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Question

In the expansion xcosθ+1xsinθ16if l1 is the least value of the term independent of x when π8θπ4 and l2 is the least value of the term independent of x when π16θπ8, then the ratio l2:l1 is equal to :


A

16:1

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B

8:1

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C

1:8

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D

1:16

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Solution

The correct option is A

16:1


Determine the ratio l2:l1

Step 1: Calculating I1 and I2

We know rth term in the expansion of (a+b)n is Tr+1=nCran-rbr then,

Tr+1=16Crxcosθ16r1xsinθr.....(i)

For the independent term of x, put 16-2r=0

r=8

T8+1=16C81sinθcosθ8=16C8281sin2θ8;[sin2θ=2sinθcosθ]

l1=16C828in π8θπ4;sin2θ=1isleastinπ8θπ4

l2=16C828128;sin2θ=12inπ16θπ8=16C8212

Step 3: Calculating the ratio

l2l1=16C821216C828=161
Hence, option A is the correct answer.


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