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08 Oct 2019, 17:08
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Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
95%
(hard)
Question Stats:
36% (02:22) correct
64%
(02:28)
wrong
based on 587
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Find the number of integer solutions to |a| + |b| + |c| = 10, where none of a, b or c is 0.
A. 36
B. 72
C. 144
D. 288
E. 576
A. 36
B. 72
C. 144
D. 288
E. 576
09 Oct 2019, 10:48
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First, lets assume that a,b,c are all +ve to simplify the question.
The three numbers can have the following combinations:
118 --> with 3 rearrangements ( because 1 is repeated, the possibilities = \(\frac{3!}{2!} = 3\))
127 --> with 6 rearrangements (because all numbers are different, the possibilities = \(3! = 6\))
136 --> with 6 rearrangements
145 --> with 6 rearrangements
226 --> with 3 rearrangements
235 --> with 6 rearrangements
244 --> with 3 rearrangements
334 --> with 3 rearrangements
Total = 36
(the above part is similar to another interesting counting question mentioned here: (https://gmatclub.com/forum/in-how-many-ways-10-identical-chocolates-be-distributed-among-3-child-307384.html#p2375066)
However, each of a,b,c can be either +ve or -ve,
so the combined possibilities of the signs = 2*2*2 = 8
for details, (a,b,c) can be:
(+,+,+)
(+,+,-)
(+,-,+)
(-,+,+)
(+,-,-)
(-,+,-)
(-,-,+)
(-,-,-)
8 possibilities
so the total number of possibilities = 36*8 = 288
D
The three numbers can have the following combinations:
118 --> with 3 rearrangements ( because 1 is repeated, the possibilities = \(\frac{3!}{2!} = 3\))
127 --> with 6 rearrangements (because all numbers are different, the possibilities = \(3! = 6\))
136 --> with 6 rearrangements
145 --> with 6 rearrangements
226 --> with 3 rearrangements
235 --> with 6 rearrangements
244 --> with 3 rearrangements
334 --> with 3 rearrangements
Total = 36
(the above part is similar to another interesting counting question mentioned here: (https://gmatclub.com/forum/in-how-many-ways-10-identical-chocolates-be-distributed-among-3-child-307384.html#p2375066)
However, each of a,b,c can be either +ve or -ve,
so the combined possibilities of the signs = 2*2*2 = 8
for details, (a,b,c) can be:
(+,+,+)
(+,+,-)
(+,-,+)
(-,+,+)
(+,-,-)
(-,+,-)
(-,-,+)
(-,-,-)
8 possibilities
so the total number of possibilities = 36*8 = 288
D
12 Jun 2021, 09:16
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This type of problem, where essentially we're trying to find how many positive integer solutions there are to an equation like "a + b + c = 10" (or any other equation where positive integers sum to a number) is known as a "partition problem" in combinatorics. I've never once seen a partition problem in official GMAT materials, so it's not likely this will be important to understand. If we draw ten dots:
• • • • • • • • • •
and then we insert two partitions in random places, between different pairs of dots, e.g. like this:
• • • | • • | • • • • •
then, counting dots on each side of a partition, we create a solution to the equation a + b + c = 10. So the diagram above illustrates the solution 3 + 2 + 5 = 10. The number of different positive integer solutions to "a + b + c = 10" will equal the number of ways we can insert two partitions in the middle of 10 dots. And we have 9 spaces between dots, so 9 choices for where to put the first partition. Since our partitions can't go in the same place (a, b and c cannot be zero, so we must have at least one dot between two partitions), we only have 8 choices for where to put the second partition. But if we flip the positions of our two partition markers, our diagram stays unchanged, so the order of the two partitions doesn't matter, so we must divide by 2!. So we have (9)(8)/2! = 36 ways to place the partitions, and there are thus 36 distinct positive integer solutions to the equation a + b + c = 10.
Since we have two choices for the sign of a, two choices for the sign of b, and two choices for the sign of c if we want nonzero integer solutions to |a| + |b| + |c| = 10, we have (2)(2)(2)(36) = 288 solutions in total.
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• • • • • • • • • •
and then we insert two partitions in random places, between different pairs of dots, e.g. like this:
• • • | • • | • • • • •
then, counting dots on each side of a partition, we create a solution to the equation a + b + c = 10. So the diagram above illustrates the solution 3 + 2 + 5 = 10. The number of different positive integer solutions to "a + b + c = 10" will equal the number of ways we can insert two partitions in the middle of 10 dots. And we have 9 spaces between dots, so 9 choices for where to put the first partition. Since our partitions can't go in the same place (a, b and c cannot be zero, so we must have at least one dot between two partitions), we only have 8 choices for where to put the second partition. But if we flip the positions of our two partition markers, our diagram stays unchanged, so the order of the two partitions doesn't matter, so we must divide by 2!. So we have (9)(8)/2! = 36 ways to place the partitions, and there are thus 36 distinct positive integer solutions to the equation a + b + c = 10.
Since we have two choices for the sign of a, two choices for the sign of b, and two choices for the sign of c if we want nonzero integer solutions to |a| + |b| + |c| = 10, we have (2)(2)(2)(36) = 288 solutions in total.
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