- Standard Form of Complex Numbers - Concept
- Problem 1 Based on Standard Form of Complex Number
- Problem 2 Based on Standard Form of Complex Number
- Conjugate of Complex Numbers - Concept
- Problem 1 Based on Conjugate of Complex Numbers
- Problem 2 Based on Conjugate of Complex Numbers
- Algebra of Complex Numbers - Concept
- Problem 1 Based on Algebra of Complex Numbers
- Problem 2 Based on Algebra of Complex Numbers
- Problem 3 Based on Algebra of Complex Numbers
- Equality of Complex Numbers - Concept
- Problem 1 Based on Equality of Complex Numbers
- Problem 2 Based on Equality of Complex Numbers
- Problem 1 Based on Square Root of Complex Numbers
- Modulus and Argument of Complex Number - Concept
- How to Find Argument of Any Complex Number?
- Problem 1 Based on Modulus and Argument of Complex Number
- Problem 2 Based on Modulus and Argument of Complex Number
- Problem 3 Based on Modulus and Argument of Complex Number
- Polar Form of Complex Numbers - Concept
- Problem on Polar Form of Complex Number
- How to Find Product and Quotient of Two Complex Numbers in Exponential Form
- Problem 1 Based Product and Quotient of Two Complex Numbers in Exponential Form
- Problem 2 Based Product and Quotient of Two Complex Numbers in Exponential Form
- Miscellaneous Problem No. 1 on Complex Number
- Miscellaneous Problem No. 2 on Complex Number
- Miscellaneous Problem No. 3 on Complex Number
- Miscellaneous Problem No. 4 on Complex Number
- De Moivre's Theorem with Corollaries
- De Moivre's Theorem - Problem 1
- De Moivre's Theorem - Problem 2
- De Moivre's Theorem - Problem 3
- De Moivre's Theorem - Problem 4
- De Moivre's Theorem - Problem 5
- De Moivre's Theorem - Problem 6
- De Moivre's Theorem - Problem 7
- Problem 1 Based on Power of Complex Number
- Problem 2 Based on Power of Complex Number
- Problem 3 Based on Power of Complex Number
- Problem 4 Based on Power of Complex Number
- Problem 1 Based on Roots of Quadratic Equation
- Problem 2 Based on Roots of Quadratic Equation
- Expansion of sin n q, cos nqin Powers of sinq, cosq
- Problem 1 based on Expansion of sin nq, cos nq in Powers of sinq, cosq
- Problem 2 based on Expansion of sin nq, cos nq in Powers of sinq, cosq
- Expansion of sin^n q, cos^nq in Multiple of sinq, cosq - Concept
- Problem 1 based on Expansion of sin^n q, cos^nq in Multiple of sinq, cosq
- Problem 2 based on Expansion of sin^n q, cos^nq in Multiple of sinq, cosq
- Problem 1 Based on Cube Root of Unity
- Problem 2 Based on Cube Root of Unity
- Problem 3 Based on Cube Root of Unity
- Problem 4 Based on Cube Root of Unity
- Problem 1 Based on Multiple Roots of Equation
- Problem 2 Based on Multiple Roots of Equation
- Problem 3 Based on Multiple Roots of Equation
- Problem 4 Based on Multiple Roots of Equation
- Problem 5 Based on Multiple Roots of Equation
- Problem 1 Based on Exponential Form of Complex Numbers
- Problem 2 Based on Exponential Form of Complex Numbers
- Problem 3 Based on Exponential Form of Complex Numbers
- Problem 4 Based on Exponential Form of Complex Numbers

