Introduces notation and formulas for exponential growth models, with solutions to guided problems.
From playlist Discrete Math
Identifying Exponential Models
Identifying Exponential Models
From playlist ck12.org Algebra 1 Examples
Compare Linear and Exponential Functions
This video compares linear and exponential functions. http://mathispower4u.com
From playlist Introduction to Exponential Functions
Using the inverse of an exponential equation to find the logarithm
👉 Learn how to convert an exponential equation to a logarithmic equation. This is very important to learn because it not only helps us explain the definition of a logarithm but how it is related to the exponential function. Knowing how to convert between the different forms will help us i
From playlist Logarithmic and Exponential Form | Learn About
How to determine the inverse of an exponential equation
👉 Learn how to convert an exponential equation to a logarithmic equation. This is very important to learn because it not only helps us explain the definition of a logarithm but how it is related to the exponential function. Knowing how to convert between the different forms will help us i
From playlist Logarithmic and Exponential Form | Learn About
Determine if a Table Represents a Linear or Exponential Function
This video explains how to determine if a function given as a table is a linear function, exponential function, or neither. Site: http://mathispower4u.com Blog: http://mathispower4u.wordpress.com
From playlist Introduction to Exponential Functions
Showing how to find the inverse of an exponential to find the log, y = 2^x
👉 Learn how to convert an exponential equation to a logarithmic equation. This is very important to learn because it not only helps us explain the definition of a logarithm but how it is related to the exponential function. Knowing how to convert between the different forms will help us i
From playlist Logarithmic and Exponential Form | Learn About
Fin Math L4-2: The two fundamental theorems of asset pricing and the exponential martingale
Welcome to the second part of Lesson 4 of Financial Mathematics. In this video we discuss the two fundamental theorems of asset pricing and we introduce the exponential martingale, an essential tool that we will use as the Radon-Nikodym derivative to move from P to Q in the Cameron-Martin
From playlist Financial Mathematics
Determine if Equations Are Linear or Exponential and Increasing or Decreasing
This video explains how to identify linear and exponential equation as well as determine if the behavior is increasing or decreasing. http://mathispower4u.com
From playlist Introduction to Exponential Functions
Modeling Batteries Using Simulink and Simscape
Learn about equivalent circuits and why you’d want to use them. In this video, you will learn to: - Use equivalent circuits to represent the dynamic behavior of a battery cell. - Identify how to parameterize the equivalent circuit based on measurement data using parameter estimation. -
From playlist Hybrid Electric Vehicles
Radek Adamczak: Functional inequalities and concentration of measure II
Concentration inequalities are one of the basic tools of probability and asymptotic geo- metric analysis, underlying the proofs of limit theorems and existential results in high dimensions. Original arguments leading to concentration estimates were based on isoperimetric inequalities, whic
From playlist Winter School on the Interplay between High-Dimensional Geometry and Probability
Large deviations of Markov processes (Part 2) by Hugo Touchette
Large deviation theory in statistical physics: Recent advances and future challenges DATE: 14 August 2017 to 13 October 2017 VENUE: Madhava Lecture Hall, ICTS, Bengaluru Large deviation theory made its way into statistical physics as a mathematical framework for studying equilibrium syst
From playlist Large deviation theory in statistical physics: Recent advances and future challenges
Discrepancy of generalized polynomials by Anirban Mukhopadhyay
Program Workshop on Additive Combinatorics ORGANIZERS: S. D. Adhikari and D. S. Ramana DATE: 24 February 2020 to 06 March 2020 VENUE: Madhava Lecture Hall, ICTS Bangalore Additive combinatorics is an active branch of mathematics that interfaces with combinatorics, number theory, ergod
From playlist Workshop on Additive Combinatorics 2020
Dylan Possamaï: Principal Agent Modelling - lecture 2
CIRM HYBRID EVENT These lectures will consist in an overview of recent progresses made in contracting theory, using the so-called dynamic programming approach. The basic situation is that of a Principal wanting to hire an Agent to do a task on his behalf, and who has to be properly incenti
From playlist Probability and Statistics
Canonical forms for free group automorphisms - Jean Pierre Mutanguha
Arithmetic Groups Topic: Canonical forms for free group automorphisms Speaker: Jean Pierre Mutanguha Affiliation: Member, School of Mathematics Date: March 23, 2022 The Nielsen-Thurston theory of surface homeomorphism can be thought of as a surface analogue to the Jordan Canonical Form.Â
From playlist Mathematics
Twisted Patterson-Sullivan Measure and Applications to Growth Problems (Lecture-4) by Remi Coulon
PROGRAM: PROBABILISTIC METHODS IN NEGATIVE CURVATURE (ONLINE) ORGANIZERS: Riddhipratim Basu (ICTS - TIFR, Bengaluru), Anish Ghosh (TIFR, Mumbai) and Mahan M J (TIFR, Mumbai) DATE & TIME: 01 March 2021 to 12 March 2021 VENUE: Online Due to the ongoing COVID pandemic, the meeting will
From playlist Probabilistic Methods in Negative Curvature (Online)
Fabio Nobile: Polynomial Approximation of Random PDEs by discrete least squares with observations in
Fabio Nobile: Polynomial Approximation of Random PDEs by discrete least squares with observations in random points Abstract: We consider a general problem F(u,y)=0 where u is the unknown solution, possibly Hilbert space valued, and y a set of uncertain parameters. We specifically address
From playlist HIM Lectures: Trimester Program "Mathematics of Signal Processing"
Camille Horbez: Automorphisms of hyperbolic groups and growth
Abstract: Let G be a torsion-free hyperbolic group, let S be a finite generating set of G, and let f be an automorphism of G. We want to understand the possible growth types for the word length of fn(g), where g is an element of G. Growth was completely described by Thurston when G is the
From playlist Topology
Ex: Rewrite Exponential Functions: y = ab^t to y = ae^(kt)
This video explains how to convert between different forms of exponential functions. Site: http://mathispower4u.com Blog: http://mathispower4u.wordpress.com
From playlist Solving Exponential Equations With Logarithms