Description: Biomathematic
-
Biomathematic
- L1-Introduction
- L2-Graphs and functions – I
- L3-Graphs and functions – II
- L4-Functions and derivatives
- L5-Calculation of derivatives
- L6-Differentiation and its application in Biology – I
- L7-Differentiation and its application in Biology – II
- L8-Differentiation and its application in Biology – III
- L9-Differentiation and its application in Biology – IV
- L10-Integration – I
- L11-Integration – II
- L12-Differential equations-I
- L13-Differential equations – II
- L14-Vectors – I
- L15-Vectors – II
- L16-Vectors – III
- L17-Nernst equation
- L18-Diffusion-I : Diffusion equation
- L19-Diffusion – II: Mean-square displacement
- L20-Diffusion-III : Einstein’s relation
- L21-Statistics : Mean and variance
- L22-Statistics: Distribution function
- L23-Understanding Normal distribution
- L24-Fitting a function to experimental data
- L25-Size of a flexible protein: Simplest model
- L26-Uniform and Poisson distributions; Knudson’s analysis
- L27-Fourier Series-I
- L28-Fourier Series-II
- L29-Fourier transform
- L30-Master equation: Polymerization dynamics, Molecular motor motion
- L31-Evolution: Simplest model
- L32-Tutorial – I
- L33-Tutorial-II
- L34-Temperature, Energy and Entropy
- L35-Partition function, Free energy
- L36-Bending fluctuations of DNA and spring-like proteins
- L37-Force-extension and looping of DNA
- L38-Thermodynamics of protein organization along DNA
- L39-Learning mathematics with the help of a computer