On a randomly chosen day, each of the 32 students in a class recorded the time, t minutes to the nearest minute, they spent on their homework - Edexcel - A-Level Maths Statistics - Question 5 - 2011 - Paper 1

To find the mean:

Mean = ( \frac{\sum{t}}{n} = \frac{1414}{32} \approx 44.1875 ) (rounded to 4 decimal places).

For the standard deviation:

1. First, calculate the mean of squared times:\n( \sum{t^2} = 69378 )
2. Use the formula for standard deviation:

( \sigma = \sqrt{\frac{\sum{t^2}}{n} - \left(\frac{\sum{t}}{n}\right)^2} )

( \sigma = \sqrt{\frac{69378}{32} - \left(\frac{1414}{32}\right)^2} \approx \sqrt{2161.1875 - 1940.2656} \approx \sqrt{220.9219} \approx 14.87 ) (rounded to 2 decimal places).

Thus, the mean is approximately 44.19 and the standard deviation is approximately 14.87.

The mean (approximately 44.19) is greater than the median (approximately 39.1). This suggests that the distribution of times spent on homework is positively skewed. In a positively skewed distribution, more students spent less time on homework with a few students spending significantly more time, pulling the mean higher than the median.