(7n2%2B6n-5).jpeg "(6n2-6n-5)(7n2+6n-5)")
Multiplying Binomials: (6n²-6n-5)(7n²+6n-5)
This article will guide you through the process of multiplying the two binomials: (6n²-6n-5)(7n²+6n-5). We will use the FOIL method to simplify the expression.
Understanding the FOIL Method
FOIL is an acronym that stands for First, Outer, Inner, Last. It's a mnemonic device used to remember the steps for multiplying two binomials.
- First: Multiply the first terms of each binomial.
- Outer: Multiply the outer terms of each binomial.
- Inner: Multiply the inner terms of each binomial.
- Last: Multiply the last terms of each binomial.
Applying the FOIL Method to Our Problem
Let's break down the multiplication of (6n²-6n-5)(7n²+6n-5) using the FOIL method:
- First: (6n²) * (7n²) = 42n⁴
- Outer: (6n²) * (6n) = 36n³
- Inner: (-6n) * (7n²) = -42n³
- Last: (-6n) * (6n) = -36n²
- First: (6n²) * (-5) = -30n²
- Outer: (-6n) * (-5) = 30n
- Inner: (-5) * (7n²) = -35n²
- Last: (-5) * (6n) = -30n
- Last: (-5) * (-5) = 25
Combining Like Terms
Now, we have the following terms:
42n⁴ + 36n³ - 42n³ - 36n² - 30n² + 30n - 35n² - 30n + 25
Combining like terms:
42n⁴ + (36n³ - 42n³) + (-36n² - 30n² - 35n²) + (30n - 30n) + 25
This simplifies to:
42n⁴ - 6n³ - 101n² + 25
Conclusion
By using the FOIL method, we successfully multiplied the binomials (6n²-6n-5)(7n²+6n-5) and obtained the simplified expression 42n⁴ - 6n³ - 101n² + 25.