is 360А the exterior angle of a triangle is equal to the sum of the two interior opposite anglesExplain how to find, calculate and use: • the sums of the interior and exterior angles of quadrilaterals, pentagons and hexagons • the interior and exterior angles of regular polygons  HYPERLINK "http://nrich.maths.org/4832/index" Semi-regular Tesselations (  HYPERLINK "http://nrich.maths.org/7306" Which Solids Can We Make? (  Know the definition of a circle and the names of its parts; explain why inscribed regular polygons can be constructed by equal divisions of a circleKnow that the tangent at any point on a circle is perpendicular to the radius at that point; explain why the perpendicular from the centre to the chord bisects the chord  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=548" Compare Areas (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2163" Circle-inProve and use the facts that: • the angle subtended by an arc at the centre of a circle is twice the angle subtended at any point on the circumference • the angle subtended at the circumference by a semicircle is a right angle • angles in the same segment are equal • opposite angles in a cyclic quadrilateral sum to 180А  HYPERLINK "http://nrich.maths.org/2844" Triangles in Circles (  HYPERLINK "http://nrich.maths.org/6624" Cyclic Quadrilaterals* (  HYPERLINK "http://nrich.maths.org/2845" Subtended Angles* (  HYPERLINK "http://nrich.maths.org/2847" Right Angles* ( Prove and use the alternate segment theoremIdentify and use angle, side and symmetry properties of triangles and quadrilaterals; explore geometrical problems involving these properties, explaining reasoning orally, using step-by-step deduction supported by diagrams  HYPERLINK "http://nrich.maths.org/11202" Guess my Quad  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2927&refpage=titlesearch.php" Property Chart (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2925&part=index&refpage=monthindex.php" Shapely Pairs (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2924&refpage=titlesearch.php" Quadrilaterals Game (Solve geometrical problems using side and angle properties of equilateral, isosceles and right-angled triangles and special quadrilaterals, explaining reasoning with diagrams and text; classify quadrilaterals by their geometrical properties  HYPERLINK "http://nrich.maths.org/2526" Square It (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6280" Eight Hidden Squares (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2667&refpage=titlesearch.php" Square Coordinates (  HYPERLINK "http://nrich.maths.org/7381" Opposite Vertices ( Solve problems using properties of angles, of parallel and intersecting lines, and of triangles and other polygons, justifying inferences and explaining reasoning with diagrams and text  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2844&refpage=titlesearch.php" Triangles in Circles (  HYPERLINK "http://nrich.maths.org/6624" Cyclic Quadrilaterals* (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2845&part=index&refpage=monthindex.php" Subtended Angles* (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2847&part=index&refpage=monthindex.php" Right Angles* (Solve multi-step problems using properties of angles, of parallel lines, and of triangles and other polygons, justifying inferences and explaining reasoning with diagrams and text  HYPERLINK "http://nrich.maths.org/8301" Kite in a Square ( HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6355"Making Sixty (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=665" Sitting Pretty (  Know that if two 2-D shapes are congruent, corresponding sides and angles are equalUnderstand congruence and explore similarityKnow that if two 2-D shapes are similar, corresponding angles are equal and corresponding sides are in the same ratio; understand from this that any two circles and any two squares are mathematically similar while in general any two rectangles are not  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=4960" Trapezium Four (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5635" Nicely similar  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=510" Two ladders  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=700" Napkin (Prove the congruence of triangles and verify standard ruler and compass constructions using formal arguments  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=483" Triangle Midpoints (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=726" Angle trisection( Use 2-D representations to visualise 3-D shapes and deduce some of their properties Visualise 3-D shapes from their nets; use geometric properties of cuboids and shapes made from cuboids; use simple plans and elevationsVisualise and use 2-D representations of 3-D objects; analyse 3-D shapes through 2-D projections, including plans and elevations  HYPERLINK "http://nrich.maths.org/768/index" Nine Colours (  HYPERLINK "http://nrich.maths.org/895" Marbles in a Box (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=573" Tet-trouble (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1157&refpage=titlesearch.php" Triangles to Tetrahedra (  Investigate Pythagoras’ theorem, using a variety of media, through its historical and cultural roots, including ‘picture’ proofs  HYPERLINK "http://nrich.maths.org/2293" Tilted Squares (Understand and apply Pythagoras' theorem when solving problems in 2-D and simple problems in 3-D  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2160&part=index&refpage=monthindex.php" Inscribed in a Circle  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1863&part=index&refpage=monthindex.php" Semi-detached  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=289" Ladder and Cube  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2658" Where to Land Understand and use Pythagoras' theorem to solve 3-D problems  HYPERLINK "https://nrich.maths.org/11190" Garden Shed  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2365" The Spider and the Fly  HYPERLINK "http://nrich.maths.org/6553" Pythagoras Proofs (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=360" Three Cubes Understand and use trigonometric relationships in right-angled triangles, and use these to solve problems, including those involving bearings  HYPERLINK "http://nrich.maths.org/5615" Where Is the Dot? HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5615"   HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5601" Trigonometric Protractor (Use trigonometric relationships in right-angled triangles to solve 3-D problems, including finding the angles between a line and a plane  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2357" Far horizonDraw, sketch and describe the graphs of trigonometric functions for angles of any size, including transformations involving scalings in either or both of the x and y directions Use the sine and cosine rules to solve 2-D and 3-D problems HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1954"Hexy-metry ( HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1955"Three by One (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2690" Cubestick  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=312" Bendy Quad(  Calculate the area of a triangle using the formula НabsinC Understand and use the language and notation associated with reflections, translations and rotations Recognise and visualise the symmetries of a 2-D shape  HYPERLINK "http://nrich.maths.org/1868" Shady Symmetry (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1840" Reflecting Squarely ( Identify all the symmetries of 2-D shapes  HYPERLINK "http://nrich.maths.org/900" Attractive Tablecloths* ( Identify reflection symmetry in 3-D shapes Transform 2-D shapes by: • reflecting in given mirror lines • rotating about a given point • translating  HYPERLINK "http://nrich.maths.org/5458" Mirror, Mirror… (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5459&part=index&refpage=viewer.php" ...on the Wall (  HYPERLINK "http://nrich.maths.org/6987" Attractive Rotations ( Transform 2-D shapes by rotation, reflection and translation, on paper and using ICT  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5457&part=index&refpage=monthindex.php" Transformation Game (Recognise that translations, rotations and reflections preserve length and angle, and map objects on to congruent imagesTransform 2-D shapes by combinations of translations, rotations and reflections, on paper and using ICT; use congruence to show that translations, rotations and reflections preserve length and angle Explore these transformations and symmetries using ICTTry out mathematical representations of simple combinations of these transformations Explore and compare mathematical representations of combinations of translations, rotations and reflections of 2-D shapes, on paper and using ICTUse any point as the centre of rotation; measure the angle of rotation, using fractions of a turn or degrees; understand that translations are specified by a vectorUnderstand and use vector notation to describe transformation of 2-D shapes by combinations of translations; calculate and represent graphically the sum of two vectors  HYPERLINK "http://nrich.maths.org/5812" Spotting the Loophole HYPERLINK "http://nrich.maths.org/7453"Vector Journeys (Calculate and represent graphically the sum of two vectors, the difference of two vectors and a scalar multiple of a vector; calculate the resultant of two vectors  HYPERLINK "https://nrich.maths.org/6572" Vector Walk ( Devise instructions for a computer to generate and transform shapes Understand and use the commutative and associative properties of vector addition Solve simple geometrical problems in 2-D using vectors  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=4890&refpage=titlesearch.php" Areas of Parallelograms ( Understand and use the language and notation associated with enlargement; enlarge 2-D shapes, given a centre of enlargement and a positive integer scale factor; explore enlargement using ICTEnlarge 2-D shapes, given a centre of enlargement and a positive integer scale factor, on paper and using ICT; identify the scale factor of an enlargement as the ratio of the lengths of any two corresponding line segments; recognise that enlargements preserve angle but not length, and understand the implications of enlargement for perimeterEnlarge 2-D shapes using positive, fractional and negative scale factors, on paper and using ICT; recognise the similarity of the resulting shapes; understand and use the effects of enlargement on perimeter  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5461&part=index&refpage=viewer.php" Who Is the Fairest of Them All? (Understand and use the effects of enlargement on areas and volumes of shapes and solids  HYPERLINK "http://nrich.maths.org/6923" Growing Rectangles (  HYPERLINK "http://nrich.maths.org/7385" Fit for Photocopying (  Make scale drawings Use and interpret maps and scale drawings in the context of mathematics and other subjects Use