(a^(2n+3)*a^((2n+1)(n+2)))/((a^(3))^(2n+1)*a^(n(2n+1)))

3 min read Jun 16, 2024
(a^(2n+3)*a^((2n+1)(n+2)))/((a^(3))^(2n+1)*a^(n(2n+1)))

Simplifying Exponential Expressions

This article aims to simplify the following exponential expression:

**(a^(2n+3)a^((2n+1)(n+2)))/((a^(3))^(2n+1)a^(n(2n+1)))

Let's break down the process step-by-step:

Applying the Properties of Exponents

To simplify this expression, we will utilize the following properties of exponents:

  • Product of powers: a^m * a^n = a^(m+n)
  • Power of a power: (a^m)^n = a^(m*n)

Simplifying the Numerator

  • *a^(2n+3)a^((2n+1)(n+2)) can be simplified by applying the product of powers rule.
  • Expanding the exponent in the second term: (2n+1)(n+2) = 2n^2 + 5n + 2
  • Combining the exponents: a^(2n+3) * a^(2n^2 + 5n + 2) = a^(2n^2 + 7n + 5)

Simplifying the Denominator

  • *(a^(3))^(2n+1)a^(n(2n+1)) can be simplified by applying the power of a power rule and then the product of powers rule.
  • Applying power of a power: (a^(3))^(2n+1) = a^(3*(2n+1)) = a^(6n+3)
  • Expanding the exponent in the second term: n(2n+1) = 2n^2 + n
  • Combining the exponents: a^(6n+3) * a^(2n^2 + n) = a^(2n^2 + 7n + 3)

Combining the Numerator and Denominator

Now we have: a^(2n^2 + 7n + 5) / a^(2n^2 + 7n + 3)

  • Applying the division of powers rule (a^m / a^n = a^(m-n)), we get: a^(2n^2 + 7n + 5 - (2n^2 + 7n + 3))
  • Simplifying the exponent: a^(2n^2 + 7n + 5 - 2n^2 - 7n - 3) = a^2

Final Result

Therefore, the simplified expression is a^2.

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