Permutations: Writing a Permutation as a Product of Disjoint Cycles

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We give two examples of writing a permutation written as a product of nondisjoint cycles as a product of disjoint cycles (with one factor).
  1. Adam Glesser
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Комментарии
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Your observation that we're trying to "get rid of redundancy" actually provides ample motivation for students with an applications bent. I'm an advocate of pure math, yet even I was appreciated the insight. New subscriber here. Thank you.

vector
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Sir, you are the best! Your students are very lucky! Our Professor doesn't explain anything, but expected to know everything!

alla
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I usually don't write comments but sir, you've literally saved my life

mcmc
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Thank u so have searched so many videos..but you explained the best

rubhasreekrishnan
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I have my semester tomorrow and I was utterly confused in this I can do a bit thanks to this vid

baroncandy
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Thank you so much! I spent the whole day doing this😂😂😂😂... only to get it in 5 minutes

lethabompotoane
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Thankyou so much this was so amazing can't believe I understood in 5 minutes 🥺❤️

agathakafuko
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Wow, only one video, which could resolve my problem. Thank You.

lksak
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Thank You! This video is much appreciated...

drummerjuans
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Thanks for the infor sir! Was stuck quite a bit

KermitTheHermit.
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Thanks. It was just what I needed to understand it. What is the spelling of the notation name please? It sounds like you say "kochi's" notation?

shawnmofid
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Hello
Is it possible to express (1 2 3 4) in S4 as a product of disjoint cycles ?
Thanks

kennethben-boulo
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sir one doubt
in ans a
there is only one cycle we got so this is the disjoint cycle right

firewingsipl