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ALGEBRA 1 LESSON 6-3 Standard Form (For help, go to Lessons 2-3 and 2-6.) Solve each equation for y. 1. 3x + y = 5 2. y – 2x = 10 3. x – y = 6 4. 20x + 4y = 8 5. 9y + 3x = 1 6. 5y – 2x = 4 Clear each equation of decimals. 7. 6.25x + 8.5 = 7.75 8. 0.4 = 0.2x – 5 9. 0.9 – 0.222x = 1 8-5 ALGEBRA 1 LESSON 6-3 Standard Form Solutions 1. 3x + y = 5 3x – 3x + y = 5 – 3x y = –3x + 5 3. x – y = 6 x=6+y x–6=y y=x–6 5. 9y + 3x = 1 9y = –3x + 1 y = –3x+ 1 9 1 y=– x+ 1 3 9 2. y – 2x = 10 y – 2x + 2x = 10 + 2x y = 2x + 10 4. 20x + 4y = 8 4y = –20x + 8 y = –20x + 8 4 y = –5x + 2 6. 5y – 2x = 4 5y = 2x + 4 y = 2x+ 4 5 2 y = x +4 5 5 8-5 7. Multiply each term by 100: 100(6.25x)+100(8.5) = 100(7.75) Simplify: 625x + 850 = 775 8. Multiply each term by 10: 10(0.4) = 10(0.2x) – 10(5) Simplify: 4 = 2x – 50 9. Multiply each term by 1000: 1000(0.9)–1000(0.222x)=1000(1) Simplify: 900 – 222x = 1000 ALGEBRA 1 LESSON 6-3 Standard Form Find the x- and y-intercepts of 2x + 5y = 6. Step 1 To find the x-intercept, substitute 0 for y and solve for x. Step 2 To find the y-intercept, substitute 0 for x and solve for y. 2x + 5y = 6 2x + 5y = 6 2x + 5(0) = 6 2(0) + 5y = 6 2x = 6 5y = 6 x=3 y= The x-intercept is 3. 6 5 The y-intercept is 8-5 6 . 5 ALGEBRA 1 LESSON 6-3 Standard Form Graph 3x + 5y = 15 using intercepts. Step 1 Find the intercepts. Step 2 Plot (5, 0) and (0, 3). Draw a line through the points. 3x + 5y = 15 3x + 5(0) = 15 3x = 15 Substitute 0 for y. Solve for x. x=5 3x + 5y = 15 3(0) + 5y = 15 5y = 15 Substitute 0 for x. Solve for y. y=3 8-5 ALGEBRA 1 LESSON 6-3 Standard Form a. Graph y = 4 b. Graph x = –3. 0 • x + 1 • y = 4 Write in standard form. For all values of x, y = 4. 1 • x + 0 • y = –3 Write in standard form. For all values of y, x = –3. 8-5 ALGEBRA 1 LESSON 6-3 Standard Form Write y = 2 x + 6 in standard form using integers. 3 y= 2x+6 3 3y = 3( 2 x + 6 ) Multiply each side by 3. 3y = 2x + 18 Use the Distributive Property. 3 –2x + 3y = 18 Subtract 2x from each side. The equation in standard form is –2x + 3y = 18. 8-5 ALGEBRA 1 LESSON 6-3 Standard Form Write an equation in standard form to find the number of hours you would need to work at each job to make a total of $130. Job Mowing lawns Delivering newspapers Amount Paid per hour Define: Let x = the hours mowing lawns. Let y = the hours delivering newspapers. $12 $5 Relate: $12 per h plus mowing 12 x Write: + $5 per h equals $130 delivering 5 y = The equation standard form is 12x + 5y = 130. 8-5 130 ALGEBRA 1 LESSON 6-3 Standard Form Find each x- and y-intercepts of each equation. 2. –4x – 3y = 9 1. 3x + y = 12 x = – 9 , y = –3 x = 4, y = 12 4 3. Graph 2x – y = 6 using x- and y-intercepts. For each equation, tell whether its graph is horizontal or vertical. 4. y = 3 horizontal 5. x = –8 vertical 6. Write y = 5 x – 3 in standard form using integers. 2 –5x + 2y = –6 or 5x – 2y = 6 8-5 Point-Slope Form and Writing Linear Equations ALGEBRA 1 LESSON 6-4 (For help, go to Lessons 6-1 and 1-7.) Find the rate of change of the data in each table. 1. x y 2 5 8 11 4 –2 –8 –14 2. x y –3 –1 1 3 –5 –4 –3 –2 Simplify each expression. 4. –3(x – 5) 5. 