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21 Sep 2019, 16:18
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Merle's spare change jar has exactly 16 U.S. coins, each of which is a 1-cent coin, a 5-cent coin, a 10-cent coin, a 25-cent coin, or a 50-cent coin. If the total value of the coins in the jar is 288 U.S. cents, how many 1-cent coins are in the jar?
(1) The exact numbers of 10-cent, 25-cent, and 50-cent coins among the 16 coins in the jar are, respectively, 6, 5, and 2.
(2) Among the 16 coins in the jar there are twice as many 10-cent coins as 1-cent coins.
DS56971.01
(1) The exact numbers of 10-cent, 25-cent, and 50-cent coins among the 16 coins in the jar are, respectively, 6, 5, and 2.
(2) Among the 16 coins in the jar there are twice as many 10-cent coins as 1-cent coins.
DS56971.01
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27 Sep 2019, 06:08
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total US coins = 16
types of coins = 1-cent,5-cent,10-cent,25-cent, and 50-cent
total value ofr coins = 288
how many 1-cent coins are in the jar?
STATEMENT (1)-The exact numbers of 10-cent, 25-cent, and 50-cent coins among the 16 coins in the jar are, respectively, 6, 5, and 2.
value of 6- 10-cent coin = 10*6 = 60
value of 5- 25-cent coin = 25*5 = 125
value of 2- 50-cent coin = 50*2 = 100
remaining value = total value of all coins - value of these 3 types of coins = 288-285 = 3
now we are left with 1-cent and 5-cent coins
5-cent coins are not possible because value of remaining coins = 3
so, there are 3 -- 1-cent coins in the jar
SUFFICIENT
STATEMENT (2)-Among the 16 coins in the jar there are twice as many 10-cent coins as 1-cent coins.
let's write all the possible combinations of 10-cent and 1-cent coins
1-cent coin = 1 then 10-cent coin = 2
value of these coins = 20+1 = 21
value of remaining coins = 288-21 = 267 (not the multiple of 5 or 10)
we cant get 267 from coins--5-cent,25-cent, and 50-cent (not possible)
1-cent coin = 2 then 10-cent coin = 4
value of these coins = 40+2 = 42
value of remaining coins = 288-42 = 246 (not the multiple of 5 or 10)
we cant get 246 from coins--5-cent,25-cent, and 50-cent (not possible)
1-cent coin = 3 then 10-cent coin = 6 (only possible value)
value of these coins = 60+3 = 63
value of remaining coins = 288-63 = 225 (multiple of 5)
we can get 225 from coins--5-cent,25-cent, and 50-cent
1-cent coin = 4 then 10-cent coin = 8
value of these coins = 80+4 = 84
value of remaining coins = 288-84 = 204 (not the multiple of 5 or 10)
we cant get 204 from coins--5-cent,25-cent, and 50-cent (not possible)
1-cent coin = 5 then 10-cent coin = 10
value of these coins = 100+5 = 105
value of remaining coins = 288-105 = 183 (not the multiple of 5 or 10)
we cant get 183 from coins--5-cent,25-cent, and 50-cent (not possible)
1-cent coin = 6 then 10-cent coin = 12 (not possible because total coin is 16)
how many 1-cent coins are in the jar?
--3
SUFFICIENT
D is the answer
types of coins = 1-cent,5-cent,10-cent,25-cent, and 50-cent
total value ofr coins = 288
how many 1-cent coins are in the jar?
STATEMENT (1)-The exact numbers of 10-cent, 25-cent, and 50-cent coins among the 16 coins in the jar are, respectively, 6, 5, and 2.
value of 6- 10-cent coin = 10*6 = 60
value of 5- 25-cent coin = 25*5 = 125
value of 2- 50-cent coin = 50*2 = 100
remaining value = total value of all coins - value of these 3 types of coins = 288-285 = 3
now we are left with 1-cent and 5-cent coins
5-cent coins are not possible because value of remaining coins = 3
so, there are 3 -- 1-cent coins in the jar
SUFFICIENT
STATEMENT (2)-Among the 16 coins in the jar there are twice as many 10-cent coins as 1-cent coins.
let's write all the possible combinations of 10-cent and 1-cent coins
1-cent coin = 1 then 10-cent coin = 2
value of these coins = 20+1 = 21
value of remaining coins = 288-21 = 267 (not the multiple of 5 or 10)
we cant get 267 from coins--5-cent,25-cent, and 50-cent (not possible)
1-cent coin = 2 then 10-cent coin = 4
value of these coins = 40+2 = 42
value of remaining coins = 288-42 = 246 (not the multiple of 5 or 10)
we cant get 246 from coins--5-cent,25-cent, and 50-cent (not possible)
1-cent coin = 3 then 10-cent coin = 6 (only possible value)
value of these coins = 60+3 = 63
value of remaining coins = 288-63 = 225 (multiple of 5)
we can get 225 from coins--5-cent,25-cent, and 50-cent
1-cent coin = 4 then 10-cent coin = 8
value of these coins = 80+4 = 84
value of remaining coins = 288-84 = 204 (not the multiple of 5 or 10)
we cant get 204 from coins--5-cent,25-cent, and 50-cent (not possible)
1-cent coin = 5 then 10-cent coin = 10
value of these coins = 100+5 = 105
value of remaining coins = 288-105 = 183 (not the multiple of 5 or 10)
we cant get 183 from coins--5-cent,25-cent, and 50-cent (not possible)
1-cent coin = 6 then 10-cent coin = 12 (not possible because total coin is 16)
how many 1-cent coins are in the jar?
--3
SUFFICIENT
D is the answer
16 Oct 2019, 12:02
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Statement 1-
Value of the coins of 10-cent, 25-cent, and 50-cent coins present in the jar= 6*10+5*25*+2*50=285
Value of the coins of 1-cent and 5-cent coins present in the jar= 288-285=3 cents
Only 1 case is possible, that is there are 3 coins of 1-cent and 0 coins of 5 cents in the jar
Sufficient
Statement 2- the total value of the coins in the jar is 288
Value of 5-cents, 10-cent, 25-cent, and 50-cent coins must be a multiple of 5
Hence value of 1-cent
= 288-5k
= 285-5k +3
= 5(57-k) +3
= 5X+3
Hence number of 1-cent can be 3, 8, 13.....so on
Case 1
If number of 1-cent=3, number of 10-cent= 6
This case is possible...(Look at case in statement 1)
Case 2
If number of 1-cent=8, number of 10-cent= 16
Total Number of coins>8+16 (Not possible)
We can clearly see that there is no other case possible except case 1
Sufficient
Value of the coins of 10-cent, 25-cent, and 50-cent coins present in the jar= 6*10+5*25*+2*50=285
Value of the coins of 1-cent and 5-cent coins present in the jar= 288-285=3 cents
Only 1 case is possible, that is there are 3 coins of 1-cent and 0 coins of 5 cents in the jar
Sufficient
Statement 2- the total value of the coins in the jar is 288
Value of 5-cents, 10-cent, 25-cent, and 50-cent coins must be a multiple of 5
Hence value of 1-cent
= 288-5k
= 285-5k +3
= 5(57-k) +3
= 5X+3
Hence number of 1-cent can be 3, 8, 13.....so on
Case 1
If number of 1-cent=3, number of 10-cent= 6
This case is possible...(Look at case in statement 1)
Case 2
If number of 1-cent=8, number of 10-cent= 16
Total Number of coins>8+16 (Not possible)
We can clearly see that there is no other case possible except case 1
Sufficient
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