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Find the equation of the line through the points (−2,5) and (4,9).

Enter your answer in standard form Ax+By=C, where A is a positive integer, and B and C are integers.

User Slonopotam
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1 Answer

3 votes

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Answer:

2x -3y = -19

Explanation:

Taking the differences between the given points, we have ...

(Δx, Δy) = (4, 9) -(-2, 5) = (6, 4)

The equation of the line can be written ...

Δy·x -Δx·y = Δy·(x1) -Δx·(y1) . . . . . for point (x1, y1) on the line

4x -6y = 4(-2) -6(5) = -38

Dividing by 2 gives the standard form equation ...

2x -3y = -19

_____

Additional comment

The original equation 4x-6y=-38 satisfies the requirements of this problem. However, "standard form" requires the numbers in the equation be mutually prime (in addition to the problem requirements). That is, they must have no common factors. Hence, we must remove the common factor of 2 in order to have true "standard form."

Find the equation of the line through the points (−2,5) and (4,9). Enter your answer-example-1
User BCliks
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