1. **State the problem:** We want to find a combination of odd and even numbers that sum up to 141 and from which we can get the numbers 17, 32, 48, 60, and 64. 2. **Understand odd and even numbers:** Odd numbers are integers not divisible by 2 (e.g., 1, 3, 5, ...), and even numbers are integers divisible by 2 (e.g., 2, 4, 6, ...). 3. **Check the sum of the given numbers:** Calculate the sum of 17, 32, 48, 60, and 64. $$17 + 32 + 48 + 60 + 64 = 221$$ 4. **Compare with the target sum:** The sum 221 is greater than 141, so these numbers cannot all be summed directly to 141. 5. **Find a subset or combination:** We need to find a subset of these numbers or a combination of odd and even numbers that sum to 141. 6. **Try combinations:** For example, sum 17 (odd), 32 (even), 48 (even), and 44 (even) to check if they sum to 141. $$17 + 32 + 48 + 44 = 141$$ 7. **Verify the numbers:** 17 is odd, 32, 48, and 44 are even, and their sum is 141. **Final answer:** One possible combination of odd and even numbers that sum to 141 is 17, 32, 48, and 44.