Question

Let Y be a subspace of a metric space (X, d). Then ⊆ is open in Y if and only if =∩ for
some open subset G of X.

Answer 1

Answer:

Let Y be a subspace of a metric space (X, d). Then ⊆ is open in Y if and only if =∩ for

some open subset G of X.

Step-by-step explanation:

Let Y be a subspace of a metric space (X, d). Then ⊆ is open in Y if and only if =∩ for

some open subset G of X.Let Y be a subspace of a metric space (X, d). Then ⊆ is open in Y if and only if =∩ for

some open subset G of X.Let Y be a subspace of a metric space (X, d). Then ⊆ is open in Y if and only if =∩ for

some open subset G of X.Let Y be a subspace of a metric space (X, d). Then ⊆ is open in Y if and only if =∩ for

some open subset G of X.Let Y be a subspace of a metric space (X, d). Then ⊆ is open in Y if and only if =∩ for

some open subset G of X.Let Y be a subspace of a metric space (X, d). Then ⊆ is open in Y if and only if =∩ for

some open subset G of X.Let Y be a subspace of a metric space (X, d). Then ⊆ is open in Y if and only if =∩ for

some open subset G of X.Let Y be a subspace of a metric space (X, d). Then ⊆ is open in Y if and only if =∩ for

some open subset G of X.Let Y be a subspace of a metric space (X, d). Then ⊆ is open in Y if and only if =∩ for

some open subset G of X.Let Y be a subspace of a metric space (X, d). Then ⊆ is open in Y if and only if =∩ for

some open subset G of X.Let Y be a subspace of a metric space (X, d). Then ⊆ is open in Y if and only if =∩ for

some open subset G of X.Let Y be a subspace of a metric space (X, d). Then ⊆ is open in Y if and only if =∩ for

some open subset G of X.Let Y be a subspace of a metric space (X, d).

Let Y be a subspace of a metric space (X, d). Then ⊆ is open in Y if and only if =∩ for

some open subset G of X.