How old is the other one?

Let the age of the twins be x years while the age of the other
sibling is y years

Case I: x>=y

x^2*y = 567(given)
-> x^3 >=  567
-> x>= 9

No square of x with x>=9, apart from x= 9, divides 567.

So, x=9, so that: y = 567/81 = 7

Case II: x < y

x^2*y = 567(given)
-> x^3 <  567
-> x <=8

The only possible cases are: x = 1, 3

If x = 1 -> y = 567/1 = 567, which is much greater than the age of a mere boy.

if x =3 -> y = 567/9 = 83, which is much greater than the age of a mere boy.

Consequently, comparing the two cases it follows that the age of the twins is 9 years while the age of the other is 7 years.

Edited on September 5, 2023, 9:33 pm

Posted by K Sengupta on 2008-12-13 12:24:00