If the value of c is negative then zero pairs are required to mimic the polynomial factorization.
It is the method to separate the polynomial into parts and the parts will be in multiplication. And the value of the polynomial at this point will be zero.
If you are using algebra tiles to factor a trinomial of the form
[tex]\rm ax^2 + bx + c[/tex]
If the value of c is negative, zero pairs are required to mimic the polynomial factorization.
The constants in the factors are determined by the x-tiles on the board.
Because the product of these constants equals the value of c, you'll need positive x-tiles on one side and negative x-tiles on the other side of the x-squared tile to have opposite signs on the constants.
When multiplying the components, opposite signs on the constants will result in a negative value for c.
More about the factorization link is given below.
https://brainly.com/question/6810544
Answer:
Sample Response: If the value of c is negative, you would need zero pairs to model the factorization of the polynomial. The x-tiles on the board determine what the constants are in the factors. The product of these constants is equal to the value of c, so you would need positive tiles on one side of the x-squared tile and negative x-tiles on the other side to have opposite signs on the constants. Opposite signs on the constants will result in a negative value for c when multiplying the factors.
Step-by-step explanation:
