" If "f:[-2,2]rarr R" is defined by "f(x)={[(sqrt(1+cx)-sqrt(1-cx))/(x),,-2<=x<0],[(x+3)/(x+1),0<=x<=2]}" is continuous "m[-2,2]" then "

If : [ -2 ,2 ] to R is defined by f(x) = {: { ((sqrt(1+cx) -sqrt(1-cx))/x , " for" -2 le x lt 0), ((x+3)/(x +1) , " for " 0 le x le 2):} continuous on [ -2, 2] then c is equal to

The function f:R rarr R defined by f(x)=x+sqrt(x^(2)) is

If f:R rarr R is defined by f(x)=x/(x^2+1) find f(f(2))

Let f:[-oo,0]rarr[1,oo) be defined as f(x)=(1+sqrt(-x))-(sqrt(-x)-x), then

A function f defined by f(x)=In(sqrt(x^(2)+1-x)) is

If f : R rarr R is defined by f(x) = 2x + 3, then f^-1 (x)

If f: R rarr R is defined by f(x)=(x)/(x^(2)+1) find f(f(2))

If f : R rarr R is defined by f(x) = {((x+2)/(x^(2)+3x+2), x in R-{-1,-2}),(-1, x=-2),(0, x = -1):} then f is continuous on the set

If f:R-{5//2}rarr R-{-1} defined by f(x)=(2x+3)/(5-2x) then f^(-1)(x)=