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#1 2008-10-07 04:17:59
- shocamefromebay
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- Registered: 2007-05-30
- Posts: 103
Inequalities and negative numbers?
I am having trouble with an inequalities problem.
I found the solution to be
, but the real solution is .Why is that? Is there some sort of rule that I do not know about? does it have somethign to do witht eh variable being in the denominator?
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#2 2008-10-07 05:16:43
- TheDude
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- Registered: 2007-10-23
- Posts: 361
Re: Inequalities and negative numbers?
I'd guess these were your steps:
The key here is moving from step 2 to step 3. You're multiplying by 8a, which is positive when a is positive and negative when a is negative. Whenever you multiply or divide both sides of an inequality by a negative number you need to switch the sign around.
To show you what would happen we'll split the problem into 2 sections: first is where a > 0, the second is where a < 0 (it should be obvious what happens when a = 0). If we assume a > 0 then we leave the sign as it is and can use the proof I gave above. Let's see what happens if we assume a < 0:
Thus we've found that a > 7/4. However, we assumed that a < 0. This is a contradiction, which means that there is no solution when a < 0. You can see that a = 0 is not a solution either, so we're left with 0 < a < 7/4.
Wrap it in bacon
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#3 2008-10-07 06:01:02
- mathsyperson
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Re: Inequalities and negative numbers?
An alternative method would have been to multiply by 8a², which is always positive and so means you don't need to split into cases. You'd then get to 4a² - 7a < 0, which is a quadratic that solves to give the same solution.
Why did the vector cross the road?
It wanted to be normal.
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#4 2008-10-07 13:08:26
- shocamefromebay
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- Registered: 2007-05-30
- Posts: 103
Re: Inequalities and negative numbers?
Wow, thanks guys. It was a real help!
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