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What is an equation of the line that passes through the points (-4,-6) and (4,4)

User Bsquare
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1 Answer

11 votes
11 votes

Equation of a line

The slope-intercept form of the line can be written as follows:


y=mx+b

Where m is the slope and b is the y-intercept

We have two points through which the line passes. If we substitute them into the equation, we can find the values of m and b.

Using the point (-4,-6):


\begin{gathered} -6=m(-4)+b \\ \text{Operate:} \\ -6=-4m+b \end{gathered}

Using the point (4,4):


\begin{gathered} 4=m(4)+b \\ \text{Operate:} \\ 4=4m+b \end{gathered}

Subtract the second equation from the first equation:


\begin{gathered} -6-4=-4m-4m+b-b \\ \text{Simplify:} \\ -10=-8m \end{gathered}

Solve for m:


m=-(10)/(-8)=(5)/(4)

Substituting into the second equation:


\begin{gathered} 4=4\cdot(5)/(4)+b \\ \text{Operate:} \\ 4=5+b \\ \text{Solve:} \\ b=-1 \end{gathered}

Finally, the equation of the required line is:


y=(5)/(4)x-1

User Osman
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