\label{Statistics_Overall_Key} The \textbf{Overall Problem Statistics} page displays the following data about the problems currently in the course: \begin{description} \item{\textbf{\#Stdnts}}: Total number of students attempting the problem. \item{\textbf{Tries}}: Total number of attempts to solve the problem. \item{\textbf{Max Tries}}: Largest number of attempts to solve the problem by a student. \item{\textbf{Mean Tries}}: Average number of attempts. \item{\textbf{S.D. tries}}: Standard Deviation of the tries. \item{\textbf{Skew Tries}} Skewness of the students' tries. \[ \frac{\sqrt{ \sum{(Xi - Mean)^3} / \#Stdnts}}{\sigma^3} \] \item{\textbf{\#YES}}: Number of students who solved the problem correctly. \item{\textbf{\#yes}}: Number of students who solved the problem by override. \item{\textbf{\%Wrng}}: Percentage of students who tried to solve the problem but were unable to. \item{\textbf{DoDiff}}: Degree of Difficulty of the problem. This statistics give a measure of how many attempts it took the students to get the problem correct. Those students who did not get the problem correct are not counted. A value close to 0 indicates most students who got the problem correct did so on the first attempt. A value close to 1 indicates many attempts were required for students to get the problem correct. A negative value indicates students were given points without attempting the problem. A value of 'nan' means there were no attempts made on the problem. \[ 1 - \frac{\#YES+\#yes}{Tries} \] \item{\textbf{DoDisc}}: Degree of Discrimination of the problem. The students are grouped based on their scores on the sequence which contains the homework problem. The percent score of the bottom 25\% of the students is subtracted from the percent score of the top 25\% of the students. This yields a number from -1 to 1. 1.0 indicates all of the good students answered the problem correctly and none of the poor students answered it correctly. Conversely, a score of -1.0 indicates all of the good students got the problem wrong and the bad students did well. \item{\textbf{weight}}: The weight of the problem in the course (``points''). The value shown is the weight of the problem for the individual computing the statistics. Individual student or section variations are not shown. \end{description} \textbf{Sequence Statistics}: Compiled statistics on problems based on their containing sequence, are also shown. The following data are shown: \begin{description} \item{\textbf{\#Items}}: The number of problem parts in the sequence. \item{\textbf{Score Mean}, \textbf{Score STD}, \textbf{Score Max} \textbf{Score Min}} The mean, standard deviation, maximum, and minimum of the scores of the selected students on the given sequence. \item{\textbf{Score N}} The number of the selected students who submitted answers to problem parts in the sequence. \item \textbf{Count Mean}, \textbf{Count STD}, \textbf{Count Max}, \textbf{Count Min}: The mean, standard deviation, maximum, and minimum count of correct problem parts of the selected students on the given sequence. \item \textbf{Count N} The number of the selected students who submitted answers to problem parts in the sequence. \item \textbf{KR-21} The KR-21 reliability statistic measures the internal reliability of a test or exam. To compute the KR-21 reliability statistic the following formula is used: \[KR-21 = \frac{K}{K-1} \cdot \left(1- \frac{M \cdot (K-M)}{K \cdot s^{2}} \right)\] Where \begin{description} \item{$K$} is the number of items in your test \item{$M$} the mean score on the test \item{$s$} the standard deviation of the scores on your test \end{description} \end{description}