`f(x) = x(x+3)e^(-x//2)` in `[-3,0]`

Verify Rolles theorem for the function: f(x)=x(x+3)e^(-x//2) on [-3,\ 0] .

Verify Rolles theorem for each of the following functions on the indicated intervals: f(x)=x(x+3)e^(-x/2)on[-3,0] f(x)=e^x(sinx-cosx)on[pi/4,(5pi)/4]

Find the inverse of the following function. (i) f(x) = sin^(-1)(x/3), x in [-3,3] (ii) f(x) = 5^(log_e x), x gt 0 (iii) f(x) = log_e (x+sqrt(x^2+1))

f(x)=e^(x)-e^(-x)-2 sin x -(2)/(3)x^(3). Then the least value of n for which (d^(n))/(dx^(n))f(x)|underset(x=0) is nonzero is

f(x)=e^(x)-e^(-x)-2 sin x -(2)/(3)x^(3). Then the least value of n for which (d^(n))/(dx^(n))f(x)|underset(x=0) is nonzero is

The function f(x)=x(x+3)e^(-(1/2)x) satisfies the conditions of Rolle's theorem in (-3,0). The value of c, is

If the functions f(x)=x^(3)+e^(x//2) " and " g(x)=f^(-1)(x) , the value of g'(1) is ………… .

h(x)=3f((x^2)/3)+f(3-x^2)AAx in (-3, 4) where f''(x)> 0 AA x in (-3,4), then h(x) is

Which of the following functions is one-one ? (1)f:R->R defined as f(x)=e^(sgn x)+e^(x^2) (2) f:[-1,oo) ->(0,oo) defined by f(x)=e^(x^2+|x|) (3)f:[3,4]->[4,6] defined by f(x)=|x-1|+|x-2|+|x-3|+x-4| (4) f(x) =sqrt(ln(cos (sin x))

The function f : (-oo, 3] to (o,e ^(7)] defined by f (x)=e ^(x^(3)-3x^(2) -9x+2) is