- Euler's Form of Circular Function- Concept
- Problem 1 Based on Euler's Form of Circular Function
- Problem 2 Based on Euler's Form of Circular Function
- Problem 3 Based on Euler's Form of Circular Function
- Problem 4 Based on Euler's Form of Circular Function
- Definition of Hyperbolic Functions
- Problem 1 Based on Hyperbolic Functions
- Problem 2 Based on Hyperbolic Functions
- Problem 3 Based on Hyperbolic Functions
- Problem 4 Based on Hyperbolic Functions
- Relationship Between Hyperbolic and Circular Functions
- Formulae of Hyperbolic Functions
- Problem 1 Based on Formulae of Hyperbolic Functions
- Problem 2 Based on Formulae of Hyperbolic Functions
- Problem 3 Based on Formulae of Hyperbolic Functions
- Problem 4 Based on Formulae of Hyperbolic Functions
- Problem 5 Based on Formulae of Hyperbolic Functions
- Problem 1 Based on Separation of Hyperbolic Function into Real and Imaginary Parts
- Problem 2 Based on Separation of Hyperbolic Function into Real and Imaginary Parts
- Problem 3 Based on Separation of Hyperbolic Function into Real and Imaginary Parts
- Problem 4 Based on Separation of Hyperbolic Function into Real and Imaginary Parts
- Problem 5 Based on Separation of Hyperbolic Function into Real and Imaginary Parts
- Problem 6 Based on Separation of Hyperbolic Function into Real and Imaginary Parts
- Problem 7 Based on Separation of Hyperbolic Function into Real and Imaginary Parts
- Problem 8 Based on Separation of Hyperbolic Function into Real and Imaginary Parts
- Inverse Hyperbolic Function - Definition and Formulae
- Problem 1 Based on Inverse Hyperbolic Function
- Problem 2 Based on Inverse Hyperbolic Function
- Problem 3 Based on Inverse Hyperbolic Function
- Problem 4 Based on Inverse Hyperbolic Function
- Problem 5 Based on Inverse Hyperbolic Function
- Problem 6 Based on Inverse Hyperbolic Function
- Problem 7 Based on Inverse Hyperbolic Function
- Problem 8 Based on Inverse Hyperbolic Function
- Problem 9 Based on Inverse Hyperbolic Function

- How to Find Log of Complex Number?
- Problem 1 Based on Logarithm of Complex or Negative Real Number
- Problem 2 Based on Logarithm of Complex or Negative Real Number
- Problem 3 Based on Logarithm of Complex or Negative Real Number
- Problem 4 Based on Logarithm of Complex or Negative Real Number
- Problem 1 Based on Direct Formula
- Problem 2 Based on Direct Formula
- Problem 3 Based on Direct Formula
- Problem 4 Based on Direct Formula
- Problem 1 Based on Separation of Real and Imaginary Part
- Problem 2 Based on Separation of Real and Imaginary Part
- Problem 3 Based on Separation of Real and Imaginary Part
- Problem 4 Based on Separation of Real and Imaginary Part
- Miscellaneous Problem No.1 on Logarithm of Complex Number
- Miscellaneous Problem No.2 on Logarithm of Complex Number
- Miscellaneous Problem No.3 on Logarithm of Complex Number
- Miscellaneous Problem No 4 on Logarithm of Complex Number
- Miscellaneous Problem No.5 on Logarithm of Complex Number

- Types of Matrices
- Symmetric and Skew - Symmetric Matrix
- Theorem 1 on Symmetric and Skew - Symmetric Matrix
- Theorem 2 on Symmetric and Skew - Symmetric Matrix
- Theorem 3 on Symmetric and Skew - Symmetric Matrix
- Theorem 4 on Symmetric and Skew - Symmetric Matrix
- Hermitian and Skew - Hermitian Matrix
- Theorem 1 on Hermitian and Skew - Hermitian Matrix
- Theorem 2 on Hermitian and Skew - Hermitian Matrix
- Theorem 3 on Hermitian and Skew - Hermitian Matrix
- Theorem 4 on Hermitian and Skew - Hermitian Matrix
- Co-Factor of an Element of Matrix
- Adjoint of Matrix
- Problem 1 Based on Adjoint of Matrix
- Problem 2 Based on Adjoint of Matrix
- Problem 3 Based on Adjoint of Matrix
- Theorem 1 on Adjoint of Matrix
- Theorem 2 on Adjoint of Matrix
- Theorem 3 on Adjoint of Matrix
- Theorem 4 on Adjoint of Matrix
- Inverse of Matrix by Adjoint Method
- Problem 1 Based on Inverse of Matrix by Adjoint Method
- Problem 2 Based on Inverse of Matrix by Adjoint Method
- Problem 3 Based on Inverse of Matrix by Adjoint Method
- Reciprocal of the Matrix - Concept
- Orthogonal Matrices - Concept
- Problem 1 Based on Orthogonal Matrices
- Problem 2 Based on Orthogonal Matrices
- Problem 3 Based on Orthogonal Matrices
- Unitary Matrices - Concept
- Problem 1 Based on Unitary Matrices
- Problem 2 Based on Unitary Matrices
- What Is Rank of Matrix?
- Normal Form or Canonical Form - Concept
- Problem 1 Based on Normal Form or Canonical Form
- Problem 2 Based on Normal Form or Canonical Form
- Problem 3 Based on Normal Form or Canonical Form
- Problem 4 Based on Normal Form or Canonical Form
- PAQ form - Concept
- Problem 1 Based on PAQ form
- Problem 2 Based on PAQ form
- Problem 3 Based on PAQ form

