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marcodonzelli
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When positive integer x is divided by 5, the remainder is 3; Updated on: 03 Mar 2024, 23:12
Originally posted by marcodonzelli on 12 Mar 2008, 13:16.
Last edited by gmatophobia on 03 Mar 2024, 23:12, edited 1 time in total.
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When positive integer x is divided by 5, the remainder is 3; and when x is divided by 7, the remainder is 4. When positive integer y is divided by 5, the remainder is 3; and when y is divided by 7, the remainder is 4. If x > y, which of the following must be a factor of x - y?

(A) 12
(B) 15
(C) 20
(D) 28
(E) 35­

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Bunuel
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When positive integer x is divided by 5, the remainder is 3; 13 Jan 2012, 10:31
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Baten80
Trial and error method is lengthy than the equation method provided by bigtreezl.
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The way to derive general formula is described in the solution below:

When positive integer x is divided by 5, the remainder is 3; and when x is divided by 7, the remainder is 4. When positive integer y is divided by 5, the remainder is 3; and when y is divided by 7, the remainder is 4. If x > y, which of the following must be a factor of x - y?

(A) 12
(B) 15
(C) 20
(D) 28
(E) 35

When a positive integer x is divided by 5 and 7, the remainders are 3 and 4, respectively: \(x = 5q + 3\) (where x could be 3, 8, 13, 18, 23, ...) and \(x = 7p + 4\) (where x could be 4, 11, 18, 25, ...).

A general formula can be derived from the above two statements:

The divisor will be the least common multiple of the two divisors 5 and 7, hence 35.

The remainder will be the first common integer in the two patterns, hence 18. Therefore, to satisfy both conditions, x must be of the form x = 35m + 18 (where x could be 18, 53, 88, ...).

The same applies to y (as the same information is given about y): \(y = 35n + 18\).

Henxe, \(x-y=(35m+18)-(35n+18)=35(m-n)\). Therefore, x - y must be a multiple of 35.

Answer: E.

More about this concept:

https://gmatclub.com/forum/manhattan-re ... ve#p721341
https://gmatclub.com/forum/good-problem ... ve#p722552


Hope it helps.­
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When positive integer x is divided by 5, the remainder is 3; 11 May 2008, 10:19
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Hi , I tried two ways of reaching the answer and I get E 35. Not sure if this is right though :? !

For x we have two equations:

x=3+5m
x=4+7n

Similarly for y:

y=3+5l
4= 4 +7j

x-y =3+5m - (3+5l)
=5(m-l)

x-y = 4+7n -(4+7j)
= 7(n-j)
7 and 5 are factors of x-y, therefore 7*5 =35 must be a factor of x-y.


Another way I tried to solve this is by using numbers, If x=3+5m, then c must be a number with units digit 8 or 3
since x=7 +5n , the values of x that satisfy these two equations are 18 and 53,

since y has similar rules and x>y; x=53 and y =18,
x-y= 53-18 =35, therefore 35 must be a factor of x-y.
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When positive integer x is divided by 5, the remainder is 3; 14 Mar 2008, 20:18
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35

Interesting thing to note here is it doesn't matter what the reminders are, the only thing that matters is if the reminders are same for x and y when devided by the same number.

x can be written as 5a+3 or 7b+4
y can be written as 5c+3 or 7d+4
x-y=5(a-c) or 7(b-d)
take LCM of 5 and 7 = 35 (it's easy here bacause both are prime)
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When positive integer x is divided by 5, the remainder is 3; 12 May 2008, 17:49
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Agree with E

Remainder 3: x = 3 8 13 18 23 28 33 38 .... 53 58
Remainder 4: x = 4 11 18 25 ... 53

Remainder 3: y = 3 8 13 18 23 28 33 38 .... 53 58
Remainder 4: y = 4 11 18 25 ... 53

values of 18 and 53 are valid for x and y

x > y so x = 53, y = 18

x - y = 35
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When positive integer x is divided by 5, the remainder is 3; 07 Nov 2008, 04:59
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x = 5a + 3 = 7b + 4
y = 5c + 3 = 7d + 4
x-y = 5(a-c) = 7(b-d)

Since, 5 and 7 are prime number, hence 5*7 must be a factor of (x-y).
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When positive integer x is divided by 5, the remainder is 3; 27 Aug 2009, 07:55
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The difference must be the multiple of 35, which is LCM of 5 and 7.
1) In order for x and y to leave the same remainder when divided by 5, the gap between two numbers should be a multiple of 5.
2)In order for x and y to leave the same remainder when divided by 7, the gap between two numbers should be a multiple of 7.
But x and y leave the same remainders when divided by both 5 and 7...so the gap between x and y should be a multiple of 5 AND a multiple of 7 or simply it should be a multiple of 35, which is LCM (5,7).

