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what is the degree of the polynomial product? 3 enter the coefficients for each term in the product of 9w and -2w^2-6 enter 0 as the

Question

What is the degree of the polynomial product?	3
Enter the coefficients for each term in the product of 9w and -2w^2-6
Enter 0 as the coefficient of any terms not in the product.
(1) more bread more

What is the degree of the polynomial product? 3 Enter the coefficients for each term in the product of 9w and -2w^2-6 Enter 0 as the coefficient of any terms not in the product. (1) more bread more

Solution

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Leonel Profissional · Tutor por 6 anos

Resposta

To find the degree of the polynomial product, we need the given terms together. The given terms are 9w and -2w^2 - 6. Multiplying these terms, we get:9w * (-2w^2 - 6) = -18w^3 - 54wThe degree of a polynomial is the highest power of the variable in the polynomial. In this case, the highest power of the variable w is 3. Therefore, the degree of the polynomial product is 3.Now, let's find the coefficients for each term in the product:-18w^3: The coefficient is -18.-54w: The coefficient is -54.There are no other terms in the product, so the coefficient for any terms not in the product is 0.