%5E-1%2F3.jpeg "(-64)^-1/3")
Simplifying (-64)^(-1/3)
This problem involves simplifying an expression with a negative base and a fractional exponent. Let's break down the steps:
Understanding Fractional Exponents
A fractional exponent like (-1/3) represents both a root and a power.
- The denominator (3) indicates the type of root. In this case, it's a cube root.
- The numerator (-1) indicates the power. Here, it's raising to the power of -1, which means finding the reciprocal.
Solving the Expression
- Cube Root: Find the cube root of -64. The cube root of -64 is -4 because (-4) * (-4) * (-4) = -64.
- Reciprocal: Take the reciprocal of the result from step 1. The reciprocal of -4 is -1/4.
Therefore, (-64)^(-1/3) = -1/4.
Key Points to Remember
- Negative Bases: When dealing with negative bases and fractional exponents, remember to consider the sign of the result. In this case, a negative base raised to an odd power results in a negative outcome.
- Reciprocal: Raising a number to the power of -1 is the same as finding its reciprocal.
Let me know if you'd like to explore other examples with fractional exponents!