Metamath Proof Explorer
Description: A function continuous with respect to the standard topology, is a real
mapping. (Contributed by Glauco Siliprandi, 20-Apr-2017)
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Ref |
Expression |
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Hypotheses |
fcnre.1 |
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fcnre.3 |
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sfcnre.5 |
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fcnre.6 |
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Assertion |
fcnre |
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Proof
| Step |
Hyp |
Ref |
Expression |
| 1 |
|
fcnre.1 |
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| 2 |
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fcnre.3 |
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| 3 |
|
sfcnre.5 |
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| 4 |
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fcnre.6 |
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| 5 |
4 3
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eleqtrdi |
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| 6 |
|
cntop1 |
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| 7 |
5 6
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syl |
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| 8 |
2
|
toptopon |
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| 9 |
7 8
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sylib |
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| 10 |
|
retopon |
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| 11 |
1 10
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eqeltri |
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| 12 |
11
|
a1i |
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| 13 |
|
cnf2 |
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| 14 |
9 12 5 13
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syl3anc |
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