parkhydel
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
Algebraically, this looks tough to solve - may be because i see 5 variables in a + 5b + 10c + 25d + 50e. I could reach out to D and E but faltered as for a moment i thought all types of coins are required to solve. One way to solve can be to check minimum and maximum number of coins that sum exactly 100 cents.
The minimum number of coins would be e = 2(2 50-cents coins).
The maximum number of coins would be a = 100(100 1-cents coins).
As options available are nearer to 100, most likely we should solve keeping 1-cents coins at maximum possible numbers. The 1-cents coins need to be in multiples of 5 as we can see from the equation 'a + 5(b + 2c + 5c + 10e)'.So, lowering down the number of coins from 100 the next lowest value is
96 [a(95) + 5b(1) = 100]
92 [a(90) + 5b(2)]
91 [a(90) + 10c(1)]88 [a(85) + 5b(3)]
87 [a(85) + 5b(1) + 10c(1)]
84 [a(80) + 5b(4)]
83 [a(80) + 5b(2) + 10c(1)]
82 [a(80) + 10c(2)]
80 [a(75) + 5b(5)]
78 [a(75) + 5b(1) + 10c(2)]
76 [a(75) + 25d(1)]As we can see 81 is not possible, only 91 and 76 are possible.
Looking back at the approach i see we can check for highest number of coins - a combination of largest possible number of 1-cents coins and 1 coin of any other - but this might no click at first under exam condition.
1-cent coins(a) = 100 coins
1-cent(a) + 5-cent coins(b) = 96
1-cent(a) + 10-cent(c) = 91
1-cent(a) + 25-cent(d) = 76
1-cent(a) + 50-cent(e) = 51
Finally, had we had coins of denominations 15-cent and 20-cents we would had 86 and 81 respectively.
Answer D.
Back of the envelope thought: Algebraic equation actually helps to form a base to start with.
Hope this helps.