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Question
The value of n∑r=0(−1)rnCrr+2Cr is equal to
The value of n∑r=0(−1)rnCrr+2Cr is equal to
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Solution
The correct option is C 2n+2
n∑r=0(−1)rnCrr+2Cr=n∑r=0(−1)rn!(n−r)! r!⋅r!⋅2!(r+2)!
=2n∑r=0(−1)rn!(n−r)! (r+2)!
=2(n+1)(n+2)n∑r=0(−1)r(n+2)![(n+2)−(r+2)]!(r+2)!
=2(n+1)(n+2)n∑r=0(−1)r n+2Cr+2
=2(n+1)(n+2)(n+2C2−n+2C3+n+2C4−⋯+(−1)n n+2Cn+2)
Add and subtract n+2C0− n+2C1, we get
n∑r=0(−1)rnCrr+2Cr
=2(n+1)(n+2)[(n+2C0−n+2C1+n+2C2−⋯+(−1)n n+2Cn+2)−(n+2C0−n+2C1)]
=2(n+1)(n+2)[0−(1−(n+2))]
=2n+2
n∑r=0(−1)rnCrr+2Cr=n∑r=0(−1)rn!(n−r)! r!⋅r!⋅2!(r+2)!
=2n∑r=0(−1)rn!(n−r)! (r+2)!
=2(n+1)(n+2)n∑r=0(−1)r(n+2)![(n+2)−(r+2)]!(r+2)!
=2(n+1)(n+2)n∑r=0(−1)r n+2Cr+2
=2(n+1)(n+2)(n+2C2−n+2C3+n+2C4−⋯+(−1)n n+2Cn+2)
Add and subtract n+2C0− n+2C1, we get
n∑r=0(−1)rnCrr+2Cr
=2(n+1)(n+2)[(n+2C0−n+2C1+n+2C2−⋯+(−1)n n+2Cn+2)−(n+2C0−n+2C1)]
=2(n+1)(n+2)[0−(1−(n+2))]
=2n+2
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