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Question

The number of all the possible triplets a1,a2,a3 such that a1+a2cos(2x)+a3sin2(x)=0 for all xR is

A
0
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B
1
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C
3
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D
infinite
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Solution

The correct option is D infinite
a1+a2cos(2x)+a3sin2(x)=0a1+a2cos(2x)+a3(1cos2x2)=0(a1+a32)+(a2a32)cos2x=0

The above equation is valid for all xR, so
a1+a32=0 and a2a32=0a3=2a1, a2=a1

Hence, infinite number of triplets of (a1,a1,2a1) is possible.



Alternate Solution:
Since the given equation is possible for all xR, so
Putting x=0, we get
a1+a2=0(1)
Putting x=π4, we get
a1+a32=0(2)
From (1) and (2), we get
a2=a1, a3=2a1

Hence, infinite triplets are possible.

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