conventions and notation for 2-D coordinates in all four quadrants; find coordinates of points determined by geometric information Article:  HYPERLINK "https://nrich.maths.org/10818" Dotty Grids in the Classroom  HYPERLINK "http://nrich.maths.org/6288" Cops and Robbers (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2292&refpage=titlesearch.php" Coordinate Patterns* (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5469&part=index&refpage=monthindex.php" Route to Infinity (Find the midpoint of the line segment AB, given the coordinates of points A and BUse the coordinate grid to solve problems involving translations, rotations, reflections and enlargementsFind the points that divide a line in a given ratio, using the properties of similar triangles; calculate the length of AB, given the coordinates of points A and B  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=737" Beelines ( Use a ruler and protractor to: • measure and draw lines to the nearest millimetre and angles, including reflex angles, to the nearest degree • construct a triangle, given two sides and the included angle (SAS) or two angles and the included side (ASA)Use straight edge and compasses to construct: • the midpoint and perpendicular bisector of a line segment • the bisector of an angle • the perpendicular from a point to a line • the perpendicular from a point on a line • a triangle, given three sides (SSS)  HYPERLINK "http://nrich.maths.org/8098" Constructing Triangles (Use straight edge and compasses to construct triangles, given right angle, hypotenuse and side (RHS) Understand from experience of constructing them that triangles given SSS, SAS, ASA or RHS are unique, but that triangles given SSA or AAA are not Use ICT to explore constructions Use ICT to explore these constructionsUse ICT to explore constructions of triangles and other 2-D shapes  Use ruler and protractor to construct simple nets of 3-D shapes, e.g. cuboid, regular tetrahedron, square-based pyramid, triangular prismFind simple loci, both by reasoning and by using ICT, to produce shapes and paths, e.g. an equilateral triangle Find the locus of a point that moves according to a simple rule, both by reasoning and by using ICT  HYPERLINK "http://nrich.maths.org/2159" Rolling Around Find the locus of a point that moves according to a more complex rule, both by reasoning and by using ICT  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2162" Rollin’ Rollin’ Rollin’ (  Choose and use units of measurement to measure, estimate, calculate and solve problems in everyday contexts; convert one metric unit to another, e.g. grams to kilograms; read and interpret scales on a range of measuring instruments  HYPERLINK "http://nrich.maths.org/7500" Place Your Orders* (  HYPERLINK "http://nrich.maths.org/6046" Thousands and Millions* (Choose and use units of measurement to measure, estimate, calculate and solve problems in a range of contexts; know rough metric equivalents of imperial measures in common use, such as miles, pounds (lb) and pints  HYPERLINK "http://nrich.maths.org/5994" All in a Jumble (  HYPERLINK "http://nrich.maths.org/8318" Olympic Measures (Solve problems involving measurements in a variety of contexts; convert between area measures (e.g. mm2 to cm2, cm2 to m2, and vice versa) and between volume measures (e.g. mm3 to cm3, cm3 to m3, and vice versa)  HYPERLINK "http://nrich.maths.org/7571" Nutrition and Cycling (Understand and use measures of speed (and other compound measures such as density or pressure); solve problems involving constant or average rates of change  HYPERLINK "http://nrich.maths.org/7322" Speed-time Problems at the Olympics (  HYPERLINK "http://nrich.maths.org/6494" Speeding Boats (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=985&submit=submit" Walk and Ride* ( Apply knowledge that measurements given to the nearest whole unit may be inaccurate by up to one half of the unit in either direction and use this to understand how errors can be compounded in calculationsRecognise limitations in the accuracy of measurements and judge the proportional effect on solutionsDistinguish between and estimate the size of acute, obtuse and reflex angles HYPERLINK "http://nrich.maths.org/1235"Estimating Angles (Use bearings to specify direction  Interpret and explore combining measures into rates of change in everyday contexts (e.g. km per hour, pence per metre); use compound measures to compare in real-life contexts (e.g. travel graphs and value for money), using ICT as appropriate  Know and use the formula for the area of a rectangle; calculate the perimeter and area of shapes made from rectangles  HYPERLINK "https://nrich.maths.org/11119" Perimeter Challenge  HYPERLINK "http://nrich.maths.org/9691" Perimeter Possibilities (  HYPERLINK "http://nrich.maths.org/7534" Changing Areas, Changing Perimeters (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=4889&part=index&refpage=monthindex.php" Warmsnug Double Glazing (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2401&part=index&refpage=monthindex.php" On the Edge (Derive and use formulae for the area of a triangle, parallelogram and trapezium; calculate areas of compound shapes  HYPERLINK "http://nrich.maths.org/6398" Can They Be Equal? (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2663&refpage=titlesearch.php" Fence It (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2666&refpage=titlesearch.php" Isosceles Triangles (  HYPERLINK "https://nrich.maths.org/11017" Triangles in a Square  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=1867&refpage=titlesearch.php" Pick's Theorem* (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=693" Of All the Areas ( Know and use the formulae for the circumference and area of a circle  HYPERLINK "http://nrich.maths.org/809" Blue and White  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2161&refpage=titlesearch.php" An Unusual Shape (  Solve problems involving lengths of circular arcs and areas of sectors  HYPERLINK "http://nrich.maths.org/6468" Curvy Areas (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2425" Salinon (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=866" Arclets Understand and use the formulae for the length of a circular arc and area and perimeter of a sector  HYPERLINK "http://nrich.maths.org/7359" Track Design (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2095" Triangles and Petals (Calculate the surface area of cubes and cuboids  HYPERLINK "http://nrich.maths.org/11178" Colourful Cubes  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2383&refpage=titlesearch.php" Cuboids (Know and use the formula for the volume of a cuboid; calculate volumes and surface areas of cuboids and shapes made from cuboids  HYPERLINK "http://nrich.maths.org/6399" Cuboid Challenge (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2322&refpage=titlesearch.php" Painted Cube* (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2650&part=index&refpage=monthindex.php" Sending a Parcel Calculate the surface area and volume of right prisms  HYPERLINK "http://nrich.maths.org/7535" Changing Areas, Changing Volumes ( Solve problems involving surface areas and volumes of cylinders  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=2664&refpage=titlesearch.php" Efficient Cutting (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5888" Cola Can Solve problems involving surface areas and volumes of cylinders, pyramids, cones and spheres  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5890" FunnelSolve problems involving more complex shapes and solids, including segments of circles and frustums of cones  HYPERLINK "http://nrich.maths.org/7499" Fill Me up Too (  HYPERLINK "http://nrich.maths.org/6439" Immersion (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=5673" Gutter  Consider the dimensions of a formula and begin to recognise the difference between formulae for perimeter, area and volume in simple contextsUnderstand the difference between formulae for perimeter, area and volume by considering dimensionsStatisticsSuggest possible answers, given a question that can be addressed by statistical methods  HYPERLINK "http://nrich.maths.org/7721" Statistical Shorts (Discuss a problem that can be addressed by statistical methods and identify related questions to explore  HYPERLINK "http://nrich.maths.org/6044" Reaction Timer (Suggest a problem to explore using statistical methods, frame questions and raise conjectures  HYPERLINK "https://nrich.maths.org/11007" The Lives of PresidentsIndependently devise a suitable plan for a substantial statistical project and justify the decisions madeConsider possible difficulties with planned approaches, including practical problems; adjust the project plan accordinglySelect and justify a sampling scheme and a method to investigate a population, including random and stratified samplingDecide which data would be relevant to an enquiry and possible sources Decide which data to collect to answer a question, and the degree of accuracy needed; identify possible sources; consider appropriate sample size  HYPERLINK "http://nrich.maths.org/7367" Who’s the Best? (Discuss how different sets of data relate to the problem; identify possible primary or secondary sources; determine the sample size and most appropriate degree of accuracy  HYPERLINK "http://nrich.maths.org/7722" Retiring to Paradise (Identify possible sources of bias and plan how to minimise itDeal with practical problems such as non-response or missing dataUnderstand how different methods of sampling and different sample sizes may affect the reliability of conclusions drawnPlan how to collect and organise small sets of data from surveys and experiments: • design data collection sheets or questionnaires to use in a simple survey • construct frequency tables for gathering discrete data, grouped where appropriate in equal class intervalsPlan how to collect the data; construct frequency tables with equal class intervals for gathering continuous data and two-way tables for recording discrete dataDesign a survey or experiment to capture the necessary data from one or more sources; design, trial and if necessary refine data collection sheets; construct tables for gathering large discrete and continuous sets of raw data, choosing suitable class intervals; design and use two-way tablesBreak a task down into an appropriate series of key statements (hypotheses), and decide upon the best methods for testing theseIdentify what extra information may be required to pursue a further line of enquiry Collect small sets of data from surveys and experiments, as plannedCollect data using a suitable method (e.g. observation, controlled experiment, data logging using ICT)  HYPERLINK "https://nrich.maths.org/10629" Estimating Time ( Gather data from specified secondary sources, including printed tables and lists, and ICT-based sources, including the internetGather data from primary and secondary sources, using ICT and other methods, including data from observation, controlled experiment, data