" Let "m" and "n" be two positive integers greater than "1." If "lim_(a rarr0)((e^(cos(a^(n)))-e)/(alpha^(m)))=-((e)/(2))" then "t

Let m and n be two positive integers greater than 1. If lim_(alpha rarr0)(e^(cos alpha^(n))-e)/(alpha^(m))=-((e)/(2)) then the value of (m)/(n) is

Let m and n be two positive integers greater than 1.If lim_(alpha->0) (e^(cos alpha^n)-e)/(alpha^m)=-(e/2) then the value of m/n is

Let m and n be two positive integers greater than 1.If lim_(alpha->0) (e^(cos alpha^n)-e)/(alpha^m)=-(e/2) then the value of m/n is

Let m and n be two positive integers greater than 1.If lim_(alpha->0) (e^(cos alpha^n)-e)/(alpha^m)=-(e/2) then the value of m/n is

Let m and n be the two positive integers greater than 1 . If underset( alpha rarr 0 ) ( "lim")((e^(cos(alpha^(n)))-e)/(alpha^(m))) = -((e )/( 2)) then the value of ( m )/( n ) is

lim_(x rarr0)(e^(cos x^(n))-e)/(x^(m))=-(e)/(2) then find (4m)/(5n)

lim_(n rarr0)((1+cos n)/(n^(2)))

lim_(x rarr0)(e^(sin x)-1)/(x)

lim_(x rarr0)(e^(sin x)-1)/(x)

lim_(n rarr0)(cos n)/(n+1)