Let Sn=∑nl=1(l4+l3n+l2n2+2n4n5)andTn=∑n−1l=0(l4+l3n+l2n2+2n4n5),(n=1,2,3,...)then
A
Tn>16760
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B
Tn<16760
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C
Sn>16760
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D
Sn<16760
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Solution
The correct options are BTn<16760 CSn>16760 Replace ln→xand1n→dx, The functoin we get is f(x)=x4+x3+x2+2 f(x) is increasing in (0,1) Sn=∑nl=1l4n4.1n+l3n3.1n+l2n2.1n+2n
(Snis the sum of all the rectangles >∫10(x4+x3+x2+2)dx(∵Sn>area under curve)=16760 ⇒Sn>16760
Tn=∑n−1l=0(l4+l3n+l2n2+2n4n5)(∵Tn<area under curve) ⇒Tn<∫10f(x)dx ⇒Tn<16760