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Question

In ΔABC,AB=^i+3^j2^k, AC=3^i^j2^k.
If the bisector of BAC meets BC at D and G is the centroid of ΔABC, then |GD|=

A
1
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B
13
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C
23
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D
2
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Solution

The correct option is A 1
|AB|=|AC|=14
ΔABC is isosceles.
So, the bisector of BAC coincide with the median through A.
AD=12(AB+AC)=2^i+^j2^k
|AD|=3
Since, centroid divides the median in the ratio 2:1, we have
3|GD|=|AD||GD|=1

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