Find the ratio in which the plane 2x + 3y + 5 | vedclass

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Question

(A) Let the required ratio be $k : 1$.The coordinates of the point dividing the line segment joining $(1, 0, -3)$ and $(1, -5, 7)$ in the ratio $k : 1

Vedclass · Accepted Answer

$2 : 3$

Vedclass · Answer

(A) Let the required ratio be $k : 1$.The coordinates of the point dividing the line segment joining $(1, 0, -3)$ and $(1, -5, 7)$ in the ratio $k : 1$ are given by the section formula:$\left( \frac{k(1) + 1(1)}{k+1}, \frac{k(-5) + 1(0)}{k+1}, \frac{k(7) + 1(-3)}{k+1} \right) = \left( \frac{k+1}{k+1}, \frac{-5k}{k+1}, \frac{7k-3}{k+1} \right) = \left( 1, \frac{-5k}{k+1}, \frac{7k-3}{k+1} \right)$.Since this point lies on the plane $2x + 3y + 5z = 1$,we substitute these coordinates into the equation:$2(1) + 3\left( \frac{-5k}{k+1} \right) + 5\left( \frac{7k-3}{k+1} \right) = 1$.Multiplying by $(k+1)$ to clear the denominator:$2(k+1) - 15k + 5(7k-3) = 1(k+1)$.Expanding the terms:$2k + 2 - 15k + 35k - 15 = k + 1$.Combining like terms:$22k - 13 = k + 1$.Solving for $k$:$22k - k = 1 + 13$.$21k = 14$.$k = \frac{14}{21} = \frac{2}{3}$.Thus,the required ratio is $k : 1 = 2 : 3$.

Find the ratio in which the plane $2x + 3y + 5z = 1$ divides the line segment joining the points $(1, 0, -3)$ and $(1, -5, 7)$.

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