1 Answer

CeePlusPlus · Answer 1 · 2021-11-08T21:02:50+0000

Answer:

The position of point B is:

$(x_(3), y_(3)) = \left((2)/(3)\cdot x_(2) + (1)/(3) \cdot x_(1), (2)/(3)\cdot y_(2) + (1)/(3) \cdot y_(1) \right)$

Explanation:

Let be
A = (x_(1), y_(1)) ,
B = (x_(3), y_(3)) and
C = (x_(2), y_(2)) . The ratio is:

((x_(3)-x_(1),y_(3)-y_(1)))/((x_(2)-x_(3),y_(2)-y_(3))) = 2

After some algebraic handling:

$(x_(3)-x_(1), y_(3)-y_(1)) = 2 \cdot (x_(2)-x_(3),y_(2)-y_(3))$

$(x_(3)-x_(1), y_(3)-y_(1)) = (2\cdot x_(2) - 2\cdot x_(3), 2\cdot y_(2) - 2\cdot y_(3))$

$(3\cdot x_(3), 3\cdot y_(3)) = (2\cdot x_(2) + x_(1), 2\cdot y_(2) + y_(1))$

$3\cdot (x_(3), y_(3)) = (2\cdot x_(2) + x_(1), 2\cdot y_(2) + y_(1))$

$(x_(3),y_(3)) = (1)/(3)\cdot (2\cdot x_(2)+x_(1), 2\cdot y_(2)+y_(1))$

The position of point B is:

$(x_(3), y_(3)) = \left((2)/(3)\cdot x_(2) + (1)/(3) \cdot x_(1), (2)/(3)\cdot y_(2) + (1)/(3) \cdot y_(1) \right)$

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