Final answer:
To check if (m+2) is a factor of (m – 3m2 – m+26), we need to divide the polynomial by (m+2) using synthetic division. If the final result is zero, it means that (m+2) is a factor of the given polynomial. If the result is non-zero, then (m+2) is not a factor.
Step-by-step explanation:
The given binomial is (m+2) and the given polynomial is (m – 3m2 – m+26).
To check if (m+2) is a factor of (m – 3m2 – m+26), we need to divide the polynomial by (m+2) using synthetic division.
Write the coefficients of the polynomial in descending order: -3, -1, 0, 26.
Using synthetic division, divide the polynomial:
Bring down the first coefficient (-3) and multiply it by the divisor, 2.
Add the result to the next coefficient, -1. Repeat this process until the last coefficient.
The final result should be zero.
If the final result is zero, it means that (m+2) is a factor of the given polynomial. If the result is non-zero, then (m+2) is not a factor.
In this case, the final result is not zero, so (m+2) is not a factor of (m – 3m2 – m+26).