If n and y are positive integers and n represents the number of different positive factors of y, is y a perfect square?
1. sqrt(n) is an odd integer
2. y=sqrt[5^[2(n-1)]]
Please help!
OA is A
My reasoning:
1 is insufficient:
Let n = 9, so sqrt(n) = sqrt(9) = 3 is an odd integer. So then y has 9 different positive factors, so say y = 1*2*3*4*5*6*7*8*9, which is not a perfect square.
But if n = 1, so sqrt(1) = 1 is also an odd integer. So then y has 1 factor 1, so y = 1 is a perfect square.
2 is insufficient:
No restrictions on n.
Together they are sufficient:
y = 5^(n-1) so when sqrt( n) is odd then, n is also odd, so y must be a perfect square.
Where am I wrong?
1. sqrt(n) is an odd integer
2. y=sqrt[5^[2(n-1)]]
Please help!
OA is A
My reasoning:
1 is insufficient:
Let n = 9, so sqrt(n) = sqrt(9) = 3 is an odd integer. So then y has 9 different positive factors, so say y = 1*2*3*4*5*6*7*8*9, which is not a perfect square.
But if n = 1, so sqrt(1) = 1 is also an odd integer. So then y has 1 factor 1, so y = 1 is a perfect square.
2 is insufficient:
No restrictions on n.
Together they are sufficient:
y = 5^(n-1) so when sqrt( n) is odd then, n is also odd, so y must be a perfect square.
Where am I wrong?