5(x + 2) 6. – 4 (x – 6) 9 8-5 3. x y 10 4 7.5 –1 5 –6 2.5 –11 Point-Slope Form and Writing Linear Equations Solutions ALGEBRA 1 LESSON 6-4 4 – (–2) 6 1. Use points (2, 4) and (5, –2). rate of change = 2 – 5 = –3 = –2 2. Use points (–3, –5) and (–1, –4). rate of change = –5 – (–4) –5 + 4 1 = = –1 = –3 – (–1) –3 + 1 –2 2 3. Use points (10, 4) and (7.5, –1). rate of change = 4 – (–1 ) 4+1 5 = = =2 10 – 7.5 2.5 2.5 4. –3(x – 5) = –3x – (–3)(5) = –3x + 15 5. 5(x + 2) = 5x + 5(2) = 5x + 10 6. – 4 (x – 6) = – 4 x – (– 4 )(6) = – 4 x + 8 9 9 9 9 3 8-5 Point-Slope Form and Writing Linear Equations ALGEBRA 1 LESSON 6-4 Graph the equation y – 2 = 1 (x – 1). 3 The equation of a line that passes through (1, 2) with slope 1 . 3 Start at (1, 2). Using the slope, go up 1 unit and right 3 units to (4, 3). Draw a line through the two points. 8-5 Point-Slope Form and Writing Linear Equations ALGEBRA 1 LESSON 6-4 Write the equation of the line with slope –2 that passes through the point (3, –3). y – y1 = m(x – x1) y – (–3) = –2(x – 3) y + 3 = –2(x – 3) Substitute (3, –3) for (x1, y1) and – 2 for m. Simplify the grouping symbols. 8-5 Point-Slope Form and Writing Linear Equations ALGEBRA 1 LESSON 6-4 Write equations for the line in point-slope form and in slope-intercept form. Step 1 Find the slope. y 2 – y1 x 2 – x1 =m 4–3 –1 – 2 =– The slope is – 1 . 3 8-5 1 3 Point-Slope Form and Writing Linear Equations ALGEBRA 1 LESSON 6-4 (continued) Step 2 Use either point to write the the equation in point-slope form. Step 3 Rewrite the equation from Step 2 in slope– intercept form. y – 4 = – 1 (x + 1) Use (–1, 4). 3 y–4=–1x–1 3 3 y = – 1 x + 32 3 3 y – y1 = m(x – x1) y – 4 = – 1 (x + 1) 3 8-5 Point-Slope Form and Writing Linear Equations ALGEBRA 1 LESSON 6-4 Is the relationship shown by the data linear? If so, model the data with an equation. Step 1 Find the rate of change for consecutive ordered pairs. –1( –3( –2( x y 3 2 –1 –3 6 4 –2 –6 ) –2 –2 =2 –1 ) –6 ) –4 –6 =2 –3 –2 =2 –1 The relationship is linear. The rate of change is 2. 8-5 Point-Slope Form and Writing Linear Equations ALGEBRA 1 LESSON 6-4 (continued) Step 2 Use the slope 2 and a point (2,4) to write an equation. y – y1 = m(x – x1) Use the point-slope form. y – 4 = 2(x – 2) Substitute (2, 4) for (x1, y1) and 2 for m. 8-5 Point-Slope Form and Writing Linear Equations ALGEBRA 1 LESSON 6-4 Is the relationship shown by the data linear? If so, model the data with an equation. Step 1 Find the rate of change for consecutive ordered pairs. 1( 2( 1( x –2 –1 1 2 y –2 –1 0 1 )1 1 1 =1 )1 )1 –1 2 =/ 1 –1 1 =1 – The relationship is not linear. 8-5 Point-Slope Form and Writing 1. Graph the equation y + 1 = –(x – Equations 3). Linear ALGEBRA 1 LESSON 6-4 2. Write an equation of the line with slope – 2 that passes through 3 the point (0, 4). y – 4 = – 2 (x – 0), or y = – 2 x + 4 3 3 3. Write an equation for the line that passes through (3, –5) and (–2, 1) in Point-Slope form and Slope-Intercept form. y + 5 = – 6 (x – 3); y = – 6 x – 7 5 5 5 4. Is the relationship shown by the data linear? If so, model that data with an equation. 2 yes; y + 3 = 5 (x – 0) 8-5 x –10 0 5 20 y –7 –3 –1 5
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