Find the greatest common factor of the terms of the polynomial. \[ 8 v^{4}+18 v^{3} \]

To find the greatest common factor (GCF) of the terms of the polynomial \( 8 v^{4} + 18 v^{3} \), we will follow these steps: 1. **Identify the coefficients and variables of each term**: - The first term is \( 8 v^{4} \) with a coefficient of \( 8 \) and a variable part of \( v^{4} \). - The second term is \( 18 v^{3} \) with a coefficient of \( 18 \) and a variable part of \( v^{3} \). 2. **Find the GCF of the coefficients**: - The coefficients are \( 8 \) and \( 18 \). - The factors of \( 8 \) are \( 1, 2, 4, 8 \). - The factors of \( 18 \) are \( 1, 2, 3, 6, 9, 18 \). - The common factors are \( 1 \) and \( 2 \). - Therefore, the GCF of the coefficients is \( 2 \). 3. **Find the GCF of the variable parts**: - The variable parts are \( v^{4} \) and \( v^{3} \). - The GCF of \( v^{4} \) and \( v^{3} \) is \( v^{3} \) (the lowest power of \( v \)). 4. **Combine the GCF of the coefficients and the variable parts**: - The overall GCF is \( 2v^{3} \). Thus, the greatest common factor of the terms of the polynomial \( 8 v^{4} + 18 v^{3} \) is \( \boxed{2v^{3}} \).