%5E2%2B3x%5E4y%5E3-6x%5E3y%5E2-(xy)%5E2.jpeg "(2x^2y)^2+3x^4y^3-6x^3y^2 (xy)^2")
Simplifying the Expression: (2x^2y)^2 + 3x^4y^3 - 6x^3y^2 (xy)^2
This expression involves several terms with exponents and variables. To simplify it, we'll use the rules of exponents and then combine like terms.
Step 1: Simplify each term individually
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(2x^2y)^2: Applying the power of a product rule, we square each factor inside the parentheses:
- (2)^2 = 4
- (x^2)^2 = x^(2*2) = x^4
- (y)^2 = y^2
- Therefore, (2x^2y)^2 = 4x^4y^2
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3x^4y^3: This term is already in its simplest form.
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6x^3y^2 (xy)^2:
- First, simplify (xy)^2 = x^2y^2
- Then, multiply the coefficients and combine the variables: 6x^3y^2 * x^2y^2 = 6x^5y^4
Step 2: Combine like terms
Now we have the simplified expression: 4x^4y^2 + 3x^4y^3 - 6x^5y^4
Since there are no other like terms (terms with the same variables and exponents), this is the final simplified form.
Therefore, the simplified expression is 4x^4y^2 + 3x^4y^3 - 6x^5y^4.