logging, printed tables and lists Calculate statistics for small sets of discrete data: • find the mode, median and range, and the modal class for grouped data • calculate the mean, including from a simple frequency table, using a calculator for a larger number of items  HYPERLINK "https://nrich.maths.org/10995" About Average  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6267" M, M and M (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6345" Searching for Mean(ing) (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=4838&part=index&refpage=monthindex.php" Litov's Mean Value Theorem (Calculate statistics for sets of discrete and continuous data, including with a calculator and spreadsheet; recognise when it is appropriate to use the range, mean, median and mode and, for grouped data, the modal class  HYPERLINK "https://nrich.maths.org/11281" Unequal Averages  HYPERLINK "https://nrich.maths.org/10999" Half a minute  HYPERLINK "http://nrich.maths.org/6957" How Would You Score It? (Calculate statistics and select those most appropriate to the problem or which address the questions posed  HYPERLINK "http://nrich.maths.org/10996" Wipeout (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=4834&refpage=titlesearch.php" Top Coach (Use an appropriate range of statistical methods to explore and summarise data; including estimating and finding the mean, median, quartiles and interquartile range for large data sets (by calculation or using a cumulative frequency diagram)  HYPERLINK "http://nrich.maths.org/8061" Olympic Triathlon (Use an appropriate range of statistical methods to explore and summarise data; including calculating an appropriate moving average for a time series  Use a moving average to identify seasonality and trends in time series data, using them to make predictions Construct, on paper and using ICT, graphs and diagrams to represent data, including: • bar-line graphs • frequency diagrams for grouped discrete data • simple pie charts  HYPERLINK "https://nrich.maths.org/10464" Picturing the World (Construct graphical representations, on paper and using ICT, and identify which are most useful in the context of the problem. Include: • pie charts for categorical data • bar charts and frequency diagrams for discrete and continuous data • simple line graphs for time series • simple scatter graphs • stem-and-leaf diagramsSelect, construct and modify, on paper and using ICT, suitable graphical representations to progress an enquiry and identify key features present in the data. Include: • line graphs for time series • scatter graphs to develop further understanding of correlation  HYPERLINK "https://nrich.maths.org/10470" What’s the Weather Like? (Select, construct and modify, on paper and using ICT, suitable graphical representation to progress an enquiry and identify key features present in the data. Include: • cumulative frequency tables and diagrams • box plots • scatter graphs and lines of best fit (by eye)  HYPERLINK "https://nrich.maths.org/11002" Box Plot MatchSelect, construct and modify, on paper and using ICT, suitable graphical representation to progress an enquiry, including histograms for grouped continuous data with equal class intervals  HYPERLINK "https://nrich.maths.org/10466" Perception Versus Reality (Construct histograms, including those with unequal class intervals Work through the entire handling data cycle to explore relationships within bi-variate data, including applications to global citizenship, e.g. how fair is our society? Interpret diagrams and graphs (including pie charts), and draw simple conclusions based on the shape of graphs and simple statistics for a single distributionInterpret tables, graphs and diagrams for discrete and continuous data, relating summary statistics and findings to the questions being explored  HYPERLINK "http://nrich.maths.org/7735" Charting Success (Interpret graphs and diagrams and make inferences to support or cast doubt on initial conjectures; have a basic understanding of correlation Analyse data to find patterns and exceptions, and try to explain anomalies; include social statistics such as index numbers, time series and survey data  HYPERLINK "http://nrich.maths.org/7489" Olympic Records ( HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=4957"Substitution Cipher ( Interpret and use cumulative frequency diagrams to solve problemsUse, interpret and compare histograms, including those with unequal class intervals Appreciate that correlation is a measure of the strength of association between two variables; distinguish between positive, negative and zero correlation, using lines of best fit; appreciate that zero correlation does not necessarily imply 'no relationship' but merely 'no linear relationship' Compare two simple distributions using the range and one of the mode, median or meanCompare two distributions using the range and one or more of the mode, median and meanCompare two or more distributions and make inferences, using the shape of the distributions and appropriate statistics  HYPERLINK "http://nrich.maths.org/7731" Which List Is Which? (Compare two or more distributions and make inferences, using the shape of the distributions and measures of average and spread, including median and quartiles Write a short report of a statistical enquiry, including appropriate diagrams, graphs and charts, using ICT as appropriate; justify the choice of presentationWrite about and discuss the results of a statistical enquiry using ICT as appropriate; justify the methods used Review interpretations and results of a statistical enquiry on the basis of discussions; communicate these interpretations and results using selected tables, graphs and diagramsExamine critically the results of a statistical enquiry; justify choice of statistical representations and relate summarised data to the questions being exploredRecognise the limitations of any assumptions and the effects that varying the assumptions could have on the conclusions drawn from data analysis Use vocabulary and ideas of probability, drawing on experience Interpret the results of an experiment using the language of probability; appreciate that random processes are unpredictable  HYPERLINK "http://nrich.maths.org/7219" Sociable Cards (Interpret results involving uncertainty and prediction  HYPERLINK "http://nrich.maths.org/7250" What Does Random Look Like? (Use tree diagrams to represent outcomes of two or more events and to calculate probabilities of combinations of independent events  HYPERLINK "http://nrich.maths.org/7220" Last One Standing ( Use tree diagrams to represent outcomes of compound events, recognising when events are independent and distinguishing between contexts involving selection both with and without replacement  HYPERLINK "http://nrich.maths.org/7478" Who’s the Winner? (  HYPERLINK "http://nrich.maths.org/920" Chances Are (  Understand and use the probability scale from 0 to 1; find and justify probabilities based on equally likely outcomes in simple contexts; identify all the possible mutually exclusive outcomes of a single eventKnow that if the probability of an event occurring is p then the probability of it not occurring is 1 " p; use diagrams and tables to record in a systematic way all possible mutually exclusive outcomes for single events and for two successive events  HYPERLINK "http://nrich.maths.org/7541" Non-transitive Dice (  HYPERLINK "http://nrich.maths.org/7286" At Least One… (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=6033" Interactive Spinners ( Identify all the mutually exclusive outcomes of an experiment; know that the sum of probabilities of all mutually exclusive outcomes is 1 and use this when solving problems  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=4308&part=index&refpage=monthindex.php" Odds and Evens* (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=919" In a Box (Know when to add or multiply two probabilities: if A and B are mutually exclusive, then the probability of A or B occurring is P(A) + P(B), whereas if A and B are independent events, the probability of A and B occurring is P(A) з P(B)  HYPERLINK "http://nrich.maths.org/7238" Mathsland National Lottery (  HYPERLINK "http://nrich.maths.org/7221" Same Number! (Recognise when and how to work with probabilities associated with independent and mutually exclusive events when interpreting dataEstimate probabilities by collecting data from a simple experiment and recording it in a frequency table; compare experimental and theoretical probabilities in simple contexts  HYPERLINK "http://nrich.maths.org/4308/index" Odds and Evens* (Compare estimated experimental probabilities with theoretical probabilities, recognising that: • if an experiment is repeated the outcome may, and usually will, be different • increasing the number of times an experiment is repeated generally leads to better estimates of probability  HYPERLINK "http://nrich.maths.org/4304/index" Flippin’ Discs ( Compare experimental and theoretical probabilities in a range of contexts; appreciate the difference between mathematical explanation and experimental evidence  HYPERLINK "http://nrich.maths.org/7222" Do You Feel Lucky? (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=4311&part=index&refpage=monthindex.php" Two's Company (  HYPERLINK "http://nrich.maths.org/public/viewer.php?obj_id=4313&part=index&refpage=monthindex.php" Cosy Corner ( Understand relative frequency as an estimate of probability and use this to compare outcomes of experiments  HYPERLINK "http://nrich.maths.org/6123" Which Spinners? 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Garden Shed Triangles in a Square Quadrilaterals in a Square  October 2014 Quadratic Patterns Pythagoras Perimeters Difference of Two Squares Hollow Squares ------------------------ Unequal Averages About Average Wipeout Half a Minute Box Plot Match The Lives of Presidents ------------------------ Beach Huts Reversals April 2015 Making a Difference Puzzling Place Value Colourful Cube  May 2015  HYPERLINK "http://nrich.maths.org/11173" Multiple Surprises  HYPERLINK "http://nrich.maths.org/11164" Fibonacci Surprises  HYPERLINK "http://nrich.maths.org/11194" Square Number Surprises  HYPERLINK "http://nrich.maths.org/7405" What Numbers Can We Make?  HYPERLINK "http://nrich.maths.org/11212" Growing Surprises July 2015  HYPERLINK "http://nrich.maths.org/11234" Complete the Quadrilateral  HYPERLINK "http://nrich.maths.org/11202" Guess my Quad December 2015 HYPERLINK "http://nrich.maths.org/11750"Gabriel’s problem     PAGE  PAGE 1 Љ University of Cambridge Place Value, Integers, Ordering & Rounding – Stage 3 Place Value, Ordering and Rounding – Stage 4 Factors, Multiples and Primes Powers and Roots Fractions, Decimals, Percentages and Ratio Number Operations and Calculation Methods Creating & Manipulating Algebraic Expressions Expanding and Factorising Quadratics Equations and Formulae – Stage 3 Equations and Formulae – Stage 4 Patterns and Sequences – Stage 3 Patterns and Sequences – Stage 4 Function and Graphs – Stage 3 Functions and Graphs – Stage 4 Geometrical Reasoning – Stage 4 Angles and Polygons 3D Shapes Pythagoras’s Theorem Trigonometry Transformations Vectors Enlargements and Scale Factors Coordinate Geometry Construction and Loci Units of Measurement Perimeter, Area and Volume – Stage 4 Perimeter, Area and Volume – Stage 3 Planning Statistical Projects Processing and Representing Data Interpreting Data Probability – Stage 3 Probability – Stage 4 ~ПРСЯабдежфхіїјњ‘щзНщЉщз˜‰„€p]TE?