What is the max and min of a horizontal line on a closed interval
π Learn how to find the extreme values of a function using the extreme value theorem. The extreme values of a function are the points/intervals where the graph is decreasing, increasing, or has an inflection point. A theorem which guarantees the existence of the maximum and minimum points
From playlist Extreme Value Theorem of Functions
How to evaluate the limit of a function by observing its graph
π Learn how to evaluate the limit of an absolute value function. The limit of a function as the input variable of the function tends to a number/value is the number/value which the function approaches at that time. The absolute value function is a function which only takes the positive val
From playlist Evaluate Limits of Absolute Value
How to determine the absolute max min of a function on an open interval
π Learn how to find the extreme values of a function using the extreme value theorem. The extreme values of a function are the points/intervals where the graph is decreasing, increasing, or has an inflection point. A theorem which guarantees the existence of the maximum and minimum points
From playlist Extreme Value Theorem of Functions
Evaluate the limit for a value of a function
π Learn how to evaluate the limit of an absolute value function. The limit of a function as the input variable of the function tends to a number/value is the number/value which the function approaches at that time. The absolute value function is a function which only takes the positive val
From playlist Evaluate Limits of Absolute Value
Find the max and min from a quadratic on a closed interval
π Learn how to find the extreme values of a function using the extreme value theorem. The extreme values of a function are the points/intervals where the graph is decreasing, increasing, or has an inflection point. A theorem which guarantees the existence of the maximum and minimum points
From playlist Extreme Value Theorem of Functions
Find the max and min of a linear function on the closed interval
π Learn how to find the extreme values of a function using the extreme value theorem. The extreme values of a function are the points/intervals where the graph is decreasing, increasing, or has an inflection point. A theorem which guarantees the existence of the maximum and minimum points
From playlist Extreme Value Theorem of Functions
How to determine the global max and min from a piecewise function
π Learn how to find the extreme values of a function using the extreme value theorem. The extreme values of a function are the points/intervals where the graph is decreasing, increasing, or has an inflection point. A theorem which guarantees the existence of the maximum and minimum points
From playlist Extreme Value Theorem of Functions
Real Analysis - Part 19 - Comparison Test [dark version]
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From playlist Real Analysis [dark version]
Real Analysis - Part 19 - Comparison Test
Support the channel on Steady: https://steadyhq.com/en/brightsideofmaths Or support me via PayPal: https://paypal.me/brightmaths Or via Ko-fi: https://ko-fi.com/thebrightsideofmathematics Or via Patreon: https://www.patreon.com/bsom Or via other methods: https://thebrightsideofmathematics.
From playlist Real Analysis
1.4 - Evolutionary Thinking: Adaptation: Why it is Problematic and How to Recognize it
"Evolutionary Medicine" Sinauer Associates (2015) is the textbook that supports these lectures. Instructors can request examination copies and sign up to download figures here: http://www.sinauer.com/catalog/medical/evolutionary-medicine.html
From playlist Evolution and Medicine (2015) with Stephen Stearns
How to evaluate a limit with secant
π Learn how to evaluate the limit of a function involving trigonometric expressions. The limit of a function as the input variable of the function tends to a number/value is the number/value which the function approaches at that time. The limit of a function is usually evaluated by direct
From playlist Evaluate Limits with Trig
Maximum Likelihood Estimation Examples
http://AllSignalProcessing.com for more great signal processing content, including concept/screenshot files, quizzes, MATLAB and data files. Three examples of applying the maximum likelihood criterion to find an estimator: 1) Mean and variance of an iid Gaussian, 2) Linear signal model in
From playlist Estimation and Detection Theory
The virtue of Bayesian analysis in food risk assessment, Jukka Ranta - Bayes@Lund 2018
Find more info about Bayes@Lund, including slides, here: https://bayesat.github.io/lund2018/bayes_at_lund_2018.html
From playlist Bayes@Lund 2018
Real Analysis | Series of Functions
We introduce the notion of series of functions as well as the notions of pointwise and uniform convergence. We also prove the Cauchy criterion and Weirstrass M-test. Please Subscribe: https://www.youtube.com/michaelpennmath?sub_confirmation=1 Merch: https://teespring.com/stores/michael-p
From playlist Real Analysis
Umberto Zannier - Ambients for the Betti map and the question of its rank
November 16, 2017 - This is the final talk of a series of three Fall 2017 Minerva Lectures In this last lecture we shall further consider some of the mentioned contexts involving the Betti map. We shall also discuss in short some recent work with Yves AndrΓ© and Pietro Corvaja, where we obt
From playlist Minerva Lectures Umberto Zannier
QRM 7-3: TS for RM 2 (R studio)
Welcome to Quantitative Risk Management (QRM). In the last part of Lesson 7 we play with R studio, to better understand some of the topics we have discussed in the previous videos. We will deal with seasonality, we will simulate and estimate an ARIMA model, and we will perform model selec
From playlist Quantitative Risk Management
Real Analysis | Proving some series tests.
We give proofs of the comparison test, absolute convergence test, and alternating series test. Our tools are the Cauchy criterion for series and the nested interval property. Please Subscribe: https://www.youtube.com/michaelpennmath?sub_confirmation=1 Merch: https://teespring.com/stores
From playlist Real Analysis
Math 135 Complex Analysis Lecture 13 030515: Poisson Integral Formula; Sequences and Series
Poisson integral formula; quick (?) review of sequences and series: convergence, Cauchy sequence; series (sequence of partial sums), Cauchy criterion; proof of Divergence test; absolute convergence; absolute convergence implies convergence (via Cauchy Criterion); uniform convergence of a s
From playlist Course 8: Complex Analysis
Encouraging Green Architecture in Malaysia
MIT 11.384-11.386 Malaysia Sustainable Cities Program, Spring 2016 View the complete course: http://ocw.mit.edu/11-384S16 Instructor: Shraddha Pandey Shraddha Pandey evaluates the efficacy of Green Building indices and rating systems in creating strong incentives for developers to design
From playlist MIT 11.384-11.386 Malaysia Sustainable Cities Program, Spring 2016
Evaluate limits with cosine and cotangent
π Learn how to evaluate the limit of a function involving trigonometric expressions. The limit of a function as the input variable of the function tends to a number/value is the number/value which the function approaches at that time. The limit of a function is usually evaluated by direct
From playlist Evaluate Limits with Trig