ࡱ>  "[  Ibjbj Pΐΐ<22+@+@EEEDcEcEcEEFDcE`tJJJJJ___ߖ$ԙvJEcZ_cc+@+@JJ}i}i}ic$+@JEJ,}icߖ}i}i?CbJ cEe׏400` fPhE_`}icaa___h___`cccc_________2 >: Extra Practice 1 Lesson 1: Numbers to Thousandths and Beyond 1. Use a place-value chart to show each number. a) 3.4715 b) 0.003 025 c) 1.250 43 d) 0.0053 2. Use the numbers in question 1. What is the value of the 3 in each number? 3. Write each number in expanded form. a) 2.000 081 b) 0.0435 c) 0.000 935 d) 0.012 78 4. Write each number in standard form. a) 3 and 124 thousandths b) 15 and 6 thousandths c) 7 ten-thousandths d) 13 millionths e) 4 and 21 hundred-thousandths f) 368 ten thousandths 5. Write a number that has a 4 in: a) the tenths position b) the millionths position c) the thousandths position d) the hundred-thousandths position e) the ten-thousandths position f) the ones position 6. Write the number in each fact in as many different forms as you can. a) The diameter of a strand of sewing thread is about 0.030 48 cm. b) The mass of a fine grain of sand is about 0.000 67 g. 7. How are the values of the 5s in each number related? a) 5.005 b) 0.355 c) 0.500 53 d) 2.351 529  Extra Practice 2 Lesson 2: Estimating Products and Quotients 1. Estimate each product or quotient. Tell if your estimate is an overestimate or an underestimate. a) 6.23 ( 5 b) 4.8 ( 7 c) 10.678 ( 9 d) 21.73 ( 4 e) 29.311 ( 3 f) 97.113 ( 2 2. a) Shawn and his brothers went to the movie theatre. One ticket cost $7.75. Estimate the cost of 3 tickets. b) Shawn paid $10.75, including tax, for 3 containers of popcorn. Estimate the cost of one container of popcorn, including tax. 3. Estimate the perimeter of a square with each side length. Tell if your estimate is an overestimate or an underestimate. How do you know? a) 3.2 cm b) 3.8 cm c) 5.4 cm 4. Estimate the side length of a square with each perimeter. a) 39.8 cm b) 20.6 cm c) 58.4 cm 5. It costs $17.85 per night to camp at Notikewin Provincial Park in Alberta. About how much will it cost to camp there for a week? 6. a) Is 7.26 ( 4 greater than, or less than, 28? How do you know? b) Is 41.16 ( 7 greater than, or less than, 6? How do you know? 7. Describe a situation where you might want to use an overestimate. Explain why.  Extra Practice 3 Lesson 3: Multiplying Decimals by a Whole Number 1. The decimal point is missing in each product. Use front-end estimation to place the decimal point. a) 12.306 ( 2 = 24612 b) 3.07 ( 6 = 1842 c) 4.009 ( 7 = 28063 d) 1.0604 ( 3 = 31812 e) 10.521 ( 8 = 84168 f) 9.081 ( 4 = 36324 2. Estimate to choose the correct product for each multiplication question. Question Possible Products a) 15.39 ( 5 7.695 76.95 769.5 b) 2.57 ( 3 0.771 7.71 77.1 c) 124.21 ( 4 4.9684 49.684 496.84 3. Multiply. a) 5.04 ( 7 b) 6.384 ( 2 c) 17.009 ( 6 d) $17.35 ( 8 e) 1.257 ( 3 f) 0.736 ( 4 4. Four friends went to Reptile World in Drumheller, Alberta, for the day. The cost of an admission ticket, including tax, was $7.35. What was the total cost of their admission? 