Question:
If \(\vec a, \vec b, \vec c, \vec d\) are the position vectors of the points \(A,B,C,D\) respectively such that
\[
3\vec a - \vec b + 2\vec c - 4\vec d = \vec 0,
\]
then the position vector of the point of intersection of the line segments \(AC\) and \(BD\) is
If \(\vec a, \vec b, \vec c, \vec d\) are the position vectors of the points \(A,B,C,D\) respectively such that
\[
3\vec a - \vec b + 2\vec c - 4\vec d = \vec 0,
\]
then the position vector of the point of intersection of the line segments \(AC\) and \(BD\) is
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Vector equations of the form \(m\vec a + n\vec c = p\vec b + q\vec d\) often indicate intersection points.
Updated On: Feb 2, 2026
- \( \dfrac{\vec b + 3\vec d}{4} \)
- \( \dfrac{3\vec a + \vec c}{4} \)
- \( \dfrac{\vec a + \vec c}{2} \)
- \( \dfrac{\vec b + 4\vec d}{5} \)
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The Correct Option is D
Solution and Explanation
Step 1: Use the given vector relation.
\[ 3\vec a + 2\vec c = \vec b + 4\vec d \]
Step 2: Interpret the equation.
This equation represents a point dividing both segments \(AC\) and \(BD\) internally in the same ratio.
Step 3: Find the position vector of the intersection point.
\[ \vec r = \frac{\vec b + 4\vec d}{5} \]
\[ 3\vec a + 2\vec c = \vec b + 4\vec d \]
Step 2: Interpret the equation.
This equation represents a point dividing both segments \(AC\) and \(BD\) internally in the same ratio.
Step 3: Find the position vector of the intersection point.
\[ \vec r = \frac{\vec b + 4\vec d}{5} \]
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