A homogeneous market, is a market where the products and services traded are similar with little feature or design difference. Consumers are in position to compare products from wide range of suppliers and purchase a product at an attractive price. Examples: A good example is the flat screen TV market where this market is highly competitive with a vast arrange of similar product with minor feature difference. In B2B markets raw materials inputs such as steel, aluminium and chemical products are homogenous markets Created at http://www.b2bwhiteboard.com
Views: 9096 B2Bwhiteboard
Video shows what homogeneous means. Of the same kind; alike, similar.. Having the same composition throughout; of uniform make-up.. in the same state of matter.. homogeneous pronunciation. How to pronounce, definition by Wiktionary dictionary. homogeneous meaning. Powered by MaryTTS
Views: 15381 SDictionary
Like us on facebok - https://www.facebook.com/kgto12?ref=hl Mixtures can either be homogeneous or heterogeneous. A homogeneous mixture is a type of mixture in which the composition is uniform and every part of the solution has the same properties. A heterogeneous mixture is a type of mixture in which the components can be seen, as there are two or more phases present.
Views: 159914 Bunk school
Homogeneous Productions Functions and Returns to Scale: Cobb Douglas Production Function Example
Views: 17149 AbdulEcon
Introduction to first order homogenous equations. Watch the next lesson: https://www.khanacademy.org/math/differential-equations/first-order-differential-equations/homogeneous-equations/v/first-order-homogenous-equations-2?utm_source=YT&utm_medium=Desc&utm_campaign=DifferentialEquations Missed the previous lesson? https://www.khanacademy.org/math/differential-equations/first-order-differential-equations/exact-equations/v/integrating-factors-2?utm_source=YT&utm_medium=Desc&utm_campaign=DifferentialEquations Differential Equations on Khan Academy: Differential equations, separable equations, exact equations, integrating factors, homogeneous equations. About Khan Academy: Khan Academy offers practice exercises, instructional videos, and a personalized learning dashboard that empower learners to study at their own pace in and outside of the classroom. We tackle math, science, computer programming, history, art history, economics, and more. Our math missions guide learners from kindergarten to calculus using state-of-the-art, adaptive technology that identifies strengths and learning gaps. We've also partnered with institutions like NASA, The Museum of Modern Art, The California Academy of Sciences, and MIT to offer specialized content. For free. For everyone. Forever. #YouCanLearnAnything Subscribe to KhanAcademy’s Differential Equations channel:: https://www.youtube.com/channel/UCxSQHGkaDv8UKXE0TUbsOIg?sub_confirmation=1 Subscribe to KhanAcademy: https://www.youtube.com/subscription_center?add_user=khanacademy
Views: 770865 Khan Academy
What is CONSUMER BEHAVIOUR? What does CONSUMER BEHAVIOUR mean? Consumer behaviour is the study of individuals, groups, or organizations and the processes they use to select, secure, use, and dispose of products, services, experiences, or ideas to satisfy needs and the impacts that these processes have on the consumer and society. It blends elements from psychology, sociology, social anthropology, marketing and economics. It attempts to understand the decision-making processes of buyers, both individually and in groups such as how emotions affect buying behaviour. It studies characteristics of individual consumers such as demographics and behavioural variables in an attempt to understand people's wants. It also tries to assess influences on the consumer from groups such as family, friends, sports, reference groups, and society in general. Customer behavior study is based on consumer buying behavior, with the customer playing the three distinct roles of user, payer and buyer. Research has shown that consumer behavior is difficult to predict, even for experts in the field. Relationship marketing is an influential asset for customer behaviour analysis as it has a keen interest in the re-discovery of the true meaning of marketing through the re-affirmation of the importance of the customer or buyer. A greater importance is also placed on consumer retention, customer relationship management, personalisation, customisation and one-to-one marketing. Social functions can be categorized into social choice and welfare functions. Each method for vote counting is assumed as social function but if Arrow’s possibility theorem is used for a social function, social welfare function is achieved. Some specifications of the social functions are decisiveness, neutrality, anonymity, monotonicity, unanimity, homogeneity and weak and strong Pareto optimality. No social choice function meets these requirements in an ordinal scale simultaneously. The most important characteristic of a social function is identification of the interactive effect of alternatives and creating a logical relation with the ranks. Marketing provides services in order to satisfy customers. With that in mind the productive system is considered from its beginning at the production level, to the end of the cycle, the consumer (Kioumarsi et al., 2009).
