`25639-5252-3232=?`

To solve the expression \( 25639 - 5252 - 3232 \), we will follow these steps: 1. **Subtract the first two numbers**: \[ 25639 - 5252 \] To perform this subtraction, we can align the numbers: \[ \begin{array}{r} 25639 \\ - 5252 \\ \hline \end{array} \] Starting from the rightmost digit: - \(9 - 2 = 7\) - \(3 - 5 = -2\) (we need to borrow 1 from the next digit, making it \(13 - 5 = 8\)) - \(5 - 2 = 3\) (after borrowing, it becomes \(5 - 1 - 2 = 3\)) - \(2 - 0 = 2\) - \(2 - 0 = 2\) So, \(25639 - 5252 = 20387\). 2. **Now subtract the next number**: \[ 20387 - 3232 \] Again, we align the numbers: \[ \begin{array}{r} 20387 \\ - 3232 \\ \hline \end{array} \] Starting from the rightmost digit: - \(7 - 2 = 5\) - \(8 - 3 = 5\) - \(3 - 2 = 1\) - \(0 - 0 = 0\) - \(2 - 0 = 2\) So, \(20387 - 3232 = 17155\). Thus, the final answer is: \[ 25639 - 5252 - 3232 = 17155 \] **Final Answer**: \(17155\)