Maths has a median score of \(78\) and a range of \(10\) so all the results were close to the mean and the median. In summary, both English and Maths have a mean score of \(78\) however English has a median score of \(71\) and a range of \(35\) as some students scored much higher than others. This is far greater than the range of scores in the Maths which is \(10\). The range of scores in English is \(35\). y log10(x), instead of base 10, if there is some other base, the domain will remain same. For example, in the logarithmic function. In case, the base is not 10 for the above logarithmic functions, domain will remain unchanged. The range is not an average, but a measure of the spread of the values (or marks in this case). Domain is already explained for all the above logarithmic functions with the base 10. However, in order to highlight the differences in the marks scored and to give maximum information, a combination of the median and the range would be best. The mean is usually the best measure of the average, as it takes into account all of the data values. In statistics and mathematics, the range is the difference between the maximum and minimum values of a data set and serve as one of two important features of a data set. It depends on the context in which the result is to be used. The modal score for each subject \(96\) and \(78\) suggests that the students did better in English however this is only considering the two top marks in English and you have no information about the scores of the other students. The median is only a measure of the middle value, as there will be the same number of values above and below this middle value. This is partly true, but there are also some much higher scores. The medians, \(73\) and \(78\) suggest that the students generally scored less well in English. However, looking at the actual scores, you can see that this is not the case. But there is no 'middle' number, because there are an. In this example, the numbers are already listed in numerical order, so I dont have to rewrite the list. This suggests that the scores of the students are similar in English and Maths. Find the mean, median, mode, and range for the following list of values: 1, 2, 4, 7. You need to be careful when using this function over inexact rings: the elements are computed via repeated addition rather than multiplication, which may produce slightly different results. The mean score in each subject is \(78\). Unlike range(), start and end can be any type of numbers, and the resulting iterator involves numbers of that type. The range math definition is the difference between the highest values and lowest values in a given set of numbers. If you were to compare the scores in the two subjects, which measure of average would you use and why?
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