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Write an equation that is perpendicular to 2x -5y =5 and passes through the point (2,-9).

Write an equation that is perpendicular to 2x -5y =5 and passes through the point-example-1
User Donal M
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1 Answer

22 votes
22 votes

Consider that the equation of a line with slope 'm' and y-intercept 'c' is given by,


y=mx+c

Convert the given equation,


\begin{gathered} 2x-5y=5 \\ 5y=2x-5 \\ y=(2)/(5)x-1 \end{gathered}

So the slope of the given equation is,


m=(2)/(5)

Let the equation of the perpendicular line be,


y=m^(\prime)x+c^(\prime)

For the lines to be parallel, the product of slopes must be -1.


\begin{gathered} m^(\prime)* m=-1 \\ m^(\prime)*(2)/(5)=-1 \\ m^(\prime)=(-5)/(2) \end{gathered}

So the equation becomes,


y=(-5)/(2)x+c^(\prime)

Given that the perpendicular passes through the point (2,-9),


\begin{gathered} -9=(-5)/(2)(2)+c^(\prime) \\ -9=-5+c^(\prime) \\ c^(\prime)=-4 \end{gathered}

Substitute the value in the equation,


\begin{gathered} y=(-5)/(2)x-4 \\ 2y=-5x-8 \\ 5x+2y+8=0 \end{gathered}

Thus, the equation of the perpendicular line is 5x + 2y + 8 = 0 .

User Techmad
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