What is the equation of the line between (-1,12) and (7,-7)?

1 Answer
Diane Martraire
Feb 27, 2016

The equation of the line that passes through the points A(-1,12) and B(7,-7) is :
y = - 19/8 x + 77/8

Explanation:

The standard form of the equation of a line is y = m x + p with m the slope of the line.

STEP 1 : Let's find the slope of the line.
m = (y_B - y_A)/(x_B - x_A) = (-7-12)/(7+1) = - 19/8
N.B : The fact that the slope is negative indicates the line decreases.

STEP 2 : Let's find p (coordinate at origin).
Use the point-slope formula with one of our points, e.g. A(-1,12) and m = - 19/8.

12 = - 19/8 * -1 + p
p = 77/8

**Cross-check: ** Check the equation with the second point.
Use B(7,-7) in the equation :
y = - 19/8 * 7 + 77/8 = - 96/8 + 77/8 = -56/8 = -7
-> Perfect !

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