1 Answer

James Errico · Answer 1 · 2023-11-13T18:36:11+0000

Step-by-step explanation:

The slope-intercept form of a line with slope m and y-intercept b is given by the following equation:

$y\text{ = mx+b}$

Let us denote by L1 the parallel line to the line L that we want to find.

L1 is given by the following equation in slope-intercept form:

$y\text{ = 8x + 9}$

where the slope m = 8 and the y-intercept b = 9.

Now, to find the equation of L we can perform the following steps:

Step 1: Find the slope of L:

Slopes of parallel lines are equal, thus the slope of L1 is equal to the slope of L. Then, the slope m of L is:

$m\text{ = 8}$

Step 2: Write the provisional equation of the line L in the slope-intercept form:

According to the previous step we have:

$y\text{ = 8x+b}$

Step 3: Find the y-intercept b of L:

Take any point on the line L and replace its coordinates (x,y) in the previous equation, then solve for b.

According to the problem, the line L passes through the point (–2, 7), thus we can take the point (x,y)=(-2,7):

$7\text{= 8\lparen -2\rparen+b}$

this is equivalent to:

$7\text{ = -16 +b}$

solving for b, we obtain:

$b=\text{ 7 + 16 = 23}$

then

Step 4: Write the equation of the line L in the slope-intercept form:

According to the previous steps we have that:

m = 8

b = 23

then, we can conclude that the equation of the line L in the slope-intercept form is:

$y=8x\text{ +23}$

and we can conclude that the answer is:

Answer:

$y=8x\text{ +23}$

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