Geometry and Strong inductions Discrete Math. Suppose you begin with a pile of n stones and split this pile into n piles of one stone each by successively splitting a pile of stones into two smaller piles. Each time you split a pile you multiply the number of stones in each of the two smaller piles you form, so that if these piles have r and s stones in them, respectively, you compute rs . Show, by strong induction, that no matter how you split the piles, the sum of the products computed at each step equals n(n-1)/2

allbleachix

allbleachix

Answered question

2022-09-06

Geometry and Strong inductions Discrete Math
Suppose you begin with a pile of n stones and split this pile into n piles of one stone each by successively splitting a pile of stones into two smaller piles. Each time you split a pile you multiply the number of stones in each of the two smaller piles you form, so that if these piles have r and s stones in them, respectively, you compute rs . Show, by strong induction, that no matter how you split the piles, the sum of the products computed at each step equals n ( n 1 ) / 2
I dont get this because say n is 20 and i split it to 10 and 10. I multiply those two numbers together and i get 100. When i do 20(20-10)/2, i dont get 100. What am i doing wrong?

Answer & Explanation

yamalwg

yamalwg

Beginner2022-09-07Added 17 answers

Step 1
That is only going to be one step in the sequence, and 10 10 = 100 is only one of the numbers you'll add.
Step 2
The next step might be to split one of the piles of 10 into 3 and 7, so you'd then compute 3 7 = 21, and then next you might split the other pile of 10 into two piles of size 4 and 6, computing 4 6 = 24, then maybe you split the pile of size 3 into piles of size 1 and 2 computing 1 2 = 2, and so on, until all the piles have size 1. Then you add all the numbers you computed at each step.

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