ࡱ> s !7bjbj2)2) kPCfPCf-s8!8!!!!$"""Ph"4#"2$f%|%|%|%)6*$* $hjך!0*^)|)0*0*ך8!8!|%|%...0*^8!|%!|%.0*..~i8!6|%_Yc *X02ҡ2-$ҡҡ!0*0*.0*0*0*0*0*ךךV.40*0*0*20*0*0*0*ҡ0*0*0*0*0*0*0*0*0*X : Program Information[Lesson Title] Solving Systems of Equations: Substitution TEACHER NAME Paula MulletPROGRAM NAME Cuyahoga Community College[Unit Title] Systems of Linear Equations NRS EFL(s) 4 6 TIME FRAME 60 120 minutesInstruction HYPERLINK "https://www.ohiohighered.org/sites/ohiohighered.org/files/uploads/able/reference/standards/FY15%20CCRs-Ohio%20ABE%20ASE%20Standards.pdf"ABE/ASE Standards Mathematics Numbers (N)Algebra (A)Geometry (G)Data (D)Numbers and Operation Operations and Algebraic ThinkingGeometric Shapes and FiguresMeasurement and DataThe Number System Expressions and EquationsA.4.11 A.5.6 A.6.4 CongruenceStatistics and ProbabilityRatios and Proportional Relationships FunctionsSimilarity, Right Triangles. And TrigonometryBenchmarks identified in RED are priority benchmarks. To view a complete list of priority benchmarks and related Ohio Aspire lesson plans please see the  HYPERLINK "http://trc.ohioable.org/" Curriculum Alignments located on the  HYPERLINK "http://trc.ohioable.org/" Teacher Resource Center (TRC).Number and Quantity Geometric Measurement and DimensionsModeling with Geometry Mathematical Practices (MP)XMake sense of problems and persevere in solving them. (MP.1)Use appropriate tools strategically. (MP.5)XReason abstractly and quantitatively. (MP.2)XAttend to precision. (MP.6)Construct viable arguments and critique the reasoning of others. (MP.3)Look for and make use of structure. (MP.7)XModel with mathematics. (MP.4)Look for and express regularity in repeated reasoning. (MP.8) LEARNER OUTCOME(S) Students will accurately solve a system of equations algebraically using substitution. ASSESSMENT TOOLS/METHODS Math Scavenger Hunt completed with 100% accuracy.LEARNER PRIOR KNOWLEDGE Students should be fluent in solving linear equations and integer operations. They should have the ability to solve systems of equations by graphing. They will have completed earlier lessons on systems of equations, such as Solving Systems of Linear Equations Graphing. Teacher Note Be sure to classify each system as consistent or inconsistent and dependent or independent. INSTRUCTIONAL ACTIVITIES On the board, write the sample system (-x + 2y = 4 and 5x 3y = 1) found on handout, Steps to Solve a System of Equations by Substitution. Ask the class how they might solve the system of equations (graphing). Remind the class that this is the method that they just studied in class. Ask the class if they know of any other methods to solve this system /problem. Ask if they think the system could be solved algebraically. Using the steps outlined on the handout for solving a system of equations by substitution, demonstrate how to solve this system of equations by substitution. Distribute copies of Steps to Solve a System of Equations by Substitution handout. Ask the students to review the steps on the handout. Using the three sample systems on the handout, teacher works through each example with student input, asking questions: Which equation would be best to rewrite for substitution? Which variable do we want to solve for first? What does the equation look like