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Roman Education
India
เข้าร่วมเมื่อ 6 ก.ย. 2020
latin language,lingua latina,etymology,true meaning of english,build vocabulary,make easy english,practice,exercise,verbs,present tense,caesar,delension,future and imperfect tense,neuter declension,male declension,female declension,wheelock book,perfect tense,pluperfect tense,reflexive pronouns,#conditional sentences,#deponent verbs
Null space and examples
#Null space and examples
#properties of vector space
#Subspace and example
#Subspace
#vectorspace and
#example
#properties of vector space
#Subspace and example
#Subspace
#vectorspace and
#example
มุมมอง: 118
วีดีโอ
how to find linear transformation T(x, y, z)
มุมมอง 1.5K2 ปีที่แล้ว
#how to find linear transformation T(x, y, z) #properties of vector space #Subspace and example #Subspace #vectorspace and #example
how to find linear transformation T(x, y)
มุมมอง 8052 ปีที่แล้ว
#how to find linear transformation T(x, y) #properties of vector space #Subspace and example #Subspace #vectorspace and #example
Linear Transformation
มุมมอง 252 ปีที่แล้ว
#LinearTransformation #properties of vector space #Subspace and example #Subspace #vectorspace and #example
properties of vector space-3
มุมมอง 262 ปีที่แล้ว
#properties of vector space #Subspace and example #Subspace #vectorspace and #example
properties of vector space-2
มุมมอง 112 ปีที่แล้ว
#properties of vector space #Subspace and example #Subspace #vectorspace and #example
Basis of vector space
มุมมอง 232 ปีที่แล้ว
#Basisofvectorspace #vectorspace #vector #subspace #examples
Properties of vector space-1
มุมมอง 122 ปีที่แล้ว
#properties of vector space #vectorspace #vector #subspace #examples
Linear dependent and independent
มุมมอง 192 ปีที่แล้ว
#Lineardependent #independent #vectorspace #vector #subspace #examples
Second homomorphism theorem
มุมมอง 1112 ปีที่แล้ว
#Second homomorphism theorem #Second #homomorphism #theorem
FIRST HOMOMORPHISM THEOREM
มุมมอง 772 ปีที่แล้ว
#FIRST HOMOMORPHISM THEOREM #FIRST #HOMOMORPHISM #THEOREM
A homomorphism is isomorphism if kerf={e}
มุมมอง 2932 ปีที่แล้ว
A homomorphism is isomorphism if kerf={e}
if K is normal subgroup in G' then f^-1(K') is normal in G
มุมมอง 1702 ปีที่แล้ว
if K is normal subgroup in G' then f^-1(K') is normal in G
let f be homomorphism and if order of H=n then order of f(H) divides n
มุมมอง 1952 ปีที่แล้ว
let f be homomorphism and if order of H=n then order of f(H) divides n
Let f be homomorphism then if f(g)=g' then f^-1(g)={xE[ G | f(x)=g'}= gKerf
มุมมอง 762 ปีที่แล้ว
Let f be homomorphism then if f(g)=g' then f^-1(g)={xE[ G | f(x)=g'}= gKerf
let f be homomorphism and if order of kerf=n then f is n to 1 mapping
มุมมอง 782 ปีที่แล้ว
let f be homomorphism and if order of kerf=n then f is n to 1 mapping
let f be homomorphism and if H is normal then f(H) is normal
มุมมอง 732 ปีที่แล้ว
let f be homomorphism and if H is normal then f(H) is normal
let f be homomorphism and if H is Abelian then f(H) is Abelian
มุมมอง 2102 ปีที่แล้ว
let f be homomorphism and if H is Abelian then f(H) is Abelian
let f be homomorphism and if H is cyclic then f(H) is cyclic
มุมมอง 5372 ปีที่แล้ว
let f be homomorphism and if H is cyclic then f(H) is cyclic
f is homomorphism and if H is subgroup then f(H) is subgroup
มุมมอง 942 ปีที่แล้ว
f is homomorphism and if H is subgroup then f(H) is subgroup
homomorphism carries identity on identity
มุมมอง 422 ปีที่แล้ว
homomorphism carries identity on identity
If f(g) = g' then f^-1(g')= {xE G | f(x)=g'}= gKer f.
มุมมอง 562 ปีที่แล้ว
If f(g) = g' then f^-1(g')= {xE G | f(x)=g'}= gKer f.
let f be homomorphism and if order of g=n then order of f(g) divides n
มุมมอง 2822 ปีที่แล้ว
let f be homomorphism and if order of g=n then order of f(g) divides n
Kernel of homomorphism, definition and example
มุมมอง 722 ปีที่แล้ว
Kernel of homomorphism, definition and example
Good singer
Nice Sir
👍👍👍👍👍
👍👍👍👍👍
👍👍👍👍👍
Ekdam badiya rata hai sir apne 😂
wrong answer and worst explanation
Thanks
❤❤❤❤❤❤❤❤❤❤❤❤❤❤
❤❤❤❤❤❤❤❤❤❤❤❤❤❤❤
Thankyou so much for this!
🙏 Thankyou very much sir
Thanks man
Will you please explain that why we subtract z1 and z2 The given operation is addition, so we should have added them???
thank you so much
Extremely helpful explanation 🙏 Thankyou Sir
How were we left with 1-x^n shouldn’t it be 1-x^(n+1)? 2:13
4 marks mil jaenge itna likhne par ?
sir youre amazing, so easy explanation
Hello, can you please explain to me how phi inverse exist since phi is 1-1 and onto? I am having trouble wrapping my head around that.
look into theorem: Function f:A->B is bijective (1-1 and onto) if and only if there exists an inverse. Intuitively, this theorem should make sense (try to draw a bijective function for a small set A and B)
Thank you, good and quick video
scene thanne :)
Thanku😊
|aH| = |bH| please sir make video on this topic
Nice explanation but according to me sir ur ans is not correct
Thank you sir..
Bohot badia sir ❤...konsi book prefer ki sir apne ?
Thanks u so much sir❤ it's very helpful 😊
🎉
thank you
❤
Is it valid for 1 epsilon only
For rejecting an assumption you just need one counter but for proving an assumption you have to go for general approach
How come 0x1=1
it's addition
But the adj of Matrix is wrong. You should not be done transpose
Where did that 6 came from?
Thx for help
Brilliant lecture!
Thank you so much 🥰💗
शुक्रिया
Sir aap hindi ma bhi smjha skta tha last ma you fumble in English in last part. But overall good explanation sir 🤗🤗
nice explanation
Nice video😍
Super
Thank you Sir 🙌🏼
Why are you wasting your time.
Well explained Sir
I have difficulty in proving onto
Thank you sir🙏
what does m1 and m2 mean?
Thanks for the info, but there is something I don't understand. It probably has an easy explanation but you proved this only for epsilon = -a/2. By the definition of a limit, should this not be valid for all epsilon values? How does showing this for 1 value of epsilon prove the theorem?
For rejecting an assumption you just need one counter but for proving an assumption you have to go for general approach