If a function f(x) is defined from R (real numbers) to R and the range of this function is N. Then the function is onto.Group startsTrue or FalseTrue, unselectedFalse, unselected
Question
If a function f(x) is defined from R (real numbers) to R and the range of this function is N. Then the function is onto.Group startsTrue or FalseTrue, unselectedFalse, unselected
Solution
To determine if the function f(x) is onto, we need to consider the given information.
The function f(x) is defined from R (real numbers) to R, which means that the domain and codomain of the function are both the set of real numbers.
It is also mentioned that the range of the function is N, which represents the set of natural numbers.
To be onto, a function must have a range that is equal to its codomain. In this case, the codomain is R (real numbers), but the range is N (natural numbers).
Since the range of the function is not equal to its codomain, we can conclude that the function is not onto.
Therefore, the statement "The function is onto" is False.
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