Math’s Videos
- Laplace Transform Part 1
- Laplace Transform Part 2
- Lecture 1 | The Fourier Transforms and its Application Full Stanford course Playlist
- Understanding e to the pi I
- Euler’s Formula Proof (Taylor Series)
- Maclauren and Taylor Series Intuition
- Sine Taylor Series at 0 (Maclaurin)
- Introduction to Superposition MIT Quantum Physics
- Young’s Double Slit Introduction
- Imaginary Numbers, Functions of Complex Variables: 3D animations
- Imaginary Numbers Are Real
- Visualizing the Riemann zeta function and analytic continuation
- Essence of linear algebra preview
- Linear Transformations and Matrices
- Euler’s formula with introductory group theory
- The Equation of Time
MIT Maths Courseware.
- 18.01 Single Variable Calculus (Fall 2005)
- 18.013A Calculus with Applications (Spring 2005)
- 18.014 Calculus with Theory (Fall 2010)
- 18.02SC Multivariable Calculus (Fall 2010)
- 18.02 Multivariable Calculus (Fall 2007)
- 18.02 Multivariable Calculus (Spring 2006)
- 18.022 Calculus of Several Variables (Fall 2010)
- 18.024 Multivariable Calculus with Theory (Spring 2011)
- 18.03SC Differential Equations (Fall 2011)
- 18.03 Differential Equations (Spring 2010)
- 18.034 Honors Differential Equations (Spring 2009)
- 18.034 Honors Differential Equations (Spring 2004)
- 18.04 Complex Variables with Applications (Fall 2003)
- 18.04 Complex Variables with Applications (Fall 1999)
- 18.05 Introduction to Probability and Statistics (Spring 2014)
- 18.06SC Linear Algebra (Fall 2011)
- 18.06 Linear Algebra (Spring 2010)
- 18.062J Mathematics for Computer Science (Fall 2010)
- 18.062J Mathematics for Computer Science (Fall 2005)
- 18.062J Mathematics for Computer Science (Spring 2015)
- 18.06CI Linear Algebra – Communications Intensive (Spring 2004)
- 18.075 Advanced Calculus for Engineers (Fall 2004)
- 18.085 Computational Science and Engineering I (Fall 2008)
- 18.086 Mathematical Methods for Engineers II (Spring 2006)
- 18.091 Mathematical Exposition (Spring 2005)
- 18.094J Teaching College-Level Science and Engineering (Fall 2015)
- 18.094J Teaching College-Level Science and Engineering (Spring 2009)
- 18.098 Street-Fighting Mathematics (January IAP 2008)
- 18.100A Introduction to Analysis (Fall 2012)
- 18.100B Analysis I (Fall 2010)
- 18.100C Real Analysis (Fall 2012)
- 18.101 Analysis II (Fall 2005)
- 18.102 Introduction to Functional Analysis (Spring 2009)
- 18.103 Fourier Analysis (Fall 2013)
- 18.104 Seminar in Analysis: Applications to Number Theory (Fall 2006)
- 18.112 Functions of a Complex Variable (Fall 2008)
- 18.117 Topics in Several Complex Variables (Spring 2005)
- 18.125 Measure and Integration (Fall 2003)
- 18.152 Introduction to Partial Differential Equations (Fall 2011)
- 18.152 Introduction to Partial Differential Equations (Fall 2005)
- 18.155 Differential Analysis (Fall 2004)
- 18.156 Differential Analysis II: Partial Differential Equations and Fourier Analysis (Spring 2016)
- 18.156 Differential Analysis (Spring 2004)
- 18.175 Theory of Probability (Spring 2014)
- 18.177 Universal Random Structures in 2D (Fall 2015)
- 18.238 Geometry and Quantum Field Theory (Fall 2002)
- 18.303 Linear Partial Differential Equations: Analysis and Numerics (Fall 2014)
- 18.303 Linear Partial Differential Equations (Fall 2006)
- 18.304 Undergraduate Seminar in Discrete Mathematics (Spring 2015)
- 18.305 Advanced Analytic Methods in Science and Engineering (Fall 2004)
- 18.306 Advanced Partial Differential Equations with Applications (Fall 2009)
- 18.307 Integral Equations (Spring 2006)
- 18.310 Principles of Discrete Applied Mathematics (Fall 2013)
- 18.311 Principles of Applied Mathematics (Spring 2014)
- 18.312 Algebraic Combinatorics (Spring 2009)
- 18.314 Combinatorial Analysis (Fall 2014)
- 18.315 Combinatorial Theory: Introduction to Graph Theory, Extremal and Enumerative Combinatorics (Spring 2005)
- 18.315 Combinatorial Theory: Hyperplane Arrangements (Fall 2004)
- 18.318 Topics in Algebraic Combinatorics (Spring 2006)
- 18.319 Geometric Combinatorics (Fall 2005)
- 18.325 Topics in Applied Mathematics: Waves and Imaging (Fall 2015)
- 18.327 Wavelets, Filter Banks and Applications (Spring 2003)
- 18.330 Introduction to Numerical Analysis (Spring 2012)
- 18.330 Introduction to Numerical Analysis (Spring 2004)
- 18.335J Introduction to Numerical Methods (Fall 2010)
- 18.335J Introduction to Numerical Methods (Fall 2004)
- 18.336 Numerical Methods for Partial Differential Equations (Spring 2009)
- 18.337J Parallel Computing (Fall 2011)
- 18.338J Infinite Random Matrix Theory (Fall 2004)
- 18.352J Theoretical Environmental Analysis (Spring 2015)
- 18.353J Nonlinear Dynamics I: Chaos (Fall 2012)
- 18.354J
MIT Finance – Financial Interferometry MIT Finance
- Introduction, Financial Terms and Concepts
- Introduction and Course Overview
- Finance, Growth, and Volatility
- Introduction to Statistics
- Stochastic Processes I
- Probability Theory
- Random Walks
- Value At Risk (VAR) Models
- Equities
- Forward and Futures Contracts I
- Forward and Futures Contracts II & Options I
- Risk and Return II & Portfolio Theory I
- Portfolio Management
- Commodity Models
- Financial Projections
- Portfolio Theory
- Factor Modeling
- Black-Scholes Formula, Risk-neutral Valuation
- Stochastic Differential Equations
- Itō Calculus