Views: 2550 The Audiopedia
Improve listening! Free Audible audiobook: https://goo.gl/LshaPp Don't forget to turn on subtitles! FREE Grammar Checker: https://grammarly.go2cloud.org/SH1B9 Earn 100 free italki credits: https://go.italki.com/englishwithlucy £26 Airbnb credit: https://www.airbnb.co.uk/c/lcondesa Free uber ride: https://www.uber.com/invite/lucye539ue You can now send me post or mail! I now have a PO BOX address!! This is a post box for PR use, but if you would like to send me a letter or drawing then you are welcome to send it here: English With Lucy PO Box 1305 Cambridge CB1 OHB UNITED KINGDOM FAQ: - Where are you from? I grew up in Bedfordshire, a region near London! - How many languages do you speak? English is my mother tongue, but I also speak fluent Spanish and I'm learning Italian. You can see a video of me speaking Spanish here: https://goo.gl/4RVY0O - Which camera do you use? I use the Canon 60D with a 50mm lens (https://goo.gl/T2T045) - Which microphone do you use? I use the SONY ECMCS3 - Very affordable and great value for money: https://goo.gl/uzuIBh (Note that you will need this mic adapter if you want to use it with your iphone - https://goo.gl/oNtEhN) - What shade of lipstick are you wearing? I wear Elizabeth Arden 8 Hour Sheer Lip Tint in Berry. You can find it here: https://goo.gl/rjREuM - Which editing software do you use? I use Final Cut Pro X - Which grammar book do you recommend? I completely recommend English Grammar in Use: https://goo.gl/S3DIlN - Can you recommend any books that will help me improve my English? I always recommend 'The Curious Incident of the Dog in the Night-time' (https://goo.gl/7vGLDY) as it is written in the first person from the point of view of an autistic teenager and it does not use very complicated language. Some of it is also based in London which I like. - Can you recommend a British TV Series for me to watch and improve my British English pronunciation? Absolutely! I highly recommend 'Broadchurch' (https://goo.gl/5qdWbJ) which is a FANTASTIC crime drama based in a small village in the South of England. The actors are brilliant and it has won lots of awards! Social Media: Instagram: @LearnEnglishWithLucy Facebook: https://www.facebook.com/EnglishwithLucy Patreon: https://www.patreon.com/englishwithlucy
Views: 6209753 English with Lucy
Learning Objectives 1) Expand a matrix-vector product via the definition to prove properties like A0=0 2) Apply algebraic rules like distributivity of Matrix-Vector multiplication over vector addition to prove properties like that the sum of solutions to a Ax=0 is itself a solution. 3) Write a solution to Ax=b as the sum of a particular solution and a homogeneous solution This video is part of a Linear Algebra course taught at the University of Cincinnati.
Views: 1163 Trefor Bazett
Speaker: Evgeny Lazarenko, Product Manager, Tradegecko Subtitle: How to manage software development in cross-cultural teams Blurb: The world is flat, as Thomas Friedman put it. No matter how many walls we build or how hard we try to curb immigration, we are forever bound to work with people who are nothing like us culturally. Cultural homogeneity in product teams is dead, welcome cultural diversity. We are right to celebrate it, but we should also learn how to handle it well. Event Page: http://www.productcampsg.com Produced by Engineers.SG Help us caption & translate this video! http://amara.org/v/44Yj/
Views: 90 Engineers.SG
This video provides an introduction to panel data econometrics, highlighting the issue of unobserved heterogeneity. Check out http://oxbridge-tutor.co.uk/undergraduate-econometrics-course for course materials, and information regarding updates on each of the courses. Check out https://ben-lambert.com/econometrics-course-problem-sets-and-data/ for course materials, and information regarding updates on each of the courses. Quite excitingly (for me at least), I am about to publish a whole series of new videos on Bayesian statistics on youtube. See here for information: https://ben-lambert.com/bayesian/ Accompanying this series, there will be a book: https://www.amazon.co.uk/gp/product/1473916364/ref=pe_3140701_247401851_em_1p_0_ti
Views: 96830 Ben Lambert
An introduction to homogeneous functions, their identification and uses in economics.
Views: 96 EconJohn
Given the basic form of the Cobb-Douglas production function, we'll find the partial derivatives with respect to capital, K, and labor, L. Thereby finding the marginal products of capital and labor. Starting with Cobb-Douglas production function: Y=F(K,L)=AK^α L^(1-α) Derivative of output w.r.t. Labor, then differentiation of production with respect to capital. Finding the wage rate and marginal product of labor. And finding the rental rate and the marginal product of capital. More Intermediate Macro Video: https://sites.google.com/site/curtiskephart/ta/intermediate-macro-solutions
Views: 210058 economicurtis
This video demonstrates how to test the assumptions for the Pearson’s product-moment correlation coefficient in SPSS. The output from the assumption testing, including a scatterplot, is interpreted and Pearson’s r is calculated.
