The range of `x^(3)` when domain is `[-1,1]` is

Consider the real-valued function satisfying 2f(sin x)+f(cos x)=x .then the (a)domain of f(x) is R (b)domain of f(x)is[-1,1] (c)range of f(x) is [-(2 pi)/(3),(pi)/(3)]( d)range of f(x) is R

The graph of a function fx) which is defined in [-1, 4] is shown in the adjacent figure. Identify the correct statement(s). (1) domain of f(|x|)-1) is [-5,5] (2) range of f(|x|+1) is [0,2] (3) range of f(-|x|) is [-1,0] (4) domain of f(|x|) is [-3,3]

The graph of a function fx) which is defined in [-1, 4] is shown in the adjacent figure. Identify the correct statement(s). (1) domain of f(|x|)-1) is [-5,5] (2) range of f(|x|+1) is [0,2] (3) range of f(-|x|) is [-1,0] (4) domain of f(|x|) is [-3,3]

The graph of a function fx) which is defined in [-1, 4] is shown in the adjacent figure. Identify the correct statement(s). (1) domain of f(|x|)-1) is [-5,5] (2) range of f(|x|+1) is [0,2] (3) range of f(-|x|) is [-1,0] (4) domain of f(|x|) is [-3,3]

Given that y=f(x) is a function whose domain is [4,7] and range is [-1,9] then find the range and domain of

The graph of a function fx which is defined in [-1,4] is shown in the adjacent figure.Identify the correct statement(s).(1) domain of f(|x|)-1)is[-5,5](2) range of f(|x|+1) is [0,2](3) range of f(-|x|) is [-1,0](4) domain of f(|x|)is[-3,3]

Find the domain and range of the following function : |x-1| .

Find the domain and range of the following functions. f(x)=abs[x-1]

Find the domain and the range of the real function f defined by f(x)=sqrt((x-1)) .(a)Domain = ( 1 , ∞ ) , Range = ( 0 , ∞ ) (b) Domain = [ 1 , ∞ ) , Range = ( 0 , ∞ (c) Domain = ( 1 , ∞ ) , Range = [ 0 , ∞ ) (d)Domain = [ 1 , ∞ ) , Range = [ 0 , ∞ )

Find the domain and range of the following functions: (1)/(sqrt(x-3))