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Question
Evaluate ∫10(tx+1−x)ndx, where n is a positive integer and t is a parameter independent of x. Hence ∫10xk(1−x)n−kdx=P[nCk(n+1)]fork=0,1,......n, then P=
Evaluate ∫10(tx+1−x)ndx, where n is a positive integer and t is a parameter independent of x. Hence ∫10xk(1−x)n−kdx=P[nCk(n+1)]fork=0,1,......n, then P=
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Solution
The correct option is A 1
Let I=∫10(tx+1−x)ndx=∫10{(t−1)x+1}ndx=[(t−1)x+1n+1(n+1)(t−1)]10
=1n+1(tn+1−1t−1)=1n+1(1+t+t2+...tn) ...(1)
Again ∫10(tx+1−x)ndx=∫10[(1−x)+tx]ndx=∫10[nC0(1−x)n+nC1(1−x)n−1(tx)+nC2(1−x)n−2(tx)2+...+nCn(tx)n]dx
=∫10n∑r=1nCr(1−x)n−r(tx)rdx=n∑r=1nCr[∫10(1−x)n−rxrdx]tr ...(2)
From (1) and (2)
n∑r=1nCr[∫10(1−x)n−r.xrdx]tr=1n+1(1+t+...tn)
On equating coefficient of tk on both sides , we get
nCk[∫10(1−x)n−r,xrdx]⇒∫10(1−x)n−kxhdx=1(n+1)nCk
Let I=∫10(tx+1−x)ndx=∫10{(t−1)x+1}ndx=[(t−1)x+1n+1(n+1)(t−1)]10
=1n+1(tn+1−1t−1)=1n+1(1+t+t2+...tn) ...(1)
Again ∫10(tx+1−x)ndx=∫10[(1−x)+tx]ndx
=∫10[nC0(1−x)n+nC1(1−x)n−1(tx)+nC2(1−x)n−2(tx)2+...+nCn(tx)n]dx
=∫10n∑r=1nCr(1−x)n−r(tx)rdx=n∑r=1nCr[∫10(1−x)n−rxrdx]tr ...(2)
From (1) and (2)
n∑r=1nCr[∫10(1−x)n−r.xrdx]tr=1n+1(1+t+...tn)
On equating coefficient of tk on both sides , we get
nCk[∫10(1−x)n−r,xrdx]⇒∫10(1−x)n−kxhdx=1(n+1)nCk
=∫10n∑r=1nCr(1−x)n−r(tx)rdx=n∑r=1nCr[∫10(1−x)n−rxrdx]tr ...(2)
From (1) and (2)
n∑r=1nCr[∫10(1−x)n−r.xrdx]tr=1n+1(1+t+...tn)
On equating coefficient of tk on both sides , we get
nCk[∫10(1−x)n−r,xrdx]⇒∫10(1−x)n−kxhdx=1(n+1)nCk
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