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Inequality and absolute values

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Futuristic
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Inequality and absolute values [#permalink] New post   25 Jun 2006, 17:08
This is possibly a repost.....but if possible could someone explain the right way to solve this?

| 3x - 2 | = -1, x = 7/5. However, 4GMAT seems to solve this by squaring the absolute values on both sides of the equation....please comment...



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Re: Inequality and absolute values [#permalink] New post   25 Jun 2006, 17:20
Futuristic wrote:
This is possibly a repost.....but if possible could someone explain the right way to solve this?

| 3x - 2 | <= | 2x - 5 |

The way I see it, we would end up with 4 possible equations:

3x -2 <= 2x - 5 ......(1)
3x -2 <= -2x + 5 ....(2)
-3x + 2 <= 2x -5 ....(3)
-3x +2 <= -2x + 5 ..(4)

Is the above correct? If so, I solved to get x <= 7/5, x>= -1, x <= 03, x >= 7/5. However, 4GMAT seems to solve this by squaring the absolute values on both sides of the equation....please comment...


Since you have to consider 4 different scenarios for absolute value problems like this one above, squaring it and then solving is faster.
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Futuristic
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Re: Inequality and absolute values [#permalink] New post   25 Jun 2006, 17:47
gmatmba wrote:
Futuristic wrote:
This is possibly a repost.....but if possible could someone explain the right way to solve this?

| 3x - 2 | <= | 2x - 5 |

The way I see it, we would end up with 4 possible equations:

3x -2 <= 2x - 5 ......(1)
3x -2 <= -2x + 5 ....(2)
-3x + 2 <= 2x -5 ....(3)
-3x +2 <= -2x + 5 ..(4)

Is the above correct? If so, I solved to get x <= 7/5, x>= -1, x <= 03, x >= 7/5. However, 4GMAT seems to solve this by squaring the absolute values on both sides of the equation....please comment...


Since you have to consider 4 different scenarios for absolute value problems like this one above, squaring it and then solving is faster.


I'm aware of the solution by squaring. Are we sure that it provides a solution with all possible values of x?
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Re: Inequality and absolute values [#permalink] New post   25 Jun 2006, 22:11
Futuristic wrote:
gmatmba wrote:
Futuristic wrote:
This is possibly a repost.....but if possible could someone explain the right way to solve this?

| 3x - 2 | <= | 2x - 5 |

The way I see it, we would end up with 4 possible equations:

3x -2 <= 2x - 5 ......(1)
3x -2 <= -2x + 5 ....(2)
-3x + 2 <= 2x -5 ....(3)
-3x +2 <= -2x + 5 ..(4)

Is the above correct? If so, I solved to get x <= 7/5, x>= -1, x <= 03, x >= 7/5. However, 4GMAT seems to solve this by squaring the absolute values on both sides of the equation....please comment...


Since you have to consider 4 different scenarios for absolute value problems like this one above, squaring it and then solving is faster.


I'm aware of the solution by squaring. Are we sure that it provides a solution with all possible values of x?


If you square absolute values, the final equation will have exactly the same roots as the original. However if some of the variables are not in absolute values, you can end up with more roots then the original (consider |x|=2x+1 ). But you will never lose a root because of squaring.
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Re: Inequality and absolute values [#permalink] New post   28 Jun 2006, 13:54
Great, thanks for confirming.



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Hi there,
This topic has been closed and archived due to inactivity or violation of community quality standards. No more replies are possible here.
Where to now? Join ongoing discussions on thousands of quality questions in our Quantitative Questions Forum
Still interested in this question? Check out the "Best Topics" block above for a better discussion on this exact question, as well as several more related questions.
Thank you for understanding, and happy exploring!
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Re: Inequality and absolute values [#permalink]
28 Jun 2006, 13:54
Moderator:
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