5. Frank saved $4.35 each week for 8 weeks. He wants to buy a pair of aluminum drumsticks that cost $35.65, including tax. a) Does Frank have enough money? How do you know? b) If your answer to part a is no, how much more money does Frank need? 6. The decimal point in some of these products is in the wrong place. Identify the mistakes, then write each product with the decimal point in the correct place. a) 3.984 ( 3 = 119.52 b) 73.26 ( 4 = 293.04 c) 3.001 ( 5 = 150.05 d) 1.08 ( 5 = 0.54 Extra Practice 4 Lesson 4: Multiplying a Decimal Less than 1 by a Whole Number 1. Use Base Ten Blocks. Multiply. a) 0.43 ( 5 b) 0.065 ( 2 c) 0.24 ( 3 2. Multiply. Record each product in the place-value chart. Ones Tenths Hundredths Thousandths Ten-Thousandths a) b) c) d) e) f) a) 0.008 ( 7 b) 0.041 ( 4 c) 0.0209 ( 5 d) 0.184 ( 6 e) 0.1258 ( 9 f) 0.0491 ( 3 3. Multiply. What patterns do you see? a) 0.8 ( 4 b) 0.39 ( 8 c) 0.027 ( 6 0.08 ( 4 0.039 ( 8 0.0027 ( 6 0.008 ( 4 0.0039 ( 8 0.000 27 ( 6 4. Leah cut a strip of leather into 7 equal lengths to make bookmarks. Each piece was 0.232 m long. a) How long was the strip of leather before Leah cut it? b) How many cuts did she make? 5. Multiply as you would whole numbers. Estimate to place the decimal point. a) 0.495 ( 6 b) 0.0027 ( 9 c) 0.093 ( 3 d) 0.74 ( 7 e) 0.0053 ( 8 f) 0.089 ( 5 Extra Practice 5  Lesson 5: Dividing Decimals by a Whole Number 1. Use Base Ten Blocks to divide. a) 2.55 ( 5 b) 3.63 ( 3 c) 1.56 ( 4 2. The decimal point is missing in each quotient. Use estimation to place the decimal point. a) 7.4 ( 4 = 185 b) 6.12 ( 3 = 204 c) 2.936 ( 8 = 367 d) 14.85 ( 5 = 297 e) 10.323 ( 9 = 1147 f) 50.72 ( 8 = 634 3. Estimate to choose the correct quotient for each division question. Question Possible Quotients a) 9.256 ( 8 1.157 11.57 115.7 b) 53.92 ( 4 0.1348 1.348 13.48 c) 8.244 ( 9 0.916 9.16 91.6 4. The perimeter of each square is given. Find the side length of the square. a) P = 4.28 m b) P = 17.52 cm 5. Divide. Multiply to check your answers. a) 40.6 ( 5 b) 7.092 ( 3 c) 1.968 ( 6 d) 7.284 ( 6 e) 20.328 ( 8 f) 59.04 ( 9 6. Adam jogged 1.62 km in 9 min. Cecilia jogged 1.12 km in 7 min. Who jogged farther in 1 min? 7. Cito paid $13.75 to rent a bicycle for 5 h. His friend Alicia paid $2.95 each hour to rent a bicycle at a different location for 5 h. Who paid the lesser amount? Extra Practice 6 Lesson 6: Dividing Decimals 1. Estimate to choose the correct quotient for each division question. Question Possible Quotients a) 3.16 ( 4 0.79 7.9 79 b) 8.64 ( 6 0.144 1.44 14.4 c) 89.2 ( 4 0.223 2.23 22.3 2. Divide. Estimate to place the decimal point. a) 3.589 2 b) 18.2 4 c) 2.768 5 d) 14.07 5 e) 49.77 2 f) 4.592 4 3. Divide. Write each quotient to the same number of decimal places as there are in the dividend. a) 3.189 2 b) 5.1 9 c) $2.05 2 d) 27.3 4 e) 7.66 3 f) 1.3 6 4. Lissa divided a 1.89-L bottle of cranberry juice equally among 6 glasses. How much juice is in each glass? 5. Three friends take a taxi home from the baseball game. The taxi ride was $35.80. They want to share the cost equally. a) How much should each person pay? b) Is your answer to part a exact or approximate? Explain. c) Is it possible to share the cost equally? Explain. 