(5a^2bc^3)(1/5 Abc^4)

2 min read Jun 16, 2024
(5a^2bc^3)(1/5 Abc^4)

Simplifying Expressions with Exponents

Let's explore how to simplify the expression (5a²bc³)(1/5 abc⁴).

Understanding the Basics

  • Exponents: The small numbers written above and to the right of variables (like the "2" in a²) represent the number of times that variable is multiplied by itself.
  • Multiplication: When multiplying terms with exponents and the same base, we add the exponents. For example, a² * a³ = a^(2+3) = a⁵.

Simplifying the Expression

  1. Rearrange the terms:
    (5a²bc³)(1/5 abc⁴) = (5 * 1/5) * (a² * a) * (b * b) * (c³ * c⁴)

  2. Simplify the coefficients: (5 * 1/5) = 1

  3. Apply exponent rules for variables:

    • a² * a = a^(2+1) = a³
    • b * b = b²
    • c³ * c⁴ = c^(3+4) = c⁷
  4. Combine the simplified terms: 1 * a³ * b² * c⁷ = a³b²c⁷

Conclusion

Therefore, the simplified form of (5a²bc³)(1/5 abc⁴) is a³b²c⁷. Remember, when working with expressions involving exponents, the key is to apply the rules of exponents systematically to arrive at the most simplified form.

Related Post


Featured Posts