SAT Equivalent Expressions Question 4 | Free SAT Prep | Aniko

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Question 4·Easy·Equivalent Expressions

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Which expression is equivalent to $12m^3n + 18m^2n^2$ ?

For factoring questions like this on the SAT, first look for the greatest common factor: find the largest integer that divides all coefficients, then take the smallest exponent of each variable that appears in every term. Combine these into a single GCF, factor it out, and determine what remains by dividing each original term by the GCF. If unsure, you can quickly expand a promising answer choice to see if it reproduces the original expression exactly, paying close attention to both coefficients and exponents.

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Look for a common factor

Both terms, $12m^3n$ and $18m^2n^2$ , share numbers and variables. What is the largest overall factor you can pull out of both at the same time?

Handle the coefficients first

Ignore $m$ and $n$ for a moment and just look at 12 and 18. What is the greatest integer that divides both 12 and 18?

Then handle the variables

Compare $m^3$ with $m^2$ , and $n$ with $n^2$ . For each variable, use the smaller exponent as the shared factor, then divide each term by the full GCF to see what goes inside the parentheses.

Desmos Guide

Enter the original expression

In a Desmos calculator line, type:

orig = 12*m^3*n + 18*m^2*n^2

This stores the original expression so you can compare it with each choice.

Enter each answer choice as a separate expression

On new lines, type:

exprA = 6*m^3*n*(2 + 3*n) (choice A)
exprB = 6*m^2*n^2*(2*m + 3) (choice B)
exprC = 12*m^2*n*(m + n) (choice C)
exprD = 6*m^2*n*(2*m + 3*n) (choice D)

These represent the four options.

Test with specific values of m and n

Choose simple values, such as m = 1 and n = 2, by typing them on separate lines. Desmos will compute numerical values for orig, exprA, exprB, exprC, and exprD. The equivalent expression will have the same value as orig. You can confirm by trying another set of values (for example, m = 2, n = -1) and checking which expression still matches orig.

Step-by-step Explanation

Identify the greatest common factor structure

You are looking for a common factor that multiplies both terms in $12m^3n + 18m^2n^2$ .

That common factor (the GCF) will have:

A numerical part that divides both 12 and 18.
A variable part with powers of $m$ and $n$ that appear in both terms.

Once you know this GCF, you can factor it out in front of parentheses.

Find the numerical GCF

Look at the coefficients 12 and 18.

Factors of 12: $1, 2, 3, 4, 6, 12$
Factors of 18: $1, 2, 3, 6, 9, 18$

The greatest common factor of 12 and 18 is $6$ .

Find the variable part of the GCF

Now look at the variables in each term:

First term: $12m^3n$ has $m^3$ and $n^1$ .
Second term: $18m^2n^2$ has $m^2$ and $n^2$ .

For each variable, the common factor uses the smaller exponent:

For $m^3$ and $m^2$ , the smaller exponent is 2, so the common factor in $m$ is $m^2$ .
For $n^1$ and $n^2$ , the smaller exponent is 1, so the common factor in $n$ is $n$ .

So the variable part of the GCF is $m^2n$ . Combined with the numerical part, the full GCF is $6m^2n$ .

Factor out the GCF and match the option

Factor $6m^2n$ out of each term by dividing:

$12m^3n / 6m^2n = 2m$
$18m^2n^2 / 6m^2n = 3n$

12m^3n + 18m^2n^2 = 6m^2n(2m + 3n).

This matches choice D, so the equivalent expression is $6m^2n(2m + 3n)$ .

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Step-by-step Explanation

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Step-by-step Explanation