Views: 4508 Dr. Todd Grande
Learn Homothetic function| Monotonicity | Examples of Cardinal Utility, MRS, Oridnal Utility | Learn Microeconomics- Consumer theory Best Online classes for Economics Honours, Bcom Hons, CA foundation. At Calqulus classes we believe in providing the best quality study material to our students. Why waste your time and money on coachings when you can sit at home and study the same. Our faculty Mr. Rahul Kanojia is experienced in this field since many years, he is a known teacher in Delhi University for his outstanding results. This is the platform where you can find the best online classes for economics, econometrics, actuarial, CA foundation. What is a homothetic function? In mathematics, a homothetic function is a monotonic transformation of a function which is homogeneous; however, since ordinal utility functions are only defined up to a monotonic transformation, there is little distinction between the two concepts in consumer theory. Consumer Theory Consumer theory is the study of how people decide to spend their money, given their preferences and budget constraints. Cardinal and ordinal utility. Cardinal utility is the utility wherein the satisfaction derived by the consumers from the consumption of good or service can be measured numerically. Ordinal utility states that the satisfaction which a consumer derives from the consumption of product or service cannot be measured numerically. We also provide 1) online classes for econometrics 2) online classes for statistics 3) online classes for actuarial sciences 4) online classes for Bcom(H) 5) online classes for CA foundation Courses Available- Actuarial science , Eco. Hons. B.Com(h), B.com(Prog), CA Foundation For More Details Call Us On 9810148882 Calculus Classes Introduction Video ! Rahul Kanojia ! Best Online Classes For All
Views: 4240 Calqulus Classes
Production Function In Hindi / उत्पादन फलन क्या है?https://youtu.be/zM_2i0AvbeM Production function relates quantities of physical output of a production process to quantities of physical inputs or factor of production Q=𝑓(𝐿,𝐾,𝑇,….𝑛) The Cobb-Douglas production function is based on the empirical study of the American manufacturing industry made by Paul Douglas and Charles Cobb. It is a linear homogeneous production function of degree one which takes into account two inputs, labour and capital, for the entire output of the manufacturing industry. 𝑄=𝐴𝐿^𝑎 𝑘^𝛽 Q = total production (the real value of all goods produced in a year L = labour input (the total number of person-hours worked in a year K = capital input (the real value of all machinery, equipment, and buildings) A = The equation tells that output depends directly on L and K, and that part of output which cannot be explained by L and K is explained by A which is the ‘residual’, often called technical change. α and 𝛽 are the output elasticities of capital and labour, respectively. These values are constants determined by available technology. Properties of Cobb Douglas production function (𝑄=𝐴𝐿^𝑎 𝑘^𝛽) Cobb-Douglas production is linear homogenous. In cobb-Douglas returns to scale is constant that means if labor and capital is increased in some proportion will increases in same proportion. For production purposes there is always be require labour and capital. Without any of these two factor, production is not possible. According to the cobb-Douglas production function if one factor of production is kept constant and the other quantity of the other factor of production is increased then the marginal productivity of variable factor is reduced. Elasticity of technical substitution is unity. The production function solved by Cobb-Douglas had 1/4 contribution of capital to the increase in manufacturing industry and 3/4 of labour so that the C-D production function is Q = AL3/4 K1/4 Importance of Cobb - Douglas production function: 1. It has been used widely in empirical studies of manufacturing industries and in inter-industry comparisons. 2. It is used to determine the relative shares of labour and capital in total output. 3. It is used to prove Euler’s Theorem. 4. Its parameters a and b represent elasticity coefficients that are used for inter-sectoral comparisons. .5. This production function is linear homogeneous of degree one which shows constant returns to scale 6. Economists have extended this production function to more than two variables. Criticism of Cobb - Douglas production function: The C-D production function considers only two inputs, labour and capital, and neglects some important inputs, like raw materials, which are used in production. It is, therefore, not possible to generalize this function to more than two inputs. The C-D production function is criticised because it shows constant returns to scale. But constant returns to scale are not an actuality, for either increasing or decreasing returns to scale are applicable to production. It is not possible to change all inputs to bring a proportionate change in the outputs of all the industries. Some inputs are scarce and cannot be increased in the same proportion as abundant inputs. On the other hand, inputs like machines, entrepreneurship, etc. are indivisible. 4. The C-D production function is based on the assumption of substitutability of factors and neglects the complementarity of factors. 5. This function is based on the assumption of perfect competition in the factor market which is unrealistic. If, however, this assumption is dropped, the coefficients α and β do not represent factor shares.
Views: 19790 Know Economics
For quality maths revision across all levels, please visit my free maths website (now LITE) on www.m4e.live -------------------------- Example is based on Exercise 3.25 of ISEG's Mathematic II course. Euler's theorem is applied to Homogeneous Functions for (x,y,z). We must recall two things: (i) how to apply the product rule for 2 or more variables. (ii) how to partially differentiate a function in the form of f(x/y , z/x)
Views: 2034 Yacine Koucha
A Stability Indicating Method (SIM) is defined as a validated analytical procedure that accurately and precisely measures active ingredients (drug substance or drug product) free from process impurities, excipients and degradation products. SIMs must be validated for the specific formulation being tested. The SIM is used to perform the assay (test) and ultimately extend the beyond use date. This session will illustrate how SIM are performed and include specific examples for quantitative assays. A comparison of stability indicating methods and release methods will be presented for sterile and non-sterile products. Participants will gather an understanding of the basic process for developing and validating SIM. Learning Objectives: At the conclusion of the program, the participants should be able to: (1) Define a stability indicating method. (2) Explain how a stability indicating method is different than a release (or potency) method. (3) Describe the process for developing and validating a stability indicating method.
