For this portfolio, let's say we have the following concession stand prices:
- $3.25 (which has a hundredths place value of 5)
- $4.50 (which has a hundredths place value of 0)
- $2.75 (which has a hundredths place value of 5)
Based on the requirement of choosing amounts with decimal values and specifically focusing on the hundredths place, we'll select the following three amounts for our calculation:
- $3.25 (hundredths place value: 5)
- $2.75 (hundredths place value: 5)
- $1.60 (hundredths place value: 0)
Now, let's add them together but focus on the hundredths place values:
\[ 3.25 \ (hundredths \ place \ value: 5) \
- 2.75 \ (hundredths \ place \ value: 5) \
- 1.60 \ (hundredths \ place \ value: 0) \]
We will add only the values from the hundredths place, so we take:
- 5 from $3.25
- 5 from $2.75
- 0 from $1.60
Now, we will sum up:
\[ 5 + 5 + 0 = 10 \]
Since the sum of the hundredths place values is 10, it actually means we have 0 in the hundredths place (not counting the full number over 9). Typically, we carry over to the next place value.
If we focus on the overall addition of the original prices for correct representation, here’s the full addition:
\[ 3.25 + 2.75 + 1.60 = 7.60 \]
Final Explanation:
In total, I bought popcorn for $3.25, a soda for $2.75, and candy for $1.60. The total amount I spent at the concession stand was $7.60.
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