Raquel and Van live in two different cities. As part of a project, they each record the lowest prices for a gallon of gas at gas stations around their cities on the same day. Raquel’s data reflect a mean price of $3.42 with a standard deviation of 0.07. Van’s data reflect a mean price of $3.78 with a standard deviation of 0.23. Which statement is true about their gas-price data? Raquel’s data are most likely closer to $3.42 than Van’s data are to $3.78. Van’s data are most likely closer to $3.42 than Raquel’s data are to $3.78. Raquel’s data are most likely closer to $3.78 than Van’s data are to $3.42. Van’s data are most likely closer to $3.78 than Raquel’s data are to $3.42.

the standard deviation shows the dispersion (how close) of the data. Therefore the correct statement is A:
- Raquel’s data are most likely closer to $3.42 than Van’s data are to $3.78.

Answer Link

virtuematane virtuematane · Answer 2 · 2019-04-17T10:42:37+02:00

Answer:

Raquel’s data are most likely closer to $3.42 than Van’s data are to $3.78.

Step-by-step explanation:

We know that a standard deviation is a measure that is used to find the amount of dispersion or variation of the data set.

If standard deviation is low this means that the data points tends close to the mean of the data set.

while a higher standard deviation means that the data values are spread to a greater range.

Hence, form the given information we may imply that:

Raquel’s data are most likely closer to $3.42 than Van’s data are to $3.78.

( Since, the standard deviation of Raquel's data is low which is 0.07 as compared to Van's data ( which is 0.23).

Hence, the Raquel's data will tend close to the mean which is $ 3.42. )