jmc

Question

Three clever monkeys divide a pile of bananas. The first monkey takes some bananas from the pile, keeps three-fourths of them, and divides the rest equally between the other two. The second monkey takes some bananas from the pile, keeps one-fourth of them, and divides the rest equally between the other two. The third monkey takes the remaining bananas from the pile, keeps one-twelfth of them, and divides the rest equally between the other two. Given that each monkey receives a whole number of bananas whenever the bananas are divided, and the numbers of bananas the first, second, and third monkeys have at the end of the process are in the ratio 3: 2: 1,what is the least possible total for the number of bananas?

Accepted Answer

Denote the number of bananas the first monkey took from the pile as b_1, the second b_2, and the third b_3; the total is b_1 + b_2 + b_3. Thus, the first monkey got 34b_1 + 38b_2 + 1124b_3, the second monkey got 18b_1 + 14b_2 + 1124b_3, and the third monkey got 18b_1 + 38b_2 + 112b_3. Taking into account the ratio aspect, say that the third monkey took x bananas in total. Then, x = 14b_1 + 18b_2 + 1172b_3 = 116b_1 + 18b_2 + 1148b_3 = 18b_1 + 38b_2 + 112b_3 Solve this to find that b_111 = b_213 = b_327. All three fractions must be integral. Also note some other conditions we have picked up in the course of the problem, namely that b_1 is divisible by 8, b_2 is divisible by 8, and b_3 is divisible by 72 (however, since the denominator contains a 27, the factors of 3 cancel, and it only real…