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Find the equation of the line through the points (-4, -15) and (5,12)y=_____

User Henrik Poulsen
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1 Answer

19 votes
19 votes

The equation of a line in the slope-intercept form is y = mx + b.

Given the points (-4, -15) and (5, 12), follow the steps below to find the equation of the line.

Step 01: Substitute the first point in the equation.

Given the point (-4, -15)

Then, when x = -4, y = -15


\begin{gathered} y=mx+b \\ -15=m*(-4)+b \\ -15=-4m+b \end{gathered}

Add 4m to both sides to solve for b:


\begin{gathered} -15+4m=-4m+4m+b \\ b=-15+4m \end{gathered}

Step 02: Substitute b in the equation.


\begin{gathered} y=mx+(-15+4m) \\ y=mx-15+4m \end{gathered}

Step 03: Substitute the second point in the equation.

Given the point (5, 12).

Then, when x = 5, y = 12

Substituting it in the equation:


\begin{gathered} y=mx-15+4m \\ 12=m*5-15+4m \\ 12=5m-15+4m \\ 12=9m-15 \end{gathered}

Adding 15 to both sides and then dividing the sides by 9:


\begin{gathered} 12+15=9m-15+15 \\ 27=9m \\ (27)/(9)=(9)/(9)m \\ 3=m \\ m=3 \end{gathered}

Step 04: Find b and substitute b and m in the equation.


\begin{gathered} b=-15+4m \\ b=-15+4*3 \\ b=-15+12 \\ b=-3 \end{gathered}

The equation of the line is:


y=3x-3

Answer:


y=3x-3

User Dhamo
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2.5k points