62. Find the position vector of a point R which divides the line joining the two points P and Q whose position vectors are (2a→+b→) and (a→−3b→) externally in the ratio 1 : 2. Also, show that P is the middle point of line segment RQ.

Given, P(2a→+b→)i.e,OP=2a→+b→Q(a→−3b→)i.e,OQ=a→−3b→ It is given that point R divides a line segment joining two points P and Q. externally in the ratio 1:2 Then, OR→=2(2a→+b→)−(a→−3b→)2−1=4a→+2b→−a→+3b→1OR→=3a→+5b→ ∴ Position vector of the mid-point of RQ. =OQ→+OR→2=(a→−3b→)+(3a→+5b→)2=a→−3b→+3a→+5b→2=4a→−2b→2=2a→−b→=OR→ Hence proved

62. Find the position vector of a point R which divides the line joining the two points P and Q whose position vectors are $(2 \vec{a} + \vec{b})$ and $(\vec{a} - 3 \vec{b})$ externally in the ratio 1 : 2. Also, show that P is the middle point of line segment RQ.

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Vishal Baghel | Contributor-Level 10

10 months ago

Given,

$\begin{array}{l} P (2 \vec{a} + \vec{b}) i . e, O P = 2 \vec{a} + \vec{b} \\ Q (\vec{a} - 3 \vec{b}) i . e, O Q = \vec{a} - 3 \vec{b} \end{array}$

It is given that point R divides a line segment joining two points P and Q.

externally in the ratio 1:2 Then,

$\begin{array}{l} \vec{O R} = \frac{2 (2 \vec{a} + \vec{b}) - (\vec{a} - 3 \vec{b})}{2 - 1} \\ = \frac{4 \vec{a} + \vec{2 b} - \vec{a} + 3 \vec{b}}{1} \\ \vec{O R} = 3 \vec{a} + 5 \vec{b} \end{array}$

$∴$ Position vector of the mid-point of RQ.

$\begin{array}{l} = \frac{\vec{O Q} + \vec{O R}}{2} \\ = \frac{(\vec{a} - 3 \vec{b}) + (3 \vec{a} + 5 \vec{b})}{2} \\ = \frac{\vec{a} - 3 \vec{b} + 3 \vec{a} + 5 \vec{b}}{2} \\ = \frac{4 \vec{a} - 2 \vec{b}}{2} = 2 \vec{a} - \vec{b} = \vec{O R} H e n c e p r o v e d \end{array}$