A puzzle in the local newspaper lists the letters \( M, R, O, \mathrm{U} \), and H and asks readers if they can correctly unscramble the letters. How many different ways are there to list the five letters? (1 point) \( 7,893,600 \) 25 120 3,125

If you're looking to unscramble the letters \( M, R, O, U \), and \( H \), you're dealing with a classic permutation problem where you want to find how many ways you can arrange those 5 unique letters. The formula for the number of permutations of \( n \) distinct objects is \( n! \). In this case, \( n = 5 \): \[ 5! = 5 \times 4 \times 3 \times 2 \times 1 = 120 \] So, there are 120 different ways to list the five letters!