Equation of Locus from Point and a Line (1 Viewer)

Redyapper

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Hi,

The question I'm stuck on is:
Find the equation of the locus of a point so it is equidistant from P(2, -3) and the line y=7. If it was between 2 points, I could've done:
distance formula of Point A = distance formula of Point B and solved it from there, but I'm not sure what to do when I have a line?

Thanks.
 

gr_111

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you basically had it there, except use perpendicular distance formula = distance from point formula
 

Redyapper

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you basically had it there, except use perpendicular distance formula = distance from point formula
Ohh right; but what would I put into the perpendicular distance formula?
 

nightweaver066

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Consider a point (x, y)

If you look at a graph and consider if the point is above the line y = 7 (at A), you notice the distance from the point to the line is (y - 7).

If the point is below the line y = 7 (at B), the distance from the point to the line is (7 - y)

So we can say the distance is |y - 7| (distance cannot be negative).



Now we just apply the distance formula with (x, y) and P(2, -3),



Square both sides, and away you go.
 

Redyapper

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Consider a point (x, y)

If you look at a graph and consider if the point is above the line y = 7 (at A), you notice the distance from the point to the line is (y - 7).

If the point is below the line y = 7 (at B), the distance from the point to the line is (7 - y)

So we can say the distance is |y - 7| (distance cannot be negative).



Now we just apply the distance formula with (x, y) and P(2, -3),



Square both sides, and away you go.
Thanks a million!
 

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