What is the slope of the line passing through the following points: (-3, -1) ; (2,3)(3,1);(2,3)?

1 Answer
radee
Feb 29, 2016

m = 4/5m=45

Explanation:

The slope of a line is generally its "rise over run". In this case, it is the number of units the line goes up or down over the distance it travels along the xx-axis.

In this example, given the two points we would be able to compute for the slope of the line by assigning one point as P_1P1 and the other as P_2P2. Now we subtract the yy-component of P_1P1 from P_2P2 then divide it by the difference of the xx-components of P_2P2 and P_1P1. So this is the equation for finding the slope from two points:

m = (y_2 - y_1)/(x_2 - x_1)m=y2y1x2x1

Where m is the slope and y_2y2 and y_1y1 as the yy-components and x_2x2 and x_1x1 as the xx-components that I mentioned earlier.

Computing for the value of the slope...

[Solution]
let:
P_1: (-3, -1)P1:(3,1)
P_2: (2,3)P2:(2,3)

m = (y_2 - y_1)/(x_2 - x_1)m=y2y1x2x1

m = (3 - (-1))/(2 - (-3))m=3(1)2(3)
m = (3+1)/(2+3)m=3+12+3
m = 4/5m=45

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