The only number that is a multiple of 35 is E, hence E is an answer.
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When positive integer x is divided by 5, the remainder is 3; 27 Aug 2009, 09:39
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Lets find out some numbers which leaves a reminder of 3 when divided by 5.

3,8,13,18,23,28,33,38,43,48,53,58,63,68,73,78,83,88

out of these numbers,

numbers which leaves a reminder of 4 when divided by 7 are

18,53,88....


as x is greater than y..

hence, if x = 18 , then y = 53
and if x = 53 , then y = 88 or if x = 18 , then y = 88

in all cases..

x-y is divisible by 35..

hence, answer is E..

Acc to me,in these kind of questions, plugging numbers is the best approach.
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When positive integer x is divided by 5, the remainder is 3; 06 Sep 2011, 20:08
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Here we are dealing with two numbers which give the same remainder by 5 and by 7. It's useful to know that if you were to list all such numbers, you would get an equally spaced list, where the numbers are separated by the LCM of 5 and 7, so by 35. So x-y must be divisible by 35 here.

Of course, you could come up with sample numbers if you weren't familiar with the underlying theory. We need two numbers which give a remainder of 3 when divided by 5, and a remainder of 4 when divided by 7. We can start by listing small numbers which give a remainder of 3 when divided by 5. This list is equally spaced, by 5, so it's straightforward to generate a long list quickly:

3, 8, 13, 18, 23, 28, 33, 38, 43, 48, 53, 58, 63, 68, ...

Now if you scan this list looking for numbers which give a remainder of 4 when divided by 7, you'll see that 18 and 53 both work. So it might be that x=53 and y=18, and their difference is 35, from which we also get answer E.
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When positive integer x is divided by 5, the remainder is 3; 13 Jan 2012, 09:32
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Trial and error method is lengthy than the equation method provided by bigtreezl.
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When positive integer x is divided by 5, the remainder is 3; 26 Jan 2024, 01:05
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Quote:
Divisor will be the least common multiple of above two divisors 5 and 7, hence \(35\).

Remainder will be the first common integer in above two patterns, hence \(18\) --> so, to satisfy both this conditions x must be of a type \(x=35m+18\) (18, 53, 88, ...);

The same for y (as the same info is given about y): \(y=35n+18\);
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Hi Bunuel , could u explain this concept in terms of grouping objects. Thanks a lot for all the posts as always.
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When positive integer x is divided by 5, the remainder is 3; 26 Jan 2024, 01:36
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Quote:
Divisor will be the least common multiple of above two divisors 5 and 7, hence \(35\).

Remainder will be the first common integer in above two patterns, hence \(18\) --> so, to satisfy both this conditions x must be of a type \(x=35m+18\) (18, 53, 88, ...);

The same for y (as the same info is given about y): \(y=35n+18\);

Hi Bunuel , could u explain this concept in terms of grouping objects. Thanks a lot for all the posts as always.
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I'm not entirely certain what you're referring to, but you can find additional information on remainders and similar questions in the links provided below:

Remainders



For other subjects:
ALL YOU NEED FOR QUANT ! ! !
Ultimate GMAT Quantitative Megathread

Similar questions:



Hope it helps.
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When positive integer x is divided by 5, the remainder is 3; 04 Mar 2024, 21:55
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marcodonzelli
When positive integer x is divided by 5, the remainder is 3; and when x is divided by 7, the remainder is 4. When positive integer y is divided by 5, the remainder is 3; and when y is divided by 7, the remainder is 4. If x > y, which of the following must be a factor of x - y?

(A) 12
(B) 15
(C) 20
(D) 28
(E) 35­

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Screenshot 2024-03-04 114120.png
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Here is a one minute solution to this problem.

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When positive integer x is divided by 5, the remainder is 3; 04 Mar 2024, 21:59
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Yes2GMAT

Quote:
Divisor will be the least common multiple of above two divisors 5 and 7, hence \(35\).

Remainder will be the first common integer in above two patterns, hence \(18\) --> so, to satisfy both this conditions x must be of a type \(x=35m+18\) (18, 53, 88, ...);

The same for y (as the same info is given about y): \(y=35n+18\);

Hi Bunuel , could u explain this concept in terms of grouping objects. Thanks a lot for all the posts as always.
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In addition to the links shared by Bunuel, you can also check out this video on grouping in division.

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When positive integer x is divided by 5, the remainder is 3; 21 Mar 2026, 10:16
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