6. Check each division below. For each incorrect quotient, explain the error, then write the correct quotient. a) 1.76 4 = 0.44 b) $10.88 5 = $2.176 c) 18.46 L 3 = 6.153 L d) 9.544 4 = 23.86 Extra Practice 7  Lesson 7: Dividing a Decimal Less than 1 by a Whole Number 1. Write the place value to make each statement true. a) 12 hundredths ( 4 = 3 _________________ b) 42 thousandths ( 6 = 7 _________________ c) 49 millionths ( 7 = 7 _________________ d) 264 ten-thousandths ( 2 = 132 _________________ 2. Divide. Record each quotient in the place-value chart. Ones Tenths Hundredths Thousandths Ten-Thousandths a) b) c) d) e) f) a) 0.32 ( 4 b) 0.036 ( 6 c) 0.014 ( 7 d) 0.056 ( 8 e) 0.81 ( 9 f) 0.0035 ( 5 3. Find each quotient. What patterns do you see? a) 0.4 ( 2 b) 0.32 ( 8 c) 0.075 ( 5 0.04 ( 2 0.032 ( 8 0.0075 ( 5 0.004 ( 2 0.0032 ( 8 0.000 75 ( 5 4. Marco has a baguette. The baguette has length 0.486 m. Suppose he cuts the baguette into 6 equal lengths. What is the length of each piece? 5. A student said that since 48 ( 4 = 12, then 0.48 ( 4 = 1200. Is the students reasoning correct? Explain. 6. A student divided 0.843 by 3 and got 2.81. a) Without dividing, how do you know the answer is incorrect? b) Where do you think the student went wrong? c) What is the correct answer? How can you check? Extra Practice Answers Extra Practice 1 Master 3.21 Lesson 1 1. oththTthHthm34715000302512504300053 2. a) 3 ones b) 3 thousandths c) 3 hundred-thousandths d) 3 ten-thousandths 3. a) 2.000 081 = 2 + 0.000 08 + 0.000 001 b) 0.0435 = 0.04 + 0.003 + 0.0005 c) 0.000 935 = 0.0009 + 000 03 + 0.000 005 d) 0.012 78 = 0.01 + 0.002 + 0.0007 + 0.000 08 4. a) 3.124 b) 15.006 c) 0.0007 d) 0.000 013 e) 4.000 21 f) 0.0368 5. a) 1.4 b) 3.000 284 c) 1.234 d) 5.002 941 e) 7.6024 f) 4.39 6. a) 3 hundredths + 4 ten-thousandths + 8 hundred-thousandths = 0.03 + 0.0004 + 0.000 08; three hundredths and forty-eight hundred-thousandths b) 6 ten-thousandths + 7 hundred-thousandths = 0.0006 + 0.000 07; sixty-seven hundred-thousandths 7. a) 5 ones are 1000 times as great as 5 thousandths. b) 5 hundredths are 10 times as great as 5 thousandths. c) 5 tenths are 1000 times as great as 5 ten-thousandths. d) 5 hundredths are 100 times as great as 5 ten-thousandths. Extra Practice 2 Master 3.22 Lesson 2 1. a) 30; underestimate b) 35; overestimate c) 90; underestimate d) 5; underestimate e) 10; overestimate f) 50; overestimate 2. a) About $24 (3 ( $8) b) About $4 ($12 ( 3) 3. a) About 12 cm (3 cm ( 4); underestimate because 3 cm < 3.2 cm b) About 16 cm (4 cm ( 4); overestimate because 4 cm > 3.8 cm c) About 20 cm (5 cm ( 4); underestimate because 5 cm < 5.4 cm 4. a) About 10 cm b) About 5 cm c) About 15 cm 5. About $126; $18 ( 7 = $126 6. a) I know 7 ( 4 = 28. Since 7.26 is greater than 7, 7.26 ( 4 is greater than 28. b) I know 42 7 = 6. Since 41.16 is less than 42, 41.16 7 is less than 6. 7. For example, I want to put a fence around the perimeter of a square garden and I want to be sure I have enough fencing. Extra Practice 3 Master 3.23 Lesson 3 1. a) 24.612 b) 18.42 c) 28.063 d) 3.1812 e) 84.168 f) 36.324 2. a) 76.95 b) 7.71 c) 496.84 3. a) 35.28 b) 12.768 c) 102.054 d) $138.80 e) 3.771 f) 2.944 4. $29.40 5. a) No, $4.35 ( 8 = $34.80 b) $35.65 $34.80 = $0.85; Frank needs $0.85 more. 6. a) 3.984 is close to 4, and 4 ( 3 = 12. Place the decimal point so the product is close to 12. As written, the product is close to 120. Move the digits one place to the right: 11.952 b) Correct; Since 