![]() I haven't discussed the mathematics of deriving the equation in depth. Hence the total combinations of r picks from n items is n!/r!(n-r)! So this is a case pf permutations but where certain outcomes are equal to each other. In a scenario like this, picking candy1, candy2, cand圓 in that order will be no different for you from picking cand圓, candy2, candy1 (different order). Now, does it matter in what order you pick the three? It doesn't. And you get to keep all 3 of them that you pick. The bucket may have about 10 candies in total. Instead of assigning candies, you have to pick three candies from a bucket full of candies. So factorial is same as the permutation, but when n = r.Ĭombination: Now consider a slightly different example of case 3 above. From the example, we have 10 children so n = 10, 3 candies so r = 3. Here number of members is not equal to number of objects. This is also permutation but a more general case. Permutation: Consider the case above, but instead of having only 3 children we have 10 children out of which we have to choose 3 to provide the 3 candies to. ![]() We have n! outcomes when there are n candies going to n children. This is permutation (order matter.which kid gets which candy matters),but this is also a special case of permutation because number of members are equal to number of products. Also notice that different distribution will result in a different outcome for the children. We have finite number of objects to be distributed among a finite set of members. When you give away your first candy to the first kid, that candy is gone. Now you have to distribute this to three children. The candies can be same, or have differences in flavor/brand/type. For n students and k grades the possible number of outcomes is k^n.įactorial: Consider a scenario where you have three different candies. When more students get added we can keep giving them all A grades, for instance. We can provide a grade to any number of students. An easier approach in understanding them,Įxponent: Let us say there are four different grades in a class - A, B, C, D.
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