`f(x)={cos(pix)/2,x >0 x+a ,xlt=0` Find the values of `a` if `x=0` is a point of maxima.

The funtion f(x)=(log(1+ax)-log(1-bx))/x is not define at x=0. Find the value of f(0),so that f(x)is continuous at x=0.

The curve f(x)=(x^2+a x+b)/(x-10) has a stationary point at (4,1) . Find the values of a and b . Also, show that f(x) has point of maxima at this point.

Given, f(x) =(log(1+x^(2) tanx))/(sin x^(3)) , when x ne 0 . Find the assigned value of f(0), if f(x) is to be continuous at x=0.

Define the continuity of a function at a point within its domain of definition. The definition of a function is given below: f(x)={{:((1-cos5x)/(x^(2))," when "(xne0)),(k," when x = 0"):} Find the value of k for which f(x) is continuous at x = 0.

Let f(x)={(x^2|cos"pi/x|, x ne0),(0, x=0):} , x in R , then f is

Let f(x)={(x^2|cos"pi/x|,xne0),(0,x=0):}

Let f(x)={(log(1+x)^(1+x)-x)/(x^2)}dot Then find the value of f(0) so that the function f is continuous at x=0.

If y=f{f(x)} , f(0) =0 and f'(0)=5, then the value of [(dy)/(dx)]_(x=0) is-

If f(x)={{:(x^2,xlt=0) , (2sinx ,x >0):}' .Investigate the function at , x=0 for maxima/minima

Let f(x)={x+1,x >0, 2-x ,xlt=0 and g(x)={x+3,x 0)g(f(x)).