If `f(x)=3x-5,` then `f^(-1)(x)` is given by (a) `1/((3x-5))` (b) `((x+5))/3` (c)does not exist because `f` is not one-one (d)does not exist because `f` is not onto

If f(x)=3x-5, find f^(-1)(x) .

Let f:R->R be given by f(x)=(x +1)^2-1, x>=-1 Then f^(-1)(x)= (i) -1+sqrt(1+x) (ii)-1-sqrt(1+x) (iii) does not exist as f^(-1)(x) is one one (iv) does not exist as f^(-1)(x) is onto

If f:R rarr R is given by f(x)=3x-5 then f^(-1)(x)

If f(x)=(|x-1|)/(x-1) prove that lim_(x rarr1)f(x) does not exist.

If f(x)=x^(2)+3x-5, find f(0),f(1) and f((1)/(2))

Let f be defined on R by f(x)=x^(4)sin(1/x) , if x!=0 and f(0)=0 then (a) f'(0) doesn't exist (b) f'(2-) doesn't exist (c) f'' is not continous at x=0 (d) f''(0) exist but f''' is not continuous at x=0

Let f be defined on R by f(x)= x^(4)sin(1/x) , if x!=0 and f(0)=0 then (a) f'(0) doesn't exist (b) f'(2-) doesn't exist (c) f'' is not continous at x=0 (d) f''(0) exist but f'' is not continuous at x=0

If f(x)=2x^(2)+3x-5, then what is f'(0)+3f'(-1) equal to?

If f(x)=x sin((1)/(x)),x!=0 and f(x)=0,x=0 then show that f'(0) does not exist

if f(x)=2x^(2)+3x-5 , the what is f'(0)+3f'(-1)=