- Linear Dependance and Independence - Concept
- Problem 1 Based on Linear Dependance and Independence
- Problem 2 Based on Linear Dependance and Independence
- Problem 3 Based on Linear Dependance and Independence
- How to Solve Non-Homogenous Linear Equations ?
- How to Find Rank in Echelon Form?
- Problem 1 Based on Echelon Form
- Problem 2 Based on Echelon Form
- Consistency in Equation - Concept
- Problem 1 Based on Consistency in Equation
- Problem 2 Based on Consistency in Equation
- Problem 3 Based on Consistency in Equation
- Problem 4 Based on Consistency in Equation
- How to Solve Homogenous Equations ?
- Problem 1 Based on Homogenous Equations
- Problem 2 Based on Homogenous Equations
- Problem 3 Based on Homogenous Equations
- Problem 4 Based on Homogenous Equations
- Problem 5 Based on Homogenous Equations
- Gauss Elimination Method with Example
- Gauss-Jordan Method - Steps to Solve Simultaneous Equations
- Problem 1 Based on Gauss-Jordan Method
- Problem 2 Based on Gauss-Jordan Method
- Crout's Method with Example
- Jacobi's Method with Example
- Problem Based on Jacobi's Iterative Method
- Gauss-Seidel Method with Example
- Problem based on Gauss Seidel Method

- Nth Derivative of Algebraic Functions - Formula - Part 1
- Nth Derivative of Algebraic Functions - Formula - Part 2
- Nth Derivative of Transcedental Functions - Formula - Part 1
- Nth Derivative of Transcedental Functions - Formula - Part 2
- Nth Derivative of Transcedental Functions - Formula - Part 3
- Problem 1 Based on Nth Derivative of Algebraic Function
- Problem 2 Based on Nth Derivative of Algebraic Function
- Problem 3 Based on Nth Derivative of Algebraic Function
- Problem 4 Based on Nth Derivative of Algebraic Function
- Problem 1 Based on Nth Derivative of Transcedental Functions
- Problem 2 Based on Nth Derivative of Transcedental Functions
- Problem 3 Based on Nth Derivative of Transcedental Functions
- Problem 4 Based on Nth Derivative of Transcedental Functions
- Problem 1 Based on Demoivre's Theorem
- Problem 2 Based on De Moivre's Theorem
- Problem 3 Based on Demoivre's Theorem
- Problem 4 Based on Demoivre's Theorem
- Problem 5 Based on Demoivre's Theorem
- Leibnitz's Theorem - Concept & Formula
- Problem No. 1 Based on Leibnitz's Theorem
- Problem No. 2 Based on Leibnitz's Theorem
- Problem No. 3 Based on Leibnitz's Theorem
- Problem No. 4 Based on Leibnitz's Theorem
- Miscellaneous Problem 1 on Successive Differentiation
- Miscellaneous Problem 2 on Successive Differentiation
- Miscellaneous Problem 3 on Successive Differentiation

- How to Find Partial Differentiation of a Function?
- Partial Derivative of First Order - Problem 1
- Partial Derivative of First Order - Problem 2
- Partial Derivative of First Order - Problem 3
- Partial Derivative of First Order - Problem 4
- Partial Derivative of First Order - Problem 5
- Partial Derivative of First Order - Problem 6
- Partial Derivative of First Order - Problem 7
- Partial Derivative of Second Order - Problem 1
- Partial Derivative of Second Order - Problem 2
- Partial Derivative of Second Order - Problem 3
- Partial Derivative of Second Order - Problem 4
- Partial Derivative of Second Order - Problem 5
- Partial Derivative of Second Order - Problem 6
- Partial Derivative of Second Order - Problem 7
- Partial Derivative of Second Order - Problem 8
- Partial Derivative of Second Order - Problem 9
- Partial Derivative of Second Order - Problem 10
- Composite Function Definition and Example
- First Order Partial Derivation of Composite Function - Problem 1
- First Order Partial Derivation of Composite Function - Problem 2
- First Order Partial Derivation of Composite Function - Problem 3
- First Order Partial Derivation of Composite Function - Problem 4
- First Order Partial Derivation of Composite Function - Problem 5
- First Order Partial Derivation of Composite Function - Problem 6
- First Order Partial Derivation of Composite Function - Problem 7
- Second Order Partial Derivation of Composite Function - Problem 1
- Second Order Partial Derivation of Composite Function - Problem 2
- Implicit Function - Definition & Example
- Derivation of Implicit Function - Problem 1
- Derivation of Implicit Function - Problem 2
- Derivation of Implicit Function - Problem 3
- Derivation of Implicit Function - Problem 4

