What is the integral nalue of #n# for which #lim_(x->0)[cos^2x-cosx-e^xcosx+e^x-x^3/3]/x^n# is a finite non-zero number?

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Answer 1 · 2018-01-26T10:24:56

#n=3#

Calling

#f(x) = cos^2x-cosx-e^xcosx+e^x-x^3/3#

Near #x = 0# we have

#f(x) = f(0)+f'(0)x+f''(0)x^2/(2!)+f^((3))(0)x^3/(3!)+O(x^4)#

but #f(0)=f'(0) = f''(0)=0# then

#f(x) = x^3/6 + O(x^4)# then for small #abs x# we have

#lim_(x->0)f(x)/x^n = lim_(x->0) (x^3/6 + O(x^4))/x^n# then for #n = 3# we have

#lim_(x->0)f(x)/x^3 =1/6#