(3x%5E5y%5E8).jpeg "(7x^2y^3)(3x^5y^8)")
Simplifying the Expression (7x^2y^3)(3x^5y^8)
This expression involves multiplying monomials. Monomials are algebraic expressions that consist of a single term, which is a product of constants, variables, and possibly positive integer exponents. To simplify this expression, we use the following rules:
- Product of powers: When multiplying powers with the same base, add the exponents. For example, x^m * x^n = x^(m+n)
- Commutative property: The order of multiplication does not affect the result. For example, a * b = b * a
Let's break down the simplification step-by-step:
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Rearrange the terms: (7x^2y^3)(3x^5y^8) = 7 * 3 * x^2 * x^5 * y^3 * y^8
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Apply the product of powers rule: 7 * 3 * x^2 * x^5 * y^3 * y^8 = 21 * x^(2+5) * y^(3+8)
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Simplify the exponents: 21 * x^(2+5) * y^(3+8) = 21x^7y^11
Therefore, the simplified form of (7x^2y^3)(3x^5y^8) is 21x^7y^11.