(d) Let k be an integer such that k> a, k>0. For n > 2k, - - (1 + p)* > (') p* = ”(n − 1) ··· (n − k + 1)₂ pk > k! Hence n*p* 2kk!
(d) Let k be an integer such that k> a, k>0. For n > 2k, - - (1 + p)* > (') p* = ”(n − 1) ··· (n − k + 1)₂ pk > k! Hence n*p* 2kk!
Chapter8: Sequences, Series,and Probability
Section8.4: Mathematical Induction
Problem 4ECP
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detailed explanation is needed. why this inequality holds?
Transcribed Image Text:(d) Let k be an integer such that k > a, k>0. For n > 2k,
n* p*
(1 + p)">) p*=
n(n-1)(n-k+1)
k!
2kk!
Hence
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