[" If "f:[-5,5]rarr R" is a differentiable function and if "f'(x)" does not vanis "],[" anywhere,then prove that "f(-5)!=f(5)" ."]

If f:[-5,5] rarr R is a differentiable function and if f'(x) does not vanish anywhere, then prove that f(-5) ne f(5)

If f: [-5, 5] rarr R is a differentiable function and if f'(x) does not vanish anywhere, then prove that f(-5) ne f(5)

If f:[-5,5]rarr R is differentiable function and iff'(x) does not vanish anywhere,then prove that f(-5)!=f(5)

If f[-5,5] to R , is a differentiable function and if f'(x) does not vanish anywhere, then prove that f(-5)!=f(5) .

If fquad :quad [quad -5,quad 5]rArr R is a differentiable function and if f'(x) does not vanish anywhere,then prove that f(-5)!=f(5)

If f:[-5,5]toR is a differentiable function and if f'(x) does not vanish any where, then prove that f(-5)nef(5)

If f : [-5, 5] to R is a differentiable function function and if f'(x) does not vanish anywhere, then prove that f(-5) ne f(5) .

If f : [-5, 5] to R is a differentiable function function and if f'(x) does not vanish anywhere, then prove that f(-5) ne f(5) .

If f : [-5, 5] to R is a differentiable function function and if f'(x) does not vanish anywhere, then prove that f(-5) ne f(5) .

If f : [-5, 5] to R is a differentiable function and if f^(prime)(x) does not vanish anywhere, then prove that f(-5) ne f(5) .