Question #e4125

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Question #e4125

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Answer 1 · 2016-12-28T20:12:01

Yes.

Explanation:

A function f associates to each element x of its domain
an image y = f(x) in its codomain.

$\forall x \in$ $forall x \in$ ∅ $, \exists y \in$ $, exists y \in$ ∅, such that $y = f (x)$ $y = f(x)$

Suppose by contradiction that the statement above is false.

$\exists x \in$ $exists x \in$ ∅, such that $\forall y \in$ $forall y \in$ ∅, $y \neq f (x)$ $y ne f(x)$

Did you see? There exists "somebody" in the empty set. Who?

Q.E.A.

Answer 2 · 2016-12-28T20:54:39

Yes. It is a function. See explanation.

Explanation:

According to a definition an association $f : X \to Y$ $f:X ->Y$ is a function if and only if:

$\forall_{x \in X} \exists_{y \in Y} f (x) = y$ $AA_{x in X} EE_{y in Y} f(x)=y$

In the given example the condition is fulfilled. The domain $X$ $X$ contains only one element - empty set $\emptyset$ $O/$ and the value of the function is also an empty set $\emptyset$ $O/$ .

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Question #e4125

2 Answers

Explanation:

Explanation:

$\forall_{x \in X} \exists_{y \in Y} f (x) = y$ $AA_{x in X} EE_{y in Y} f(x)=y$

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Impact of this question

Science

Math

Humanities

... and beyond

Question #e4125

2 Answers

Explanation:

Explanation:

∀x∈X∃y∈Yf(x)=yAA_{x in X} EE_{y in Y} f(x)=y

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Impact of this question

$\forall_{x \in X} \exists_{y \in Y} f (x) = y$ $AA_{x in X} EE_{y in Y} f(x)=y$