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What is the Binomial Expansion of #(2k+x)^n#?

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Harish Chandra Rajpoot

Jul 11, 2018

Binomial expansion of #(2k+x)^n# is given as

#(2k+x)^n#

#=^nC_0(2k)^n(x)^0+^nC_1(2k)^{n-1}(x)^1+^nC_2(2k)^{n-2}(x)^2+\ldots+^nC_r(2k)^{n-r}(x)^r+\ldots+^nC_n(2k)^{n-n}(x)^n#

#=^nC_0(2k)^n+^nC_1(2k)^{n-1}x+^nC_2(2k)^{n-2}(x)^2+\ldots+^nC_r(2k)^{n-r}x^r+\ldots+^nC_nx^n#

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