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28 Apr 2020, 07:39
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A
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70% (01:53) correct
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November 16, 2001, was a Friday. If each of the years 2004, 2008, and 2012 had 366 days, and the remaining years from 2001 through 2014 had 365 days, what day of the week was November 16, 2014 ?
A. Sunday
B. Monday
C. Tuesday
D. Wednesday
E. Thursday
PS91151.02
A. Sunday
B. Monday
C. Tuesday
D. Wednesday
E. Thursday
PS91151.02
10 May 2020, 12:21
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parkhydel
We see that there is a 13-year span from November 16, 2001 to November 6, 2014. If each year were 365 days, the total number of days in this 13-year span would be 365 x 13 = 4,745 days. However, since 3 of the years during this span each has 1 extra day, the actual number of days in this span is 4,745 + 3 = 4,748 days. Since 4,748/7 = 678 R 2, we know that there were 678 weeks and 2 days from Friday, November 16, 2001 until November 16, 2014. The remainder of 2 tells us that November 16, 2014 was 2 days after Friday, so it was Sunday.
Answer: A
parkhydel
01 _02 _03 _04 _05 _06 _07_ 08 _ 09 _ 10 __ 11 __12 __ 13_ 14
Fri |+1 |+2 |+4 |+5 |+6 |+7 |+9 |+10 |+11 |+12 |+14 |+15 |+16 i.e.
Cumulative days added is 16
\(\frac{16}{7}\) gives remainder of 2.
So, Friday + 2 = Sunday
Answer A.
This can be tagged as 'Remainder' though.
Note: Here +1 and +2 are remainders left when 365 and 366 are divided by 7 respectively. The remainders total 16 and thus again dividing by 7 leaves us with a remainder 2.
