For each real `x ,=1`

For each real x, let f(x)=max{x,x^(2),x^(3),x^(4)} then f(x) is

let f(x)=2+cos x for all real x Statement 1: For each real t,there exists a pointc in [t,t+pi] such that f'(c)=0 Because statement 2:f(t)=f(t+2 pi) for each real t

let f(x)=2+cosx for all real x. Statement 1: For each real t, there exists a point c in [t,t+pi] such that f '(c)=0 . Statement 2: f(t)=f(t+2pi) for each real t

let f(x)=2+cosx for all real x Statement 1: For each real t, there exists a pointc in [t,t+pi] such that f'(c)=0 Because statement 2: f(t)=f(t+2pi) for each real t

let f(x)=2+cosx for all real x Statement 1: For each real t, there exists a pointc in [t,t+pi] such that f'(c)=0 Because statement 2: f(t)=f(t+2pi) for each real t

let f(x)=2+cosx for all real x Statement 1: For each real t, there exists a pointc in [t,t+pi] such that f'(c)=0 Because statement 2: f(t)=f(t+2pi) for each real t

Identify the quantifiers in the following (i) There exists a complex number for each real number (ii) for every real number x is less than x+ 2

The function f(x) has the property that for each real number x in its domain,(1)/(x) is also in its domain and f(x)+f((1)/(x))=x. Find the largest set of real numbers that can be in the domain of f(x)?

For each non-zero real number x, let f(x)=(x)/(|x|) . The range of f is