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Updated on: 23 Sep 2013, 05:58
Originally posted by imhimanshu on 23 Sep 2013, 05:55.
Last edited by Bunuel on 23 Sep 2013, 05:58, edited 1 time in total.
Last edited by Bunuel on 23 Sep 2013, 05:58, edited 1 time in total.
Renamed the topic and edited the question.
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The integers r, s and t all have the same remainder when divided by 5. What is the value of t?
(1) r + s = t
(2) 20 <= t <= 24
(1) r + s = t
(2) 20 <= t <= 24
Solving this question helps.
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23 Sep 2013, 06:31
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The integers r, s and t all have the same remainder when divided by 5. What is the value of t?
Where the remainder x is \(0\leq{x}<5\).
(1) r + s = t --> \((5a+x)+(5b+x)=5c+x\) --> \(x=5(c-a-b)\) --> the remainder (x) is a multiple of 5, thus it's 0 --> r, s and t are multiples of 5. Not sufficient.
(2) 20 <= t <= 24. Clearly insufficient.
(1)+(2) There is only one multiple of 5 between 20 and 24, inclusive, namely 20. Sufficient.
Answer: C.
Hope it's clear.
- \(r=5a+x\)
\(s=5b+x\)
\(t=5c+x\)
Where the remainder x is \(0\leq{x}<5\).
(1) r + s = t --> \((5a+x)+(5b+x)=5c+x\) --> \(x=5(c-a-b)\) --> the remainder (x) is a multiple of 5, thus it's 0 --> r, s and t are multiples of 5. Not sufficient.
(2) 20 <= t <= 24. Clearly insufficient.
(1)+(2) There is only one multiple of 5 between 20 and 24, inclusive, namely 20. Sufficient.
Answer: C.
Hope it's clear.
26 Dec 2013, 22:50
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rh410
The question: when r,t,s are divided by 5, they yield the same remainder.
Remember that when X is divided by 5, the remainder must be 0,1,2,3,4 ( remainder must always be smaller than divisor)
If r and s has the same remainder, for example 1, then t can not have remainder 1 (21+11=32, remainder of the total (32) is the sum of remainders of 11 and 21, it equals 2 actually). So for the remainder to be the same, r,t and s must be multiples of 5 (20+10=30)
