Let `x_1=1 and x_(n+1)=(4+3x_n)/(3+2x_n)` for `n >= 1.` If `lim_(x->oo)x_n` exists finitely, then the limit is equal to

Let x_(1)=1 and x_(n+1)=(4+3x_(n))/(3+2x_(n)) for n>=1 If lim_(x rarr oo)x_(n) exists finitely,then the limit is equal to

If x_1=3 and x_ +1= sqrt(2+x_n), n ge 1 , then lim_(nto oo) x_n is equal to

If x_(1)=3 and x_(n+1)=sqrt(2+x_(n)),n<=1, then lim_(n rarr oo)x_(n) is

If x_(1)=3 and x_(n+1)=sqrt(2+x_(n))" ",nge1, then lim_(ntooo) x_(n) is

If lim_(x->1)((x^n-1)/(n(x-1)))^(1/(x-1))=e^p , then p is equal to

If lim_(x to 0) (x^n-sin^n x)/(x-sin^n x) is nonzero and finite , then n in equal to

If quad sqrt(3) and x_(n+1)=(x_(n))/(1+sqrt(1+x_(n)^(2))),AA n in N then lim_(n rarr oo)2^(n)x_(n) is equal to ,AA n in N

If lim_(x rarr0)(x^(n)*sin^(n)x)/(x^(n)-sin^(n)x) is non-zero finite,then n must be equal to 4(b)1(c)2(d)3

If f(x)=lim_(n rarr oo)n(x^((1)/(n))-1) then for x>0,y>0,f(xy) is equal to

Let f : R toR " be a real function. The function "f" is double differentiable. If there exists "ninN" and "p inR" such that "lim_(x to oo)x^(n)f(x)=p" and there exists "lim_(x to oo)x^(n+1)f(x), "then" lim_(x to oo)x^(n+1)f'(x) is equal to