Views: 552 ARL BioPharma
A lot of ionic compounds dissolve in water, dissociating into individual ions. But when two ions find each other that form an insoluble compound, they suddenly fall out of solution in what's called a precipitation reaction. In this episode of Crash Course Chemistry, we learn about precipitation, precipitates, anions, cations, and how to describe and discuss ionic reactions. Table of Contents Precipitate Reactions 0:34 Determining Precipitates 1:35 Writing Precipitate Reactions 6:31 Calculating Molar Mass Equation 8:52 Want to find Crash Course elsewhere on the internet? Facebook - http://www.facebook.com/YouTubeCrashCourse Twitter - http://www.twitter.com/TheCrashCourse Tumblr - http://thecrashcourse.tumblr.com Support CrashCourse on Subbable: http://subbable.com/crashcourse
Views: 1355384 CrashCourse
State and Prove Principle of Homogeneity of Dimensions in Hindi|Applied Physics 1|Diploma|Class 11 Hello student welcome to Engineering Classes introduced JK PHYSICS CLASSES for all polytechnic electrical (EE) and Electronics (ECE and CSE,ME,CE Diploma student name of course is learn applied physics 1 lectures in Hindi.Now in this video I will briefly explain State and Prove Principle of Homogeneity of Dimensions in Hindi|Applied Physics 1|Diploma|Class 11 by engineering classes for ECE ,EE and all diploma student whose study in various board like punjab education board ,psbte (Punjab state board of technical education) board and other universities for exam point of view Principle of Homogeneity of Dimensions in Hindi this topic is very important for all govt exam lik jee main,JUNIOR ENGINEER BSNL ,BSNL JUNIOR ENGINEER ,SSC AND UPSC ELECTRICAL AND ELECTRONICS ENGINEER and RAILWAY JUNIOR ENGINEER etc So if you like my video pleases like, comment and share my videos with our college Friends this is cost of my video. Related Appropriate hashtag of Principle of Homogeneity of Dimensions #PrincipleofHomogeneityofDimensions #AppliedPhysics1 #AppliedPhysics1Lecture for more videos visit JK SMART CLASSES website For Engineering Classes http://www.jksmartclasses.blogspot.com For latest update subscribe my channel-ENGINEERING CLASSES https://www.youtube.com/c/engineeringclasses For any help join ENGINEERING CLASSES whatspp group +919814891489 Follow me on facebook-JK SMART LECTURE https://www.facebook.com/jksmart.lecture Like my page on facebook name as JK SMART LECTURE https://www.facebook.com/jksmartclasses/
Views: 2321 engineering classes
This is a video supplement to the book "Modern Robotics: Mechanics, Planning, and Control," by Kevin Lynch and Frank Park, Cambridge University Press 2017. See http://modernrobotics.org for information on the book, free software, and other materials. This video introduces the 4x4 homogeneous transformation matrix representation of a rigid-body configuration and the special Euclidean group SE(3), the space of all transformation matrices. It also introduces three common uses of transformation matrices: representing a rigid-body configuration, changing the frame of reference of a frame or a vector, and displacing a frame or a vector. This video is a brief summary of material from the book, and it is not meant to stand alone. For more details, such as an explanation of the notation, please consult the book and the other videos. Playlist for Chapter 3: https://www.youtube.com/playlist?list=PLggLP4f-rq01NLHOh2vVPPJZ0rxkbVFNc Playlist for all book videos: https://www.youtube.com/playlist?list=PLggLP4f-rq02vX0OQQ5vrCxbJrzamYDfx YouTube channel with all playlists: https://www.youtube.com/user/kevinl2145 Wiki for the book, including software and other supplements: http://modernrobotics.org Modern Robotics is now a series of online courses on Coursera! https://www.coursera.org/specializations/modernrobotics
Views: 10615 Northwestern Robotics
Given a number of production functions (including Cobb-Douglas production function, partially parameterized Cobb-Douglas and others) we calculate the return to scale -- whether or not these functions are increasing returns to scale (IRS), decreasing returns to scale (DRS) or constant returns to scale (CRS). This is designed for an Intermediate Macro Economics level. -------------------------------------------------------------------- More Returns to Scale Videos: http://youtu.be/AttvGU47Eg8 - Overview of Returns to Scale http://youtu.be/in6CK8sTQgk - Constant Returns to Scale (CRS) http://youtu.be/5W7GUxomGpM - Increasing Returns to Scale (IRS) http://youtu.be/vellgNFKztw - Decreasing Returns to Scale (DRS) http://youtu.be/gPyPvWxJOlc - Examples of determining returns to scale. -------------------------------------------------------------------- Skip Ahead 1:31 - Y=F(K,L)=AK^0.5 L^0.5⇒CRS, 4:30 - Y=F(K,L)=AK^α L^((1-α) )⇒CRS 8:15 - Y=F(K,L)=AK^0.4 L^0.7⇒IRS, 11:00 - Y=F(K,L)=AK^0.2 L^0.3⇒ 13:35 - Y=F(K,L)=2K+L⇒CRS , 15:50 - Y=F(K,L)=3KL⇒IRS, 19:28 - Y=F(K,L)=K^0.5 L^0.5+A⇒DRS, 23:05 - Y=F(K,L)=K^0.5 L^0.5-A⇒IRS 27:25 - Y=F(K,L)=K+K^0.2 L^0.2⇒DRS