- Homogenous Functions - Concept
- Euler's Theorem - Formula and Proof
- Problem 1 Based on Euler's Theorem
- Problem 2 Based on Euler's Theorem
- Problem 3 Based on Euler's Theorem
- Problem 4 Based on Euler's Theorem
- Problem 5 Based on Euler's Theorem
- Corollary 1 of Euler's Theorem - Formula & Proof
- Problem 1 Based on Corollary 1 of Euler's Theorem
- Problem 2 Based on Corollary 1 of Euler’s Theorem
- Corollary 2 of Euler's Theorem - Formula and Proof
- Problem 1 Based on Corollary 2 of Euler's Theorem
- Problem 2 Based on Corollary 2 of Euler's Theorem
- Problem 3 Based on Corollary 2 of Euler's Theorem
- Corollary 3 of Euler's Theorem - Formula and Proof
- Problem 1 Based on Corollary 3 of Euler's Theorem
- Problem 2 Based on Corollary 3 of Euler's Theorem
- Problem 3 Based on Corollary 3 of Euler's Theorem

- Definition and Property of Jacobians
- Problem 1 Based on Definition and Property of Jacobians
- Problem 2 Based on Definition and Property of Jacobians
- Problem 3 Based on Definition and Property of Jacobians
- Problem 4 Based on Definition and Property of Jacobians
- Jacobians of Composite Functions - Formula
- Problem 1 Based on Jacobians of Composite Functions
- Problem 2 Based on Jacobians of Composite Functions
- Jacobians of Implicit Functions - Formula
- Problem 1 Based on Jacobians of Implicit Functions
- Problem 2 Based on Jacobians of Implicit Functions
- Partial Derivatives Using Jacobians - Formula
- Problem 1 Based on Partial Derivatives Using Jacobians
- Functional Dependance - Formula
- Problem 1 Based on Functional Dependance
- Problem 2 Based on Functional Dependance
- Problem 3 Based on Functional Dependance

- Method to Find Maxima and Minima
- Maxima & Minima of f(x,y) when f(x,y) is Given - Concept
- Problem 1 based on Maxima & Minima of f(x,y) when f(x,y) is Given
- Problem 2 based on Maxima & Minima of f(x,y) when f(x,y) is Given
- Problem 3 based on Maxima & Minima of f(x,y) when f(x,y) is Given
- Problem 4 based on Maxima & Minima of f(x,y) when f(x,y) is Given
- Problem 1 based on Maxima & Minima of f(x,y) when f(x,y) is to be Formed
- Problem 2 based on Maxima & Minima of f(x,y) when f(x,y) is to be Formed
- Problem 3 based on Maxima & Minima of f(x,y) when f(x,y) is to be Formed
- Problem 4 based on Maxima & Minima of f(x,y) when f(x,y) is to be Formed
- Lagrange's Method of Undetermined Multipliers - Formula
- Problem 1 Based on Lagrange's Method of Undetermined Multipliers
- Problem 2 Based on Lagrange's Method of Undetermined Multipliers
- Problem 3 Based on Lagrange's Method of Undetermined Multipliers

