Which of the following function is an onto function- A. f(x) = sin(x) on f : R -> [-1,1] B. f(x) =cos(x) on f : R -> [-1,1] C. f(x)= e^x on f : R -> (0,oo) D. All of the above.

Arianna Pruitt

Arianna Pruitt

Answered question

2022-12-31

Which of the following function is an onto function-
A. f ( x ) = sin ( x ) on f : R [ 1 , 1 ]
B. f ( x ) = cos ( x ) on f : R [ 1 , 1 ]
C. f ( x ) = e x on f : R ( 0 , )
D. All of the above.

Answer & Explanation

Londyn Garcia

Londyn Garcia

Beginner2023-01-01Added 7 answers


A comparison of a function's co-domain and range can help determine whether it is into or onto. Here the co-domain of each function is given separately. So let’s check each function one by one.
First function given is sinx. The co-domain given for the function is [-1,1]. We know that the range of sinx is [-1,1]. The range and codomain are equal. So the function is onto. Similarly we can check for other two functions and we’ll find that all functions are onto. And the correct option is D.
The correct option is D

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