73.26 is close to 70, multiply: 70 ( 4 = 280. Place the decimal point so the product is close to 280. The product is correct because 293.04 is close to 280. c) 3.001 is close to 3, and 3 ( 5 = 15. Place the decimal point so the product is close to 15. As written, the product is close to 150. Move the digits one place to the right: 15.005 d) 1.08 is close to 1, and 1 ( 5 = 5. Place the decimal point so the product is close to 5. As written, the product is close to 0.5. Move the digits one place to the left: 5.4 Extra Practice 4 Master 3.24 Lesson 4 1. a) 2.15 b) 0.13 c) 0.72 2. oththTtha)0056b)0164c)01045d)1104e)11322f)01473 3. a) 3.2, 0.32, 0.032 b) 3.12, 0.312, 0.0312 c) 0.162, 0.0162, 0.001 62 4. a) 1.624 m b) 6 cuts 5. a) 2.97; 495 ( 6 = 2970; 0.495 is close to 0.5, and 0.5 ( 6 = 3. Place the decimal point so the product is close to 3. b) 0.0243; 0.0027 is about 3 thousandths, and 3 thousandths ( 9 = 27 thousandths, or 0.027. Place the decimal point so the product is close to 0.027. c) 0.279; 0.093 is about 9 hundredths, and 9 hundredths ( 3 = 27 hundredths, or 0.27. Place the decimal point so the product is close to 0.27. d) 5.18; 0.74 is about 7 tenths, and 7 tenths ( 7 = 49 tenths, or 4.9. Place the decimal point so the product is close to 4.9. e) 0.0424; 0.0053 is about 5 thousandths, and 5 thousandths ( 8 = 40 thousandths, or 0.040. Place the decimal point so the product is close to 0.040. f) 0.445; 0.089 is about 9 hundredths, and 9 hundredths ( 5 = 45 hundredths, or 0.45. Place the decimal point so the product is close to 0.45. Extra Practice 5 Master 3.25 Lesson 5 1. a) 0.51 b) 1.21 c) 0.39 2. a) 1.85 b) 2.04 c) 0.367 d) 2.97 e) 1.147 f) 6.34 3. a) 1.157 b) 13.48 c) 0.916 4. a) 1.07 m b) 4.38 cm 5. a) 8.12 b) 2.364 c) 0.328 d) 1.214 e) 2.541 f) 6.56 6. Adam jogged 0.18 km in 1 min. Cecilia jogged 0.16 km in 1 min. Adam jogged farther in 1 min. 7. Cito paid $2.75 each hour. Alicia paid $2.95 each hour. So, Cito paid the lesser amount. Extra Practice 6 Master 3.26 Lesson 6 1. a) 0.79 b) 1.44 c) 22.3 2. a) Add a 0 in the dividend so we can continue to divide: 35 890 ( 2 = 17 945. Estimate to place the decimal point. 3.589 is close to 4, and 4 ( 2 = 2. Place the decimal point so the quotient is close to 2: 1.7945 b) Add a 0 in the dividend so we can continue to divide: 1820 ( 4 = 455. Estimate to place the decimal point. 18.2 is close to 20, and 20 ( 4 = 5. Place the decimal point so the quotient is close to 5: 4.55 c) Add a 0 in the dividend so we can continue to divide: 27 680 ( 5 = 5536. Estimate to place the decimal point. 2.768 is close to 2.5, and 2.5 ( 5 = 0.5. Place the decimal point so the quotient is close to 0.5: 0.5536 d) Add a 0 in the dividend so we can continue to divide: 14 070 ( 5 = 2814. Estimate to place the decimal point. 14.07 is close to 15, and 15 ( 5 = 3. Place the decimal point so the quotient is close to 3: 2.814 e) Add a 0 in the dividend so we can continue to divide: 49 770 ( 2 = 24 885. Estimate to place the decimal point. 49.77 is close to 50, and 50 ( 2 = 25. Place the decimal point so the quotient is close to 25: 24.885 f) Add a 0 in the dividend so we can continue to divide: 45 920 ( 4 = 11 480. Estimate to place the decimal point. 