%5E3.jpeg "(2a^3b^4c^0)^3")
Simplifying the Expression (2a^3b^4c^0)^3
This article will guide you through simplifying the expression (2a^3b^4c^0)^3.
Understanding the Properties of Exponents
Before we begin, let's recall some important exponent rules:
- Product of Powers: x^m * x^n = x^(m+n)
- Power of a Product: (xy)^n = x^n * y^n
- Power of a Power: (x^m)^n = x^(m*n)
- Zero Exponent: x^0 = 1
Simplifying the Expression
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Apply the Power of a Product rule: (2a^3b^4c^0)^3 = 2^3 * (a^3)^3 * (b^4)^3 * (c^0)^3
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Apply the Power of a Power rule: 2^3 * (a^3)^3 * (b^4)^3 * (c^0)^3 = 2^3 * a^(33) * b^(43) * c^(0*3)
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Simplify the exponents: 2^3 * a^(33) * b^(43) * c^(0*3) = 8 * a^9 * b^12 * c^0
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Apply the Zero Exponent rule: 8 * a^9 * b^12 * c^0 = 8a^9b^12
Final Result
Therefore, the simplified form of (2a^3b^4c^0)^3 is 8a^9b^12.