1 Answer

Muhammed Yasir MT · Answer 1 · 2020-09-21T01:31:57+0000

The equation of the line passes through (2, -1) and (4, 5) is -3x + y = - 7 So, option 2 is correct.

Solution:

Given, two points are (2, -1) and (4, 5)

We have to find that a line that passes through the given two points.

First let us find the slope of the line that passes through given two points.

So, slope of line "m" is given as:

$\mathrm{m}=(y_(2)-y_(1))/(x_(2)-x_(1))$

$\text { where, }\left(x_(1), y_(1)\right) \text { and }\left(x_(2), y_(2)\right) \text { are two points on line. }$

So slope of our line =
(5-(-1))/(4-2)=(5+1)/(2)=3

Now, let us find the line equation using point slope form:

$y-y_(1)=m\left(x-x_(1)\right) \text { where } m \text { is slope and }\left(x_(1), y_(1)\right) \text { is point on the line. }$

Then equation of line is,

y – 5 = 3(x – 4)

y – 5 = 3x – 12

-3x + y = 5 – 12

-3x + y = -7

Hence, the line equation is -3x + y = - 7 so, option 2 is correct.

Please log in or register to add a comment.