(a^-1)^t

3 min read Jun 16, 2024
(a^-1)^t

Understanding (a^-1)^t

In mathematics, especially in the realm of algebra, the expression (a^-1)^t can be a bit confusing at first glance. However, by breaking it down step-by-step, we can understand its meaning and how to simplify it.

What is a^-1?

The notation a^-1 represents the reciprocal of a. In simpler terms, it's the number that, when multiplied by a, equals 1. For example:

  • If a = 5, then a^-1 = 1/5 because 5 * (1/5) = 1.
  • If a = 1/2, then a^-1 = 2 because (1/2) * 2 = 1.

Applying the Exponent

Now, let's consider the exponent t in (a^-1)^t. This exponent indicates that we are multiplying a^-1 by itself t times. For instance:

  • (a^-1)^2 = (a^-1) * (a^-1)
  • (a^-1)^3 = (a^-1) * (a^-1) * (a^-1)

Simplifying the Expression

Using the rule of exponents that states (x^m)^n = x^(m*n), we can simplify (a^-1)^t as follows:

(a^-1)^t = a^(-1 * t) = a^-t

Therefore, (a^-1)^t is equivalent to a^-t, which again represents the reciprocal of a raised to the power of t.

Example:

Let's say a = 2 and t = 3. Then:

(a^-1)^t = (2^-1)^3 = 2^(-1*3) = 2^-3 = 1/2^3 = 1/8

In Conclusion

The expression (a^-1)^t represents the reciprocal of a raised to the power of t. By applying the rules of exponents, we can simplify it to a^-t. This understanding is crucial for solving various algebraic problems and working with exponents in different mathematical contexts.

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