Find the number of terms in `7xxa+bdiv3-c+b`.

To find the number of terms in the expression \( 7xa + \frac{b}{3} - c + b \), we will follow these steps: ### Step 1: Identify the terms in the expression The given expression is: \[ 7xa + \frac{b}{3} - c + b \] ### Step 2: Break down the expression into individual terms 1. The first term is \( 7xa \). 2. The second term is \( \frac{b}{3} \). 3. The third term is \( -c \). 4. The fourth term is \( b \). ### Step 3: Count the distinct terms Now, we will count the distinct terms: - \( 7xa \) is one term. - \( \frac{b}{3} \) is another term, even though it contains \( b \), it is in a different form. - \( -c \) is a separate term. - \( b \) is another term. ### Step 4: Total number of terms Now, we can summarize: - Total distinct terms = 4 (which are \( 7xa \), \( \frac{b}{3} \), \( -c \), and \( b \)). ### Conclusion Thus, the total number of terms in the expression \( 7xa + \frac{b}{3} - c + b \) is **4**.