05:31

Theorem: Based on the concept of right increasing function on time scale.

01:43

Concept of right increasing and right decreasing function on time scales.

04:02

Concept of second delta derivative on time scales.

03:41

Theorem : Every regulated function on a compact interval is bounded.

01:25

Concept of left dense (ld)-continuous function on time scales.

02:08

Concept of right dense (rd)-continuous function on time scales.

02:19

Concept of Pre-differentiable function for time scales

01:48

Concept of a regulated function in time scales

03:12

Finding nabla-derivative of a function $f(t)=t^2+2t+1$

02:48

Theorem : Finding formula for nabla derivative of a function defined on a time scale.

03:43

Theorem : Finding nabla-derivative of a function at a left-dense point.

04:05

Theorem : Finding nabla derivative of a left-scattered point of a time scale.

07:01

Theorem based on the Nabla derivative of a function.

06:32

Finding delta derivative of a function_2

04:31

Finding delta derivative of a function.

02:20

Theorem based on the concept of delta derivative of a function.

04:33

Theorem based on the concept of Delta derivative of a function on time scales.

03:53

Theorem based on the concept of Delta derivative of a function on time scales.

07:17

Theorem : Every delta differentiable function is continuous

04:33

Theorem : Nabla derivative is well defined

03:05

Concept of Nabla-derivative of a function in time scales

03:50

Finding delta derivative of a function $f(t)=t^2$ on time scales

03:45

Proof of delta derivative of a constant function is zero.

03:59

Exercise question based on the concept of delta derivative of a function on time scale.

04:23

Theorem : Delta derivative is well-defined.

04:03

Concept of Delta-derivative of a Function in Time Scales.

03:54

Concept of Intervals for Time Scales.

03:32

Exercise question based on the concept of graininess function in time scales.

05:40

Exercise question based on the concept of forward and backward jump operator.

02:58

Concept of backward shift of a function for time scales.

03:44

Concept of Forward and Backward Graininess Functions in Time Scales

04:44

Concept of ''Forward Shift of Function'' in Time Scales

05:15

Question based on concept of Jump Operators for Time Scales.

02:34

Classification of Points in Time Scales

04:17

Concept of Jump Operators in Time Scales.

04:05

Concept of Time Scales

03:50

Exercise question from book ''Contemporary Abstract Algebra'' by Joseph A. Gallian.

03:43

Exercise question from book ''Contemporary Abstract Algebra'' by Joseph A. Gallian.

03:35

Exercise question from book ''Contemporary Abstract Algebra'' by Joseph A. Gallian.

03:41

Exercise question from book ''Contemporary Abstract Algebra'' by Joesph A. Gallian.

04:02

Exercise question from book ''Contemporary Abstract Algebra'' by Joseph A. Gallian.

04:02

Exercise question from book ''Contemporary Abstract Algebra'' by Joseph A. Gallian.

03:10

Exercise question from book ''Contemporary Abstract Algebra'' by Joseph A. Gallian.

03:42

Exercise question from book "Contemporary Abstract Algebra'' by J. A. Gallian.

04:26

Exercise question from book ''Contemporary Abstract Algebra'' by Joseph A. Gallian.

04:30

Exercise question from book ''Contemporary Abstract Algebra'' by Joseph Gallian.

03:33

Exercise question from book ''Contemporary Abstract Algebra'' by Joseph A. Gallian.

06:35

Exercise question from book ''Contemporary Abstract Algebra'' by Joseph A. Gallian.

04:15

Exercise question from ''Contemporary Abstract Algebra'' by Joseph A. Gallian.

04:41

Question from linear algebra based on the concept of linearly independent vectors.

08:08

Determination of basis and dimension of vector space $V=F(S,R)$.

06:05

Finding dual basis form given basis of vector space $R^2$.

02:09

Question from linear algebra based on the properties of determinants.

03:14

Question from linear algebra based on the concept of diagonalizable matrix.

02:10

Determination of rational polynomial with complex root.

04:04

Determination for rule of a linear transformation using images of basis vectors.

03:43

Question from Inner Product Spaces.

02:06

Finding values of parameter 'c' for which given matrix is A singular.

03:57

Solving recurrence relation with given initial terms.

04:39

Exercise question from vector spaces based on the concept of linear transformation.