- Laplace Transform of 1
- Laplace Transform of sin at
- Laplace Transform of cos at
- Laplace Transform of cosh at
- Laplace Transform of sinh at
- Laplace Transform of e^at
- Laplace Transform of e^-at
- Laplace Transform of t^n
- Problem 1 based on Laplace Transform of Standard Functions
- Problem 2 based on Laplace Transform of Standard Functions
- Problem 3 based on Laplace Transform of Standard Functions
- Problem 4 based on Laplace Transform of Standard Functions
- Problem 5 based on Laplace Transform of Standard Functions
- Problem 6 based on Laplace Transform of Standard Functions
- Change of Scale Property
- Problem 1 on Change of Scale Property
- First Shifting Theorem
- Problem 1 based on First Shifting Theorem
- Problem 2 based on First Shifting Theorem
- Problem 3 based on First Shifting Theorem
- Problem 4 based on First Shifting Theorem
- How to Derive Complementary Error Function in Laplace Transform
- Problem on Complementary Error Function in Laplace Transform
- Multiplication by 't' Property
- Problem 1 based on Multiplication by 't' property
- Problem 2 based on Multiplication by 't' property
- Problem 3 based on Multiplication by 't' property
- Problem 4 based on Multiplication by 't' property
- Problem 5 based on Multiplication by 't' property
- Problem 6 based on Multiplication by 't' property
- Division by 't' Property - Proof and formula
- Problem 1 based on Division by 't' Property
- Problem 2 based on Division by 't' Property
- Problem 3 based on Division by 't' Property
- Problem 4 based on Division by 't' Property
- Laplace Transform of Integral Property - Proof and formula
- Problem 1 based on Laplace Transform of Integral Property
- Problem 2 based on Laplace Transform of Integral Property
- Problem 3 based on Laplace Transform of Integral Property
- Problem 4 based on Laplace Transform of Integral Property
- Problem 5 based on Laplace Transform of Integral Property
- Problem 1 based on Definition of Laplace Transform
- Problem 2 based on Definition of Laplace Transform
- Problem 3 based on Definition of Laplace Transform
- Problem 4 based on Definition of Laplace Transform
- Laplace Transform of Derivative Property - Proof and formula
- Problem 1 based on Laplace Transform of Derivative Property
- Problem 2 based on Laplace Transform of Derivative Property
- Problem 3 based on Laplace Transform of Derivative Property
- Problem 4 based on Laplace Transform of Derivative Property
- Problem 5 based on Laplace Transform of Derivative Property

- Definition and Formulae of Inverse Laplace Transform
- Problem 1 based on Inverse Laplace Transform using Standard Results
- Problem 2 based on Inverse Laplace Transform using Standard Results
- Problem 1 based on Inverse Laplace Transform using Shifting theorem
- Problem 2 based on Inverse Laplace Transform using Shifting theorem
- Problem 3 based on Inverse Laplace Transform using Shifting theorem
- Problem 4 based on Inverse Laplace Transform using Shifting theorem
- Problem 5 based on Inverse Laplace Transform using Shifting theorem
- Problem on Inverse Laplace transform using Partial Fraction
- Problem 1 based on Inverse Laplace Transform using Convolution Theorem
- Problem 2 based on Inverse Laplace Transform using Convolution Theorem
- Problem 3 based on Inverse Laplace Transform using Convolution Theorem
- Problem 4 based on Inverse Laplace Transform using Convolution Theorem
- Problem 5 based on Inverse Laplace Transform using Convolution Theorem
- Problem 1 based on Inverse Laplace Transform of log and tan¯¹ Function
- Problem 2 based on Inverse Laplace Transform of log and tan¯¹ Function
- Problem 3 based on Inverse Laplace Transform of log and tan^-1 Function
- Problem 4 based on Inverse Laplace Transform of log and tan^-1 Function
- Problem 5 based on Inverse Laplace Transform of log and tan^-1 Function
- Problem 6 based on Inverse Laplace Transform of log and tan^-1 Function