Views: 64437 economicurtis
Managerial Economics; Management; Cobb-Douglas Production Function | Leontief Production Function ; Introduction 00:00:00- 00:00:20 Production Function 00:00:21- 00:06:14 *What is a production function? *What is a homogeneous production function? *How to determine the type and degree of a production function? *How does a production function project its type of returns to scale? Cobb- Douglas Production Function 00:06:15- 00:13:04 *Introduced by Charles Cobb and Paul Douglas *What is Cobb- Douglas production function? *What are its uses? *How to formulate a Cobb- Douglas production function? *How to find out which degree of returns to scale a production function indicates? Leontief Production Function 00:13:05- 00:18:53 *What is the difference between Cobb- Douglas and Leontief production function? *What is Leontief production function? *What are the characteristics of Leontief production function? *How to formulate a Leontief production function? Video by Edupedia World (www.edupediaworld.com), Free Online Education; Click here for more videos on Managerial Economics; All Rights Reserved.
Views: 38168 Edupedia World
Enhance the product in: • Homogeneity • High tensile strength • Product stability • Uniformity • Consistency • Viscosity absorbency • High Durability and brightness • Shelf life and brightness. Homogenizers provide benefits for the following applications: • High Pressure Pasteurization • Particle size reduction • Micro/nano emulsions • Dispersions • Cell disruption
Views: 1408 GENN Controls India Private Limited - genngcipl
Homogeneous production function: Cobb Douglas production function example
Views: 385 knowledge
This video explains how it is possible to estimate the unobserved heterogeneity term in panel data models, by using either Least Squares Dummy Variables or Fixed Effects estimators. Check out http://oxbridge-tutor.co.uk/undergraduate-econometrics-course for course materials, and information regarding updates on each of the courses. Check out https://ben-lambert.com/econometrics-course-problem-sets-and-data/ for course materials, and information regarding updates on each of the courses. Quite excitingly (for me at least), I am about to publish a whole series of new videos on Bayesian statistics on youtube. See here for information: https://ben-lambert.com/bayesian/ Accompanying this series, there will be a book: https://www.amazon.co.uk/gp/product/1473916364/ref=pe_3140701_247401851_em_1p_0_ti
Views: 19258 Ben Lambert
Video demonstration of the Cyclomix, a high-speed, intensive paddle mixer specially designed for mixing cohesive powders with liquids or melt binders. The Cyclomix is available in sizes ranging from 100 ml (Mini Cyclomix lab model) up to 2000 liters product volume. In this video, senior application engineer Allet Krug demonstrates a 5 litre model, blending calcium carbonate powder with iron oxide pigment. The Cyclomix is a multi-purpose, high-shear impact mixer and agglomerator that is suitable for a variety of applications. It combines different processes in one single machine and is the ideal choice for intensive thermal processing of high energy input; high degree of dispersion and homogeneity and ultra-short cycle times. It also handles pastes, slurries and liquids with varying characteristics with ease, due to its combination of high-shear and high-impact forces. The Cyclomix high-shear impact mixer offers a high level of homogeneity in the end product, such as frequently demanded by the food-, chemical-, plastic-, toner-, mineral-, cosmetic- and pharmaceutical industries. -------------------------------------------------------------------- More information on the Cyclomix high shear impact mixer: https://www.hosokawa-micron-bv.com/high-shear-impact-mixer -------------------------------------------------------------------- Hosokawa Micron B.V. is a global industrial process machinery supplier which provides mixing, drying and agglomeration equipment and complete systems for the powder and bulk processing industry. The main activities are concentrated in the field of design and supply of equipment and systems for mechanical and thermal processing of dry and wet powders. The company's strong emphasis on system design capability is backed up by extensive test centre and tolling facilities to support you in finding optimal solutions for your applications. -------------------------------------------------------------------- Contact Hosokawa Micron B.V.: https://www.hosokawa-micron-bv.com/contact --------------------------------------------------------------------
Views: 3836 Hosokawa Micron B.V.
