Ask Question
23 December, 12:53

You have 4 reindeer, Bloopin, Balthazar, Gloopin, and Prancer, and you want to have 3 fly your sleigh. You always have your reindeer fly in a single-file line. How many different ways can you arrange your reindeer?

+3
Answers (1)
  1. 23 December, 13:19
    0
    P43=4! (4-3) !=241=24

    Step-by-step explanation:

    There are four choices you can make for the lead reindeer. For each possible choice, there are then three remaining you can choose to fly second, making 4*3=12 choices for the lead pair. For each possible choice there are two remaining reindeer to take up the back position, making 12*2=24 choices for the team of three.

    This type of problem is called a permutation problem, and we write Pnr for the number of ways of choosing r items from n possibilities when the order of the items matters. In this case we are choosing 3 reindeer from 4 possibilities, and the order they appear in the flying line does matter, so the answer we want is P43. The general formula is Pnr=n! (n-r) !. For the answer we are looking for we therefore have:

    P43=4! (4-3) !=241=24
Know the Answer?
Not Sure About the Answer?
Find an answer to your question 👍 “You have 4 reindeer, Bloopin, Balthazar, Gloopin, and Prancer, and you want to have 3 fly your sleigh. You always have your reindeer fly in ...” in 📗 Mathematics if the answers seem to be not correct or there’s no answer. Try a smart search to find answers to similar questions.
Search for Other Answers