`101xx(-1)+0div(-1)` is equal to

To solve the expression \( 101 \times (-1) + 0 \div (-1) \), we will follow the BODMAS rule, which stands for Brackets, Orders, Division, Multiplication, Addition, and Subtraction. This rule helps us determine the order in which we should perform operations in a mathematical expression. ### Step-by-Step Solution: 1. **Identify the operations**: The expression contains multiplication, division, and addition. According to BODMAS, we will perform division and multiplication before addition. 2. **Perform the division**: \[ 0 \div (-1) = 0 \] Since any number divided by a non-zero number is 0, we find that \( 0 \div (-1) = 0 \). 3. **Rewrite the expression**: After performing the division, the expression simplifies to: \[ 101 \times (-1) + 0 \] 4. **Perform the multiplication**: \[ 101 \times (-1) = -101 \] Multiplying a positive number by a negative number gives a negative result. 5. **Combine the results**: Now we add the results from the multiplication and the division: \[ -101 + 0 = -101 \] ### Final Answer: Thus, the value of the expression \( 101 \times (-1) + 0 \div (-1) \) is: \[ \boxed{-101} \]