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10-Aug-15 Solving Sim. Equations Graphically Solving Simple Sim. Equations by Substitution Simultaneous Equations Solving Simple Sim. Equations by elimination Solving harder type Sim. equations Graphs as Mathematical Models
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10-Aug-15 Starter Questions Starter Questions
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10-Aug-15 Learning Intention Success Criteria 1.To solve simultaneous equations using graphical methods. Simultaneous Equations 1.Interpret information from a line graph. 2.Plot line equations on a graph. 3.Find the coordinates were 2 lines intersect ( meet) Straight Lines S5 Int2
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Simultaneous Equations Straight Lines 10-Aug-15 Q. Find the equation of each line. (1,3) Q. Write down the coordinates were they meet.
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Simultaneous Equations Straight Lines 10-Aug-15 Q. Find the equation of each line. (-0.5,-0.5) Q. Write down the coordinates where they meet.
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Simultaneous Equations Straight Lines 10-Aug-15 Q. Plot the lines. (1,1) Q. Write down the coordinates where they meet.
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Simultaneous Equations Straight Lines 10-Aug-15 Now try Exercise 2 Ch7 (page 84 )
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10-Aug-15 Starter Questions Starter Questions S5 Int2 5cm 8cm
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10-Aug-15 Learning Intention Success Criteria 1.To use graphical methods to solve real-life mathematical models Simultaneous Equations 1.Draw line graphs given a table of points. 2.Find the coordinates were 2 lines intersect ( meet) Straight Lines
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Simultaneous Equations Straight Lines 10-Aug-15 We can use straight line theory to work out real-life problems especially useful when trying to work out hire charges. Q.I need to hire a car for a number of days. Below are the hire charges charges for two companies. Complete tables and plot values on the same graph. 160180200 180240300
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Simultaneous Equations Straight Lines 10-Aug-15 Days Total Cost £ A r n o l d S w i n t o n Summarise data ! Who should I hire the car from? Up to 2 days Swinton Over 2 days Arnold
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Simultaneous Equations Straight Lines 10-Aug-15 Key steps 1. Fill in tables 2. Plot points on the same graph ( pick scale carefully) 3. Identify intersection point ( where 2 lines meet) 4. Interpret graph information.
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Simultaneous Equations Straight Lines 10-Aug-15 Now try Exercise 3 Ch7 (page 85 )
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10-Aug-15 Starter Questions Starter Questions S5 Int2
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10-Aug-15 Learning Intention Success Criteria 1.To solve pairs of equations by substitution. Simultaneous Equations 1.Apply the process of substitution to solve simple simultaneous equations. Straight Lines S5 Int2
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Simultaneous Equations Straight Lines 10-Aug-15 Example 1 Solve the equations y = 2x y = x+1 by substitution
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Simultaneous Equations Straight Lines 10-Aug-15 At the point of intersection y coordinates are equal: 2x = x+1 Rearranging we get : 2x - x = 1 x = 1 Finally : Sub into one of the equations to get y value y = 2x = 2 x 1 = 2 OR y = x+1 = 1 + 1 = 2 so we have y = 2x y = x+1 The solution is x = 1 y = 2 or (1,2)
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Simultaneous Equations Straight Lines 10-Aug-15 Example 1 Solve the equations y = x + 1 x + y = 4 by substitution (1.5, 2.5)
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Simultaneous Equations Straight Lines 10-Aug-15 At the point of intersection y coordinates are equal: x+1 = -x+4 Rearranging we get : 2x = 4 - 1 2x = 3 Finally : Sub into one of the equations to get y value y = x +1 = 1.5 + 1 = 2.5 y = -x+4 = -1.5 + 4 = 2.5 so we have y = x +1 y =-x+ 4 The solution is x = 1.5 y = 2.5 (1.5,2.5) x = 3 ÷ 2 = 1.5 OR
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Simultaneous Equations Straight Lines 10-Aug-15 Now try Ex 4 Ch7 (page88 )
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10-Aug-15 Starter Questions Starter Questions
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10-Aug-15 Learning Intention Success Criteria 1.To solve simultaneous equations of 2 variables. Simultaneous Equations 1.Understand the term simultaneous equation. 2.Understand the process for solving simultaneous equation of two variables. 3.Solve simple equations Straight Lines
