(7) What is the missing number? \( 725,825,925, \ldots, 1125 \)

Let's denote the sequence as follows: \[ \begin{aligned} a_1 &= 725, \\ a_2 &= 825, \\ a_3 &= 925, \\ a_4 &= ?, \\ a_5 &= 1125. \end{aligned} \] We observe that the difference between consecutive terms is: \[ a_2 - a_1 = 825 - 725 = 100 \quad \text{and} \quad a_3 - a_2 = 925 - 825 = 100. \] Since the difference is consistent, the sequence is an arithmetic sequence with a common difference of \( d = 100 \). The formula for the \( n \)-th term of an arithmetic sequence is: \[ a_n = a_1 + (n-1)d. \] For the fourth term (\( n = 4 \)): \[ a_4 = 725 + (4-1)100 = 725 + 300 = 1025. \] Thus, the missing number is: \[ \boxed{1025} \]