(D) Let $B$ divide the line segment $\overline{AC}$ in the ratio $k: 1$. Using the section formula,the coordinates of $B$ are given by: $B = \left( \f

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(D) Let $B$ divide the line segment $\overline{AC}$ in the ratio $k: 1$. Using the section formula,the coordinates of $B$ are given by: $B = \left( \frac{k(9) + 1(3)}{k+1}, \frac{k(8) + 1(2)}{k+1}, \frac{k(10) + 1(4)}{k+1} \right)$ Equating the $x$-coordinate: $\frac{9k + 3}{k+1} = \frac{33}{5}$ $5(9k + 3) = 33(k + 1)$ $45k + 15 = 33k + 33$ $12k = 18$ $k = \frac{18}{12} = \frac{3}{2}$ Thus,the ratio $k: 1$ is $\frac{3}{2}: 1$,which is $3: 2$.

Class 11 Mathematics Introduction to Three Dimensional Geometry Section Formula

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Points $A(3, 2, 4)$,$B\left(\frac{33}{5}, \frac{28}{5}, \frac{38}{5}\right)$ and $C(9, 8, 10)$ are given. The ratio in which $B$ divides $\overline{AC}$ is

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A
$5: 3$
B
$2: 1$
C
$1: 3$
D
$3: 2$

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Introduction to Three Dimensional Geometry

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Section Formula

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The harmonic conjugate of $P(-9, 12, -15)$ with respect to the line segment $AB$,where $A=(1, -2, 3)$ and $B=(-4, 5, -6)$ is

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Points $A(3, 2, 4)$,$B\left(\frac{33}{5}, \frac{28}{5}, \frac{38}{5}\right)$ and $C(9, 8, 10)$ are given. The ratio in which $B$ divides $\overline{AC}$ is

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Using the section formula,show that the points $A(2, -3, 4)$,$B(-1, 2, 1)$,and $C(0, \frac{1}{3}, 2)$ are collinear.

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