Given that `f (x)` is a non-constant linear function. Then the curves :

Given that g(x) is a non constant linear function defined on R-

If lim_(x to a) f(x)=lim_(x to a) [f(x)] and f(x) is non-constant continuous function, where [.] denotes the greatest integer function, then

If f(x) is an odd function, then the curve y=f(x) is symmetric

If f(x) is an even function, then the curve y=f(x) is symmetric about

Statement 1: Let f:R rarr R be a real-valued function AA x,y in R such that |f(x)-f(y)|<=|x-y|^(3) .Then f(x) is a constant function.Statement 2: If the derivative of the function w.r.t.x is zero,then function is constant.

Given the curve y=f(x)

Let f(x) be a non-constant twice differentiable function defined on (oo,oo) such that f(x)=f(1-x) and f'(1/4)=0^(@). Then

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

If lim_(x rarr a)f(x)=lim_(x rarr a)[f(x)]([.] denotes the greatest integer function) and f(x) is non- constantcontinuous function,then: