06:00

Complex Analysis, GATE 2009 Question (Q.ID.M(GATE)CA23)

06:52

(Q.ID.M(NET)CoV47S) Previous Years Question on Calculus of Variation, CSIR UGC NET, June 2018.

11:37

(Q.ID.M(NET)CoV46M) Previous Years Question on Calculus of Variation, CSIR UGC NET, Dec 2019.

13:45

(Q.ID.M(NET)CoV45M) Previous Years Question on Calculus of Variation, CSIR UGC NET, Dec 2019.

04:18

(Q.ID.M(NET)CoV44S) Previous Years Question on Calculus of Variation, CSIR UGC NET, Dec 2019.

08:42

(Q.ID.M(NET)CoV43M) Previous Years Question on Calculus of Variation, CSIR UGC NET, Dec 2018.

05:17

(Q.ID.M(NET)CoV40M) Previous Years Question on Calculus of Variation, CSIR UGC NET, June 2018.

08:55

(Q.ID.M(NET)CoV39M) Previous Years Question on Calculus of Variation, CSIR UGC NET, June 2018.

07:36

(Q.ID.M(NET)CoV38M) Previous Years Question on Calculus of Variation, CSIR UGC NET, June 2019.

05:24

(Q.ID.M(NET)CoV36S) Previous Years Question on Calculus of Variation, CSIR UGC NET, June 2019.

05:48

(Q.ID.M(NET)CoV35M) Previous Years Question on Calculus of Variation, CSIR UGC NET, June 2015.

05:39

(Q.ID.M(NET)CoV32S) Previous Years Question on Calculus of Variation, CSIR UGC NET, Dec 2015.

08:08

(Q.ID.M(NET)CoV31M) Previous Years Question on Calculus of Variation, CSIR UGC NET, Dec 2014.

05:30

(Q.ID.M(NET)CoV29M) Previous Years Question on Calculus of Variation, CSIR UGC NET, June 2014.

07:30

(Q.ID.M(NET)CoV28S) Previous Years Question on Calculus of Variation, CSIR UGC NET, June 2014.

03:32

(Q.ID.M(NET)CoV26S) Previous Years Question on Calculus of Variation, CSIR UGC NET, Dec 2013.

04:56

(Q.ID.M(NET)CoV25M) Previous Years Question on Calculus of Variation, CSIR UGC NET, June 2013.

08:15

(Q.ID.M(NET)CoV22S) Previous Years Question on Calculus of Variation, CSIR UGC NET, June 2013.

08:28

(Q.ID.M(NET)CoV20S) Previous Years Question on Calculus of Variation, CSIR UGC NET, Dec 2012.

03:19

(Q.ID.M(NET)CoV18S) Previous Years Question on Calculus of Variation, CSIR UGC NET, June 2012.

11:51

(Q.ID.M(NET)CoV17M) Previous Years Question on Calculus of Variation, CSIR UGC NET, Dec 2011.

04:39

(Q.ID.M(NET)CoV14S) Previous Years Question on Calculus of Variation, CSIR UGC NET, June 2011.

05:31

(Q.ID.M(NET)CoV06S) Previous Years Question on Calculus of Variation, CSIR UGC NET, June 2017.

07:44

(Q.ID.M(NET)CoV04M) Previous Years Question on Calculus of Variation, CSIR UGC NET, Dec 2016.

06:35

(Q.ID.M(NET)CoV03S) Previous Years Question on Calculus of Variation, CSIR UGC NET, Dec 2016.

17:29

(Q.ID.M(NET)CoV02M) Previous Years Question on Calculus of Variation, CSIR UGC NET, June 2016.

13:49

(Q.ID.M(NET)CoV01S) Previous Years Question on Calculus of Variation, CSIR UGC NET, June 2016.

09:12

#55: Example 2 of an automorphism group and fixed field | Field Theory

07:45

#54: Example 1 of an automorphism group and fixed field | Field Theory

05:36

#53: A fixed field E_H is an intermediate field between E and F | Field Theory

15:02

#52: What is an automorphism group? | Field Theory

25:09

#51: Steinitz theorem: A necessary and sufficient condition for a finite extension to be simple

16:10

#50: A finite and separable extension is also a simple extension | Field Theory

08:30

#49: What are separable extension, simple extension and perfect fields? | Field Theory

16:26

#48: The multiplicative group of non-zero elements of a finite field is cyclic | Field Theory

11:45

#47: Any finite field has an extension of any given finite degree | Field Theory

07:10

#46: The roots of x^(p^n)-x in Zp[x] are all distinct and form splitting field over Zp| Field Theory

08:19

#45: A finite field F has subfield isomorphic to Z/(p) and has p^n elements | Field Theory

21:21

#44: The prime field is either isomorphic to Q or Z/(p), where p is prime | Field Theory

09:11

#43: What is a prime field? | Field Theory

13:55

#42: Multiplicity of any irreducible polynomial over any field | Field Theory

14:10

#41: An irreducible polynomial over F has simple roots if char(F)=0 and multiple roots if char(F)= p

07:28

#40: An irreducible polynomial has multiple roots iff f'(x)=0 | Field Theory

17:54

#39: Multiple roots of an irreducible polynomial in extension field | Field Theory

06:17

#38: An extension field with degree 2 is a normal extension | Field Theory

08:12

#37: Finite extension is a normal extension iff it is a splitting field | Field Theory

13:47

#36: Equivalent statements for a normal extension | Field Theory

11:41

#35: What is a normal extension? | Field Theory

04:56

#34: Example of a splitting field | Field Theory

05:08

#33: A splitting field implies finite and an algebraic extension | Field Theory

09:51

#32: Uniqueness of splitting field | Field Theory

05:42

#31: Existence of splitting field | Field Theory

10:59

#30: What is a splitting field? - II | Field Theory

16:34

#29: What is a splitting field? - I | Field Theory

15:41

#28: Not every algebraic extension is a finite extension | Field Theory

07:11

#27: Every finite extension is an algebraic extension | Field Theory

15:45

#26: Algebraic and transcendental field extensions | Field Theory

22:34

#25: How to create an extension field by adjoining an element? | Field Theory

10:20

#24: Kronecker Theorem (Existence of extension) | Field Theory

14:01

#23: Embedding of a field F into a field E implies E is an extension of F | Field Theory