Show that, `underset(xto(pi//4))"lim"(|x-4|)/(x-4)`, does not exist,

Show that, lim_(xto(pi//4)) (|x-4|)/(x-4) , does not exist,

If underset(x to a)("lim")(f(x)-f(a))/(x-a) exists, then

Show that lim_(xto0^(-)) ((e^(1//x)-1)/(e^(1//x)+1)) does not exist.

Show that cot(pi/4+x)cot(pi/4-x)=1

Evaluate underset(x to pi/4)lim (1-sin 2x)/(1+cos 4x)

Consider the following statements: 1. lim_(xto0)sin""(1)/(x) does not exist. 2. lim_(xto0)sin""(1)/(x) exists. Which of the above statements correct?

Show that the lim_(xto2) ((sqrt(1-cos{2(x-2)}))/(x-2)) doesnot exist.

Show that (lim)_(x rarr0)(x)/(|x|) does not exist.

Show that lim_(xrarr2) ([x-2])/(x-2) does not exist.