- Introduction to Complex Variables and Types of Problems
- Type 1A (Analytic Function) - Problem 1 and 2
- Type 1A (Analytic Function) - Problem 3 and 4
- Type 1A (Analytic Function) - Problem 5 and 6
- Type 1A (Analytic Function) - Problem 7 and 8
- Type 1A (Analytic Function) - Problem 9 , 10 , 11
- Type 1B (Analytic Function) - Problem 1
- Type 1B (Analytic Function) - Problem 2
- Type 1B (Analytic Function) - Problem 3
- Type 1B (Analytic Function) - Problem 4
- Type 2 Harmonic Function - Problem 1 and 2
- FInding Analytic Function F(z) - Introduction and Tricks to Solve - Type 3
- FInding Analytic Function F(z) Problem 1
- FInding Analytic Function F(z) Problem 2
- FInding Analytic Function F(z) Problem 3
- FInding Analytic Function F(z) Problem 4
- FInding Analytic Function F(z) Problem 5
- FInding Analytic Function F(z) Problem 6
- FInding Analytic Function F(z) Problem 7
- Finding Analytic Function F(z) Problem 8
- Orthogonal Trajectory Problem 1
- Orthogonal Trajectory Problem 2
- Complex Variable - Miscellaneous Problem 1
- Complex Variable - Miscellaneous Problem 2
- Complex Variable - Miscellaneous Problem 3
- Complex Variable - Miscellaneous Problem 4
- Complex Variable - Miscellaneous Problem 5
- Cauchy Rieman Equation in Cartesian Co-ordinates ( Concept and Formula )
- Problem No.1 on Cauchy Riemann Equation in Cartesian Co-ordinates
- Problem No.2 on Cauchy Riemann Equation in Cartesian Co-ordinates
- Problem No.3 on Cauchy Riemann Equation in Cartesian Co-ordinates
- Problem No.4 on Cauchy Riemann Equation in Cartesian Co-ordinates
- Problem No.5 on Cauchy Riemann Equation in Cartesian Co-ordinates
- Problem No.6 on Cauchy Riemann Equation in Cartesian Co-ordinates
- Cauchy Rieman Equation in Polar Co-ordinates ( Concept and Formula )
- Problem No.1 on Cauchy Riemann Equation in Polar Co-ordinates
- Problem No.2 on Cauchy Riemann Equation in Polar Co-ordinates
- Concept of Harmonic Function
- Problem No.1 on Harmonic Function
- Problem No.2 on Harmonic Function
- Problem No.3 on Harmonic Function
- How to find Analytic Function (Imaginary Part is given)
- How to find Analytic Function (when u+v or u-v is given)
- How to find Analytic Function (Real Part is Given in Polar Form)
- How to find Analytic function when Harmonic function is given
- Problem No.1 Based on Analytic Function (Harmonic Function is given)
- Problem No.2 Based on Analytic Function (Harmonic Function is given)
- Problem No.3 Based on Analytic Function (Harmonic Function is given)
- Problem No.4 Based on Analytic Function (Harmonic Function is given)
- Problem No.5 Based on Analytic Function (Harmonic Function is given)

- Concept of Conformal Mapping and It's Type
- Standard Transformation Problem 1
- Standard Transformation Problem 2
- Standard Transformation Problem 3
- Standard Transformation Problem 4
- Bilinear Transformation Cross Ratio Property - Problem 1
- Bilinear Transformation Cross Ratio Property - Problem 2
- Bilinear Transformation Cross Ratio Property - Problem 3
- Bilinear Transformation Cross Ratio Property - Problem 4
- Mapping Through Bilinear Transformation Problem 1
- Mapping Through Bilinear Transformation Problem 2
- Mapping Through Bilinear Transformation Problem 3
- Mapping Through Bilinear Transformation Problem 4
- Mapping Through Bilinear Transformation Problem 5

