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27 Apr 2020, 15:43
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D
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Difficulty:
45%
(medium)
Question Stats:
74% (02:23) correct
26%
(02:28)
wrong
based on 3267
sessions
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Not Attempted Yet
The United States mint produces coins in 1-cent, 5-cent, 10-cent, 25-cent, and 50-cent denominations. If a jar contains exactly 100 cents worth of these coins, which of the following could be the total number of coins in the jar?
I. 91
II. 81
III. 76
A. I only
B. II only
C. III only
D. I and III only
E. I, II, and III
PS39160.02
I. 91
II. 81
III. 76
A. I only
B. II only
C. III only
D. I and III only
E. I, II, and III
PS39160.02
12 May 2020, 23:57
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The question is testing logical use of very basic divisibility.
1c, 5c, 10c, 25c, 50c
Total = 100 cents
If I am to use minimum number of coins, I can take 2 50c coins to make 100.
If I am to use maximum number of coins, I can take 100 1c coins.
We will need to evaluate each option.
I. 91
This is simple. We need to use many coins so we will use many 1c coins. If we use 90 1c coins and 1 10c coin, we get 100 cents using 91 coins. Done.
II. 81
Let's try the same process. Again, many coins so say 80 1c coins. But we don't have a 20c coin.
Then how about 75 1c coins? Note that you will need to reduce the 1c coins by a number which is a multiple of 5 since all other values are multiples of 5. Now you have to make 25c using 6 coins. But you need only 5 5c coins to make 25 so not possible.
How about 70 1c coins? Now you have to make 30 cents using 11 coins! Again, too many coins. Note the pattern - every time you reduce the number of 1c coins, by 5, you need only 1 extra coin to make the 5c but you will get 5 extra coins that you need to account for. Hence this is not possible.
III. 76
Simple. 75 1c coins and 1 25c coin make 100 cents.
Answer (D)
28 Apr 2020, 03:44
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parkhydel
We can quickly evaluate the options if we consider the following. Since 100 is a multiple of 5 and the combined value of any group of not-1-cent coins is also a multiple of 5, the number of 1-cent coins must be a multiple of 5 as well.
I. \((\checkmark)\) We can have 90 1-cent coins and 1 10-cent coin.
II. \((X)\) 80 1-cent coins is impossible because we would need 1 20-cent coin. 75 1-cent coins is also impossible because the 6 additional coins would have a minimum value of 60 cents (6 10-cent coins) and thus the total value of the coins would be over 100 cents. Clearly, even smaller numbers of 1-cent coins are all impossible.
III. \((\checkmark)\) We can have 75 1-cent coins and 1 25-cent coin.
Answer: D
