Mode for Frequency Distributions || Lesson 12 || Probability & Statistics || Learning Monkey ||

Mode for Frequency Distributions In this class, We discuss Mode for Frequency Distributions. The reader should have prior knowledge of the mode. Click Here. Example 1: Discrete Values The below table shows the frequency distribution of shirts data. The table shows the size of the shirts and the number of shirts sold. Mode = the shirt having the highest frequency = 42 sizes has frequency value 55. Mode for continuous values: The below table shows the continuous frequency distribution. The class with the highest frequency value is considered the mode class. Fm = mode class The interval of the model class is 40 – 50. Giving a mode value of 40 is not good because the left side will have less number of data values. Giving a mode value of 50 is not good because the right side will have less number of data values. We discussed a similar logic in the median class. Click Here. The measure of central tendency should always go with the central value, and we need to find a value between 40 and 50. F0 = frequency of the class before mode class. F2 = frequency of the class after mode class. Mode = L + h((Fm – F0)/((Fm – F0) + (Fm – F2)). L is the lower limit of the modal class. 'h' is the length of interval for modal class. Based on the frequencies of previous and after classes, the equation will assign a value between the modal class interval. Substituting the values we get mode = 40 + 10(16/24) Mode = 46.67 Link for playlists:    / @wisdomerscse   Link for our website: https://learningmonkey.in Follow us on Facebook @   / learningmonkey   Follow us on Instagram @   / learningmonkey1   Follow us on Twitter @   / _learningmonkey   Mail us @ [email protected]