The maximum value of the term independent of t in the expansion of (tx1/5+(1−x)1/10t)10 where x∈(0,1) is :
A
10!√3(5!)2
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B
2×10!3(5!)2
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C
10!3(5!)2
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D
2×10!3√3(5!)2
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Solution
The correct option is D2×10!3√3(5!)2 Tr+1=10Cr(tx1/5)10−r×[(1−x)1/10t]r =10Cr⋅t(10−2r)×x(10−r)/5×(1−x)r/10 For a term to be independent of t, 10−2r=0 ⇒r=5