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Simplify the polynomial and evaluate for the following values. x^(2) y xy-xy^(2)xy+xy if x = -3 and y =2

User Depzor
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Final answer:

The solution to the question is -18 after simplifying the polynomial x^(2)y + 2xy - xy^(2) and substituting the given values of x = -3 and y = 2.

Step-by-step explanation:

The subject is mathematics, especially algebraic principles focused on simplifying polynomials. The polynomial mentioned in the question seems to have a typographical error, so we will simplify it as

x^(2)y + xy - xy^(2) + xy. First, simplify the polynomial.

  1. Combine the like terms: x^(2)y + 2xy - xy^(2).
  2. Now, we substitute the given values, where x equals -3 and y equals 2, into the polynomial: (-3)^(2)*2 + 2*(-3)*2 - (-3)*(2)^(2)--> 6-12-12 --> -18.

So, the simplified polynomial evaluated at the given values is -18.

Learn more about Simplifying Polynomial

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