The product of the binomials (2x+3)(3x+3) is 6x² + 15x + 9
How to expand binomial expression.
A binomial is a mathematical expression with two terms. It typically takes the form (a + b)
where a and b can be any algebraic expression or numerical value.
Given
(2x+3)(3x+3)
Let's use the distributive property.
Multiply each term in the first binomial by each term in the second binomial and then combine like terms.
(2x+3)(3x+3)
= 2x* 3x + 2x * 3 + 3*3x + 3* 3
Simplify each term:
6x² + 6x + 9x + 9
6x² + 15x + 9
So, the product is 6x² + 15x + 9.