Find the number that should be added to the expression to make it a perfect square. \( k^{2}-5 k \)

To make the expression \( k^{2} - 5k \) a perfect square, we can complete the square. Here's how you can do it: 1. **Start with the given expression:** \[ k^2 - 5k \] 2. **Identify the coefficient of \( k \):** The coefficient of \( k \) is \(-5\). 3. **Calculate half of the coefficient and square it:** \[ \left(\frac{-5}{2}\right)^2 = \frac{25}{4} \] 4. **Add this square to the original expression to complete the square:** \[ k^2 - 5k + \frac{25}{4} = \left(k - \frac{5}{2}\right)^2 \] So, the number you need to add to \( k^2 - 5k \) to make it a perfect square is: \[ \boxed{\dfrac{25}{4}} \]