Answer:
Explanation:
Here are the steps to write the polynomial -15y + 12y² - 9y as a product of polynomials in standard form:
Factor out the coefficient of the linear term: -15y = -15 * y
Factor out the coefficient of the quadratic term: 12y² = 12 * y^2
Add the two factored polynomials: -15 * y + 12 * y^2 - 9 * y
Simplify the expression: (-15 * y + 9 * y) + 12 * y^2 = -6 * y + 12 * y^2
And there you have it, the polynomial -15y + 12y² - 9y can be written as a product of two polynomials in standard form, -6 * y + 12 * y^2.