A) M is compact |
B) M is connected |
C) M is not compact |
D) None of these |
C) M is not compact |
1). Let M be a subspace of R where \(M= [1,2]\cup [3,4]\) then \([1,2]\) is
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2). It R be the metric space then,
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3). Z is
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4). Every subset of a discrete metric space
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5). In with usual metric, every singleton set is
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6). In any metric space M, \(\phi\) and M are
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7). Any finite suliset of a metric space is
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8). A subset M of \(R^{2}\) is compact if and only if M is ____.
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9). Let (M, d) be the discrete metric space and A be any subset of A. Then the derived set of A (the set of all limit points of A) is,
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10). Any finite subset of a metric space has
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