/h[,­B*CJOJQJ^Jphџ h[,­CJhЏ/h[,­CJOJQJ^JhЏ/h[,­CJ%hЏ/h[,­B*CJOJQJaJphџh[,­B*CJOJQJaJphџh[,­ hћGЇy(hЃ* h[,­CJOJQJaJ hЃ* h[,­CJOJQJ^JaJ'hї8кh[,­0J5CJOJQJ^JaJ2j?Whї8кh[,­5CJOJQJU^JaJ#hї8кh[,­5CJOJQJ^JaJ,jhї8кh[,­5CJOJQJU^JaJдезийклмнопрстуфіїјљњ‘‘(‘5‘њёёёёёёёёёёёёёёфффффЯЯЯЯ Ц$6„уџ„уџ$If^„уџ`„уџgd[,­ Ц$6$Ifgd[,­ Ц$6gd[,­Ff…Y‘‘N‘O‘]‘^‘r‘Џ‘А‘Б‘‘ÑϑБ’ ’Њ’Е’Ж’Р’ьоиШЕоЉ ‘€оШmоЉaЉUEh.(YB*CJOJQJ^Jphџh.(YCJOJQJ^Jh02UCJOJQJ^J%h zŽh[,­B*CJOJQJ^Jphџ!hDЏh[,­B*CJOJQJphџhЏ/h[,­CJOJQJ^JhЏ/h[,­CJh[,­CJOJQJ^J%h­FЊh[,­B*CJOJQJ^Jphџh[,­B*CJOJQJ^Jphџ h[,­CJh[,­CJOJQJ^JaJ%hm^h[,­B*CJOJQJ^Jphџ5‘E‘N‘O‘^‘r‘~‘”‘Џ‘А‘Б‘‘ÑБг‘щ‘’’+’<’J’R’`’o’‡’ ’ъъъъъъъъъннъъъъъъъъъъъъъъ Ц$6$Ifgd[,­ 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‚http://nrich.maths.org/public/viewer.php?obj_id=5865yXє;HЏ,‚]Ф…'cЅЋЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11012ѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=5864yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=5958yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=5868yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=5798yXє;HЏ,‚]Ф…'cЅЋ-$$If–!vh#vџ #v #vE #vП #v- :V –l”њ ж ррр   ж<џўџСџўџСџўџСџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6і5ж$5жŠ5ж`5ж2pж<џўџСџўџСџўџСџџчњџџчњџџчњkd$$If–lж000000”њжˆ”џ“ ““и(—3Ф=$$$Š`2 ж ррр   ж<џўџСџўџСџўџСџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ4ж4ж laіpж<џўџСџўџСџўџСџџчњџџчњџџчњСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7520yXє;HЏ,‚]Ф…'cЅЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ќhttp://nrich.maths.org/public/viewer.php?obj_id=559&part=index&refpage=monthindex.phpПDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Nhttp://nrich.maths.org/559yXє;HЏ,‚]Ф…'cЅЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=5468&part=index&refpage=monthindex.phpѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=5448yXє;HЏ,‚]Ф…'cЅЋЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/7405DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ќhttp://nrich.maths.org/public/viewer.php?obj_id=796&part=index&refpage=monthindex.phpѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=1308yXє;HЏ,‚]Ф…'cЅЋЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11750ЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11173СDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6966yXє;HЏ,‚]Ф…'cЅЋ DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=2669&refpage=titlesearch.phpѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=6401yXє;HЏ,‚]Ф…'cЅЋЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/6650DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=4903&part=index&refpage=monthindex.phpDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ќhttp://nrich.maths.org/public/viewer.php?obj_id=740&part=index&refpage=monthindex.phpйDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ hhttp://nrich.maths.org/public/viewer.php?obj_id=480СDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7547yXє;HЏ,‚]Ф…'cЅЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=1866&part=index&refpage=monthindex.phpйDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ hhttp://nrich.maths.org/public/viewer.php?obj_id=602ёDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ €http://nrich.maths.org/public/viewer.php?obj_id=582yXє;HЏ,‚]Ф…'cЅЋ-$$If–!vh#vџ #v #vE #vП #v- :V –l”і ж ``````ж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6і5ж$5жŠ5ж`5ж2pж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџkdG1$$If–lж000000”і жˆ”џ“ ““и(—3Ф=$$$Š`2 ж ``````ж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ4ж4ж laіpж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=1163yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7282yXє;HЏ,‚]Ф…'cЅЋ-$$If–!vh#vџ #v #vE #vП #v- :V –l”љ ж       ж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6і5ж$5жŠ5ж`5ж2pж<џџчњџџчњџџчњџџчњџџчњџџчњkdA6$$If–lж000000”љжˆ”џ“ ““и(—3Ф=$$$Š`2 ж       ж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ4ж4ж laіpж<џџчњџџчњџџчњџџчњџџчњџџчњСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6448yXє;HЏ,‚]Ф…'cЅЋ-$$If–!vh#vџ #v #vE #vП #v- :V –l”ˆ ж       ж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6і5ж$5жŠ5ж`5ж2pж<џџчњџџчњџџчњџџчњџџчњџџчњkdH:$$If–lж000000”ˆжˆ”џ“ ““и(—3Ф=$$$Š`2 ж       ж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ4ж4ж laіpж<џџчњџџчњџџчњџџчњџџчњџџчњ-$$If–!vh#vџ #v #vE #vП #v- :V –l”ќ ж       ж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6і5ж$5жŠ5ж`5ж2pж<џџчњџџчњџџчњџџчњџџчњџџчњkdŽ=$$If–lж000000”ќжˆ”џ“ ““и(—3Ф=$$$Š`2 ж       ж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ4ж4ж laіpж<џџчњџџчњџџчњџџчњџџчњџџчњСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/2086yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=5617yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=1832yXє;HЏ,‚]Ф…'cЅЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=1853&part=index&refpage=monthindex.php-$$If–!vh#vџ #v #vE #vП #v- :V –l”! ж €€€€€€ж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6і5ж$5жŠ5ж`5ж2pж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩkdšD$$If–lж000000”! жˆ”џ“ ““и(—3Ф=$$$Š`2 ж €€€€€€ж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ4ж4ж laіpж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=5467&part=index&refpage=monthindex.phpDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=2312&part=index&refpage=monthindex.phpлDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=6540лDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=1173лDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=6541СDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6700yXє;HЏ,‚]Ф…'cЅЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=2382&part=index&refpage=monthindex.phpПDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Nhttp://nrich.maths.org/708yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=5776yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=5777yXє;HЏ,‚]Ф…'cЅЋ-$$If–!vh#vџ #v #vE #vП #v- :V –l”і ж €€€€€€ж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6і5ж$5жŠ5ж`5ж2pж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩkd4Q$$If–lж000000”і жˆ”џ“ ““и(—3Ф=$$$Š`2 ж €€€€€€ж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ4ж4ж laіpж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩ)DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Иhttp://nrich.maths.org/public/viewer.php?time=1202216842&obj_id=1249&part=indexyXє;HЏ,‚]Ф…'cЅЋ-$$If–!vh#vџ #v #vE #vП #v- :V –l”і ж €€€€€€ж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6і5ж$5жŠ5ж`5ж2pж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩkdЃU$$If–lж000000”і жˆ”џ“ ““и(—3Ф=$$$Š`2 ж €€€€€€ж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ4ж4ж laіpж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩ-$$If–!vh#vџ #v #vE #vП #v- :V –l”ќ ж €€€€€€ж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6і5ж$5жŠ5ж`5ж2pж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩkdщX$$If–lж000000”ќжˆ”џ“ ““и(—3Ф=$$$Š`2 ж €€€€€€ж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ4ж4ж laіpж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6870yXє;HЏ,‚]Ф…'cЅЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=4793&part=index&refpage=monthindex.phpDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Іhttp://nrich.maths.org/public/viewer.php?obj_id=4794&part=index&refpage=viewer.phpСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6882yXє;HЏ,‚]Ф…'cЅЋ DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=5611&refpage=titlesearch.phpПDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Nhttp://nrich.maths.org/309yXє;HЏ,‚]Ф…'cЅЋЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/7586-$$If–!vh#vџ #v #vE #vП #v- :V –l”ш ж €€€€€€ж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6і5ж$5жŠ5ж`5ж2pж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩkdZb$$If–lж000000”ш жˆ”џ“ ““и(—3Ф=$$$Š`2 ж €€€€€€ж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ4ж4ж laіpж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/7405яDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ~http://nrich.maths.org/public/viewer.php?obj_id=31yXє;HЏ,‚]Ф…'cЅЋПDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Nhttp://nrich.maths.org/746yXє;HЏ,‚]Ф…'cЅЋ DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=2661&refpage=titlesearch.phpѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=6540yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=1173yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=6541yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=5893yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=5636yXє;HЏ,‚]Ф…'cЅЋ-$$If–!vh#vџ #v #vE #vП #v- :V –l”2 ж       ж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6і5ж$5жŠ5ж`5ж2pж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџkdСm$$If–lж000000”2жˆ”џ“ ““и(—3Ф=$$$Š`2 ж       ж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ4ж4ж laіpж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11819-$$If–!vh#vџ #v #vE #vП #v- :V –l”„ ж       ж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6і5ж$5жŠ5ж`5ж2pж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџkdВq$$If–lж000000”„жˆ”џ“ ““и(—3Ф=$$$Š`2 ж       ж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ4ж4ж laіpж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/7382ѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=6499yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=1783yXє;HЏ,‚]Ф…'cЅЋџDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Žhttp://nrich.maths.org/public/viewer.php?obj_id=6402&part=yXє;HЏ,‚]Ф…'cЅЋ-$$If–!vh#vџ #v #vE #vП #v- :V –l”Q ж       ж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6і5ж$5жŠ5ж`5ж2pж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџkd†x$$If–lж000000”Qжˆ”џ“ ““и(—3Ф=$$$Š`2 ж       ж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ4ж4ж laіpж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџПDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Nhttp://nrich.maths.org/786yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=1272yXє;HЏ,‚]Ф…'cЅЋЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11109­DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ <https://nrich.maths.org/11112ѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=1864yXє;HЏ,‚]Ф…'cЅЋёDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ €http://nrich.maths.org/public/viewer.php?obj_id=901yXє;HЏ,‚]Ф…'cЅЋ-$$If–!vh#vџ #v #vE #vП #v- :V –l”f ж       ж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6і5ж$5жŠ5ж`5ж2pж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџkdК€$$If–lж000000”fжˆ”џ“ ““и(—3Ф=$$$Š`2 ж       