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|x| + |y| > |x + z|

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Carcass
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|x| + |y| > |x + z| [#permalink] New post   09 Aug 2018, 03:46
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\(|x| + |y| > |x + z|\)

Quantity A
Quantity B
y
z


A) Quantity A is greater.
B) Quantity B is greater.
C) The two quantities are equal.
D) The relationship cannot be determined from the information given.

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kaziselim
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Re: |x| + |y| > |x + z| [#permalink] New post   09 Aug 2018, 15:34
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Carcass wrote:
\(|x| + |y| > |x + z|\)

Quantity A
Quantity B
y
z


A) Quantity A is greater.
B) Quantity B is greater.
C) The two quantities are equal.
D) The relationship cannot be determined from the information given.

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General formula : \(|a| + |b| \geq|a+b|\)

In this case we don't know anything about z. Given datum is not sufficient.

The best answer is D.
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fixzion
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Re: |x| + |y| > |x + z| [#permalink] New post   24 Sep 2018, 03:05
General formula : |a|+|b|≥|a+b|
is this a formula for every value we put in? thanks
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ahamroun
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Re: |x| + |y| > |x + z| [#permalink] New post   24 Feb 2020, 09:59
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fixzion wrote:
General formula : |a|+|b|≥|a+b|
is this a formula for every value we put in? thanks


Yes, and the two sides are equal only if a and b are both non negatives, Otherwise, if ab<0 then |a|+|b|>|a+b|
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Tejas2805
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Re: |x| + |y| > |x + z| [#permalink] New post   18 Sep 2020, 02:11
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In case someone is not aware of the property, they can do this:

Take x = 0,

Then you have |y| > |z|

Now its clearly seen, y can be lesser and greater than z, since only the absolute of y is greater than z.
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abascus
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Re: |x| + |y| > |x + z| [#permalink] New post   18 Jun 2021, 03:38
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Normally, when more than two variables are involved in an equality and you do not have sufficient information to deduce your answer, it is best to try and plug in values and see the answer for yourself. Always start with the simplest values :-
1) Put x = 0, y = 1 and z = 0. In this case, |0| + |1| > |0 + 0| i.e. |1| > |0|. Thus y > z.
1) Put x = 0, y = -1 and z = 0. In this case, |0| + |-1| > |0 + 0| i.e. |1| > |0|. Thus y < z.

Thus, D is the answer.
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