4.592 is close to 4, and 4 ( 4 = 1. Place the decimal point so the quotient is close to 1: 1.148 3. a) 1.595 b) 0.6 c) $1.03 d) 6.8 e) 2.55 f) 0.2 4. About 0.32 L 5. a) About $11.93 b) Approximate; the actual answer to part a is $11.9333 but each person cannot pay this amount as the smallest denomination of money is the cent. c) No, one person will have to pay one cent more than the others. 6. a) 176 ( 4 = 44. Estimate to place the decimal point. 1.76 is close to 2, and 2 ( 4 =  eq \f(1,2), or 0.5. Place the decimal point so the quotient is close to 0.5: 0.44. The quotient is correct. b) 10 880 ( 5 = 2176. Estimate to place the decimal point. 10.88 is close to 10, and 10 ( 5 = 2. Place the decimal point so the quotient is close to 2: 2.176. Write the quotient to 2 decimal places (the closest hundredth): $2.18. Money is always written to 2 decimal places. c) 1 846 000 ( 3 = 615 333 (the 3 continues to repeat). Estimate to place the decimal point. 18.46 is close to 18, and 18 ( 3 = 6. Place the decimal point so the quotient is close to 6: 6.153 33 Write the quotient to 2 decimal places (the closest hundredth): 6.15 L. The quotient must be given to the same number of decimal places as the dividend. d) 9544 ( 4 = 2386. Estimate to place the decimal point. 9.544 is close to 8, and 8 ( 4 = 2. Place the decimal point so the quotient is close to 2: 2.386. The decimal point is in the wrong place. Move the digits one place to the right. Extra Practice 7 Master 3.27 Lesson 7 1. a) hundredths b) thousandths c) millionths d) ten-thousandths 2. othThTtha)008b)0006c)0002d)0007e)009f)00007 3. a) 0.2, 0.02, 0.002 b) 0.04, 0.004, 0.0004 c) 0.015, 0.0015, 0.000 15 4. 0.081 m 5. This reasoning is not correct. 48 hundredths divided by 4 is 12 hundredths, or 0.12. When you divide 48 hundredths into 4 equal parts, each part cannot be greater than the dividend. Both the dividend and quotient must be changed in the same way (move the digits 2 places to the right). 6. a) The answer is incorrect because 0.843 is close to 1, and 1 3 =  eq \f(1,3), or about 0.3. So, the quotient should be close to 0.3. b) The student placed the decimal point in the wrong place. c) 0.281. I can check by multiplying the quotient by the divisor: 0.281 ( 3 = 0.843. Since 0.843 is the same as the dividend, my answer is correct.     Name Date The right to reproduce or modify this page is restricted to purchasing schools. This page may have been modified from its original. Copyright 2009 Pearson Education Canada Name Date The right to reproduce or modify this page is restricted to purchasing schools. This page may have been modified from its original. Copyright 2009 Pearson Education Canada Name Date The right to reproduce or modify this page is restricted to purchasing schools. This page may have been modified from its original. Copyright 2009 Pearson Education Canada The right to reproduce or modify this page is restricted to purchasing schools. This page may have been modified from its original. Copyright 2009 Pearson Education Canada Name Date The right to reproduce or modify this page is restricted to purchasing schools. This page may have been modified from its original. 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