Logical consequence | Conditionals
A consequent is the second half of a hypothetical proposition. In the standard form of such a proposition, it is the part that follows "then". In an implication, if P implies Q, then P is called the antecedent and Q is called the consequent. In some contexts, the consequent is called the apodosis. Examples: * If , then . is the consequent of this hypothetical proposition. * If is a mammal, then is an animal. Here, " is an animal" is the consequent. * If computers can think, then they are alive. "They are alive" is the consequent. The consequent in a hypothetical proposition is not necessarily a consequence of the antecedent. * If monkeys are purple, then fish speak Klingon. "Fish speak Klingon" is the consequent here, but intuitively is not a consequence of (nor does it have anything to do with) the claim made in the antecedent that "monkeys are purple. (Wikipedia).
Concavity and Parametric Equations Example
Please Subscribe here, thank you!!! https://goo.gl/JQ8Nys Concavity and Parametric Equations Example. We find the open t-intervals on which the graph of the parametric equations is concave upward and concave downward.
From playlist Calculus
Is the function continuous or not
π Learn how to determine whether a function is continuos or not. A function is said to be continous if two conditions are met. They are: the limit of the function exist and that the value of the function at the point of continuity is defined and is equal to the limit of the function. Other
From playlist Is the Functions Continuous or Not?
Calculus 1 Lecture 3.1: Increasing/Decreasing and Concavity of Functions
Calculus 1 Lecture 3.1: Discussion of Increasing and Decreasing Intervals. Discussion of Concavity of functions.
From playlist Calculus 1 (Full Length Videos)
Differential Equations | Convolution: Definition and Examples
We give a definition as well as a few examples of the convolution of two functions. http://www.michael-penn.net http://www.randolphcollege.edu/mathematics/
From playlist Differential Equations
What is an Injective Function? Definition and Explanation
An explanation to help understand what it means for a function to be injective, also known as one-to-one. The definition of an injection leads us to some important properties of injective functions! Subscribe to see more new math videos! Music: OcularNebula - The Lopez
From playlist Functions
11_6_1 Contours and Tangents to Contours Part 1
A contour is simply the intersection of the curve of a function and a plane or hyperplane at a specific level. The gradient of the original function is a vector perpendicular to the tangent of the contour at a point on the contour.
From playlist Advanced Calculus / Multivariable Calculus
Math 139 Fourier Analysis Lecture 05: Convolutions and Approximation of the Identity
Convolutions and Good Kernels. Definition of convolution. Convolution with the n-th Dirichlet kernel yields the n-th partial sum of the Fourier series. Basic properties of convolution; continuity of the convolution of integrable functions.
From playlist Course 8: Fourier Analysis
Learn to determine the value that makes the piecewise function continuous
π Learn how to find the value that makes a function continuos. A function is said to be continous if two conditions are met. They are: the limit of the function exist and that the value of the function at the point of continuity is defined and is equal to the limit of the function. To find
From playlist The Limit
How to find the value that makes a piecewise function continuous
π Learn how to find the value that makes a function continuos. A function is said to be continous if two conditions are met. They are: the limit of the function exist and that the value of the function at the point of continuity is defined and is equal to the limit of the function. To find
From playlist The Limit
7. Ch. 3, Sections 3.1 & 3.2. Introduction to Logic, Philosophy 10, UC San Diego - BSLIF
Video lecture corresponding to _Basic Sentential Logic and Informal Fallacies_, Chapter 3, Sections 3.1 & 3.2. This is for the class Introduction to Logic, Philosophy 10, UC San Diego.
From playlist UC San Diego: PHIL 10 - Introduction to Logic | CosmoLearning.org Philosophy
2. Ch. 1 (Part 2/3). Introduction to Logic, Philosophy 10, UC San Diego - BSLIF
Video lecture corresponding to _Basic Sentential Logic and Informal Fallacies_, Chapter 1, Part 2 of 3. This is for the class Introduction to Logic, Philosophy 10, UC San Diego.
From playlist UC San Diego: PHIL 10 - Introduction to Logic | CosmoLearning.org Philosophy
26. Suicide, Part III: The morality of suicide and course conclusion
Death (PHIL 176) The lecture begins by examining the consequences a suicide has on both the person committing it and those around this person. The question is raised, however, whether this factor is the only that counts morally, as utilitarians claim, or whether other factors matter moral
From playlist Death with Shelly Kagan
CCoE Webinar Series: Open Science Cyber Risk Profile
Originally recorded Jan. 23rd, 2017 The Open Science Cyber Risk Profile (OSCRP) is a joint project of the Center for Trustworthy Scientific Cyberinfrastructure, the NSF Cybersecurity Center of Excellence, and the Department of Energyβs Energy Sciences Network (ESnet). Over the course of 2
From playlist Center for Applied Cybersecurity Research (CACR)
CVEN1701 Environmental Principles and Systems - Pre-Lecture Video: Risk Analysis Concepts
CVEN1701 Environmental Principles and Systems Pre-Lecture Video: Risk Analysis Concepts Featuring Prof Stuart Khan
From playlist UNSW Engineering
MASSOLIT: Utilitarianism as a Moral Theory
In this lecture, Dr Iain Law (University of Birmingham) provides an introduction to moral theories in general, before thinking in more detail about consequentialism and utilitarianism more specifically. This lecture is part of a larger course on Utilitarianism. The full course can be foun
From playlist Philosophy
Volker Genz - Maximal Green Sequences for Certain Triangle Products
Bernhard Keller introduced maximal green sequences as a combinatorial tool for computing refined Donaldson-Thomas invariants in the framework of cluster algebras. Maximal green sequences furthermore can be used to prove the existence of nice bases of cluster algebras and play a prominent r
From playlist Combinatorics and Arithmetic for Physics: 02-03 December 2020
8b. Ch. 3, Section 3.4. Introduction to Logic, Philosophy 10, UC San Diego - BSLIF
Video lecture corresponding to _Basic Sentential Logic and Informal Fallacies_, Chapter 3, Section 3.4. This is for the class Introduction to Logic, Philosophy 10, UC San Diego.
From playlist UC San Diego: PHIL 10 - Introduction to Logic | CosmoLearning.org Philosophy
Richard P. Feynman: Theory, Prediction, Observation
Richard P. Feynman Lecture #7 Cornell University 1964 My personal favorite min of these lectures occurs from 16:36 to 17:36, but keep going to at least 23:36
From playlist Feynman's Lectures
Find the value makes a piecewise function continuous with system of equations
π Learn how to find the value that makes a function continuos. A function is said to be continous if two conditions are met. They are: the limit of the function exist and that the value of the function at the point of continuity is defined and is equal to the limit of the function. To find
From playlist The Limit