What is the least common multiple of #18x^3y^2z, 30x^3yz^2#?

1 Answer
MathMakesMeCry
Nov 9, 2016

The LCM is #6x^3yz#.

Explanation:

The LCM between 18 and 30 is 6. Divide 6 into both of them to get 3 and 5. These cannot be reduced further, so we are sure that 6 is the LCM.

The LCM between #x^3# and #x^3# is #x^3#, so dividing both terms by #x^3# gives us 1.

The LCM between #y^2# and #y# is just y, since it is the lowest term that appears in both.

Similarly, with #z^2# and #z#, it is just z.

Put all of these together to get #6x^3yz#

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