The function `xsqrt(1-x^(2)),(x gt0)` has

xsqrt(1+2x^(2))

The function f(x)=xsqrt(ax-x^2), a lt 0

What is the interval in which the function f(x) = sqrt(9-x^(2)) is increasing ? (f(x)gt0)

Statement-1 e^(pi) gt pi^( e) Statement -2 The function x^(1//x)( x gt 0) is strictly decreasing in [e ,oo)

Given the function f(x) = x^(2) e^(-2x), x gt 0 . Then f(x) has the maximum value equal to

Integrate the functions xsqrt(1+2x^2)

int_(0)^1 (xsqrt(1-x))dx

The primitive of the function f(x)=(1-(1)/(x^(2)))a^(x+(1)/(x))x,gt0 , is

Consider the function f(x)=1/x^(2) for x gt 0 . To find lim_(x to 0) f(x) .

Find the inverse of the function y=log_(a) (x+sqrt(x^(2)+1)), (a gt 0, a ne 1)