- Maclaurin's Series - Theorem & Formula
- Expansion of cosx Using Maclaurin's Series
- Expansion of sinhx Using Maclaurin's Series
- Expansion of log(1+x) using Maclaurin's Series
- Expansion of tanh^-1 x using Maclaurin's Series
- Expansion of (1+x)^m using Maclaurin's Series
- Expansion Using Maclaurin's Series - Concept
- Problem 1 Based on Expansions Using Maclaurin's Series
- Problem 2 Based on Expansions Using Maclaurin's Series
- Problem 3 Based on Expansions Using Maclaurin's Series
- Problem 1 Based on Expansion of Implicit Function Using Maclaurin's Series
- Problem 1 Based on Method of Using Standard Expansions
- Problem 2 Based on Method of Using Standard Expansions
- Problem 3 Based on Method of Using Standard Expansions
- Problem 4 Based on Method of Using Standard Expansions
- Problem 5 Based on Method of Using Standard Expansions
- Problem 6 Based on Method of Using Standard Expansions
- Expansion by Method of Inversion - Concept
- Problem 1 Based on Method of Inversion
- Problem 2 Based on Method of Inversion
- Expansion by Method of Substitution - Concept
- Problem 1 Based on Method of Differentiation or Integration of Known Series
- Problem 2 Based on Method of Differentiation or Integration of Known Series
- Expansion by Method of Using Leibnitz's Theorem - Concept
- Problem 1 Based on Method of Substitution
- Problem 2 Based on Method of Substitution
- Expansion by Method of using Leibnitz's Theorem - Concept
- Problem 1 Based on Method of Using Leibnitz's Theorem
- Problem 2 Based on Method of Using Leibnitz's Theorem
- Problem 3 Based on Method of Using Leibnitz's Theorem
- Taylor's Series - Formula
- Problem 1 Based on Taylor's Series
- Problem 2 Based on Taylor's Series
- Problem 3 Based on Taylor's Series
- Problem 4 Based on Taylor's Series

- Problem 1 Based on Form 0/0
- Problem 2 Based on Form 0/0
- Problem 3 Based on Form 0/0
- Problem 4 Based on Form 0/0
- Problem 5 Based on Form 0/0
- Problem 6 Based on Form 0/0
- Problem 1 Based on Form Infinity/infinity
- Problem 2 Based on Form Infinity/infinity
- Problem 3 Based on Form Infinity/infinity
- Problem 1 Based on Form 0 X Infinity
- Problem 2 Based on Form 0 X Infinity
- Problem 1 Based on Form Infinity - Infinity
- Problem 2 Based on Form Infinity - Infinity
- Problem 1 Based on Form 1^infinity
- Problem 2 Based on Form 1^infinity
- Problem 3 Based on Form 1^infinity
- Problem 1 Based on Form Infinity ^ 0
- Problem 2 Based on Form Infinity ^ 0
- Problem 3 Based on Form Infinity ^ 0
- Problem 1 Based on Form 0 ^ 0
- Problem 2 Based on Form 0 ^ 0
- Problem 1 Based on Expansion of Series
- Problem 2 Based on Expansion of Series
- Problem 3 Based on Expansion of Series
- Problem 4 Based on Expansion of Series

- What is Regression?
- Lines of Regression - Concept & Formula
- Problem 1 Based on Lines of Regression
- Problem 2 Based on Lines of Regression
- Problem 3 Based on Lines of Regression
- Problem 4 Based on Lines of Regression
- Coefficient of Regression - Concept & Formula
- Problem 1 Based on Coefficient of Regression
- Problem 2 Based on Coefficient of Regression
- Properties of Coefficients of Regression - Concept & Formula
- Problem 1 Based on Properties of Coefficients of Regression
- Problem 2 Based on Properties of Coefficients of Regression
- Angle Between Lines of Regression - Concept & Formula
- Problem 1 Based on Angle Between Lines of Regression
- Problem 2 Based on Angle Between Lines of Regression

- Fitting of Straight Line - Concept and Formula
- Problem 1 Based on Fitting of Straight Line
- Problem 2 Based on Fitting of Straight Line
- Fitting a Parabola - Concept and Formula
- Problem 1 Based on Fitting a Parabola
- Problem 2 Based on Fitting a Parabola
- Fitting Exponential Curve - Concept and Formula
- Problem 1 Based on Fitting Exponential Curve
- Problem 2 Based on Fitting Exponential Curve

Professor Mahesh Wagh has pledged to eradicate the fear of Mathematics from all those students who are afraid of studying this subject. His experience of teaching mathematics stretches over a time span of around 13 years. He has earned a degree in computer engineering from Mumbai University. Apart from this, he also has industrial experience of 3 years. He is an extraordinary person when it comes to innovation, technology & entrepreneurship. He is the founder of an institution that helps students to add an increment to their scores by his authentic style of teaching. He is successfully running a start-up in order to spread quality education, digitally around the globe. Students enjoy studying under him.

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