after we substitute? Do the solutions work for both equations? Working in pairs, students will complete the Using Substitution to Solve Systems of Equations activity. Students will match the systems of equations with the correct equation modified for substitution. After verifying that the students have selected the correct modified equations on the worksheet, solve the systems of equations found on Using Substitution to Solve Systems of Equations. Set up a Math Scavenger Hunt in the classroom using the directions found in the Math Scavenger Hunt Teacher Resource. The questions and answers found in the Substitution Scavenger Hunt Information Sheet will provide the questions and solutions to place on each clue card. The answers are also included for your reference. Teacher Note Use resources to introduce the concept as in a flipped classroom or for additional practice. RESOURCES Paper and pencils Student copies of Steps to Solve a System of Equations by Substitution Handout (attached) Student copies of Using Substitution to Solve Systems of Equations Activity (attached) Math Scavenger Hunt Teacher Resource (attached) Paper or card stock (8 by 11) 2 colored markers Tape Student copies of Math Scavenger Hunt Answer Sheet (attached) Substitution Scavenger Hunt Information Sheet (attached) Additional resources: Systems of Linear Equations: Solving by Substitution. (n.d.). Retrieved from  HYPERLINK "http://www.purplemath.com/modules/systlin4.htm" http://www.purplemath.com/modules/systlin4.htm Solving Systems of Equations by Substitution. (n.d.). Retrieved from  HYPERLINK "http://cstl.syr.edu/fipse/algebra/unit5/subst.htm" http://cstl.syr.edu/fipse/algebra/unit5/subst.htm DIFFERENTIATION Play videos demonstrating substitution listed in the Resources. Encourage students to work with partners to solve the activities. Have students rework the sample systems independently or provide other systems for practice. The Scavenger Hunt allows students to move around the classroom and work with others. ReflectionTEACHER REFLECTION/LESSON EVALUATION ADDITIONAL INFORMATION This is part of a series of lessons on solving systems of linear equations. To continue the study, complete Solving Systems of Equations Elimination.  Steps to Solve a System of Equations by Substitution Solve one equation for one of the variables. Substitute the resulting expression in the other equation. Solve the resulting equation for the first variable. Find the values of the variables by substituting the solution back into the original equation to solve for the second variable. Check the solution in both equations of the system. Example -x + 2y = 4 5x 3y = 1 Step 1 Since the first equation has a term with a coefficient of -1 or 1, solve the first equation for x -x +2y -2y = 4 -2y (subtract 2y from both sides) -x = 4 -2y (result after subtracting 2y from both sides) -x/-1 = (4 -2y)/-1 (divide both sides by -1 so x is positive) X = 2y -4 (flipped the order of the terms) Step 2 (substitute for x) 5(2y 4) 3y = 1 (Substitute the resulting expression into the other equation) Step 3 (solve for y) 10y -20 -3y = 1 (distribute the 5) 7y -20 = 1 (combine like terms) 7y -20 +20 = 1 +20 (add 5 to both sides) 7y = 21 7y/7 = 21/7 (divide both sides by 7) y = 3 Step 4 (solve for x) -x + 2y = 