What is DECARTELIZATION? What does DECARTELIZATION mean? DECARTELIZATION meaning. Decartelization is the transition of a national economy from monopoly control by groups of large businesses, known as cartels, to a free market economy. This change rarely arises naturally, and is generally the result of regulation by a governing body with monopoly of power to decide what structures it likes. A modern example of decartelization is the economic restructuring of Germany after the fall of the Third Reich in 1945. To truly understand the term “decartelization” requires familiarity with the term “cartel”. A cartel is a formal (explicit) agreement among firms. Cartels usually occur in an oligopolistic industry (oligopoly), where there are a small number of sellers and usually involve homogeneous products (Homogeneity and heterogeneity). Cartel members may agree on such matters as price fixing, total industry output, market shares, allocation of customers, allocation of territories, bid rigging, establishment of common sales agencies (sales agents), and the division of property or profits or combination of these. The aim of such collusion is to increase individual member's profits by reducing competition. Competition laws forbid cartels. Identifying and breaking up cartels is an important part of the competition policy in most countries, although proving the existence of a cartel is rarely easy, as firms are usually not so careless as to put agreements to collude on paper.
Views: 86 The Audiopedia
The petroleum we pump out of the ground turns into a range of useful things: fuel for all forms of transportation, a key ingredient in plastics, and more. Alexis Madrigal, The Atlantic's senior technology editor, takes a look at the chemistry of crude oil in the two-minute video above, explaining the process of distilling one barrel, gallon by gallon. Animated by Lindsey Testolin, this clip is part of a six-part video series in The User's Guide to Energy special report. Alexis Madrigal: http://www.theatlantic.com/alexis-madrigal/ Lindsey Testolin: http://www.lindseytestolin.com/ Story: http://www.theatlantic.com/technology/archive/2013/08/whats-in-crude-oil-and-how-do-we-use-it/278645/ Atlantic Video: http://www.theatlantic.com/video
Views: 96911 The Atlantic
Modern society: a kind of society in which social solidarity is based on interdependence (organic solidarity), rather than on homogeneity (as in a pre-modern society). Modern societies are more diverse that pre-modern societies, with a variety of subcultures and possibly different ethnic groups. Technological advancement requires a greater division of labor, with specialized occupations and social roles. Modern societies develop as populations increase and are more common in urban areas. Perception of the world tends to be more rational and oriented around the individual, rather than the collective.
Views: 2465 Sociological Dictionary
This video provides an example of where it is appropriate to use Weighted Least Squares estimation, and contrasts the results that this estimator will find with those achieved from Ordinary Least Squares. Check out https://ben-lambert.com/econometrics-course-problem-sets-and-data/ for course materials, and information regarding updates on each of the courses. Quite excitingly (for me at least), I am about to publish a whole series of new videos on Bayesian statistics on youtube. See here for information: https://ben-lambert.com/bayesian/ Accompanying this series, there will be a book: https://www.amazon.co.uk/gp/product/1473916364/ref=pe_3140701_247401851_em_1p_0_ti
Views: 32023 Ben Lambert
See how to carry out a one-way non-parametric ANOVA, also known as the Kruskal-Wallis test, in SPSS. https://global.oup.com/academic/product/research-methods-for-the-biosciences-9780198728498 This video relates to sections 11.3 and 11.4 in the book Research Methods for the Biosciences third edition by Debbie Holmes, Peter Moody, Diana Dine, and Laurence Trueman. The video is narrated by Laurence Trueman. © Oxford University Press
Views: 23238 Oxford Academic (Oxford University Press)
In this vedio I have explained what is service and difference between service and product
Views: 134 PANKAJ SUTAR
What is COMPETITIVE HETEROGENEITY? What does COMPETITIVE HETEROGENEITY mean? COMPETITIVE HETEROGENEITY meaning - COMPETITIVE HETEROGENEITY definition - COMPETITIVE HETEROGENEITY explanation. Source: Wikipedia.org article, adapted under https://creativecommons.org/licenses/by-sa/3.0/ license. SUBSCRIBE to our Google Earth flights channel - https://www.youtube.com/channel/UC6UuCPh7GrXznZi0Hz2YQnQ Competitive heterogeneity is a concept from strategic management that examines why industries do not converge on one best way of doing things. In the view of strategic management scholars, the microeconomics of production and competition combine to predict that industries will be composed of identical firms offering identical products at identical prices. Deeper analyses of this topic were taken up in industrial organization economics by crossover economics/strategic-management scholars such as Harold Demsetz and Michael Porter. Demsetz argued that better-managed firms would make better products (or similar products at lower costs) than their competitors. Such firms would translate better products or lower prices (an optimal decision based on lower costs) into higher levels of demand, which would lead to revenue growth. These firms would then be larger than the more poorly managed competitors. Porter argued that firms in an industry would cluster into strategic groups. Each group would be similar and movement between groups would be difficult and costly (barriers to mobility). Richard Rumelt and Stephen Lippman demonstrated how firms could differ in an industry in partial equilibrium-like circumstances. Richard Nelson and Sidney G. Winter discussed how firms develop differing capabilities. During this time, industrial economics focused on industry characteristics, treated the differences among firms in an industry as trivial. This was a point of contention within strategy and between strategy and economics from about 1980 to the mid-1990s. Early in the 1990s a number of papers were published under the rubrics of the Resource-based View and Capabilities. Both approaches continue to develop. However, the RBV won the public relations war (complete with, allegedly, removing dissenting