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Disprove the nested quantifier |
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| Feb20-13, 10:03 PM | #1 |
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Disprove the nested quantifier
I have trouble disproving the following expression
I worded it as follows: The product of certain number and every other nonzero number is 1 |
| Feb21-13, 10:49 AM | #2 |
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First of all, does the problem specify what the domain is for x and y?
To start, lets back things up a bit. In mathematical terms, the statement is as follows: There exists an x for every possible y value, such that if y isn't zero, when you choose an x-value, you can multiply it by every y-value in the domain, and the result is 1. So, assuming the domain is real numbers, for both x and y, lets try choosing a value for x: Let x = 5. What value of y would make the statement true? y = 1/5. So, we've tested JUST ONE y-value. x = 5 has to work for EVERY single y. Can you think of a y-value that would make the statement false? EDIT: If anyone thinks my reply contains fallacious ideas, please inform me. |
| Feb22-13, 08:56 AM | #3 |
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@Albert, has my reply stirred any thoughts in your mind?
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