`lim_(xrarr0)((1+x)^(n)-1)/(x)` is equal toA. nB. 1C. `-n`D. 0 – InterviewSolution

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1.	`lim_(xrarr0)((1+x)^(n)-1)/(x)` is equal toA. nB. 1C. `-n`D. 0
Answer» Correct Answer - a Given, `lim_(xto0)((1+x)^(n)-1)/(x) = lim_(xto0)((1+x)^(n)-1)/((1+x)-1)=lim_(xto0)((1+x)^(n)-1)/((1+x)-1)` `lim_(xto0)((1+x)^(n)-1^(n))/((1+x)-1)=lim_((1+x)to1)((1+x)^(n)-1^(n))/((1+x)-1)` `=n.(1)^(n-1)=n` `[therefore lim_(xtoa)(x^(n)-a^(n))/(x-a) = na^(n-1)]`

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