If there does not exist some cyclic subgroups in any finite group,this theorem can not be proved .we assume a is nonidentity element,then there exists some cyclic subgroups.
Dihedral groups are symetrices of.regular polygones... But symetric group is symetrices of complete graph or we can say symetric group Sn is set of all permutation of a set of n elements
Sir gajab first time understandable
Thank you so much sir apna bhut accha samjhaya
👏👏👏
best explanation
Very very very thank you sir 😊😊
Nice Sir je aap bht acha samjhaty hain😊😊
Thanks sir g😊😊
Thankyou so much sir ji☺️
Ccs
Nice content sir great
Before Proving any theorems,give examples like Dr.gajendra purohit in india .
Nice explain sir
thank uu sir g
Very good method of teaching
You take G is cyclic ,at last ,you prove G is cyclic.
I think that this proof is wrong .you take conversely G is cyclic ,then you have to prove G is prime order which is not possible in every case.
But every cyclic group is abelian is correct .
Ye bi explain ni Kia k subgroup cyclic kiun suppose Kia he . Kiun k subgroup zarori ni k cyclic ho
If the subgroup is trivial,then it is obviously cyclic.How many cyclic subgroups of a group with order 20?
Nice content 👌 sir g
Set of real number with absolute value 1 is group under addition
Does every group have cyclic subgroups?
No. Many group have some non.cyclic subgroup..
Wrong suppose Kia he . G ko cyclic show krna he aur cyclic hi suppose kr Lia he.
Does there exist some cyclic subgroups in any group ?
I dont know about any group which have no any cyclic subgroup... If a group has atlest one finite order elememt which has a cyclic subgroup
Watch my group theory cocept series.. To clear all concept about group
If there does not exist some cyclic subgroups in any finite group,this theorem can not be proved .we assume a is nonidentity element,then there exists some cyclic subgroups.
Set of rational numbers is group under addition but it is not cyclic group .Anyway,it has infinite cyclic subgroups.
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What is difference between dihedral group and symmetric group ?
Dihedral groups are symetrices of.regular polygones... But symetric group is symetrices of complete graph or we can say symetric group Sn is set of all permutation of a set of n elements
Is transformation cyclic group?
Which transformation
Why do you assume that in group G and H be cyclic subgroup ? Give reason .
G is only group.. And H is cyclic subgroup because it is generated by a single element.
Ye bta dain bhai
Sir ap boht mehnat se parhate hain sir G ko cyclic to show karna h but ap ne start me let kar liya k G cyclic h
I think that this proof is wrong .you take conversely G is cyclic ,then you have to prove G is prime order which is not possible in every case.
This proof is correct .
You take G is cyclic at first ,then you prove G is cyclic .This video is completely wrong .
@@mohanbhattrai2752 by mistake Let G is group.of order n.. From.start cyclic word is written by mistakr
Converse is not true every cyclic group is not prime order..
Hindi me hi bol le nh bhai ham hindustan se hi hai
M.pakistan se hn
@@learnmathematicsbymuhammad9829 Toh pakistan me bhi toh hindi hi bolte honge bhai