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805+ (Hard)|   Algebra|   Exponents|   Inequalities|      
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Bunuel
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If x and y are integers, what is the value of xy? (1) x^2 - y^2 < 0 20 Apr 2018, 06:38
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E
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95% (hard)

Question Stats:

37% (02:00) correct 63% (01:45) wrong based on 171 sessions

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If x and y are integers, what is the value of xy?


(1) \(x^2 - y^2 < 0\)

(2) \(x^y = \frac{1}{16}\)
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E
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Tulkin987
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If x and y are integers, what is the value of xy? (1) x^2 - y^2 < 0 20 Apr 2018, 07:05
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Bunuel
If x and y are integers, what is the value of xy?


(1) \(x^2 - y^2 < 0\)

(2) \(x^y = \frac{1}{16}\)
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Statement (1) clearly is not sufficient, because x and y can take multiple integer values.

If we solve statement (2) for integer values of x and y, we result in \((16; -1)\), \((4; -2)\) and \((2; -4)\). Still, not sufficient.

If we take both statements together, only \((2; -4)\) satisfies given conditions. Hence \(x*y=2*-4=-8\).

Answer: C
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If x and y are integers, what is the value of xy? (1) x^2 - y^2 < 0 20 Apr 2018, 21:06
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St1:
(x-y)(x+y)<0
insufficient

St 2
(2)^-4, (-2)^-4, (4)^-2, (-4)^-2, 16^-1
multiple values of xy
insufficient

Combining
x=+2,-2 correspondingly y=-4
xy=+8,-8

IMO E
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If x and y are integers, what is the value of xy? (1) x^2 - y^2 < 0 14 May 2018, 10:48
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Bunuel
If x and y are integers, what is the value of xy?


(1) \(x^2 - y^2 < 0\)

(2) \(x^y = \frac{1}{16}\)
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Bunuel

Hi Bunuel, can you please explain where am i going wrong?

From 1, we get -y<x<y
From 2, we get, 4^-2, 2^-4 and 16^-1

We can discard 4^-2 and 16^-1 as clearly they do not satisfy 1
Now, in 2^-4, x=2 and y=-4. So -y=4. So here too we see that 4!<2!<-4, that is -y!<x!<y. Hence 1 is not satisfied though I understand that 1 essentially means x lies between y and -y.
Though 2^-4 satisfies 1 logically, it does not do so mathematically. Hence, the answer should be E and not B

Please explain .
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ColumbiaEMBA
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If x and y are integers, what is the value of xy? (1) x^2 - y^2 < 0 14 May 2018, 13:55
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Tulkin987
Bunuel
If x and y are integers, what is the value of xy?


(1) \(x^2 - y^2 < 0\)

(2) \(x^y = \frac{1}{16}\)

Statement (1) clearly is not sufficient, because x and y can take multiple integer values.

If we solve statement (2) for integer values of x and y, we result in \((16; -1)\), \((4; -2)\) and \((2; -4)\). Still, not sufficient.

If we take both statements together, only \((2; -4)\) satisfies given conditions. Hence \(x*y=2*-4=-8\).

Answer: C
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1 is insufficient by itself, you're right there.
For 2, consider the following:

x and y can take on the following values to equal \frac{1}{16}: (2, -4), (-2, -4), (16, -1), (4, -2). This makes 2 by itself insufficient.

If you combine 1 and 2:
\(2^2 - (-4)^2\) = 4 - 16 = -12
\((-2)^2 - (-4)^2\) = 4 - 16 = -12

You have 2 possible answer which makes C insufficient. Correct answer therefore must be E.
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ColumbiaEMBA
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If x and y are integers, what is the value of xy? (1) x^2 - y^2 < 0 14 May 2018, 13:58
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aviejay
Bunuel
If x and y are integers, what is the value of xy?


(1) \(x^2 - y^2 < 0\)

(2) \(x^y = \frac{1}{16}\)

Bunuel

Hi Bunuel, can you please explain where am i going wrong?

From 1, we get -y<x<y
From 2, we get, 4^-2, 2^-4 and 16^-1

We can discard 4^-2 and 16^-1 as clearly they do not satisfy 1
Now, in 2^-4, x=2 and y=-4. So -y=4. So here too we see that 4!<2!<-4, that is -y!<x!<y. Hence 1 is not satisfied though I understand that 1 essentially means x lies between y and -y.
Though 2^-4 satisfies 1 logically, it does not do so mathematically. Hence, the answer should be E and not B

Please explain .
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The correct answer is E. Also, don't forget \((-4)^{-2}\)
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If x and y are integers, what is the value of xy? (1) x^2 - y^2 < 0 15 May 2018, 21:28
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Tulkin987
Bunuel
If x and y are integers, what is the value of xy?


(1) \(x^2 - y^2 < 0\)

(2) \(x^y = \frac{1}{16}\)

Statement (1) clearly is not sufficient, because x and y can take multiple integer values.

If we solve statement (2) for integer values of x and y, we result in \((16; -1)\), \((4; -2)\) and \((2; -4)\). Still, not sufficient.

If we take both statements together, only \((2; -4)\) satisfies given conditions. Hence \(x*y=2*-4=-8\).

Answer: C

1 is insufficient by itself, you're right there.
For 2, consider the following:

x and y can take on the following values to equal \frac{1}{16}: (2, -4), (-2, -4), (16, -1), (4, -2). This makes 2 by itself insufficient.

If you combine 1 and 2:
\(2^2 - (-4)^2\) = 4 - 16 = -12
\((-2)^2 - (-4)^2\) = 4 - 16 = -12

You have 2 possible answer which makes C insufficient. Correct answer therefore must be E.
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You said there are two possible answers but the question asked was x*y which is -12 always. Hence why not C. Did i forget some other case
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If x and y are integers, what is the value of xy? (1) x^2 - y^2 < 0 15 May 2018, 21:36
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ruchik789

You said there are two possible answers but the question asked was x*y which is -12 always. Hence why not C. Did i forget some other case
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X *Y does not equal -12. THe equation when you plug in different values for X and Y does. In my example, X is 2 and -2 and Y is -4. When you multiply them, you get different answers. Let me know if this is still confusing.
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If x and y are integers, what is the value of xy? (1) x^2 - y^2 < 0 22 Jun 2018, 17:53
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(1)
\(x^2-y^2<0\)
\(x^2<y^2\)
\(|x|<|y|\)
Magnitude of y is more than magnitude of x. However we dont know the exact values of x and y.
Not sufficient

(2)
\(x^y=\frac{1}{16}\)
We can have x=-2 and y=-4, or x=2 and y=-4. Both of these satisfy (2). Notice that they also satisfy (1).

Answer: E
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If x and y are integers, what is the value of xy? (1) x^2 - y^2 < 0 29 Sep 2022, 03:23
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