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A and B are monomials where A = 125 and B = 27p12. What is the factored form of A – B?
(5 – 3p^4)(25 + 15p^4 + 9p^8)
25 – 3p^4)(5 + 15p^3 + 9p^3)
(25 – 3p^4)(5 + 15p^4 + 3p^8)
(5 – 3p^4)(25 + 15p^3 + 3p^4)

Respuesta :

absor201

Answer:

The correct option is A.

Step-by-step explanation:

Given:

A= 125

B = 27p^12

To find: A-B

A-B = 125 - 27p^12

A-B=(5)^3-(3p^4)^3

We know that, a^3 - b^3 = (a-b)(a^2+ab+b^2)

Using this formula and finding factored form of A-B:

=(5-3p^4)((5)^2+(5)(3p^4)+(3p^4)^2)

=(5-3p^4)(25+15p^4+9p^8)

So, factored form of A-B is: (5-3p^4)(25+15p^4+9p^8)

Option A is correct..

kalayshajames0526

Answer:

A.

Step-by-step explanation:

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