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11 votes
Find the equation of a line that contains the points (3,4) and (-6,5). Write the answer in slope intercept form

User Dvtoever
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1 Answer

23 votes
23 votes

Solution:

Given:


(3,4)\text{ and }(-6,5)

Using the formula;


(y-y_1)/(x-x_1)=(y_2-y_1)/(x_2-x_1)

where;


\begin{gathered} x_1=3,y_1=4 \\ x_2=-6,y_2=5 \end{gathered}

Hence,


\begin{gathered} (y-y_1)/(x-x_1)=(y_2-y_1)/(x_2-x_1) \\ (y-4)/(x-3)=(5-4)/(-6-3) \\ (y-4)/(x-3)=(1)/(-9) \\ Cross\text{ multiplying;} \\ y-4=-(1)/(9)(x-3) \\ y-4=-(1)/(9)x+(1)/(3) \\ y=-(1)/(9)x+(1)/(3)+4 \\ y=-(1)/(9)x+4(1)/(3) \\ y=-(1)/(9)x+(13)/(3) \end{gathered}

Therefore, the equation of the line in slope-intercept form is;


y=-(1)/(9)x+(13)/(3)

User Shawn
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