Answer:
[tex] y = 8x + 16 [/tex]
[tex] x = 12 [/tex]
Step-by-step explanation:
Given two points on the line (0, 16) and (3, 40), an equation for the line can be written using the slope-intercept line equation which takes the format [tex] y = mx + b [/tex].
Where,
[tex] m = slope = \frac{y_2 - y_1}{x_2 - x_1} [/tex]
b = y-intercept or the point at which the line cuts the y-axis.
Let's find slope (m) using the slope formula:
Let,
[tex] (0, 16) = (x_1, y_1) [/tex]
[tex] (3, 40) = (x_2, y_2) [/tex]
[tex] slope (m) = \frac{40 - 16}{3 - 0} [/tex]
[tex] slope (m) = \frac{24}{3} [/tex]
[tex] slope (m) = 8 [/tex]
Find b. Substitute the values of x = 0, y = 16, and m = 8 in the slope-intercept formula to find b.
[tex] y = mx + b [/tex]
[tex] 16 = 8(0) + b [/tex]
[tex] 16 = 0 + b [/tex]
[tex] 16 = b [/tex]
[tex] b = 16 [/tex]
Plug in the values of m and b into the slope-intercept formula to get the equation of the line.
[tex] y = mx + b [/tex]
[tex] y = 8x + 16 [/tex]
Let's use the equation to find x when y = 112.
[tex] y = 8x + 16 [/tex]
Substitute y = 112 in the equation
[tex] 112 = 8x + 16 [/tex]
[tex] 112 - 16 = 8x [/tex]
[tex] 96 = 8x [/tex]
Divide both sides by 8
[tex] 12 = x [/tex]
[tex] x = 12 [/tex]
