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Question

Vector equation of the plane r=^i^j+λ(^i+^j+^k)+μ(^i2^j+3^k) in the scalar product from is

A
r.(5^i2^j+3^k)=7
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B
r.(5^i+2^j3^k)=7
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C
r.(5^i2^j3^k)=7
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D
r.(5^i+2^j+3^k)=7
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Solution

The correct option is D r.(5^i2^j3^k)=7
Given equation of plane,
r=^i^j+λ(^i+^j+^k)+μ(^i2^j+3^k)r(^i^j)=λ(^i+^j+^k)+μ(^i2^j+3^k)(i)
If two non-collinear vector are given by b1 and b2
The equation of the plane formed by them can be given by
r=λb1+μb2
Similarly,
r(^i^j)=λ(^i+^j+^k)+μ(^i2^j+3^k) is also a plane with ^i+^j+^k & ^i2^j+3^k as two directions in the plane.
direction of normal of plane will be (^i+^j+^k)×(^i2^j+3^k)
n=(^i+^j+^k).(^i2^j+3^k)=5^i2^j3^k
equation of plane,
r.n=pr.(5^i2^j3^k)=p
In (i) when μ=λ=0,r=^i^j is a point on plane .
p=(^i^j).(5^i2^j3^k)p=7r.(5^i2^j3^k)=7

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