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Simultaneous Equations Straight Lines 10-Aug-15 Example 1 Solve the equations x + 2y = 14 x + y = 9 by elimination
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Simultaneous Equations Straight Lines 10-Aug-15 Step 1: Label the equations x + 2y = 14 (1) x + y = 9 (2) Step 2: Decide what you want to eliminate Eliminate x by subtracting (2) from (1) x + 2y = 14 (1) x + y = 9 (2) y = 5
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Simultaneous Equations Straight Lines 10-Aug-15 Step 3: Sub into one of the equations to get other variable Substitute y = 5 in (2) x + y = 9 (2) x + 5 = 9 The solution is x = 4 y = 5 Step 4:Check answers by substituting into both equations x = 9 - 5 x = 4 x + 2y = 14 x + y = 9 ( 4 + 10 = 14) ( 4 + 5 = 9)
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Simultaneous Equations Straight Lines 10-Aug-15 Example 2 Solve the equations 2x - y = 11 x - y = 4 by elimination
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Simultaneous Equations Straight Lines 10-Aug-15 Step 1: Label the equations 2x - y = 11 (1) x - y = 4 (2) Step 2: Decide what you want to eliminate Eliminate y by subtracting (2) from (1) 2x - y = 11 (1) x - y = 4 (2) x = 7
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Simultaneous Equations Straight Lines 10-Aug-15 Step 3: Sub into one of the equations to get other variable Substitute x = 7 in (2) x - y = 4 (2) 7 - y = 4 The solution is x =7 y =3 Step 4:Check answers by substituting into both equations y = 7 - 4 y = 3 2x - y = 11 x - y = 4 ( 14 - 3 = 11) ( 7 - 3 = 4)
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Simultaneous Equations Straight Lines 10-Aug-15 Example 3 Solve the equations 2x - y = 6 x + y = 9 by elimination
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Simultaneous Equations Straight Lines 10-Aug-15 Step 1: Label the equations 2x - y = 6 (1) x + y = 9 (2) Step 2: Decide what you want to eliminate Eliminate y by adding (1) and (2) 2x - y = 6 (1) x + y = 9 (2) 3x = 15 x = 15 ÷ 3 = 5
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Simultaneous Equations Straight Lines 10-Aug-15 Step 3: Sub into one of the equations to get other variable Substitute x = 5 in (2) x + y = 9 (2) 5 + y = 9 The solution is x = 5 y = 4 Step 4: Check answers by substituting into both equations y = 9 - 5 y = 4 2x - y = 6 x + y = 9 ( 10 - 4 = 6) ( 5 + 4 = 9)
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Simultaneous Equations Straight Lines 10-Aug-15 Now try Ex 5A Ch7 (page89 )
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10-Aug-15 Starter Questions Starter Questions
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10-Aug-15 Learning Intention Success Criteria 1.To solve harder simultaneous equations of 2 variables. Simultaneous Equations 1.Apply the process for solving simultaneous equations to harder examples. Straight Lines
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Simultaneous Equations Straight Lines 10-Aug-15 Example 1 Solve the equations 2x + y = 9 x - 3y = 1 by elimination
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Simultaneous Equations Straight Lines 10-Aug-15 2x + y = 9 x -3y = 1 Step 1: Label the equations 2x + y = 9(1) x -3y = 1(2) Step 2: Decide what you want to eliminate Eliminate y by : 7x = 28 6x + 3y = 27 (3) x - 3y = 1 (4) x = 28 ÷ 7 = 4 Adding (1) x3 (2) x1
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Simultaneous Equations Straight Lines 10-Aug-15 Step 3: Sub into one of the equations to get other variable Substitute x = 4 in equation (1) 2 x 4 + y = 9 y = 9 – 8 The solution is x = 4 y = 1 Step 4: Check answers by substituting into both equations y = 1 2x + y = 9 x -3y = 1 ( 8 + 1 = 9) ( 4 - 3 = 1)
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Simultaneous Equations Straight Lines 10-Aug-15 Example 2 Solve the equations 3x + 2y = 13 2x + y = 8 by elimination
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Simultaneous Equations Straight Lines 10-Aug-15 3x + 2y = 13 2x + y = 8 Step 1: Label the equations 3x + 2y = 13(1) 2x + y = 8(2) Step 2: Decide what you want to eliminate Eliminate y by : -x = -3 3x + 2y = 13 (3) 4x + 2y = 16 (4) x = 3 Subtract (1) x1 (2) x2
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Simultaneous Equations Straight Lines 10-Aug-15 Step 3: Sub into one of the equations to get other variable Substitute x = 3 in equation (2) 2 x 3 + y = 8 y = 8 – 6 The solution is x = 3 y = 2 Step 4: Check answers by substituting into both equations y = 2 3x + 2y = 13 2x + y = 8 ( 9 + 4 = 13) ( 6 + 2 = 8)
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Simultaneous Equations Straight Lines 10-Aug-15 Now try Ex 5B Ch7 (page90 )
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