Find the total number of ways
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Hi nahid078,
What is the source of this question? I ask because you have not included the 5 answer choices, the prompt isn't written in proper GMAT 'style' and it's written with few details - for example, are the balls distinguishable from one another or are they 20 identical balls. Those details would impact the math needed to solve.
GMAT assassins aren't born, they're made,
Rich
What is the source of this question? I ask because you have not included the 5 answer choices, the prompt isn't written in proper GMAT 'style' and it's written with few details - for example, are the balls distinguishable from one another or are they 20 identical balls. Those details would impact the math needed to solve.
GMAT assassins aren't born, they're made,
Rich
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Hello Rich,[email protected] wrote:Hi nahid078,
What is the source of this question? I ask because you have not included the 5 answer choices, the prompt isn't written in proper GMAT 'style' and it's written with few details - for example, are the balls distinguishable from one another or are they 20 identical balls. Those details would impact the math needed to solve.
GMAT assassins aren't born, they're made,
Rich
Thanks for responding
Its from a tutorial video. The answer is given 20*4^19. I didn't understand the explanation well. so i thought anyone might explain it well here.
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Hi nahid078,
If we're meant to assume that the 20 balls are unique (meaning that there are no 'duplicates'), then here's how the math works:
Since we have 20 balls, there are 20 different ways to put 1 ball in the first box. After placing that first ball (whichever one it is), each of the remaining 19 balls could be placed in any of the other 4 boxes. With each additional ball, you have to multiply the total by 4. 19 balls = 4^19.
Final Answer: [spoiler] (20)(4^19)[/spoiler]
GMAT assassins aren't born, they're made,
Rich
If we're meant to assume that the 20 balls are unique (meaning that there are no 'duplicates'), then here's how the math works:
Since we have 20 balls, there are 20 different ways to put 1 ball in the first box. After placing that first ball (whichever one it is), each of the remaining 19 balls could be placed in any of the other 4 boxes. With each additional ball, you have to multiply the total by 4. 19 balls = 4^19.
Final Answer: [spoiler] (20)(4^19)[/spoiler]
GMAT assassins aren't born, they're made,
Rich
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[email protected] wrote:Hi nahid078,
If we're meant to assume that the 20 balls are unique (meaning that there are no 'duplicates'), then here's how the math works:
Since we have 20 balls, there are 20 different ways to put 1 ball in the first box. After placing that first ball (whichever one it is), each of the remaining 19 balls could be placed in any of the other 4 boxes. With each additional ball, you have to multiply the total by 4. 19 balls = 4^19.
Final Answer: [spoiler] (20)(4^19)[/spoiler]
GMAT assassins aren't born, they're made,
Rich
Thanks for your reply. I have a question if you don't mind. if it was said that 2 balls in the 1st box would the answer be 20c2*4^18.
Thanks again
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Hi nahid078,
Yes - since the 'order' in which the first two balls were placed in the first box would NOT matter, we would have to deal with that part of the calculation by using the Combination Formula. The other 18 balls can be accounted for by 4^18.
GMAT assassins aren't born, they're made,
Rich
Yes - since the 'order' in which the first two balls were placed in the first box would NOT matter, we would have to deal with that part of the calculation by using the Combination Formula. The other 18 balls can be accounted for by 4^18.
GMAT assassins aren't born, they're made,
Rich
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We actually need to know whether the balls are distinct or not, so this isn't a great question. (The answers are different (i) if all the balls are identical or (ii) they're all distinct or (iii) some of them are, some of them aren't.)
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