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Consider A = (-9,4) and B (11,17). = Point P₂ partitions the segment from B to A in a 3:5 ratio. Find the coordinates of point P2.

User Little Boy
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1 Answer

12 votes
12 votes

An easy way to do this is to parameterize the directed line segment from B to A by the function


\ell_(B\to A)(t) = (1-t) B + t A = (1 - t) (11, 17) + t (-9, 4)

with 0 ≤ t ≤ 1.

The point P₂ splits up AB so that BP₂ = 3/8 AB and AP₂ = 5/8 AB. Then we reach the point P₂ when t = 3/8, so its coordinates are


P_2 = \ell_(B\to A)}\left(\frac38\right) = \frac58 (11,17) + \frac38 (-9,4) = \boxed{\left(\frac72, \frac{97}8\right)}

User Aaron Sarnat
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