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Question

If the ratio of sum of n terms of 2 different A.P. is 2n15n+10, then the ratio of their 15th term is

A
15557
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B
15057
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C
57155
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D
57150
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Solution

The correct option is C 57155
Given : SnSn=2n15n+10
n2[2a+(n1)d]n2[2a+(n1)d]=2n15n+10
a+(n1)2da+(n1)2d=2n15n+10 ...(1)

We know that
TnTn=a+(n1)da+(n1)d
So, replace n2n1, in (1) we get
TnTn=2(2n1)15(2n1)+10TnTn=4n310n+5

Putting n=15, we get
T15T15=57155


Alternate solution :
Given : SnSn=2n15n+10
SnSn=2n2n5n2+10n
So,
Sn=(2n2n)k, Sn=(5n2+10n)kTnTn=SnSn1SnSn1TnTn=[2{n2(n1)2}{n(n1)}]k[5{n2(n1)2}+10{n(n1)}]kTnTn=2(2n1)15(2n1)+10TnTn=4n310n+5

Putting n=15, we get
T15T15=57155

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