A function has the form f(x)=ax+b, where a and b are constants. If `f(2)=1" and "f(-3)=11`, the function is defined by

Let f(x)=ax^(2)-b|x| , where a and b are constant . Then at x=0 , f(x) has

Prove that f(x)=ax+b, where a,b are constants and a>0 is an increasing function on R.

Prove that f(x)=ax+b, where a,b are constants and a>0 is an increasing function on R.

A function is defined as f(x) = ax^(2) – b|x| where a and b are constants then at x = 0 we will have a maxima of f(x) if

Prove that f(x)=ax+b, where a,b are constants and a<0 is a decreasing function on R.

The function f(x) is defined by f(x)=cos^(4)x+K cos^(2)2x+sin^(4)x, where K is a constant.If the function f(x) is a constant function,the value of k is

Prove that f(x)=ax+b is decreasing function,a,b= constants and a <0

The function f: C to C defined by f(x)=(ax+b)/(cx+d) for x in C where bd ne 0 reduces to a constant function if:

The function f:C rarr C defined by f(x)=(ax+b)/(cx+d) for x in C where bd!=0 reduces to a constant function if