Mathematical modeling | Growth curves
The generalized logistic function or curve is an extension of the logistic or sigmoid functions. Originally developed for growth modelling, it allows for more flexible S-shaped curves. The function is sometimes named Richards's curve after F. J. Richards, who proposed the general form for the family of models in 1959. (Wikipedia).
Graphing a logarithmic function with two reflections
👉 Learn how to graph logarithmic functions. The logarithmic function is the inverse of the exponential function. To graph a logarithmic function, it is usually very useful to make the table of values of the function. This is done by choosing a range of values of x and then plug the x-value
From playlist How to Graph Logarithmic Functions in Different Bases
Learn how to graph and describe characteristics of a natural logarithm
👉 Learn all about graphing natural logarithmic functions. A logarithmic function is a function with logarithms in them. A natural logarithmic function (ln function) is a logarithmic function to the base of e. The graph of the parent function of a logarithmic function usually takes its doma
From playlist How to Graph Natural Logarithmic Functions with Transformations
Learn how to graph a logarithm with reflections over x and y axis
👉 Learn how to graph logarithmic functions. The logarithmic function is the inverse of the exponential function. To graph a logarithmic function, it is usually very useful to make the table of values of the function. This is done by choosing a range of values of x and then plug the x-value
From playlist How to Graph Logarithmic Functions in Different Bases
Learn how to identify transformations and graph natural logarithmic function
👉 Learn all about graphing natural logarithmic functions. A logarithmic function is a function with logarithms in them. A natural logarithmic function (ln function) is a logarithmic function to the base of e. The graph of the parent function of a logarithmic function usually takes its doma
From playlist How to Graph Natural Logarithmic Functions with Transformations
The Search for Siegel Zeros - Numberphile
Featuring Professor Tony Padilla. See https://brilliant.org/numberphile for Brilliant and get 20% off their premium service (episode sponsor) More links & stuff in full description below ↓↓↓ Yitang Zhang strikes again... Discrete mean estimates and the Landau-Siegel zero: https://arxiv.or
From playlist Tony Padilla on Numberphile
Simon Barthelmé: The Expectation-Propagation algorithm: a tutorial - Part 1
Abstract: The Expectation-Propagation algorithm was introduced by Minka in 2001, and is today still one of the most effective algorithms for approximate inference. It is relatively difficult to implement well but in certain cases it can give results that are almost exact, while being much
From playlist Probability and Statistics
Can learning theory resist deep learning? Francis Bach, INRIA
Machine learning algorithms are ubiquitous in most scientific, industrial and personal domains, with many successful applications. As a scientific field, machine learning has always been characterized by the constant exchanges between theory and practice, with a stream of algorithms that e
From playlist Statistics and computation
Transcendental Functions 3 Examples using Properties of Logarithms.mov
Examples using the properties of logarithms.
From playlist Transcendental Functions
Graphing logarithmic equations
👉 Learn how to graph logarithmic functions involving vertical shift. The logarithmic function is the inverse of the exponential function. To graph a logarithmic function, it is usually very useful to make the table of values of the function. This is done by choosing a range of values of x
From playlist How to Graph Logarithmic Functions with Vertical Shift
Birational Geometry and Orbifold Pairs :Arithmetic and hyperbolic... (Lecture 1) by Frederic Campana
PROGRAM : TOPICS IN BIRATIONAL GEOMETRY ORGANIZERS : Indranil Biswas and Mahan Mj DATE : 27 January 2020 to 31 January 2020 VENUE : Madhava Lecture Hall, ICTS Bangalore Birational geometry is one of the current research trends in fields of Algebraic Geometry and Analytic Geometry. It ca
From playlist Topics In Birational Geometry
Graphing the logarithmic equation with a horizontal & vertical translation
👉 Learn how to graph logarithmic functions involving vertical shift. The logarithmic function is the inverse of the exponential function. To graph a logarithmic function, it is usually very useful to make the table of values of the function. This is done by choosing a range of values of x
From playlist How to Graph Logarithmic Functions with Vertical Shift
Roland Bauerschmidt: Log-Sobolev inequality for the continuum Sine-Gordon model
The lecture was held within the of the Hausdorff Junior Trimester Program: Randomness, PDEs and Nonlinear Fluctuations. Abstract: We derive a multiscale generalisation of the Bakry–Emery criterion for a measure to satisfy a Log-Sobolev inequality. Our criterion relies on the control of an
From playlist Workshop: Workshop: Singular SPDEs and Related Topics
Graphing a natural logarithmic equation using reflection
👉 Learn all about graphing natural logarithmic functions. A logarithmic function is a function with logarithms in them. A natural logarithmic function (ln function) is a logarithmic function to the base of e. The graph of the parent function of a logarithmic function usually takes its doma
From playlist How to Graph Natural Logarithmic Functions with Transformations
Proof That We Only Use 10% Of Our Brain
The definitive proof that 90% of our brain is irrelevant. https://curiositystream.com/drawcuriosity for 26% off. Check out Human Limits: Super Brains at https://curiositystream.com/video/1954 If you ever wondered how little of your brain you could live with, look no further as we explore
From playlist Docuriosity
離散数学入門#8: 最大流問題(1):フローネットワークの基礎知識
早稲田大学の全学部の3〜4年生を対象とする全学オープン科目「離散数学入門」(担当教員:早水 桃子)の授業動画です.文理を問わず,誰でもグラフ理論やグラフアルゴリズムの初歩を学ぶことができます.グラフ理論の定理やグラフに関するアルゴリズムを正しく理解して,現実の諸問題を解決するための応用力を身につけましょう. --------------------------------------------------------------------------------------- ネットワークの始点(ソース)から終点(シンク)に向けて流せる最大の流量を問う「最大流問題」は,
From playlist 離散数学入門Ⅲ
Graphing a basic logarithmic graph and determine the x intercept
👉 Learn how to graph logarithmic functions. The logarithmic function is the inverse of the exponential function. To graph a logarithmic function, it is usually very useful to make the table of values of the function. This is done by choosing a range of values of x and then plug the x-value
From playlist How to Graph Logarithmic Functions in Different Bases
Problem of Apollonius - what does it teach us about problem solving?
This video uses the problem of Apollonius as a way to introduce circle inversion and an important problem-solving technique - transforming a hard problem into a simpler one; then solve for the simpler, transformed version of the problem before doing the inverse transformation so that we ob
From playlist Geometry Gem
Approximate cross validation for large data and high dimensions - Tamara Broderick, MIT
The error or variability of statistical and machine learning algorithms is often assessed by repeatedly re-fitting a model with different weighted versions of the observed data. The ubiquitous tools of cross-validation (CV) and the bootstrap are examples of this technique. These methods a
From playlist Statistics and computation
what are the transformation of the logarithmic graph compared to exponential
👉 Learn all about graphing logarithmic functions. A logarithmic function is a function with logarithms in them. The graph of the parent function of a logarithmic function usually takes its domain from the positive x-axis. To graph a logarithmic function, it is usually useful to first graph
From playlist How to Graph Logarithmic Functions | Learn About
Integral Transforms Lecture 2: Test Functions and Actions. Oxford Mathematics 2nd Yr Student Lecture
This short course from Sam Howison, all 9 lectures of which we are making available (this is lecture 2), introduces two vital ideas. First, we look at distributions (or generalised functions) and in particular the mathematical representation of a 'point mass' as the Dirac delta function.
From playlist Oxford Mathematics Student Lectures - Integral Transforms