%5E-4.jpeg "(-7a^2b^3c^0/3a^3b^4c^3)^-4")
Simplifying the Expression (-7a^2b^3c^0/3a^3b^4c^3)^-4
This article will guide you through the steps of simplifying the expression (-7a^2b^3c^0/3a^3b^4c^3)^-4.
Understanding the Properties
Before we begin simplifying, let's recall some important properties of exponents:
- Negative Exponent: x^-n = 1/x^n
- Fractional Exponent: (x/y)^n = x^n / y^n
- Zero Exponent: x^0 = 1
Simplifying the Expression
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Simplify the numerator:
- c^0 = 1 (using zero exponent property)
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Simplify the denominator:
- Combine the 'a' terms: a^2 / a^3 = a^(2-3) = a^-1
- Combine the 'b' terms: b^3 / b^4 = b^(3-4) = b^-1
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Apply the negative exponent property to the entire fraction:
- (-7a^2b^3/3a^3b^4c^3)^-4 = (3a^3b^4c^3 / -7a^2b^3)^4
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Simplify inside the parentheses:
- (3a^3b^4c^3 / -7a^2b^3)^4 = (3/(-7)) * (a^(3-2)) * (b^(4-3)) * (c^3)^4
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Apply the power of a product rule:
- (3/(-7)) * (a^(3-2)) * (b^(4-3)) * (c^3)^4 = (-3/7) * a * b * c^12
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Simplify the final expression:
- (-3/7) * a * b * c^12 = -3abc^12 / 7
Final Result
Therefore, the simplified form of the expression (-7a^2b^3c^0/3a^3b^4c^3)^-4 is -3abc^12 / 7.