(2mn).jpeg "(-4m^2n^3)(2mn)")
Simplifying Algebraic Expressions: (-4m^2n^3)(2mn)
In mathematics, simplifying expressions often involves combining like terms and applying the rules of exponents. Let's break down the simplification of the expression (-4m^2n^3)(2mn).
Understanding the Rules
- Multiplication of Monomials: When multiplying monomials, we multiply the coefficients and add the exponents of the same variables.
- Exponents: Remember that x^m * x^n = x^(m+n).
Simplifying the Expression
- Multiply the coefficients: (-4) * (2) = -8
- Multiply the 'm' terms: m^2 * m = m^(2+1) = m^3
- Multiply the 'n' terms: n^3 * n = n^(3+1) = n^4
The Final Result
By combining the steps above, the simplified expression is:
(-4m^2n^3)(2mn) = -8m^3n^4
Therefore, the simplified form of the expression (-4m^2n^3)(2mn) is -8m^3n^4.