[0] is denoted as equivalence class for remainder 0 and not residue classes. Residue class is set of all such poosible equivalence class. Rest you have explained well. Proceed further with multiplicative group Zn*
Main bahut der se samaj raha tha kuch nahi aa raha tha Fir app ka vedio dekha to awsm clear ho gaya Maine app ko susxribe bhi char diya hai Plz congurance modulo m ke vedio bana do sir mere exam near hai 🙏🙏🙏🙏🙏🙏😭😭😭😭🙏🙏🙏🙏🙏🙏🙏🙏🙏😭😭🙏🙏
Residue classes modulo(7) (except 0) forms an abelian group for multiplication ....in general residue classes of modulo m(except 0) does not form an abelian group ..... please reply bhaiya 🙏🙏
@@ShoulendraMishra thanku so much bhaiya..,🙏🙏🙏..i confused from 1 hours because everyone says that it does not form an abelian group for operation multiplication ......
Sir prime resdue classes form a group & composite resdue classes not a group pz make video on this as it is confusion (Zm,•) is not group but( Zp,•) p is prime is a group
I don't understand if A={1234},R be the relationR={(1,1),(1,2),(1,3),(2,1),(2,2),(1,2),(3,3),(4,4)}then classes are[1]=(1,2),[2]=(1,2) [3]=(3,3),[4]=(4,4) so here[1]why not take (1,1)or(1,3) [2]and(2,2) 2,1
Great Sir great thanks alot from Pakistan 🇵🇰...you clear my confusion again thanks
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❤ thanku sir bahut accha explain kiya aapne
Awesome explanation sir... 🔥👏👏👏
Fantastic ❤❤
Awsomw explanation.but some noice.
Wow sir splendid ... Thank u so much👍
Thank you very much Sir. You possess a very nice way of teaching.
Aditya Siddharth thanks so mucchhh
Thanks: Good Explaination
Thanks for giving best explanation
Book se apne aap kuch smjh ni aara... Thanks to you I totally understood it😊
Thanks bhai bhaut ache se samjhaya tumne
Sir you teach very well
Mast bhai
Thank you 🙏....this is helped me a lot 😊
[0] is denoted as equivalence class for remainder 0 and not residue classes. Residue class is set of all such poosible equivalence class. Rest you have explained well. Proceed further with multiplicative group Zn*
wow very helpful now i got clear difference between residue class and equivalence thanks
@@ShoulendraMishra I can't understand difference in resdue classes and equivalenc classes
Nice explanation sir👏
explain beautifully... but speak softly and be relax..
Yes .... I also realize that thing thanks so muchhhh
You lecture is good
Thank you sir😇😇😇
Main bahut der se samaj raha tha kuch nahi aa raha tha
Fir app ka vedio dekha to awsm clear ho gaya
Maine app ko susxribe bhi char diya hai
Plz congurance modulo m ke vedio bana do sir mere exam near hai
🙏🙏🙏🙏🙏🙏😭😭😭😭🙏🙏🙏🙏🙏🙏🙏🙏🙏😭😭🙏🙏
Thanks a lot
Thanks bhai
Well explained.
Thanks
Sir aap ka padhana ka tarika best h and you r a good teacher
Thanks a lot bro
Nice teachs
Thank you sir !
Thank you
You are greatest sir.
THANKS A LOT
Excellent
Asum helpful
Easy explanation
thanks
Thhanke
Sir,
why you r not taking negative integers like -2, ,-6,-10.....in the residue class of 2?
Please explain...
-ve remainder having not much sense ,
Bt if talking about divisor -ve then yes u can take them
correct. he forgot it.
Is it true to say that Z4 is same as the set of integers??
thanks bhai🙂
good sir
can the set have negative numbers?
what mean
bhayaa eek video modulo per banaiyea jalde
Sure..... Bt which modulo basic
Thanks, bhai!!
Welcome
Well Explained Bhai👏
Shantnu Kumar thanks so mucch
Sir Jee यहां पर r and m positive integer होगा या फिर integer
r to positive hi rhega , m usable positive hi rehta h
1 wale set main 1 element kaise aaea?
thanks u sir
Always welcome
Bhai congurance modulo m ke vedio bana kar kuch belp karo na plz plz plz
Okm
sir how to show a given set complete residue of mod m...pls share a video
Birendra Mahto s contact me whatsapp 9450047156
Birendra Mahto thanks for review
If U1&U2 are two ideals of a ring R the prove the U1+U2={x+y/x€U1and y€U2} a also an ideal of R ( please solve this theorem)
ok check i think i do already
🙏🙏thankyou
thanks
superior
Thanks so much
Residue classes modulo(7) (except 0) forms an abelian group for multiplication ....in general residue classes of modulo m(except 0) does not form an abelian group ..... please reply bhaiya 🙏🙏
Only prime
@@ShoulendraMishra thanku so much bhaiya..,🙏🙏🙏..i confused from 1 hours because everyone says that it does not form an abelian group for operation multiplication ......
Thank you sir
welcome
Why have you taken the classes as an element ?? As a class contains a whole amount of nos in it like [0] contains 0 ,4,8,12......
Or you have mixed the set of residues modulo m and set of residue classes modulo m
i m using seperate notations for both like 1 is residue and [1] for residue class
Sir prime resdue classes form a group & composite resdue classes not a group pz make video on this as it is confusion (Zm,•) is not group but( Zp,•) p is prime is a group
Sir -ve bhi ho skte h kya
means
thank you bhyaa
Thanks a lot
Dear sir CRS or NCRS or RRS ki vedios b upload kr dy plzzzzz
I will try. Thanks for review
These full form.
Shoulendra Mishra CRS _complete residue system
Thanks for review
bhai 1 ko 4 se divided krne per remainder 1 kaise hoga
reply please
Division goes to 0 times
@@ShoulendraMishra thnk bhai mai bhi yhi soch raha tha
I don't understand if A={1234},R be the relationR={(1,1),(1,2),(1,3),(2,1),(2,2),(1,2),(3,3),(4,4)}then classes are[1]=(1,2),[2]=(1,2) [3]=(3,3),[4]=(4,4) so here[1]why not take (1,1)or(1,3) [2]and(2,2) 2,1
Because [1] and [2] are same , so u can choose one of them
If u wish then take [1] and leave [2]
Nice video
Dharmendra Mishra thanks so mucchh
Thank you
thank you sir