LeonG wrote: ↑Thu Mar 21, 2024 10:08 pm
Franklan wrote: ↑Thu Mar 21, 2024 8:49 pm
"Commutative" means that a multiplication can be "swapped", as in "5 times 3" is the same as "3 times 5".
I had a teacher who didn't know that. He wanted me to multiply 3 by 3 by 3 by 3 and I went 9 by 9 equals 81. He started off with "Wait, you can't do that?" To "Oh, it works too".
Made me think about this story about Gauss.
He was unruly at school, especially at maths, because the subject for him was too easy and therefore boring.
So the teacher, unhappy with his bad behaviour, decided to "punish" him, and instructed him to calculate the sum of the first 100 integer numbers. How long would this take you? The teacher thought it was going to take him many days. All good.
Problem is, he was done after few minutes.
How would you calculate the sum of the first 100 numbers? I think most people would do 1+2+3+..., like 1+2=3, 3+3=6, 6+4=10, 10+5=15, 15+6=21, etcetera. But not Gauss, he was one of the greatest genius ever.
in a sum, you can reshuffle the numbers as you wish. Result always the same. So instead of adding the first to the second, then adding the third, the the fourth, and so on, you could also:
add the first and the last: 1+100 = 101
add the 2nd smallest and the 2nd biggest: 2+99 = 101
add the 3rd smallest and the 3rd biggest: 3+98 = 101
this way you have 50 different pairs, all summing up to 101.
In other words:
1+2+ ... + 100 = 50*101 = 5050
1+2+ ... + N = N*(N+1)/2
And before you conclude: "come on, that's easy, not so genius after all....". Do you really think many people find this easy BEFORE it is ever explained to them?
The crazy and cool thing is that the teacher who gave him this task, to force him quiet, was probably unaware of this cool thing. After all this is one of many equations that still carries Gauss name. Poor teacher. Love Gauss.
. I expect I will soon return enemy #1 but hey, for now I'm very happy.
