What three numbers have an average of 696?
Part 1: Understanding the Problem
We're looking for three numbers whose average is 696. This means if we add these three numbers together and divide by 3, we should get 696.
Step-by-step Solution:
- Recall the average formula: Average = (Sum of numbers) / (Count of numbers)
- In this case: 696 = (x + y + z) / 3
- To find the sum, multiply both sides by 3: 696 * 3 = x + y + z
- So, the sum of our three numbers should be: 2088
Part 2: Finding Solutions
Now, let's find multiple sets of three numbers that add up to 2088.
Solution 1:
696, 696, 696
Verification:
(696 + 696 + 696) / 3 = 2088 / 3 ≈ 696
This solution is correct!
Solution 2:
696, 696, 696
Verification:
(696 + 696 + 696) / 3 = 2088 / 3 ≈ 696
This solution is correct!
Solution 3:
1001, 502, 585
Verification:
(1001 + 502 + 585) / 3 = 2088 / 3 ≈ 696
This solution is correct!
Solution 4:
1452, 17, 619
Verification:
(1452 + 17 + 619) / 3 = 2088 / 3 ≈ 696
This solution is correct!
Solution 5:
1743, 228, 117
Verification:
(1743 + 228 + 117) / 3 = 2088 / 3 ≈ 696
This solution is correct!
Explanation:
As you can see, there are many possible solutions. We can find more by:
- Choosing any two numbers
- Subtracting their sum from 2088 to get the third number
Remember:
- The numbers don't have to be whole numbers.
- They can even be negative (although that might not make sense in some real-world contexts).
- The order of the numbers doesn't matter for the average.