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Question

If 2^i+3^j+4^k and ^i^j+^k are two adjacent sides of a parallelogram, then the area of the parallelogram will be

A
87
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B
70
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C
Cannot be calculated from the given data
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D
none of the above
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Solution

The correct option is B 70
We know that when two adjacent sides of a parallelogram are given, the area of the parallelogram is given by the magnitude of the cross product of these two vectors. Here two given sides are 2^i+3^j+4^k and ^i^j+^k
So their cross product will be given by the following determinant
∣ ∣ ∣^i^j^k234111∣ ∣ ∣
= ^i((3×1)(4×1)^j(2×1)(4×1)+^k(2×1)(3×1))
=7^i+2^j5^k
Now the modulus of this cross product i.e. 7^i+2^j5^k, will give you the area of the parallelogram.
|7^i+2^j5^k|=(7)2+(2)2+(5)2
=49+4+25
=78
Which is nothing but the area of the given parallelogram


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