How do you find the GCF of $42a^2b, 6a^2, 18a^3$ ?

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How do you find the GCF of $42a^2b, 6a^2, 18a^3$ ?

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Answer 1 · 2017-11-30T15:47:36

Greatest Common Factor ( GCF ) of the three algebraic expressions given is equal to $color(red) (6a^2)$

Explanation:

The Highest Common Factor (HCF) or the Greatest Common Factor (GCF) of algebraic expressions is obtained in a similar way to the method used for numbers.

Write the factors of $42a^2b = (7*2*3*a*a*b)$
Write the factors of $6a^2 = (2*3*a*a)$
Write the factors of $18a^3 = (2*3*3*a*a*a)$

We observe that the common factors are $(2*3*a*a)$

Hence, GCF = Product of common factors = $color(red)(6a^2)$

I hope this procedure helps.

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How do you find the GCF of $42a^2b, 6a^2, 18a^3$ ?

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How do you find the GCF of 42a^2b, 6a^2, 18a^342a^2b, 6a^2, 18a^3?

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How do you find the GCF of $42a^2b, 6a^2, 18a^3$ ?