opinions from Wikipedia). The RBV argues that firms vary in their resources and resource variances lead to varying competitive positions. Capability theories, building on earlier work by Nelson and Winter and Teece, make a similar claim. Developing ideas pioneered by Rumelt (1984) and discussed by Levinthal (1985) and Noda and Collis (2001). Hoopes, Madsen, and Walker (2003) use the term competitive heterogeneity to describe the performance differences between close competitors. Hoopes et al. argue that the RBV is but one of many possible explanations for competitive heterogeneity. Thus, the title of their paper and special issue, "Why is there a RBV?" In addition to economics-based explanations noted above, Hoopes et al. point out that differing beliefs, preferences, and objectives lead firms pursuing similar customers to find and develop unique competitive positions. Additionally, Hoopes et al. suggest that competitive advantage should be thought of in terms of each firm's "economic contribution. (Walker,2004; Hoopes Madsen, and Walker, 2003). Termed the V-C model, it is basically a bargaining model (see Tirole, 1986: 21-34) over the surplus created by a firm's activities. A buyer and supplier bargain over the price (P) for a good that contributes a value (V) to the buyer and costs the supplier some amount (C) to produce. "Value is the price a buyer is willing to pay for a good absent competing products or services yet within budget constraints and considering other purchasing opportunities. Most work considers costs in terms of marginal cost. The good’s market price lies between value and cost. So, the buyer receives a surplus of value minus the price (V-P), and the supplier receives a profit of price minus cost (P-C). The supplier’s resources and capabilities, in turn, influence the value of the good to the buyer and/or the cost of producing it (Hoopes, Madsen, and Walker (2003)." Also see Besanko, Dranove & Shanley, 1999: chapter 13; Ghemawat, 1991: chapter 4; Walker, 2004: chapter 2; see also Postrel, 2002). Under this theory, competitive advantage is deemed to be possessed by the firm who implements largest difference between value and cost when compared to rivals. In summary, a theory of competitive heterogeneity seeks to explain why firms do not converge on a single best way of doing things as predicted by simple microeconomics. The RBV contains one approach. In recent years capability theories have expanded RBV logic. Recently, more work that focuses on heterogeneity has been published in strategy journals.
Views: 277 The Audiopedia
We were assigned to create an unique and innovative show for the launch of the new product line “GENERATION6000”. The show had to cover the inspiration which affects the designer during the creation process as well as the presentation of the final products concerning design and function. The second part of the show has covered the presentation of the final products. The cube construction bases on a possible kitchenette and were settled up by dancers life on stage during show and projected by mapping technology to generate a convincing and impressive 3D effect for the audience. The product presentation includes the visual appearance (design lines, available colors), the design homogeneity of the products as well as the individual and incredible features - like touch interface, flexilight, popcorn-button or warming drawer - just to pronounce a few. See pictures here: https://www.flickr.com/photos/unitedmotionlabs/albums/72157681489414940 See here the first part of the show: https://www.youtube.com/watch?v=QTpylwAAjvM&t=52s https://unitedmotionlabs.com
Views: 50 UNITED MOTION LABS
Find this video and other talks given by worldwide mathematicians on CIRM's Audiovisual Mathematics Library: http://library.cirm-math.fr. And discover all its functionalities: - Chapter markers and keywords to watch the parts of your choice in the video - Videos enriched with abstracts, bibliographies, Mathematics Subject Classification - Multi-criteria search by author, title, tags, mathematical area Part 2: minimal curves Let P be of the unitary group UA of a C∗-algebra A. The main result: in the von Neumann algebra context (i.e. if the isotropy sub-algebra is a von Neumann algebra), for each unit tangent vector X at a point, there is a geodesic δ(t), wich is obtained by the action on P of a 1-parameter group in UA. This geodesic is minimizing up to length π/2. Recording during the thematic meeting: « Geometry and dynamics of Finsler manifolds » the June 17, 2014 at the Centre International de Rencontres Mathématiques (Marseille, France) Filmmaker: Guillaume Hennenfent
Views: 1024 Centre International de Rencontres Mathématiques
COSMETIC COMPANY MANUFACTURER, HAIRDRESSING AND BEAUTY (further information on www.valquer.com) When the goods from the most prestigious suppliers from all continents reach our facilities, they are tested thoroughly through a robust and reliable tracking system. This ensures total homogeneity in time for the compositions and components of all products. Automatic stocking checks are conducted weekly, which allows planning what will be needed up to 150 days in advance. Once the PRODUCTION ORDER is available, the Technical Department carries out a painstaking, reliable and automated manufacturing process. Our products (COSMETIC, HAIRDRESSIN, BEAUTY CARE PRODUCTS) have a key element: WATER, which is treated and processed with state-of-the-art equipment to ensure microbiological and chemical purity at all times. Stainless steel guarantees manufacturing processes will be safe and without interference. Laboratorios Válquer (company) is equipped with several different reactors that allow reliable and homogeneous manufacturing processes from 100 to 24,000 kg. All these reactors have the most effective and advanced systems on the market: optimized steam heating, triple agitation, vacuum and cooling systems. Both the dosage of raw materials and the production processes are performed automatically thanks to intelligent equipment and systems in place to ensure full homogeneity in all manufacturing processes. Once the manufacture of products has been completed, they are tested to ensure that all parameters are correct. After these tests, the cosmetics are packaged and prepared. Laboratorios VALQUER (company) has a full, up-to-date, advanced range of machinery in order to pack each and every reference.
