To find the greatest common factor (GCF) of the polynomial terms 44x6 and 8x5, we need to find the GCF of the numerical coefficients and the GCF of the variable parts.
Step 1: Finding the GCF of the Numerical Coefficients
The numerical coefficients we have are 44 and 8. To find the GCF of these two numbers, we can list their factors or use the prime factorization method.
- 44: The prime factorization of 44 is 2 × 2 × 11 or 22 × 11.
- 8: The prime factorization of 8 is 2 × 2 × 2 or 23.
The common prime factors between 44 and 8 are 2. The lowest power of 2 that appears in both factorizations is 22 (from 44).
Thus, the GCF of the numerical coefficients is 4.
Step 2: Finding the GCF of the Variable Parts
Next, we need to find the GCF of the variable parts, which are x6 and x5. To do this, we take the variable with the lowest exponent:
- The lowest exponent of x is 5 (from x5).
So, the GCF of the variable parts is x5.
Step 3: Combining the GCFs
Now that we have both the GCF of the numerical coefficients and the GCF of the variable parts, we can combine them:
The GCF of 44x6 and 8x5 is:
4x5
Conclusion
Therefore, the greatest common factor of the terms of the polynomial 44x6 + 8x5 is 4x5.