If x and y are positive integers such that the greatest common factor of x^2y^2 and xy^3 is 45, then which of the following could y equal?

1 Answer
Jun 12, 2016

No answers were provided from which to select;
the only possible answers are #y=1# or #y=3#

Explanation:

#x^2y^2# and #xy^3# have a common factor of #xy^2#

If #x# and #y# are positive integers any common factor of #x^2y^2# and #xy^3# must itself have a factor of #y^2#

If #45# is the greatest common factor (or any factor) of #x^2y^2# and #xy^3#
then #45# must contain #y^2# as a factor.

Restricting ourselves to positive factors:
#color(white)("XXX")45=1^2xx3^2xx5#

So #y# must be either #1# or #3#