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Let A = {1, 2, 3, …, 50} and R be the relation "is square of" on A. Then R as a subset of A x A is written as |
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Answer» 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.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. 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. |
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