(9/5)^-1

2 min read Jun 16, 2024
(9/5)^-1

Understanding (9/5)^-1

The expression (9/5)^-1 might seem intimidating at first glance, but it's actually quite simple to understand. Here's a breakdown of what it means and how to calculate it:

Negative Exponents

The key lies in the negative exponent. In mathematics, a negative exponent indicates the reciprocal of the base raised to the positive version of the exponent. In other words:

x^-n = 1/x^n

Applying the Concept

In our case, (9/5)^-1 is equivalent to:

(9/5)^-1 = 1 / (9/5)^1

Since any number raised to the power of 1 is itself, we have:

(9/5)^-1 = 1 / (9/5)

To divide by a fraction, we flip the fraction and multiply:

(9/5)^-1 = 1 * (5/9)

Therefore, (9/5)^-1 = 5/9.

In Conclusion

The expression (9/5)^-1 represents the reciprocal of the fraction 9/5. This is a fundamental concept in mathematics, and understanding it can help you work with exponents and fractions more effectively.

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