ж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ4ж4ж laіpж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7500yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6046yXє;HЏ,‚]Ф…'cЅЋ-$$If–!vh#vџ #v #vE #vП #v- :V –l”— ж       ж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6і5ж$5жŠ5ж`5ж2pж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџkd‚…$$If–lж000000”—жˆ”џ“ ““и(—3Ф=$$$Š`2 ж       ж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ4ж4ж laіpж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6606yXє;HЏ,‚]Ф…'cЅЋЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11107 DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ˜http://nrich.maths.org/public/viewer.php?obj_id=781&refpage=titlesearch.php-$$If–!vh#vџ #v #vE #vП #v- :V –l”: ж       ж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6і5ж$5жŠ5ж`5ж2pж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџkd=‹$$If–lж000000”:жˆ”џ“ ““и(—3Ф=$$$Š`2 ж       ж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ4ж4ж laіpж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/5612ёDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ €http://nrich.maths.org/public/viewer.php?obj_id=564yXє;HЏ,‚]Ф…'cЅЋЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/1785 DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=2032&refpage=titlesearch.php-$$If–!vh#vџ #v #vE #vП #v- :V –l” ж       ж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6і5ж$5жŠ5ж`5ж2pж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџkdб‘$$If–lж000000” жˆ”џ“ ““и(—3Ф=$$$Š`2 ж       ж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ4ж4ж laіpж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџ-$$If–!vh#vџ #v #vE #vП #v- :V –l”Ц ж       ж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6і5ж$5жŠ5ж`5ж2pж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџkd•$$If–lж000000”Ц жˆ”џ“ ““и(—3Ф=$$$Š`2 ж       ж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ4ж4ж laіpж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6651yXє;HЏ,‚]Ф…'cЅЋ-$$If–!vh#vџ #v #vE #vП #v- :V –l”Ј ж       ж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6і5ж$5жŠ5ж`5ж2pж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџkd™$$If–lж000000”Јжˆ”џ“ ““и(—3Ф=$$$Š`2 ж       ж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іˆ6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ4ж4ж laіpж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”Я ж        6 ””Дж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџytћGЇ-kddœ$$If–lж000000”Яжˆ”џ’ ”=ƒ)B4m>PW) ж        6 ””Дж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џ№сџџ№сџџ№сџџ№сџџ№сџџ№сџytћGЇЌ$$If–!vh#vй>:V –l”р ж` 6 ””Дж џfЬџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5жˆe4pж џfЬџytћGЇСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/2289yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/2281yXє;HЏ,‚]Ф…'cЅЋлDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=6261H$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”Х ж```` 6 ””Дж(џйѕџџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џйѕџџйѕџџйѕџџйѕџџџџџytћGЇkdЃ$$If–lж000000”Хжˆ”џ’ ”=ƒ)B4m>PW) ж```` 6 ””Дж(џйѕџџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џйѕџџйѕџџйѕџџйѕџџџџџytћGЇH$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”‡ ж```` 6 ””Дж(џйѕџџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џйѕџџйѕџџйѕџџйѕџџџџџytћGЇkdaІ$$If–lж000000”‡жˆ”џ’ ”=ƒ)B4m>PW) ж```` 6 ””Дж(џйѕџџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џйѕџџйѕџџйѕџџйѕџџџџџytћGЇЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/7208 DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=2282&refpage=titlesearch.phpСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7283yXє;HЏ,‚]Ф…'cЅЋЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11164СDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/2129yXє;HЏ,‚]Ф…'cЅЋ­DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ <https://nrich.maths.org/11118ЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11215 DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=4716&refpage=titlesearch.php DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=2278&refpage=titlesearch.php­DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ <https://nrich.maths.org/11011ПDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Nhttp://nrich.maths.org/742yXє;HЏ,‚]Ф…'cЅЋёDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ €http://nrich.maths.org/public/viewer.php?obj_id=658yXє;HЏ,‚]Ф…'cЅЋ DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=2821&refpage=titlesearch.php­DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ <https://nrich.maths.org/11106ЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/7490ЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11194­DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ <https://nrich.maths.org/11120ЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11257СDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7452yXє;HЏ,‚]Ф…'cЅЋПDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Nhttp://nrich.maths.org/745yXє;HЏ,‚]Ф…'cЅЋёDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ €http://nrich.maths.org/public/viewer.php?obj_id=517yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=2034yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=2286yXє;HЏ,‚]Ф…'cЅЋ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”0 ж ```    6 ””Дж<џйѕџџйѕџџйѕџџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џйѕџџйѕџџйѕџџџчњџџчњџџчњytћGЇ-kd)М$$If–lж000000”0 жˆ”џ’ ”=ƒ)B4m>PW) ж ```    6 ””Дж<џйѕџџйѕџџйѕџџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џйѕџџйѕџџйѕџџџчњџџчњџџчњytћGЇ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”і ж €€€ 6 ””Дж<џџџџџџџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џџџџџџџсџЩџсџЩџсџЩytћGЇ-kdКП$$If–lж000000”іжˆ”џ’ ”=ƒ)B4m>PW) ж €€€ 6 ””Дж<џџџџџџџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџџџџџџсџЩџсџЩџсџЩytћGЇСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7216yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=1170yXє;HЏ,‚]Ф…'cЅЋПDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Nhttp://nrich.maths.org/708yXє;HЏ,‚]Ф…'cЅЋ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l” ж ррр€€€ 6 ””Дж<џўџСџўџСџўџСџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џўџСџўџСџўџСџсџЩџсџЩџсџЩytћGЇ-kdОХ$$If–lж000000” жˆ”џ’ ”=ƒ)B4m>PW) ж ррр€€€ 6 ””Дж<џўџСџўџСџўџСџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџсџЩџсџЩџсџЩytћGЇ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”ј ж ррр€€€ 6 ””Дж<џўџСџўџСџўџСџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џўџСџўџСџўџСџсџЩџсџЩџсџЩytћGЇ-kdOЩ$$If–lж000000”јжˆ”џ’ ”=ƒ)B4m>PW) ж ррр€€€ 6 ””Дж<џўџСџўџСџўџСџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџсџЩџсџЩџсџЩytћGЇСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/1053yXє;HЏ,‚]Ф…'cЅЋЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/4889DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=2670&part=index&refpage=monthindex.phpёDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ €http://nrich.maths.org/public/viewer.php?obj_id=849yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=5674yXє;HЏ,‚]Ф…'cЅЋЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/7447`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”т ж ррр€€€ 6 ””Дж<џўџСџўџСџўџСџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џўџСџўџСџўџСџсџЩџсџЩџсџЩytћGЇ-kdіб$$If–lж000000”тжˆ”џ’ ”=ƒ)B4m>PW) ж ррр€€€ 6 ””Дж<џўџСџўџСџўџСџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџсџЩџсџЩџсџЩytћGЇСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7342yXє;HЏ,‚]Ф…'cЅЋЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/7344`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”ћ ж ррр€€€ 6 ””Дж<џўџСџўџСџўџСџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џўџСџўџСџўџСџсџЩџсџЩџсџЩytћGЇ-kdёж$$If–lж000000”ћжˆ”џ’ ”=ƒ)B4m>PW) ж ррр€€€ 6 ””Дж<џўџСџўџСџўџСџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџсџЩџсџЩџсџЩytћGЇЇDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 6http://nrich.maths.org/631ёDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ €http://nrich.maths.org/public/viewer.php?obj_id=271yXє;HЏ,‚]Ф…'cЅЋ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”f ж ррр€€€ 6 ””Дж<џўџСџўџСџўџСџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џўџСџўџСџўџСџсџЩџсџЩџсџЩytћGЇ-kdм$$If–lж000000”fжˆ”џ’ ”=ƒ)B4m>PW) ж ррр€€€ 6 ””Дж<џўџСџўџСџўџСџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџсџЩџсџЩџсџЩytћGЇ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”љ ж ррр€€€ 6 ””Дж<џўџСџўџСџўџСџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џўџСџўџСџўџСџсџЩџсџЩџсџЩytћGЇ-kdЋп$$If–lж000000”љжˆ”џ’ ”=ƒ)B4m>PW) ж ррр€€€ 6 ””Дж<џўџСџўџСџўџСџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџсџЩџсџЩџсџЩytћGЇ DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=1867&refpage=titlesearch.phpѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=5608yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7366yXє;HЏ,‚]Ф…'cЅЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=1860&part=index&refpage=monthindex.php`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”ђ ж ррр€€€ 6 ””Дж<џўџСџўџСџўџСџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џўџСџўџСџўџСџсџЩџсџЩџсџЩytћGЇ-kdч$$If–lж000000”ђ жˆ”џ’ ”=ƒ)B4m>PW) ж ррр€€€ 6 ””Дж<џўџСџўџСџўџСџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџсџЩџсџЩџсџЩytћGЇСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7529yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6713yXє;HЏ,‚]Ф…'cЅЋ DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=5525&refpage=titlesearch.php­DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ <https://nrich.maths.org/11008СDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7024yXє;HЏ,‚]Ф…'cЅЋ DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=2292&refpage=titlesearch.phpDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=1019&part=index&refpage=monthindex.phpСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6690yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7016yXє;HЏ,‚]Ф…'cЅЋ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”ї ж        6 ””Дж<џ№сџџ№сџџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џ№сџџ№сџџџчњџџчњџџчњџџчњytћGЇ-kdRђ$$If–lж000000”їжˆ”џ’ ”=ƒ)B4m>PW) ж        6 ””Дж<џ№сџџ№сџџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џ№сџџ№сџџџчњџџчњџџчњџџчњytћGЇПDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Nhttp://nrich.maths.org/507yXє;HЏ,‚]Ф…'cЅЋ DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=2275&refpage=titlesearch.php DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=4835&refpage=titlesearch.phpЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :https://nrich.maths.org/9071ЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :https://nrich.maths.org/1246ЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/8111ЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/7405ѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=5531yXє;HЏ,‚]Ф…'cЅЋЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/8280СDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/2274yXє;HЏ,‚]Ф…'cЅЋЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/6710ѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=6390yXє;HЏ,‚]Ф…'cЅЋёDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ €http://nrich.maths.org/public/viewer.php?obj_id=308yXє;HЏ,‚]Ф…'cЅЋЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11212ПDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Nhttp://nrich.maths.org/900yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/2322yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6703yXє;HЏ,‚]Ф…'cЅЋЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/7760СDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6903yXє;HЏ,‚]Ф…'cЅЋЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/8096ПDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Nhttp://nrich.maths.org/325yXє;HЏ,‚]Ф…'cЅЋЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/8054`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”і ж        6 ””Дж<џ№сџџ№сџџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џ№сџџ№сџџџчњџџчњџџчњџџчњytћGЇ-kdБ$$If–lж000000”і жˆ”џ’ ”=ƒ)B4m>PW) ж        6 ””Дж<џ№сџџ№сџџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џ№сџџ№сџџџчњџџчњџџчњџџчњytћGЇ DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=1867&refpage=titlesearch.phpT$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”ћ ж ррррр 6 ””Дж2џўџСџўџСџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џўџСџўџСџўџСџўџСџўџСџџytћGЇ!kdM $$If–lж000000”ћжˆ”џ’ ”=ƒ)B4m>PW) ж ррррр 6 ””Дж2џўџСџўџСџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџўџСџўџСџџytћGЇСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6951yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=6603yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/5609yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=5725yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=6539yXє;HЏ,‚]Ф…'cЅЋџDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Žhttp://nrich.maths.org/public/viewer.php?obj_id=6471&part=yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6461yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=5610yXє;HЏ,‚]Ф…'cЅЋџDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Žhttp://nrich.maths.org/public/viewer.php?obj_id=6544&part=yXє;HЏ,‚]Ф…'cЅЋёDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ €http://nrich.maths.org/public/viewer.php?obj_id=494yXє;HЏ,‚]Ф…'cЅЋT$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”є ж ррррр 6 ””Дж2џўџСџўџСџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џўџСџўџСџўџСџўџСџўџСџџytћGЇ!kdФ$$If–lж000000”є жˆ”џ’ ”=ƒ)B4m>PW) ж ррррр 6 ””Дж2џўџСџўџСџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџўџСџўџСџџytћGЇ DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ œhttp://nrich.maths.org/public/viewer.php?obj_id=985&submit=submityXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7419yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6424yXє;HЏ,‚]Ф…'cЅЋ DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=4808&refpage=titlesearch.phpDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Іhttp://nrich.maths.org/public/viewer.php?obj_id=4809&part=index&refpage=viewer.phpDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Іhttp://nrich.maths.org/public/viewer.php?obj_id=4810&part=index&refpage=viewer.phpѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=5871yXє;HЏ,‚]Ф…'cЅЋ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”r ж рррр   6 ””Дж<џўџСџўџСџўџСџўџСџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џўџСџўџСџўџСџўџСџ№сџџ№сџytћGЇ-kdј!$$If–lж000000”r жˆ”џ’ ”=ƒ)B4m>PW) ж рррр   6 ””Дж<џўџСџўџСџўџСџўџСџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџўџСџ№сџџ№сџytћGЇ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”д ж рррр   6 ””Дж<џўџСџўџСџўџСџўџСџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џўџСџўџСџўџСџўџСџ№сџџ№сџytћGЇ-kd‰%$$If–lж000000”д жˆ”џ’ ”=ƒ)B4m>PW) ж рррр   6 ””Дж<џўџСџўџСџўџСџўџСџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџўџСџ№сџџ№сџytћGЇСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6952yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7502yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=6506yXє;HЏ,‚]Ф…'cЅЋлDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=4851`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”ђ ж ррр    6 ””Дж<џўџСџўџСџўџСџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џўџСџўџСџўџСџ№сџџ№сџџ№сџytћGЇ-kdj,$$If–lж000000”ђ жˆ”џ’ ”=ƒ)B4m>PW) ж ррр    6 ””Дж<џўџСџўџСџўџСџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџ№сџџ№сџџ№сџytћGЇПDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Nhttp://nrich.maths.org/773yXє;HЏ,‚]Ф…'cЅЋёDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ €http://nrich.maths.org/public/viewer.php?obj_id=802yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=6481yXє;HЏ,‚]Ф…'cЅЋ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”ї ж ррр    6 ””Дж<џўџСџўџСџўџСџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џўџСџўџСџўџСџ№сџџ№сџџ№сџytћGЇ-kdž2$$If–lж000000”їжˆ”џ’ ”=ƒ)B4m>PW) ж ррр    6 ””Дж<џўџСџўџСџўџСџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџ№сџџ№сџџ№сџytћGЇ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”э ж ррр    6 ””Дж<џўџСџўџСџўџСџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џўџСџўџСџўџСџ№сџџ№сџџ№сџytћGЇ-kd/6$$If–lж000000”эжˆ”џ’ ”=ƒ)B4m>PW) ж ррр    6 ””Дж<џўџСџўџСџўџСџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџ№сџџ№сџџ№сџytћGЇ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”і ж ррр    6 ””Дж<џўџСџўџСџўџСџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џўџСџўџСџўџСџ№сџџ№сџџ№сџytћGЇ-kdР9$$If–lж000000”і жˆ”џ’ ”=ƒ)B4m>PW) ж ррр    6 ””Дж<џўџСџўџСџўџСџ№сџџ№сџџ№сџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџ№сџџ№сџџ№сџytћGЇЌ$$If–!vh#vй>:V –l”я ж` 6 ””Дж џfЬџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5жˆe4pж џfЬџytћGЇЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11234ЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11105СDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6536yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=6323yXє;HЏ,‚]Ф…'cЅЋлDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=2287`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”ї ж €€€``` 6 ””Дж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџytћGЇ-kdфA$$If–lж000000”їжˆ”џ’ ”=ƒ)B4m>PW) ж €€€``` 6 ””Дж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџytћGЇЭDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ \http://nrich.maths.org/4832/indexyXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7306yXє;HЏ,‚]Ф…'cЅЋ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”є ж €€€``` 6 ””Дж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџytћGЇ-kdG$$If–lж000000”є жˆ”џ’ ”=ƒ)B4m>PW) ж €€€``` 6 ””Дж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџytћGЇёDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ €http://nrich.maths.org/public/viewer.php?obj_id=548yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=2163yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/2844yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6624yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/2845yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/2847yXє;HЏ,‚]Ф…'cЅЋ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”я ж €€€``` 6 ””Дж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџytћGЇ-kd|O$$If–lж000000”яжˆ”џ’ ”=ƒ)B4m>PW) ж €€€``` 6 ””Дж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџytћGЇЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11202 DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=2927&refpage=titlesearch.phpDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=2925&part=index&refpage=monthindex.php DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=2924&refpage=titlesearch.phpСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/2526yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=6280yXє;HЏ,‚]Ф…'cЅЋ DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=2667&refpage=titlesearch.phpЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/7381 DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=2844&refpage=titlesearch.phpСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6624yXє;HЏ,‚]Ф…'cЅЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=2845&part=index&refpage=monthindex.phpDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=2847&part=index&refpage=monthindex.phpЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/8301ѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=6355yXє;HЏ,‚]Ф…'cЅЋёDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ €http://nrich.maths.org/public/viewer.php?obj_id=665yXє;HЏ,‚]Ф…'cЅЋ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”є ж €€€``` 6 ””Дж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџytћGЇ-kdь`$$If–lж000000”є жˆ”џ’ ”=ƒ)B4m>PW) ж €€€``` 6 ””Дж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџytћGЇлDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=4960ѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=5635yXє;HЏ,‚]Ф…'cЅЋёDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ €http://nrich.maths.org/public/viewer.php?obj_id=510yXє;HЏ,‚]Ф…'cЅЋёDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ €http://nrich.maths.org/public/viewer.php?obj_id=700yXє;HЏ,‚]Ф…'cЅЋёDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ €http://nrich.maths.org/public/viewer.php?obj_id=483yXє;HЏ,‚]Ф…'cЅЋёDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ €http://nrich.maths.org/public/viewer.php?obj_id=726yXє;HЏ,‚]Ф…'cЅЋ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”ѓ ж €€€``` 6 ””Дж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџytћGЇ-kdj$$If–lж000000”ѓ жˆ”џ’ ”=ƒ)B4m>PW) ж €€€``` 6 ””Дж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џсџЩџсџЩџсџЩџйѕџџйѕџџйѕџytћGЇЫDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Zhttp://nrich.maths.org/768/indexyXє;HЏ,‚]Ф…'cЅЋПDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Nhttp://nrich.maths.org/895yXє;HЏ,‚]Ф…'cЅЋйDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ hhttp://nrich.maths.org/public/viewer.php?obj_id=573 DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=1157&refpage=titlesearch.php`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”] ж        6 ””Дж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џџчњџџчњџџчњџџчњџџчњџџчњytћGЇ-kdq$$If–lж000000”]жˆ”џ’ ”=ƒ)B4m>PW) ж        6 ””Дж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџчњџџчњџџчњџџчњџџчњџџчњytћGЇСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/2293yXє;HЏ,‚]Ф…'cЅЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=2160&part=index&refpage=monthindex.phpDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=1863&part=index&refpage=monthindex.phpйDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ hhttp://nrich.maths.org/public/viewer.php?obj_id=289лDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=2658­DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ <https://nrich.maths.org/11190лDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=2365ЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/6553йDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ hhttp://nrich.maths.org/public/viewer.php?obj_id=360`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”љ ж ```` 6 ””Дж<џџџџџйѕџџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џџџџџйѕџџйѕџџйѕџџйѕџytћGЇ-kd\|$$If–lж000000”љжˆ”џ’ ”=ƒ)B4m>PW) ж ```` 6 ””Дж<џџџџџйѕџџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџџџџйѕџџйѕџџйѕџџйѕџytћGЇСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/5615yXє;HЏ,‚]Ф…'cЅЋлDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=5615лDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=5601лDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=2357`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”ї ж ррр 6 ””Дж<џџџџџџџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џџџџџџџўџСџўџСџўџСytћGЇ-kd?