%5E-1-without-exponent.jpeg "(7/6)^-1 Without Exponent")
Understanding (7/6)^-1 Without Exponents
The expression (7/6)^-1 might look intimidating at first glance, especially if you're not familiar with negative exponents. However, it's actually quite simple to understand and solve.
The Power of Negative Exponents
A negative exponent indicates a reciprocal. In other words, (7/6)^-1 is the same as 1 divided by (7/6).
Calculating the Reciprocal
To find the reciprocal of a fraction, we simply flip the numerator and the denominator. Therefore, the reciprocal of (7/6) is (6/7).
Conclusion
So, (7/6)^-1 is equal to (6/7). This means that raising a fraction to the power of -1 is the same as finding its reciprocal.