- Introduction to Fourier Series
- Full Range Fourier Series - Problem 1
- Full Range Fourier Series - Problem 2
- Full Range Fourier Series - Problem 3
- Full Range Fourier Series - Problem 4
- Full Range Fourier Series - Problem 5
- Full Range Fourier Series - Problem 6
- Full Range Fourier Series - Problem 7
- Full Range Fourier Series - Problem 8
- Full Range Fourier Series - Problem 9
- Full Range Fourier Series - Problem 10
- Full Range Fourier Series - Problem 11
- Full Range Fourier Series - Problem 12
- Full Range Fourier Series - Problem 13
- Full Range Fourier Series - Problem 14
- Full Range Fourier Series - Problem 15
- Full Range Fourier Series - Problem 16
- Full Range Fourier Series - Problem 17
- Half Range Fourier Series - Problem 18
- Half Range Fourier Series - Problem 19
- Half Range Fourier Series - Problem 20
- Half Range Fourier Series - Problem 21
- Half Range Fourier Series - Problem 22
- Parsevals Identity Problem 1
- Parsevals Identity Problem 2
- Parsevals Identity Problem 3
- Introduction to Complex Form of Fourier series
- Complex Form of Fourier Series - Problem 1
- Complex Form of Fourier Series - Problem 2
- Complex Form of Fourier Series - Problem 3
- Complex Form of Fourier Series - Problem 4
- Complex Form of Fourier Series - Problem 5
- Complex Form of Fourier Series - Problem 6
- Complex Form of Fourier Series - Problem 7
- Orthogonal and Orthonormal - Problem 1
- Orthogonal and Orthonormal - Problem 2
- Orthogonal and Orthonormal - Problem 3
- Orthogonal and Orthonormal - Problem 4
- Orthogonal and Orthonormal - Problem 5

- Introduction To Correlation
- Spearman's Rank Correlation Coefficient - Problem 1
- Spearman's Rank Correlation Coefficient - Problem 2
- Karl Pearson Coefficient Of Correlation - Problem 1
- Karl Pearson Coefficient Of Correlation - Problem 2
- Karl Pearson Coefficient Of Correlation - Problem 3
- Introduction To Regression
- Regression Problem 1
- Regression Problem 2
- Regression Problem 3
- Regression Problem 4
- Regression Problem 5

- Introduction to Bessels Function and Formulae Discussion
- Bessel Function - Problem 1
- Bessel Function - Problem 2
- Bessel Function - Problem 3
- Bessel Function - Problem 4
- Bessel Function - Problem 5
- Bessel Function - Problem 6
- Bessel Function - Problem 7
- Bessel Function - Problem 8
- Bessel Function - Problem 9
- Bessel Function - Problem 10
- Bessel Function - Problem 11

- Type 1 Problem 1
- Type 1 Problem 2
- Type 1 Problem 3
- Type 1 Problem 4
- Type 1 Problem 5
- Type 1 Problem 6
- Type 1 Problem 7
- Properties of Z - Transform
- Type 1) Problem 8
- Type 1) Problem 9
- Type 1) Problem 10
- Type 1) Problem 11
- Type 1) Problem 12
- Inverse Z-Transform Type 2) Problem 1
- Inverse Z-Transform Type 2) Problem 2
- Inverse Z-Transform Type 2) Problem 3
- Inverse Z-Transform Type 2 Problem 4
- Inverse Z-Transform Type 2 Problem 5

Professor Farhan Meer believes only good education is the foundation of a better future and knowledge is only a thing which can never be snatched from a person, so it stays for life. With more than ten years of bountiful teaching experience in the field of mathematics, and computer science, he has attained both of his degrees in bachelor and master of computer engineering from Mumbai University. His teaching methodology involves focusing on the simplification of sums to make students understand more some of his primary and secondary subjects remain Engineering Mathematics and Computer Science respectively. His definition for good teaching is all about listening, questioning, being responsive and remembering that each student and class is different yet unique.

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