4 (original equation) -x + 2(3) = 4 (y value substituted into the equation) -x + 6 = 4 -x +6 6 = 4 -6 (subtract 6 from both sides) -x = -2 (combine like terms) -x/-1 = -2/-1 (divide both sides by -1) X = 2 Step 5 (check your answer) -x + 2y = 4 - (2) + 2(3) = 4 -2 + 6 = 4 4 = 4 5x 3y = 1 5(2) -3(3) = 1 10 -9 = 1 1 = 1 (Results of substituting the solutions into both equations) Sample Systems to Solve 5x y = 1 3x + 2y = 13 r = 5 s 2r + 7s = 0 4a + b 8 = 0 5a + 3b 3 = 0 Using Substitution to Solve Systems of Equations Activity Directions Match the system of equations with the modified equation that can be used to solve the system of equations by substitution. Draw a line between the system and the equation used to substitute. 2x + y = 11 x y = 2 x = -2y + 6 4x y = 7 5x 8y = 2 x = -6y + 5 2x + 2y = 4 3x 3y =18 y = -2x + 1 2x + y = 1 10x - 4y = 2 y = 4x 7 -3x y = -13 X + 2y = 6 x = y + 2 2x 6y = 4 X + 6y = 5 x = -y + 2 Activity Answers 2x + y = 11 x y = 2 x = y + 2 4x y = 7 5x 8y = 2 y = 4x 7 2x + 2y = 4 3x 3y =18 x = -y + 2 2x + y = 1 10x - 4y = 2 y = -2x + 1 -3x y = -13 X + 2y = 6 x = -2y + 6 2x 6y = 4 X + 6y = 5 x = -6y + 5  SHAPE \* MERGEFORMAT  Supplies Paper or card stock (8 by 11) 2 colored markers Tape A math scavenger hunt is a fun way to assess the math skills of your students. Most any math topic can be evaluated with this activity, and the students will stay active as they move around the room solving problems and searching for the answers. Students can work in groups or alone as they complete the activity. To set up a scavenger hunt select 6-8 problems with answers. Before you make the scavenger hunt clue cards, do some planning to make sure each problem and its answer will be on different cards. This has already been done for you in the series of lessons on systems of equations. When you have decided on the problem and answer to place on each card, write a problem at the top (portrait orientation) of the clue card and a solution at the bottom of the card. Write all the answers in one color of marker, and use the second color for the problems. Tape these sheets around the room. Math Clue Card Example 2 x 4  10  Now it is time for the students to complete the Math Scavenger Hunt. Give each student a Scavenger Hunt Answer Sheet (see below). Students can start their hunt at any location in the room. This way the class will be spread out around the classroom. At their first stop, the students will write the problem on their answer sheet and solve it. Remember the problem will be at the top of the sheet. There is space on the answer sheet for the students to show their work. Once they have solved this problem they will find the Scavenger Hunt Clue Card with their answer. The problem at the top of this clue card will be the students next problem to solve. If the students dont find their answer when they look around the room, the students know to redo their work. Students continue with this process until all the problems have been completed, and they return to the card which contains their first problem. The answers can be corrected quickly because the answers will be in a specific order. Remember each student will start the Scavenger Hunt in a different place in the answer sequence.  