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Bunuel
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Is x a positive number? (1) (x – 2)^2 > 2 (2) 2^x > 3^x 05 Sep 2017, 01:30
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25% (medium)

Question Stats:

78% (01:42) correct 22% (01:55) wrong based on 108 sessions

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Is x a positive number?

(1) (x – 2)^2 > 2
(2) 2^x > 3^x
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B
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Is x a positive number? (1) (x – 2)^2 > 2 (2) 2^x > 3^x 05 Sep 2017, 01:45
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x a positive number?

(1) (x – 2)^2 > 2
Assume x=1 (1-2)^2 > 2 No...
but x=0.1 positive (0.1-2)^2 = (1.9)^2 > 2... True.....
Not sufficient

(2) 2^x > 3^x
Assume x=1 => 2>3.. False
x=0.1 => 2^0.1 > 3^0.1 => False.. All positive powers will give answer "False"
so for 2^x > 3^x ... x is not positive
Sufficient

Answer: B
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Is x a positive number? (1) (x – 2)^2 > 2 (2) 2^x > 3^x 05 Sep 2017, 02:16
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Is x a positive number?

(1) (x – 2)^2 > 2
(2) 2^x > 3^x
Show more


Bunuel,

I have a doubt here.

For statement 1,
I took ((x – 2)^2- (\sqrt{2}) ^2> 0

Now, can we not take (a-b)(a+b)>0 seperately to find out the solution?

Thanks
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Is x a positive number? (1) (x – 2)^2 > 2 (2) 2^x > 3^x 05 Sep 2017, 02:28
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Bunuel
Is x a positive number?

(1) (x – 2)^2 > 2
(2) 2^x > 3^x


Bunuel,

I have a doubt here.

For statement 1,
I took ((x – 2)^2- (\sqrt{2}) ^2> 0

Now, can we not take (a-b)(a+b)>0 seperately to find out the solution?

Thanks
Show more

Well yes but it will give the same answer.

Probably the easiest way to deal with the first statement would be to tests numbers or to take the square root from both sides:

\(|x-2|>\sqrt{2}\);

\(x-2>\sqrt{2}\) or \(-(x-2)>\sqrt{2}\)

\(x>2+\sqrt{2}\) or \(x<2-\sqrt{2}\)
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Is x a positive number? (1) (x – 2)^2 > 2 (2) 2^x > 3^x 05 Sep 2017, 02:34
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Bunuel
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Bunuel
Is x a positive number?

(1) (x – 2)^2 > 2
(2) 2^x > 3^x


Bunuel,

I have a doubt here.

For statement 1,
I took ((x – 2)^2- (\sqrt{2}) ^2> 0

Now, can we not take (a-b)(a+b)>0 seperately to find out the solution?

Thanks

Well yes but it will give the same answer.

Probably the easiest way to deal with the first statement would be to tests numbers or to take the square root from both sides:

\(|x-2|>\sqrt{2}\);

\(x-2>\sqrt{2}\) or \(-(x-2)>\sqrt{2}\)

\(x>2+\sqrt{2}\) or \(x<2-\sqrt{2}\)
Show more

Can you show this using the formula a^2-b^2 i.e (a-b)(a+b) and then solving? I know it is easy to solve using numbers but not able to get using this formula

Thanks
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GMAT 1: 730 Q50 V38
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Is x a positive number? (1) (x – 2)^2 > 2 (2) 2^x > 3^x Updated on: 05 Sep 2017, 02:52
Originally posted by Nikkb on 05 Sep 2017, 02:42.
Last edited by Nikkb on 05 Sep 2017, 02:52, edited 3 times in total.
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KS15

Can you show this using the formula a^2-b^2 i.e (a-b)(a+b) and then solving? I know it is easy to solve using numbers but not able to get using this formula

Thanks
Show more

KS15

(x – 2)^2 > 2
=> (x – 2)^2 - 2 >0
=>\((x – 2)^2 - \sqrt{2} >0\)
=> \((x-2+\sqrt{2}) (x-2-\sqrt{2}) >0\)

This will term either both term are positive or both terms are negative
both positive :
\(x-2+\sqrt{2} > 0\) and \(x-2-\sqrt{2} > 0\)
\(x>2-\sqrt{2}\) and \(x >2+\sqrt{2}\)

OR

both negative :
\(x-2+\sqrt{2} < 0\) and \(x-2-\sqrt{2} < 0\)
\(x<2-\sqrt{2}\)and \(x <2+\sqrt{2}\)

Combining all 4 equations we can write :

\(x >2+\sqrt{2}\) OR \(x<2-\sqrt{2}\)
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Is x a positive number? (1) (x – 2)^2 > 2 (2) 2^x > 3^x 05 Sep 2017, 02:45
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Bunuel
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Bunuel,

I have a doubt here.

For statement 1,
I took ((x – 2)^2- (\sqrt{2}) ^2> 0

Now, can we not take (a-b)(a+b)>0 seperately to find out the solution?

Thanks

Well yes but it will give the same answer.

Probably the easiest way to deal with the first statement would be to tests numbers or to take the square root from both sides:

\(|x-2|>\sqrt{2}\);

\(x-2>\sqrt{2}\) or \(-(x-2)>\sqrt{2}\)

\(x>2+\sqrt{2}\) or \(x<2-\sqrt{2}\)

Can you show this using the formula a^2-b^2 i.e (a-b)(a+b) and then solving? I know it is easy to solve using numbers but not able to get using this formula

Thanks
Show more

\((x – 2)^2 > 2\)

\((x – 2)^2 -2> 0\)

\((x – 2-\sqrt{2})(x – 2+\sqrt{2})> 0\).

For the product to be positive both multiples must have the same sign.

When both are positive:
\(x – 2-\sqrt{2}> 0\) and \(x – 2+\sqrt{2}> 0\).
\(x > 2+\sqrt{2}\) and \(x > 2-\sqrt{2}\).

For both above to be true simultaneously, \(x > 2+\sqrt{2}\) should hold (so x must be more than the larger number).

When both are negative:
\(x – 2-\sqrt{2}< 0\) and \(x – 2+\sqrt{2}< 0\).
\(x < 2+\sqrt{2}\) and \(x < 2-\sqrt{2}\).

For both above to be true simultaneously, \(x < 2-\sqrt{2}\) should hold (so x must be less than the smaller number).

So, \(x>2+\sqrt{2}\) or \(x<2-\sqrt{2}\).

Hope it's clear.
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Is x a positive number? (1) (x – 2)^2 > 2 (2) 2^x > 3^x 17 Feb 2024, 02:25
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