To find the total time Erin spends watching YouTube over a five-day period, we can express this in different ways. Erin watches \(\frac{8}{11}\) of an hour each day for 5 days. Here are the expressions that represent that amount of time:
- \(5 \times \frac{8}{11}\): This expression indicates multiplying the daily viewing time by the number of days (5).
- \(\frac{8}{11} + \frac{8}{11} + \frac{8}{11} + \frac{8}{11} + \frac{8}{11}\): This expression adds the daily viewing time for 5 times, representing the total over the 5 days.
- \(\frac{8}{11} + \frac{8}{11} + \frac{8}{11} + \frac{8}{11} + \frac{8}{11} = \frac{40}{11}\): This is the sum of her viewing time over five days represented in a fraction format.
The correct expressions from the provided options would be:
- \(5 \times \frac{8}{11}\)
- \(\frac{8}{11} + \frac{8}{11} + \frac{8}{11} + \frac{8}{11} + \frac{8}{11}\)
- \(\frac{40}{11}\) (though it's not provided in your list, this is a likely outcome if you sum it up)
Given your options, it seems the choices are slightly unclear, but the following options seem accurate:
- \(5 \times \frac{8}{11}\)
- \(\frac{8}{11} + \frac{8}{11} + \frac{8}{11} + \frac{8}{11} + \frac{8}{11}\)
- \(\frac{40}{11}\) does not appear, but if you specify similar output, it might be useful.
Summarizing the expressions per your conditions, ensure to check for correctness or similar forms if specified.
1 answer