SHAPE \* MERGEFORMAT  ProblemsAnswers         SHAPE \* MERGEFORMAT  Use the following systems of equations and solutions to create a Math Scavenger Hunt for the students. The systems in the left column should be placed on the same card as the solutions next to them. Note The solutions do not match the systems they are next to! X 2y = 0 (12, 17) 2x 5y = -4 -1/2 x y = -3 (4, 1) X + 3y = 6 y = 8 x (2, 3) 4x 3y = -3 x = 8y (6, 0) x 4y = 12 y = x + 5 (24, 3) y = 2x - 7 -x + 2y = 4 (2, 1) 5x 3y = 1 -3x y = -13 (3, 5) x + 2y = 6 4x y = 7 (8, 4) 5x 8y = 2  SHAPE \* MERGEFORMAT  The first column lists the system of equation to solve. The second column listed the answer to that system. Remember the x-value is the first number and the y-value is the second number. The third column (in red) is the order in which the answers will appear on the answer sheet for the scavenger hunt. Remember, because students will start the hunt on different cards, their answers will start in different locations. The first answer will be different on each sheet, but the solutions will be in the same sequence (red list). X 2y = 0 (4, 4) (8, 4) 2x 5y = -4 -1/2 x y = -3 (6, 0) (2,1) X + 3y = 6 y = 8 x (3, 5) (2, 3) 4x 3y = -3 x = 8y (24, 3) (3, 5) x 4y = 12 y = x + 5 (12, 17) (4, 1) y = 2x - 7 -x + 2y = 4 (2, 3) (6, 0) 5x 3y = 1 -3x y = -13 (4, 1) (24, 3) x + 2y = 6 4x y = 7 (2, 1) (12, 17) 5x 8y = 2        PAGE \* MERGEFORMAT 6 Ohio Aspire Lesson Plan Solving Systems of Equations: Substitution Math Scavenger Hunt Teacher Resource Math Scavenger Hunt Student Answer Sheet Substitution Scavenger Hunt Information Sheet Substitution Scavenger Hunt Information Sheet Answers "#$BNOP\]^kwxyܴȑppiȴWHHHh)5CJOJQJ^JaJ#h)hJ_~5CJOJQJ^JaJ h jfh#h)h)5CJOJQJ^JaJh5CJOJQJ^JaJ#h)h5CJOJQJ^JaJ h56CJOJQJ^JaJ&h)h56CJOJQJ^JaJ&h)h)56CJOJQJ^JaJ h)56CJOJQJ^JaJ#h jfh5CJOJQJ^JaJ#$OP]^kxyd<$Ifgd$d<$Ifa$gd)$d<$Ifa$gd$qqd<$If]q^qa$gd E*$qqd<$If]q^qa$gdkd$$Ifl4 \(Y5`   t0644 lap(ytJd<$Ifgdd<$Ifgd)$d<$Ifa$gdJ_~$d<$Ifa$gd  ۶r`NG8hk5CJOJQJ^JaJ h jfhk#h jfhk6CJOJQJ^JaJ#h jfhk6CJOJQJ^JaJ#h,?hk5CJOJQJ^JaJ'h,?hk0J5CJOJQJ^JaJhBcjhBcU#h jfhk5CJOJQJ^JaJ h jfhh)5CJOJQJ^JaJh5CJOJQJ^JaJ#h)h5CJOJQJ^JaJ#h)h)5CJOJQJ^JaJE*$qqd<$If]q^qa$gd=kd$$Ifl4@\(Y5`   t0644 lap(ytJ R7$qqd<$If]q^qa$gd=kd$$Ifl40Y5`e2 t0644 laf4pyt d$Ifgd=$d<$Ifa$gd=      ) * + H I ] ^ _ ` a r s t u v ŷŷ~g,h)hk5B*CJOJQJ^JaJph,h)h-V5B*CJOJQJ^JaJph h,?hkCJOJQJ^JaJ h jfhkCJOJQJ^JaJhkCJOJQJ^JaJ#h jfhk5CJOJQJ^JaJ h jfhkhk5CJOJQJ^JaJ#h jfhk5CJOJQJ^JaJ" $d<$Ifa$gd= -kdy$$Ifl4^r'Y5`   c t0644 lap2yt      * + H I ^ _ ` a s t u v d<$IfgdISFfd<$Ifgd=$qqd<$If]q^qa$gd=   0 1 J M ʸqqʸ_H_,h|j(h|j(5B*CJOJQJ^JaJph#h|j(h|j(5CJOJQJ^JaJhk5CJOJQJ^JaJ#h jfhk5CJOJQJ^JaJ h jfhk h jfhkCJOJQJ^JaJhkCJOJQJ^JaJ#h jfhk5CJOJQJ^JaJ h,?hkCJOJQJ^JaJ#h jfhIS5CJOJQJ^JaJ#h)hIS5CJOJQJ^JaJ   0 1 b c d x y z { Ffd<$Ifgd|j($qqd<$If]q^qa$gd=Ffnd<$Ifgd=     @ A B _ ` a b c d w ޭǙǙmfTFhkCJOJQJ^JaJ#h jfhk5CJOJQJ^JaJ h jfhH#h|j(hk5CJOJQJ^JaJ2j h|j(h|j(5CJOJQJU^JaJ'h|j(h|j(0J5CJOJQJ^JaJ2j h|j(h|j(5CJOJQJU^JaJ,jh|j(h|j(5CJOJQJU^JaJ#h|j(h|j(5CJOJQJ^JaJhW5CJOJQJ^JaJw x y z { |   ! @ ųųų{mm\m h?hkCJOJQJ^JaJhkCJOJQJ^JaJh'5CJOJQJ^JaJ#h'hk5CJOJQJ^JaJ,hhk5B*CJOJQJ^JaJph#h jfhk5CJOJQJ^JaJ h jfhk h,?hkCJOJQJ^JaJ#h jfhk5CJOJQJ^JaJ h jfhkCJOJQJ^JaJ{ | $d<$Ifa$gd=Ff$qqd<$If]q^qa$gd=Ff2d<$Ifgd= ! 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