In Exercises 1–68, factor completely, or state that the polynomia...

Question

In Exercises 1–68, factor completely, or state that the polynomial is prime. x⁶y⁶ − x³y³

Accepted Answer

Hello, everyone. We are going to perform a complete factorization of the given expression or categorize it as a prime polynomial. The expression we're given is three M raised the sixth power and raised the sixth power minus three M cubed and cubed. Our answer choices are a three M cubed and cubed multiplied by open parentheses. M N minus one closed parentheses multiplied by open parentheses. M squared N squared plus M N plus one closed parentheses. B three M cubed and cubed multiplied by open parentheses. M N plus one closed parentheses multiplied by open parentheses. M squared N squared plus M N plus one closed parentheses, C three M cubed N cubed multiplied by open parentheses. M N minus one closed parentheses multiplied by M squared N squared minus M N plus one closed parentheses. D the given polynomial is primed. Going back to rewrite my original expression. Three M raised the sixth power and raised the sixth power minus three M cubed and cubed. First thing I always do when I factor any expression is look for a greatest common factor. Recall, a greatest common factor is the largest value that will come evenly out of each term being that the coefficients here are both three. I know three is part of my greatest common factor. Next, I noticed that both terms have both an M and an N. So I want to take out an M cubed and an N cubed. And I know I could take out a cube or a third exponent because that is the smallest exponent in either of my original terms. So 3 m cubed n cubed is my greatest common factor. I'm gonna multiply that by a set of parentheses. And in those parentheses, I'm gonna put values found from taking the original terms and dividing them by my greatest common factor. So three M raised to the sixth power and raised to the sixth power divided by three M cubed and cubed. The threes will cancel when I divide like bases. I subtract my exponents. So I have M cubed and cubed inside my parentheses. Next, I have negative three M cubed and cubed divided by three M cubed and cubed which will result in negative one because everything else cancels out closed parentheses. I'm not done factoring just yet in my parentheses. I have M cubed N cubed -1. This is the difference of cubes because one cubed is one. So these are still both perfect cubes. So we will factor this further. So I'm rewriting my GCF of 3 M cubed N cubed. And then I recall the format for a difference of cubes has me first create a binomial. So I'm gonna open a set of parentheses there. And in my binomial, the first term is the cubed root of the first term in the difference of cubes. So the first term is gonna be the cubed root of M cubed N cubed, which will be M N. My second term is going to be the cubed root of the second term from the difference of cubes. And in this case, that's one. And since it was a difference of cubes, our binomial is also a difference, so it has a subtraction sign, the next piece is a trinomial. So I open another set of parentheses. And in my trinomial, the first term is the first term from our new binomial squared. So M N, both of it squared would be M squared N squared. My middle term it's gonna be positive, but it comes from multiplying the two terms of the binomial together. So one time multiplied by M N is M N and the last term is also gonna be a positive. And that is the last term in my new binomial squared. So one squared, which is one closed parentheses. At this step, my factorization is three M cubed and cubed multiplied by the parentheses M minus or sorry M N minus one closed parentheses multiplied by open parentheses M squared N squared plus M N plus one closed parentheses. This is as factored as this expression can get So this is our solution and it matches answer choice a have a nice day.

In Exercises 1–68, factor completely, or state that the polynomial is prime. x⁶y⁶ − x³y³

Key Concepts

Factoring Polynomials

Greatest Common Factor (GCF)

Exponents and Power Rules

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