%5E3%2F2x%5E3y%5E8.jpeg "(2xy^5)^3/2x^3y^8")
Simplifying the Expression (2xy^5)^3 / (2x^3y^8)
This expression involves exponents and fractions. To simplify it, we will use the following rules of exponents:
- (a^m)^n = a^(m*n)
- a^m / a^n = a^(m-n)
Let's break down the simplification step-by-step:
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Simplify the numerator: (2xy^5)^3 = 2^3 * x^3 * (y^5)^3 = 8x^3y^15
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Rewrite the entire expression: (8x^3y^15) / (2x^3y^8)
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Apply the division rule for exponents: 8/2 * x^(3-3) * y^(15-8) = 4x^0y^7
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Simplify x^0: x^0 = 1
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Final simplified expression: 4y^7
Therefore, the simplified form of (2xy^5)^3 / (2x^3y^8) is 4y^7.