If $y = f (x),$ where $f : A \to B$ is a function in $x,$ then which of the following statements is true?

(i) Every element of $A$ needs to have an image.

(ii) $x \in A$ must be related to one and only one value of $y$ of $B .$

Statement (i) is true, but statement (ii) is false.

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Statement (ii) is true, but statement (i) is false.

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Both statements (i) and (ii) are true.

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Neither statement (i) nor statement (ii) is true.

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Solution

The correct option is C
Both statements (i) and (ii) are true.

A relation $f$ from set $A$ to set $B$ is said to be a function if each element of $A$ has one and only one image in $B .$

Thus, it is necessary for every element of $A$ to have an image in $B .$ It is also necessary that an element of $A$ has a unique image in $B .$
Thus, both the statements are true.

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Similar questions

If $y = f (x),$ where $f : A \to B$ is a function in $x,$ then which of the following statements is true?

(i) Every element of $A$ needs to have an image.

(ii) $x \in A$ must be related to one and only one value of $y$ of $B .$

If y = f : A $\to$ B, then which of the following is true if f(x) is a function in x.

(i) x must be able to take each and every value of A

(ii) one value of x must be related to one and only one value of y in set B.

If y = f : A $\to$ B, then which of the following is true if f(x) is a function in x?

(i) x must be able to take each and every value of A.

(ii) one value of x must be related to one and only one value of y in set B.

If y = f (x): A $\to$ B, then which of the following is true if f(x) is function in x.

(i) x must be able to take each and every value of A

(ii) one value of x must be related to one and only one value of y in set B.

Let

f : A \to B

be a function defined by

y = f (x)

where f is a bijective function, means f is injective (one-one) as well as surjective (onto), then there exist a unique mapping

g : B \to A

such that

f (x) = y

if and only if

g (y) = x \forall x ϵ A, y ϵ B

Then function g is said to be inverse of f and vice versa so we write

g = f^{- 1} : B \to A [{f (x), x} : {x, f (x)} ϵ f^{- 1}]

when branch of an inverse function is not given (define) then we consider its principal value branch.

Which of the following is not correct?

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If y=f(x), where f:A→B is a function in x, then which of the following statements is true? (i) Every element of A needs to have an image. (ii) x∈A must be related to one and only one value of y of B.

If $y = f (x),$ where $f : A \to B$ is a function in $x,$ then which of the following statements is true?

(i) Every element of $A$ needs to have an image.

(ii) $x \in A$ must be related to one and only one value of $y$ of $B .$