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15 Dec 2020, 19:00
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B
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Difficulty:
45%
(medium)
Question Stats:
72% (02:18) correct
28%
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wrong
based on 325
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12 Days of Christmas GMAT Competition with Lots of Fun
On a San Diego Comic-Con, Sheldon bought all 72 identical collectible Mr. Spock action figures. He paid a total of $a6,79b where a is the ten thousands digit and b is the units digit. If each figure cost the same and the cost in dollars was an integer, what is the value of a + b ?
A. 4
B. 5
C. 6
D. 9
E. 10
M37-74
On a San Diego Comic-Con, Sheldon bought all 72 identical collectible Mr. Spock action figures. He paid a total of $a6,79b where a is the ten thousands digit and b is the units digit. If each figure cost the same and the cost in dollars was an integer, what is the value of a + b ?
A. 4
B. 5
C. 6
D. 9
E. 10
M37-74
Attachment:
MV5BMTM2ODk4ODMwM15BMl5BanBnXkFtZTcwMDI3MDE2Nw@@._V1_.jpg
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01 Dec 2021, 06:01
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Official Solution:
On a San Diego Comic-Con, Sheldon bought all 72 identical collectible Mr. Spock action figures. He paid a total of \($a6,79b\) where \(a\) is the ten thousands digit and \(b\) is the units digit. If each figure cost the same and the cost in dollars was an integer, what is the value of \(a + b\) ?
A. \(4\)
B. \(5\)
C. \(6\)
D. \(9\)
E. \(10\)
To solve this question, we should know divisibility rule for 8 and 9.
Divisibility rule for \(2^n\):
An integer is divisible by 2 if its last digit is divisible by 2.
An integer is divisible by 4 if its last two digits is divisible by 4.
An integer is divisible by 8 if its last three digits is divisible by 8.
...
Generally, an integer is divisible by \(2^n\) if its last \(n\) digits is divisible by \(2^n\). ...
Divisibility rule for \(9\):
The rule for divisibility by 9 is similar to divisibility rule for 3. That is, if the sum of digits of the number is divisible by 9, then the number itself is divisible by 9.
Back to the question:
We are given that \(72*p=a6,79b\), where \(p\) is an integer price of each figure.
\(p=\frac{a6,79b}{8*9}=integer\). So, \(a6,79b\) must be divisible by both 8 and 9.
According to the rule above, \(a6,79b\) will be divisible by 8, whenever \(79b\) is divisible by 8. 800 is divisible by 8, next smallest number divisible by 8 is 792, so \(b=2\)
\(a6,79b\) will be divisible by 9, if \(a+6+7+9+b=a+6+7+9+2=24+a\) is divisible by 9, so when \(a=3\).
Hence, \(a+b=2+3=5\).
Answer: B
On a San Diego Comic-Con, Sheldon bought all 72 identical collectible Mr. Spock action figures. He paid a total of \($a6,79b\) where \(a\) is the ten thousands digit and \(b\) is the units digit. If each figure cost the same and the cost in dollars was an integer, what is the value of \(a + b\) ?
A. \(4\)
B. \(5\)
C. \(6\)
D. \(9\)
E. \(10\)
To solve this question, we should know divisibility rule for 8 and 9.
Divisibility rule for \(2^n\):
An integer is divisible by 2 if its last digit is divisible by 2.
An integer is divisible by 4 if its last two digits is divisible by 4.
An integer is divisible by 8 if its last three digits is divisible by 8.
...
Generally, an integer is divisible by \(2^n\) if its last \(n\) digits is divisible by \(2^n\). ...
Divisibility rule for \(9\):
The rule for divisibility by 9 is similar to divisibility rule for 3. That is, if the sum of digits of the number is divisible by 9, then the number itself is divisible by 9.
Back to the question:
We are given that \(72*p=a6,79b\), where \(p\) is an integer price of each figure.
\(p=\frac{a6,79b}{8*9}=integer\). So, \(a6,79b\) must be divisible by both 8 and 9.
According to the rule above, \(a6,79b\) will be divisible by 8, whenever \(79b\) is divisible by 8. 800 is divisible by 8, next smallest number divisible by 8 is 792, so \(b=2\)
\(a6,79b\) will be divisible by 9, if \(a+6+7+9+b=a+6+7+9+2=24+a\) is divisible by 9, so when \(a=3\).
Hence, \(a+b=2+3=5\).
Answer: B
General Discussion
15 Dec 2020, 19:22
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If a679b is perfectly divisible by 72, then it is divisible by 4,8,3 and 9. Applying divisibility rules for each:
1. Div by 4 only when b=2 or 6 ( last two digits divisible by 4 ie. 9b%4=0)
2. Doc by 8 only when b=2 ( last three digits divisible by 8 ie. 79b%4=0)
Now the number is a6792
3. Divisibility rule by 9: sum of digits is divisible by 9 (a+24 is multiple of 9) therefore a=3
Finally number is 36792
a+b = 5
Posted from my mobile device
1. Div by 4 only when b=2 or 6 ( last two digits divisible by 4 ie. 9b%4=0)
2. Doc by 8 only when b=2 ( last three digits divisible by 8 ie. 79b%4=0)
Now the number is a6792
3. Divisibility rule by 9: sum of digits is divisible by 9 (a+24 is multiple of 9) therefore a=3
Finally number is 36792
a+b = 5
Posted from my mobile device
