What is the arithmetic mean of a series of investment returns: 18.3%, 0.7%, −7.6%, 11.9%, and 2.5%?

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Multiple Choice

What is the arithmetic mean of a series of investment returns: 18.3%, 0.7%, −7.6%, 11.9%, and 2.5%?

Explanation:
To calculate the arithmetic mean of a series of numbers, you need to sum all the values together and then divide by the total number of values. In this case, the investment returns are 18.3%, 0.7%, -7.6%, 11.9%, and 2.5%. First, add the returns together: 18.3 + 0.7 - 7.6 + 11.9 + 2.5 = 25.8% Next, count the number of returns. There are five values in total. Now, divide the sum of the returns by the number of returns: 25.8% ÷ 5 = 5.16% Thus, the arithmetic mean of these investment returns is 5.16%. This calculation effectively averages out the returns to show the overall return of the investments over the period evaluated.

To calculate the arithmetic mean of a series of numbers, you need to sum all the values together and then divide by the total number of values. In this case, the investment returns are 18.3%, 0.7%, -7.6%, 11.9%, and 2.5%.

First, add the returns together:

18.3 + 0.7 - 7.6 + 11.9 + 2.5 = 25.8%

Next, count the number of returns. There are five values in total.

Now, divide the sum of the returns by the number of returns:

25.8% ÷ 5 = 5.16%

Thus, the arithmetic mean of these investment returns is 5.16%. This calculation effectively averages out the returns to show the overall return of the investments over the period evaluated.

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