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Question
prove that
∑nr=0⋅(−2)r⋅nCrr+2Cr=[1/(n+1),neven1/(n+2),nodd
∑nr=0⋅(−2)r⋅nCrr+2Cr=[1/(n+1),neven1/(n+2),nodd
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Solution
As in last part (A) we have
nCrr+2Cr=2(n+2)(n+1)n+2Cr+2
∑=2(n+2)(n+1)[∑(−2)r⋅n+2Cr+2]
Now put r + 2 = s ∴ r = s - 2
∴(−2)r=(−2)s(−2)−2=14(−2)s
∑=12(n+2)(n+1)[∑n+2s=0(−2)sn+2Cs−[(−2)0n+2C0+(−2)1n+2C1]]
=12(n+2)(n+1)[(1−2)n+2−1+2(n+2)]
=12(n+2)(n+1)[(−1)n+2+2n+3]
Now if n is even then Nr = 2n + 4 = 2(n + 2)
When n is odd then Nr = 2n + 2 = 2(n + 1)etc.
nCrr+2Cr=2(n+2)(n+1)n+2Cr+2
∑=2(n+2)(n+1)[∑(−2)r⋅n+2Cr+2]
Now put r + 2 = s ∴ r = s - 2
∴(−2)r=(−2)s(−2)−2=14(−2)s
∑=12(n+2)(n+1)[∑n+2s=0(−2)sn+2Cs−[(−2)0n+2C0+(−2)1n+2C1]]
=12(n+2)(n+1)[(1−2)n+2−1+2(n+2)]
=12(n+2)(n+1)[(−1)n+2+2n+3]
Now if n is even then Nr = 2n + 4 = 2(n + 2)
When n is odd then Nr = 2n + 2 = 2(n + 1)etc.
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