Views: 3504 José Luis
Academic Homogeneity: Leftist Bias in the University Several recent studies have shown that the university system is laden with leftwing bias. More than this, the studies show that this trend has long been occurring and is getting worse. The old notion that the university is where one goes to have their beliefs challenged is no longer true. If one comes in with a generalized leftist bias from pop culture (products of leftist Hollywood), then none of those ideas are challenged. Rather those ideas are enhanced and deepened once one enters university. Studies show that leftists far outnumber those on the right. Conservatives are almost nonexistent in many fields and libertarians have only a tiny fraction of the positions held by far leftwing professors. One is far more likely to encounter numerous Marxists, neo-Marxists, Maoists, Leninists, and progressives than any position to the right of center. In fact, many on the left now see the old center as "extreme" or "far right" and often equate such positions with dangerous movements which are potentially violent. Heterodox Academy is a group of academics working to remedy this situation by attempting to introduce notions of viewpoint diversity and emphasizing freedom of speech and free thought. Heterodox Academy - https://heterodoxacademy.org/ Homogeneous: The Political Affiliations of Elite Liberal Arts College Faculty - https://www.nas.org/articles/homogenous_political_affiliations_of_elite_liberal Political Homogeneity in Academia - https://www.frontpagemag.com/fpm/270194/political-homogeneity-academia-jack-kerwick 8 in 10 British Lecturers are Leftwing - https://www.telegraph.co.uk/education/2017/03/02/eight-ten-british-university-lecturers-left-wing-survey-finds/ Left-wing Campus Bias Worse Than You Think - http://www.wnd.com/2017/05/left-wing-campus-bias-worse-than-you-thought/ All images, sources, and links are used in the interest of education, commentary, and criticism. All such uses are protected under the safe harbor of Fair Use. I only endorse the views which you specifically hear me advocate and I always retain the right to change my mind at any moment based upon evidence.
Views: 55 Apollo's Artifacts
Like Rajesh Choudhary sir on Facebook https://www.facebook.com/RcRajas/ Please Like ATP Academy on Facebook https://web.facebook.com/Any-Time-Padhai-Academy-1034624919960861/
Views: 16571 Any Time Padhai Academy
MIC-100L vacuum emulsifying machine consists of: oil tank, water tank, vacuum homogeneous emulsifying machine, heating system, mixing system, vacuum system, electric lifting system, operation control cabinet, piping system. It is the most suitable equipment to produce high-grade skin care creams or other creams products. Vacuum Emulsifying pot: made of three decks by stainless steel. Interlayer thickness 4mm, middle layer thickness 4mm, outer layer thickness 3mm, special light treatment The homogenizer is on the top of the emulsifying pot, adjustable time setting depends on the product homogenization need, voltage 3800V, power 3KW, made in Shanghai and uses German technology, the highest speed 2800 rev / min. The material moves in a high speed between the rotor and stator, what can engender a strong hydraulic shear power to dispersing materials, meanwhile it can engender centrifugal power to extrude, milling, crash the material, ultimately make the material mixing, stirring, diminution to the desired requirements. A lighting hole on the pot cover to observe the states of homogeneity. Entrance for spots of material provide possibility to add essence and suchlike materials. Either pour-out the material by tilting the pot or from the bottom, the latter way can make the materials enter the filling machine directly for quantitative filling. Easy to clean. MIC.Machinery Co., Ltd [email protected] Skype:monika.yao1 Web:www.micmachinery.com http://www.micmachinery.en.alibaba.com/
Views: 483 MICMACHINERY
Learn to create sets from Cartesian Product of two non-empty set. This relations and function video lesson will teach you to make a set , to find the elements of related set from the Cartesian product of two sets. If we are given the Cartesian Product in ordered pair from, then always the first element of the every ordered pair represents the member of first set while second element of the every ordered pair represents the member of second set. So, from all the ordered pair we will extract the member of first set and similarly, we will extract the elements of second set. I believe you will like this lesson and please if you have any doubt to ask me regarding this lesson of mathematics, Please feel free to ask in comment section below. Please like this video and subscribe to my channel to motivate me. You can connect with me in Facebook @ http://facebook.com/ItsMyAcademy You can connect with me on Twitter @ http://twitter.com/ItsMyAcademy And, please don't forget to visit and support us at our website - http://ItsMyAcademy.com
Views: 1591 IMA Videos