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Updated on: 17 Jul 2015, 03:58
Originally posted by mainhoon on 15 Sep 2010, 14:04.
Last edited by ENGRTOMBA2018 on 17 Jul 2015, 03:58, edited 1 time in total.
Last edited by ENGRTOMBA2018 on 17 Jul 2015, 03:58, edited 1 time in total.
Edited the question, added the OA and tags
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Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
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34% (02:29) correct
66%
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When the number 777 is divided by the integer N, the remainder is 77. How many integer possibilities are there for N?
A. 2
B. 3
C. 4
D. 5
E. 6
A. 2
B. 3
C. 4
D. 5
E. 6
15 Sep 2010, 14:20
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mainhoon
I think it should me mentioned that \(n\) is a positive integer.
Positive integer \(a\) divided by positive integer \(d\) yields a reminder of \(r\) can always be expressed as \(a=qd+r\), where \(q\) is called a quotient and \(r\) is called a remainder, note here that \(0\leq{r}<d\) (remainder is non-negative integer and always less than divisor).
So we'd have: \(777=qn+77\), where \(remainder=77<n=divisor\) --> \(qn=700=2^2*5^2*7\) --> as \(n\) must be more than 77 then \(n\) could take only 5 values: 100, 140, 175, 350, and 700.
Answer: 5.
29 Jun 2013, 12:09
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hirendhanak
One way to think about this that might help is the following:
You know that the feasible factors of 700 must be in a range above 77. Thus start breaking down 700 "from the top":
700 x 1
350 x 2
175 x 4
140 x 5
100 x 7
The next one, 70 x 10, is already out of range. That gives you 5 factors.
