Darlene wrote this proof of the identity (x+y)^2-(x-y)^2=4xy. Which of the following is a justification for step 5 for her proof?

a. definition of a squaring a binomial
b. distributive property
c combining like terms
d. reflective property

Like terms are terms that have the same variables and powers. The coefficients do not need to match. Unlike terms are two or more terms that are not like terms, i.e. they do not have the same variables or powers. The order of the variables does not matter unless there is a power.

According to the question

Darlene wrote this proof of the identity [tex](x+y)^2-(x-y)^2[/tex]=4xy.

In which

Step 5: [tex]x^{2} + 2xy + y^{2}[/tex] - [tex]x^{2} +2xy - y^{2}[/tex]= 4xy

like terms are added and subtracted

Hence, justification for step 5 for her proof is combining like terms.

To know more about like terms and unlike terms here:

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Darlene wrote this proof of the identity (x+y)^2-(x-y)^2=4xy. Which of the following is a justification for step 5 for her proof? a. definition of a squaring a binomial b. distributive property c combining like terms d. reflective property

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What are like terms and unlike terms ?

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Darlene wrote this proof of the identity (x+y)^2-(x-y)^2=4xy. Which of the following is a justification for step 5 for her proof?

a. definition of a squaring a binomial
b. distributive property
c combining like terms
d. reflective property