(k^5)^9

less than a minute read Jun 16, 2024
(k^5)^9

Understanding (k^5)^9

In mathematics, when we have an exponent raised to another exponent, we use the rule of exponents that states: (a^m)^n = a^(m*n).

Let's apply this rule to our expression (k^5)^9:

1. Identify the base and exponents:

  • The base is 'k'.
  • The first exponent is '5'.
  • The second exponent is '9'.

2. Apply the rule:

  • (k^5)^9 = k^(5 * 9)

3. Simplify:

  • k^(5 * 9) = k^45

Therefore, (k^5)^9 is equivalent to k^45.

In simpler terms: This expression means we are multiplying 'k' by itself 5 times, and then we are taking that result and multiplying it by itself 9 times. This can be simplified to multiplying 'k' by itself 45 times.