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24 Apr 2018, 23:30
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C
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
65%
(hard)
Question Stats:
63% (02:49) correct
37%
(03:02)
wrong
based on 662
sessions
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The remainder when positive integer N is divided by 2 is 1, when divided by 3 is 2, when divided by 4 is 3, and when divided by 5 is 4. What is the sum of the digits of the least possible value of N?
(A) 11
(B) 13
(C) 14
(D) 16
(E) 17
(A) 11
(B) 13
(C) 14
(D) 16
(E) 17
13 May 2018, 03:30
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For remainder by 5 to be 4 we need to have unit digit either 4 or 9
If unit digit is 4 then that number is always divisible by 2 so this possibility is out
We need to find number with unit digit 9
Possible numbers are-19,29,39,49,59,69,79,89,99
9 is discarded as sum in options is at least 11
39,69,99 are divisible by 3 so not possible
19,49,79 give remainder 1 by 3 so out
Among Number(29,59,89)above only 59 fulfill criteria
So sum is 14
Give kudos if it helps
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If unit digit is 4 then that number is always divisible by 2 so this possibility is out
We need to find number with unit digit 9
Possible numbers are-19,29,39,49,59,69,79,89,99
9 is discarded as sum in options is at least 11
39,69,99 are divisible by 3 so not possible
19,49,79 give remainder 1 by 3 so out
Among Number(29,59,89)above only 59 fulfill criteria
So sum is 14
Give kudos if it helps
Posted from my mobile device
24 Apr 2018, 23:49
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Solution
Given:
• N is a positive integer
• When N is divided by 2, 3, 4, and 5, the remainders are 1, 2, 3, and 4 respectively
To find:
• The sum of the digits of the least possible value of N
Approach and Working:
• The number N can be written as:
- o N = 2a + 1 = 2a + 2 – 1 = 2(a+1) – 1 = 2a’ – 1
- o N = 3b + 2 = 3b’ – 1
- o N = 4c + 3 = 4c’ – 1
- o N = 5d + 4 = 5d’ – 1
Or, least (N) = 60 – 1 = 59
• Sum of digits of least (N) = 5 + 9 = 14
Hence, the correct answer is Option C.
Answer: C
thanks! 
