(2a-5b).jpeg "(2a+3b)(2a-5b)")
Multiplying Binomials: (2a+3b)(2a-5b)
This article will demonstrate how to multiply the binomials (2a + 3b) and (2a - 5b).
Understanding the Process
Multiplying binomials involves distributing each term of the first binomial to every term in the second binomial. This is often referred to as the FOIL method:
- First terms: Multiply the first terms of each binomial.
- Outer terms: Multiply the outer terms of the binomials.
- Inner terms: Multiply the inner terms of the binomials.
- Last terms: Multiply the last terms of each binomial.
Applying FOIL to (2a + 3b)(2a - 5b)
- First: (2a)(2a) = 4a²
- Outer: (2a)(-5b) = -10ab
- Inner: (3b)(2a) = 6ab
- Last: (3b)(-5b) = -15b²
Combining Like Terms
Now, combine the like terms:
4a² - 10ab + 6ab - 15b² = 4a² - 4ab - 15b²
Final Answer
Therefore, the product of (2a + 3b) and (2a - 5b) is 4a² - 4ab - 15b².