Every Euclidean Domain is a Principal Ideal Domain - Theorem - Euclidean Domain - Lesson 4
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- Опубликовано: 7 фев 2025
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Here in this video i will explain a result which states that Every Euclidean Domain is a Principal Ideal Domain .
everything is explained in Hindi
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![Z[i] is an Euclidean Domain - Result - Euclidean Domain - Lesson 5](http://i.ytimg.com/vi/OOrMqEFl6Ic/mqdefault.jpg)
![Z[i] is an Euclidean Domain - Result - Euclidean Domain - Lesson 5](/img/tr.png)
Thank you mam really really appreciate , you clear my concept which my university professor couldn't , I'm really grateful
Mam your way of reaching is very good
Thankyou so much ma'am. U made it easy to understand
If f is a homomorphism of a ring R onto R' then R' is a isomorphic to the quotient ring R/S, where S is tha kernal of homomorphism plz solve
this question
Maam, R is an ED implies that R is an ID as well, then by def it will have unity, since ID is a commutative ring with unity without zero divisors.14:45??
I had the same doubt but apparently the definition of ID is different in different books. Some assume the existence of unity in it while others don't
Ma'am ID me to multi idt to hoti hi hai ,, to I.D. ke sath idt ko kyun difine karti h ,,,, confusion
Thank you so much
Nice
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thanks
Good
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Euclidean ring and euclidean domain is same?
Yes
what about converse mam??
It need not be true
S is not a mapping from R to z it should be Z^+U{0}
Mention time of the video
Sn math tuitorial (bsc) youtube channel for bangla medium
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't' ulta kyun likha hai
Thank you very much