Let `f:R->[0,oo)` be such that `lim_(x->5) f(x)` exists and `lim_(x->5)([f(x)]^2-9)/(sqrt(|x-5|))=0.` then, `lim_(x->6) f(x)` equals to

Let f: R rarr [10,oo) be such that lim_(x rarr 5)f(x) exists and lim_(x rarr 5) ((f (x))^(2)-9)/(sqrt(|x-5|))=0 . Then lim_(x rarr 5) f(x) equals :

Let f : R rarr [10, oo) be such that lim_(x rarr 5) f(x) exists and lim_(x rarr 5) ((f (x))^(2)-9)/(sqrt(|x-5|))=0 . Then lim_(x rarr 5) f(x) equals :

Let f :R to [0,oo) be such that lim_(xto3) f(x) exists and lim_(x to 3) ((f(x))^2-4)/sqrt(|x-3|)=0 . Then lim_(x to 3) f(x) equals

Let f : R to [0,oo)" be such that "underset(x to 5)lim f(x)" exists and "underset(x to 5)lim ([f(x)]^(2)-9)/(sqrt(|x-5|))=0." Then "underset(x to 5)lim f(x) is equal to:

Let f : R to [0,oo)" be such that "underset(x to 5)lim f(x)" exists and "underset(x to 5)lim ([f(x)]^(2)-9)/(sqrt(|x-5|))=0." Then "underset(x to 5)lim f(x) is equal to:

If lim_(x rarr4)(f(x)-5)/(x-2)=1 then lim_(x rarr4)f(x)=

f(x)=x,x 0 then find lim_(x rarr0)f(x) if exists

If lim_(x->oo) f(x) exists and is finite and nonzero and if lim_(x->oo) {f(x)+(3f(x)−1)/(f^2(x))}=3 ,then the value of lim_(x->oo) f(x) is

If f is an even function, then prove that lim_(x->0^-) f(x) = lim_(x->0^+) f(x)