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Find the lowest common multiple of 3xyz2 and 9x2y+9x2.

Find The Lowest Common Multiple Of 3xyz2 And 9x2y9x2 class=

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MrRoyalidn

The lowest common multiple of the expressions 3xyz^2 and 9x^2y + 9x^2 is 9x^2z^2(y + 1)

How to determine the lowest common multiple?

The expressions are given as:

3xyz^2 and 9x^2y + 9x^2

Factorize the expressions

3xyz^2 = 3 * x * y * z * z

9x^2y + 9x^2 = 3 * 3 * x * x * (y + 1)

Multiply the common factors, without repetition

LCM = 3 * 3 * x * x * (y + 1) * z* z

Evaluate the product

LCM = 9x^2z^2(y + 1)

Hence, the lowest common multiple of the expressions 3xyz^2 and 9x^2y + 9x^2 is 9x^2z^2(y + 1)

Read more about lowest common multiple at

https://brainly.com/question/10749076

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