2.4 Writing Linear Equations Using point-slope form
Slope-intercept form of a linear equations y = mx +b Remember m is slope and b is the y intercept If we are given points, then we will have to find the slope.
Write the equation in Slope- Intercept form The line has a slope of -3/5 and passes through (5, -2).
Write the equation in Slope- Intercept form The line has a slope of -3/5 and passes through (5, -2). So x = 5 and y = -2 also m = -3/ = -3/5(5) + bMust find b
Write the equation in Slope- Intercept form The line has a slope of -3/5 and passes through (5, -2). So x = 5 and y = -2 also m = -3/ = -3/5(5) + bMust find b - 2 = -3 + bAdd 3
Write the equation in Slope- Intercept form The line has a slope of -3/5 and passes through (5, -2). So x = 5 and y = -2 also m = -3/ = -3/5(5) + bMust find b - 2 = -3 + bAdd 3 1 = b
Write the equation in Slope- Intercept form The line has a slope of -3/5 and passes through (5, -2). So x = 5 and y = -2 also m = -3/5. 1 = b So the equation is written as y = -3/5 x + 1
Write the equation in Slope- Intercept form Given the points (2, - 3) and (- 3, 7). What do you need first?
Write the equation in Slope- Intercept form Given the points (2, - 3) and (- 3, 7). What do you need first? Slope: the formula is
Write the equation in Slope- Intercept form Given the points (2, - 3) and (- 3, 7). m = ( - 3) – (7)= -10 = -2 ( 2 ) – ( - 3) 5 Now we can use either point to find “b” Lets use ( -3, 7) 7 = - 2( - 3) + b 7 = 6 + b 1 = bWith m and by = - 2x + 1
Point slope form Here we do not have to solve for b Given a point and a slope, we can write an equation. Lets use the points from the last problem (2, - 3) and (- 3, 7). The slope of the line was -2.
Point slope form Given a point and a slope, we can write an equation. (2, - 3) and (- 3, 7) and slope of the line -2. Point-slope Formula y – y 1 = m(x – x 1 ) Filling in using a point and slope we have the equation y – 7 = -2(x – (-3)) or y – (- 3) = - 2(x – 2)
Point slope form Which one is right, lets solve for y in both y – 7 = -2(x – (-3)) or y – (- 3) = - 2(x – 2) y – 7 = -2x – 6 y + 3 = -2x + 4 y = - 2x + 1 y = - 2x + 1 Since the equations are the same it does not matter which point we use.
Using point-slope with parallel or perpendicular lines Write an equation parallel to the line y = 3x – 4 and passes through the point (2, - 4). The slope is 3; y – ( - 4) = 3(x – 2)
Using point-slope with parallel or perpendicular lines Write an equation parallel to the line y = 3x – 4 and passes through the point (2, - 4). The slope is 3; y – ( - 4) = 3(x – 2) y + 4 = 3x - 6
Using point-slope with parallel or perpendicular lines Write an equation parallel to the line y = 3x – 4 and passes through the point (2, - 4). The slope is 3; y – ( - 4) = 3(x – 2) y + 4 = 3x – 6 y = 3x - 10
Using linear equation in a word problem. As a part-time salesperson, Jean Stock is paid a daily salary plus commission. When her sales are $100, she makes $58. When her sales are $300, she makes $78. Write the linear equation to model this situation.
Using linear equation in a word problem. her sales are $100, she makes $58 (100,58). When her sales are $300, she makes $78 (300, 78). Find slope78 – 58= 20= – What is her daily Salary? (if she sales nothing)
Using linear equation in a word problem. What is her daily Salary? (if she sales nothing) What is her commission rate? If she sales $100, she makes $58 The slope of the line is 0.1 y – 58 = 0.1(x – 100) y – 58 = 0.1x - 10 y = 0.1x + 48
So she earns $48 for just being there. Commission rate is 0.1 or 10% What would she earn if she sold $500?
y = 0.1x + 48 So she earns $48 for just being there. Commission rate is 0.1 or 10% What would she earn if she sold $500? y =0.1(500) + 48 y = y = $98
Homework Page 78 – 80 #13 – 17 odd,21, – 37 odd, 49, 50
Homework Page 78 – 80 #14 – 18 even 24 – 38 odd,