ƒ$$If–lж000000”їжˆ”џ’ ”=ƒ)B4m>PW) ж ррр 6 ””Дж<џџџџџџџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџџџџџџўџСџўџСџўџСytћGЇлDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=1954лDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=1955лDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=2690йDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ hhttp://nrich.maths.org/public/viewer.php?obj_id=312`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”§ ж ррр 6 ””Дж<џџџџџџџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џџџџџџџўџСџўџСџўџСytћGЇ-kd:Š$$If–lж000000”§жˆ”џ’ ”=ƒ)B4m>PW) ж ррр 6 ””Дж<џџџџџџџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџџџџџџўџСџўџСџўџСytћGЇ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”§ ж ррр 6 ””Дж<џџџџџџџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џџџџџџџўџСџўџСџўџСytћGЇ-kdЫ$$If–lж000000”§жˆ”џ’ ”=ƒ)B4m>PW) ж ррр 6 ””Дж<џџџџџџџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџџџџџџўџСџўџСџўџСytћGЇH$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”њ ж     6 ””Дж(џџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џџчњџџчњџџчњџџчњџџџџytћGЇkd\‘$$If–lж000000”њжˆ”џ’ ”=ƒ)B4m>PW) ж     6 ””Дж(џџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџчњџџчњџџчњџџчњџџџџytћGЇСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/1868yXє;HЏ,‚]Ф…'cЅЋлDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=1840ЇDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 6http://nrich.maths.org/900H$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”ќ ж     6 ””Дж(џџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џџчњџџчњџџчњџџчњџџџџytћGЇkd—$$If–lж000000”ќжˆ”џ’ ”=ƒ)B4m>PW) ж     6 ””Дж(џџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџчњџџчњџџчњџџчњџџџџytћGЇСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/5458yXє;HЏ,‚]Ф…'cЅЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Іhttp://nrich.maths.org/public/viewer.php?obj_id=5459&part=index&refpage=viewer.phpСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6987yXє;HЏ,‚]Ф…'cЅЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=5457&part=index&refpage=monthindex.phpH$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”ѕ ж     6 ””Дж(џџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џџчњџџчњџџчњџџчњџџџџytћGЇkdž$$If–lж000000”ѕ жˆ”џ’ ”=ƒ)B4m>PW) ж     6 ””Дж(џџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџчњџџчњџџчњџџчњџџџџytћGЇСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/5812yXє;HЏ,‚]Ф…'cЅЋЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/7453ЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :https://nrich.maths.org/6572`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”і ж     €€ 6 ””Дж<џџчњџџчњџџчњџџчњџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џџчњџџчњџџчњџџчњџсџЩџсџЩytћGЇ-kdЃ$$If–lж000000”і жˆ”џ’ ”=ƒ)B4m>PW) ж     €€ 6 ””Дж<џџчњџџчњџџчњџџчњџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџчњџџчњџџчњџџчњџсџЩџсџЩytћGЇ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”ќ ж     €€ 6 ””Дж<џџчњџџчњџџчњџџчњџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џџчњџџчњџџчњџџчњџсџЩџсџЩytћGЇ-kd Ї$$If–lж000000”ќжˆ”џ’ ”=ƒ)B4m>PW) ж     €€ 6 ””Дж<џџчњџџчњџџчњџџчњџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџчњџџчњџџчњџџчњџсџЩџсџЩytћGЇ DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=4890&refpage=titlesearch.php`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”§ ж €€ 6 ””Дж<џџџџџџџџџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џџџџџџџџџсџЩџсџЩytћGЇ-kdМЋ$$If–lж000000”§жˆ”џ’ ”=ƒ)B4m>PW) ж €€ 6 ””Дж<џџџџџџџџџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџџџџџџџџсџЩџсџЩytћGЇDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Іhttp://nrich.maths.org/public/viewer.php?obj_id=5461&part=index&refpage=viewer.phpСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6923yXє;HЏ,‚]Ф…'cЅЋЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/7385`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”Ё ж рррррр 6 ””Дж<џўџСџўџСџўџСџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џўџСџўџСџўџСџўџСџўџСџўџСytћGЇ-kdЮБ$$If–lж000000”Ё жˆ”џ’ ”=ƒ)B4m>PW) ж рррррр 6 ””Дж<џўџСџўџСџўџСџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџўџСџўџСџўџСytћGЇ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”њ ж рррррр 6 ””Дж<џўџСџўџСџўџСџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џўџСџўџСџўџСџўџСџўџСџўџСytћGЇ-kd_Е$$If–lж000000”њжˆ”џ’ ”=ƒ)B4m>PW) ж рррррр 6 ””Дж<џўџСџўџСџўџСџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџўџСџўџСџўџСytћGЇ­DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ <https://nrich.maths.org/10818СDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6288yXє;HЏ,‚]Ф…'cЅЋ DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=2292&refpage=titlesearch.phpDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=5469&part=index&refpage=monthindex.phpйDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ hhttp://nrich.maths.org/public/viewer.php?obj_id=737`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”ј ж `````` 6 ””Дж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџytћGЇ-kdaН$$If–lж000000”јжˆ”џ’ ”=ƒ)B4m>PW) ж `````` 6 ””Дж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџytћGЇЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/8098`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”W ж        6 ””Дж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џџчњџџчњџџчњџџчњџџчњџџчњytћGЇ-kd›С$$If–lж000000”W жˆ”џ’ ”=ƒ)B4m>PW) ж        6 ””Дж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџчњџџчњџџчњџџчњџџчњџџчњytћGЇ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”Ы ж        6 ””Дж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џџчњџџчњџџчњџџчњџџчњџџчњytћGЇ-kd,Х$$If–lж000000”Ыжˆ”џ’ ”=ƒ)B4m>PW) ж        6 ””Дж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџчњџџчњџџчњџџчњџџчњџџчњytћGЇСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/2159yXє;HЏ,‚]Ф…'cЅЋлDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=2162`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”‘ ж        6 ””Дж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џџчњџџчњџџчњџџчњџџчњџџчњytћGЇ-kdYЪ$$If–lж000000”‘жˆ”џ’ ”=ƒ)B4m>PW) ж        6 ””Дж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџчњџџчњџџчњџџчњџџчњџџчњytћGЇСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7500yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6046yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/5994yXє;HЏ,‚]Ф…'cЅЋЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/8318ЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/7571ЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/7322ЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/6494ѕDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ „http://nrich.maths.org/public/viewer.php?obj_id=985&submit=submit`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l” ж €€€€€€ 6 ””Дж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩytћGЇ-kdЦг$$If–lж000000”жˆ”џ’ ”=ƒ)B4m>PW) ж €€€€€€ 6 ””Дж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩytћGЇЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/1235`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”ќ ж €€€€€€ 6 ””Дж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩytћGЇ-kdи$$If–lж000000”ќжˆ”џ’ ”=ƒ)B4m>PW) ж €€€€€€ 6 ””Дж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩytћGЇn$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”— ж €€€€€€ 6 ””Дж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)/ж џџџ0e4pж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩytћGЇ-kd‘л$$If–lж000000”— жˆ”џ’ ”=ƒ)B4m>P00W) ж €€€€€€ 6 ””Дж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џсџЩџсџЩџсџЩџсџЩџсџЩџсџЩytћGЇ­DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ <https://nrich.maths.org/11119ЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/9691СDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7534yXє;HЏ,‚]Ф…'cЅЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=4889&part=index&refpage=monthindex.phpDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=2401&part=index&refpage=monthindex.phpЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/6398 DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=2663&refpage=titlesearch.php DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=2666&refpage=titlesearch.php­DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ <https://nrich.maths.org/11017 DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=1867&refpage=titlesearch.phpйDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ hhttp://nrich.maths.org/public/viewer.php?obj_id=693ЇDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 6http://nrich.maths.org/809 DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=2161&refpage=titlesearch.phpЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/6468лDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=2425йDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ hhttp://nrich.maths.org/public/viewer.php?obj_id=866ЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/7359лDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=2095n$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”љ ж   рррр 6 ””Дж<џ№сџџ№сџџџџРџџџРџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)/ж џџџ0e4pж<џ№сџџ№сџџџџРџџџРџўџСџўџСytћGЇ-kdhю$$If–lж000000”љжˆ”џ’ ”=ƒ)B4m>P0W0) ж   рррр 6 ””Дж<џ№сџџ№сџџџџРџџџРџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џ№сџџ№сџџџџРџџџРџўџСџўџСytћGЇЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11178 DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=2383&refpage=titlesearch.phpСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6399yXє;HЏ,‚]Ф…'cЅЋ DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=2322&refpage=titlesearch.phpDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=2650&part=index&refpage=monthindex.phpСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7535yXє;HЏ,‚]Ф…'cЅЋ DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=2664&refpage=titlesearch.phpлDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=5888лDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=5890СDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7499yXє;HЏ,‚]Ф…'cЅЋЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/6439лDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=5673`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”љ ж    ррр 6 ””Дж<џ№сџџ№сџџ№сџџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џ№сџџ№сџџ№сџџўџСџўџСџўџСytћGЇ-kdoќ$$If–lж000000”љжˆ”џ’ ”=ƒ)B4m>PW) ж    ррр 6 ””Дж<џ№сџџ№сџџ№сџџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џ№сџџ№сџџ№сџџўџСџўџСџўџСytћGЇ`$$If–!vh#vў #v #vЉ #vF #vП #v+ :V –l”ј ж ррр 6 ””Дж<џџџџџџџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі”Д5ж5ж5жP5ж5жW5ж)e4pж<џџџџџџџўџСџўџСџўџСytћGЇ-kd$$If–lж000000”јжˆ”џ’ ”=ƒ)B4m>PW) ж ррр 6 ””Дж<џџџџџџџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6ііжџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџџџџџџўџСџўџСџўџСytћGЇЌ$$If–!vh#v8>:V –l”• ж` 6 ””Дж џfЬџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4”Д5жTe4pж џfЬџytћGЇЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/7721СDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6044yXє;HЏ,‚]Ф…'cЅЋ­DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ <https://nrich.maths.org/11007X$$If–!vh#vў #v #v #vG #vТ #v. :V –l”љ ж `````` 6 ””Дж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4”Д5ж5ж5ж5жX5ж*e4pж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџytћGЇ-kdV$$If–lж000000”љжˆ”џ’ ”•м(ž3Ь=X* ж `````` 6 ””Дж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4жџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџytћGЇСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7367yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7722yXє;HЏ,‚]Ф…'cЅЋX$$If–!vh#vў #v #v #vG #vТ #v. :V –l”ї ж `````` 6 ””Дж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4”Д5ж5ж5ж5жX5ж*e4pж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџytћGЇ-kda $$If–lж000000”їжˆ”џ’ ”•м(ž3Ь=X* ж `````` 6 ””Дж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4жџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџytћGЇX$$If–!vh#vў #v #v #vG #vТ #v. :V –l”A ж `````` 6 ””Дж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4”Д5ж5ж5ж5жX5ж*e4pж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџytћGЇ-kdъ$$If–lж000000”A жˆ”џ’ ”•м(ž3Ь=X* ж `````` 6 ””Дж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4жџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџytћGЇ­DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ <https://nrich.maths.org/10629X$$If–!vh#vў #v #v #vG #vТ #v. :V –l”ї ж `````` 6 ””Дж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4”Д5ж5ж5ж5жX5ж*e4pж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџytћGЇ-kd $$If–lж000000”їжˆ”џ’ ”•м(ž3Ь=X* ж `````` 6 ””Дж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4жџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џйѕџџйѕџџйѕџџйѕџџйѕџџйѕџytћGЇ­DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ <https://nrich.maths.org/10995ѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=6267yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=6345yXє;HЏ,‚]Ф…'cЅЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=4838&part=index&refpage=monthindex.php­DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ <https://nrich.maths.org/11281­DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ <https://nrich.maths.org/10999СDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6957yXє;HЏ,‚]Ф…'cЅЋЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/10996 DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ šhttp://nrich.maths.org/public/viewer.php?obj_id=4834&refpage=titlesearch.phpЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/8061X$$If–!vh#vў #v #v #vG #vТ #v. :V –l”є ж        6 ””Дж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4”Д5ж5ж5ж5жX5ж*e4pж<џџчњџџчњџџчњџџчњџџчњџџчњytћGЇ-kdе$$If–lж000000”є жˆ”џ’ ”•м(ž3Ь=X* ж        6 ””Дж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4жџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџчњџџчњџџчњџџчњџџчњџџчњytћGЇX$$If–!vh#vў #v #v #vG #vТ #v. :V –l”ћ ж        6 ””Дж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4”Д5ж5ж5ж5жX5ж*e4pж<џџчњџџчњџџчњџџчњџџчњџџчњytћGЇ-kd^"$$If–lж000000”ћжˆ”џ’ ”•м(ž3Ь=X* ж        6 ””Дж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4жџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџчњџџчњџџчњџџчњџџчњџџчњytћGЇ­DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ <https://nrich.maths.org/10464­DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ <https://nrich.maths.org/10470­DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ <https://nrich.maths.org/11002­DаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ <https://nrich.maths.org/10466X$$If–!vh#vў #v #v #vG #vТ #v. :V –l”L ж        6 ””Дж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4”Д5ж5ж5ж5жX5ж*e4pж<џџчњџџчњџџчњџџчњџџчњџџчњytћGЇ-kd›($$If–lж000000”L жˆ”џ’ ”•м(ž3Ь=X* ж        6 ””Дж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4жџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџчњџџчњџџчњџџчњџџчњџџчњytћGЇf$$If–!vh#vў #v #v #vG #vТ #v. :V –l”і ж        6 ””Дж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4”Д5ж5ж5ж5жX5ж*/ж џџџ0e4pж<џџчњџџчњџџчњџџчњџџчњџџчњytћGЇ-kd$,$$If–lж000000”і жˆ”џ’ ”•м(ž3Ь=0000X0*0 ж        6 ””Дж<џџчњџџчњџџчњџџчњџџчњџџчњж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4жџџџџџџжџџџџџџжџџџџџџџџџџџџџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џџчњџџчњџџчњџџчњџџчњџџчњytћGЇСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7735yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7489yXє;HЏ,‚]Ф…'cЅЋлDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ jhttp://nrich.maths.org/public/viewer.php?obj_id=4957X$$If–!vh#vў #v #v #vG #vТ #v. :V –l”ћ ж рррррр 6 ””Дж<џўџСџўџСџўџСџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4”Д5ж5ж5ж5жX5ж*e4pж<џўџСџўџСџўџСџўџСџўџСџўџСytћGЇ-kd2$$If–lж000000”ћжˆ”џ’ ”•м(ž3Ь=X* ж рррррр 6 ””Дж<џўџСџўџСџўџСџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4жџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџўџСџўџСџўџСytћGЇX$$If–!vh#vў #v #v #vG #vТ #v. :V –l”% ж рррррр 6 ””Дж<џўџСџўџСџўџСџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4”Д5ж5ж5ж5жX5ж*e4pж<џўџСџўџСџўџСџўџСџўџСџўџСytћGЇ-kdЁ5$$If–lж000000”% жˆ”џ’ ”•м(ž3Ь=X* ж рррррр 6 ””Дж<џўџСџўџСџўџСџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4жџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџўџСџўџСџўџСytћGЇСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7731yXє;HЏ,‚]Ф…'cЅЋX$$If–!vh#vў #v #v #vG #vТ #v. :V –l”ј ж рррррр 6 ””Дж<џўџСџўџСџўџСџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4”Д5ж5ж5ж5жX5ж*e4pж<џўџСџўџСџўџСџўџСџўџСџўџСytћGЇ-kdы9$$If–lж000000”јжˆ”џ’ ”•м(ž3Ь=X* ж рррррр 6 ””Дж<џўџСџўџСџўџСџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4жџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџўџСџўџСџўџСytћGЇX$$If–!vh#vў #v #v #vG #vТ #v. :V –l”і ж рррррр 6 ””Дж<џўџСџўџСџўџСџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4”Д5ж5ж5ж5жX5ж*e4pж<џўџСџўџСџўџСџўџСџўџСџўџСytћGЇ-kdt=$$If–lж000000”і жˆ”џ’ ”•м(ž3Ь=X* ж рррррр 6 ””Дж<џўџСџўџСџўџСџўџСџўџСџўџСж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі4жџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж laіe4pж<џўџСџўџСџўџСџўџСџўџСџўџСytћGЇСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7219yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7250yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7220yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7478yXє;HЏ,‚]Ф…'cЅЋПDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Nhttp://nrich.maths.org/920yXє;HЏ,‚]Ф…'cЅЋQ$$If–!vh#v #vM #vХ #v5 :V –l”g ж    €€€ 6 ””Дж<џ№сџџ№сџџ№сџџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі'”Д5ж5жƒ5жY5ж,`ж џџѓљe4pж<џ№сџџ№сџџ№сџџсџЩџсџЩџсџЩytћGЇ:kdРD$$If–lж000000”gжˆ”џœ ЄЌљ(О3ѓ=ƒY, ж    €€€ 6 ””Дж<џ№сџџ№сџџ№сџџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі'жџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж l`ж џџѓљaіe4pж<џ№сџџ№сџџ№сџџсџЩџсџЩџсџЩytћGЇСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7541yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7286yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=6033yXє;HЏ,‚]Ф…'cЅЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=4308&part=index&refpage=monthindex.phpёDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ €http://nrich.maths.org/public/viewer.php?obj_id=919yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7238yXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7221yXє;HЏ,‚]Ф…'cЅЋQ$$If–!vh#v #vM #vХ #v5 :V –l”Й ж    €€€ 6 ””Дж<џ№сџџ№сџџ№сџџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі'”Д5ж5жƒ5жY5ж,`ж џџѓљe4pж<џ№сџџ№сџџ№сџџсџЩџсџЩџсџЩytћGЇ:kdVN$$If–lж000000”Й жˆ”џœ ЄЌљ(О3ѓ=ƒY, ж    €€€ 6 ””Дж<џ№сџџ№сџџ№сџџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі'жџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж l`ж џџѓљaіe4pж<џ№сџџ№сџџ№сџџсџЩџсџЩџсџЩytћGЇЭDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ \http://nrich.maths.org/4308/indexyXє;HЏ,‚]Ф…'cЅЋЭDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ \http://nrich.maths.org/4304/indexyXє;HЏ,‚]Ф…'cЅЋСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/7222yXє;HЏ,‚]Ф…'cЅЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=4311&part=index&refpage=monthindex.phpDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Ўhttp://nrich.maths.org/public/viewer.php?obj_id=4313&part=index&refpage=monthindex.phpСDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ Phttp://nrich.maths.org/6123yXє;HЏ,‚]Ф…'cЅЋѓDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ ‚http://nrich.maths.org/public/viewer.php?obj_id=4334yXє;HЏ,‚]Ф…'cЅЋQ$$If–!vh#v #vM #vХ #v5 :V –l”Я ж    €€€ 6 ””Дж<џ№сџџ№сџџ№сџџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі'”Д5ж5жƒ5жY5ж,`ж џџѓљe4pж<џ№сџџ№сџџ№сџџсџЩџсџЩџсџЩytћGЇ:kd2X$$If–lж000000”Я жˆ”џœ ЄЌљ(О3ѓ=ƒY, ж    €€€ 6 ””Дж<џ№сџџ№сџџ№сџџсџЩџсџЩџсџЩж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0іН6іі'жџџџџџџжџџџџџџжџџџџџџжџџџџџџ”Д4ж4ж l`ж џџѓљaіe4pж<џ№сџџ№сџџ№сџџсџЩџсџЩџсџЩytћGЇЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11173ЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11164ЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11194ЉDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ 8http://nrich.maths.org/7405ЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11212ЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11234ЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11202ЋDаЩъyљКЮŒ‚ЊKЉ рЩъyљКЮŒ‚ЊKЉ :http://nrich.maths.org/11750 $$If–!vh#vм#vx#v#vЧ:V –l”F ж```` tрж(џьў§џьў§џьў§џьў§ж0џџџ0џџџ0џџџ0џџџ0џџџ0џџџ0і65жм5жx5ж5жЧ`ж џьў§pж(џьў§џьў§џьў§џьў§‚˜žžžžžžžž666666666vvvvvvvvv666666>666666666666666666666666666Ј6666666666И66666666666hH66666666666666666666666666666666666666666666666666666666666666666А66666666662Рар№ 0@P`p€Рар№2(иш 0@P`p€Рар№ 0@P`p€Рар№ 0@P`p€Рар№ 0@P`p€Рар№ 0@P`p€Рар№ 0@P`p€8XјV~_HmH nH sH tH @`ёџ@ NormalCJ_HaJmH sH tH R@R f Heading 1ЄdЄd@&[$\$5CJ0KH$\aJ0DA`ђџЁD Default Paragraph FontRi@ѓџГR  Table Normalі4ж l4жaі (k єџС(No List jšГѓj 1If Table Grid7:Vж0џџџџџџ$ўЂ$ 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