If \(x\) and \(y\) are positive integers and

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BTGmoderatorLU: Moderator; Posts: 2505; Joined: Sun Oct 15, 2017 1:50 pm; Followed by:6 members

If \(x\) and \(y\) are positive integers and

by BTGmoderatorLU » Fri Aug 02, 2019 3:13 pm

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Source: Manhattan Prep

If \(x\) and \(y\) are positive integers and \(\frac{1620x}{y^2}\) is the square of an odd integer, what is the smallest possible value of \(xy\)?

A. 1
B. 8
C. 10
D. 15
E. 28

The OA is C

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Source: Beat The GMAT — Problem Solving | Fri Aug 02, 2019 3:13 pm

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Ian Stewart: GMAT Instructor; Posts: 2623; Joined: Mon Jun 02, 2008 3:17 am; Location: Montreal; Thanked: 1090 times; Followed by:355 members; GMAT Score:780

by Ian Stewart » Sun Aug 04, 2019 5:22 am

1620 = (4)(405) = (4)(81)(5) = (2^2)(3^4)(5)

So if (2^2)(3^4)(5)x / y^2 is going to be odd, the 2^2 needs to cancel, and y^2 needs to be divisible by 2^2, so y needs to be divisible by 2. If we're going to end up with a perfect square, we'll need an even exponent on the '5' after we multiply by x, so x needs to be divisible by 5. Since we want the minimum values of x and y, those values are 2 and 5 (we'll then get the odd square 3^4*5^2 = 45^2), and their smallest possible product is 10.

For online GMAT math tutoring, or to buy my higher-level Quant books and problem sets, contact me at ianstewartgmat at gmail.com

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Scott@TargetTestPrep: GMAT Instructor; Posts: 8086; Joined: Sat Apr 25, 2015 10:56 am; Location: Los Angeles, CA; Thanked: 43 times; Followed by:29 members

by Scott@TargetTestPrep » Sun Aug 11, 2019 6:15 pm

BTGmoderatorLU wrote:Source: Manhattan Prep

If \(x\) and \(y\) are positive integers and \(\frac{1620x}{y^2}\) is the square of an odd integer, what is the smallest possible value of \(xy\)?

A. 1
B. 8
C. 10
D. 15
E. 28

The OA is C

In order for 1620x/y^2 to be a perfect square, 1620x has to be a perfect square also (since y^2 is a perfect square).

Since 1620 = 162 x 10 = 81 x 2 x 10 = 2^2 x 3^4 x 5^1, we see that in order for 1620x to be the smallest perfect square, x must be 5. Now, if y^2 = 2^2, then 1620x/y^2 = 3^4 * 5^2 is indeed the square of an odd integer. So we see that y = 2 and therefore, xy = 5 * 2 = 10.

Answer: C

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