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

underset(x to 1)lim (sqrt(1-cos 2(x-1)))/(x-1)

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

lim_(xto3)sqrt(1-cos2(x-3))/(x-3)

The value of lim_(xto2)sqrt(1-cos 2(x-2))/(x-2) , is

underset(x to oo)lim (cos""2/x)^(x^2)=

The value of underset(x to 2)lim (sqrt(1+sqrt(2+x))-sqrt3)/(x-2) is

The value of underset(x to 2)lim (sqrt(1+sqrt(2+x))-sqrt3)/(x-2) is

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

underset( x rarr 2 ) ( "lim") (( sqrt( 1- cos { 2 ( x - 2)}))/( x - 2))

(lim)_(x rarr2)((sqrt(1-cos{2(x-2)}))/(x-2))(1) does not exist (2) equals sqrt(2)(3) equals -sqrt(2)(4) equals (1)/(sqrt(2))