Identify an equation in point-slope form for the line parallel to y = 1/2 x-7 that passes through (-3,-2).

Question

asked Apr 10, 2020 163k views

2 Answers

Zlakad · Answer 1 · 2020-04-13T16:22:13+0000

The equation of the line that is parallel to the line
y=(1)/(2) x-7 and passes through the point (-3, -2) is
$\bold{y=(1)/(2)(x-1)}$

Solution:

Given that the line passes through point (-3, -2)

The line is parallel to
$y=(1)/(2) x-7 \rightarrow (1)$

First let us find the slope of line, the point slope form is given as,

$y-y_(1)=m\left(x-x_(1)\right) \rightarrow (2)$

where "m" is the slope of line

Comparing the (1) with (2) we get, m=\frac{1}{2}

The slopes of parallel lines are always equal. Hence the slope of line passing through (-3, -2) has the same slope as m=\frac{1}{2}

Now plug in m=\frac{1}{2} and in (2) to get the required equation of line,

$y-(-2)=(1)/(2)(x-(-3)) \rightarrow y-(-2)=(x)/(2)+(3)/(2) \rightarrow y=(x)/(2)+(3)/(2)-2$

y=(x)/(2)+(3)/(2)-(4)/(2)

$y=(x)/(2)-(1)/(2) \rightarrow y=(1)/(2)(x-1)$

Thus, the equation of line parallel to given line is
y=(1)/(2)(x-1)