Real Analysis 2 Presentation (M.Sc Math)
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Real analysis
This document provides an overview of topics in real analysis including countable and uncountable sets, open and closed sets, connected sets, and limit points. It defines bounded and unbounded sets, with an unbounded set not being of finite size. Open sets are defined as sets containing all their limit points, while closed sets can be approximated in a metric space by containing limit points. Limit points are also defined as points that can be approximated by other points in a set's neighborhood excluding the point itself. Images are provided as examples of open and closed sets.
ABSTRACT ALGEBRA
This document provides an overview of abstract algebra and key concepts such as groups. It discusses how the word "algebra" is derived from an Arabian word meaning "union of broken parts." It also outlines important mathematicians who contributed to the development of algebra, such as Al Khwarizmi, the "father of algebra." The document defines what a set and group are, including the properties a group must satisfy like closure, associative, identity, and inverse elements. Examples of groups are given like integers, rational numbers, and matrices. Applications of group theory in fields like physics, chemistry, and technology are mentioned.
Set
This document introduces some basic concepts of set theory, including:
1) Defining sets by listing elements or describing properties. Common sets include real numbers, integers, etc.
2) Basic set operations like union, intersection, difference, and complement.
3) Relationships between sets like subset, proper subset, and equality.
4) Other concepts like partitions, power sets, and Cartesian products involving ordered pairs from multiple sets.
Symmetrics groups
The document defines symmetric groups and discusses their properties. Some key points:
- A symmetric group is the group of all permutations of a finite set under function composition.
- Symmetric groups of finite sets behave differently than those of infinite sets.
- The symmetric group Sn of degree n is the set of all permutations of the set {1,2,...,n}.
- Sn is a finite group under permutation composition. Subgroups include the alternating group An of even permutations.
- Examples discussed include S2, the Klein four-group, and S3, which is non-abelian with cyclic subgroups.
Real analysis
A metric space is a non-empty set together with a metric or distance function that satisfies four properties: distance is always greater than or equal to 0; distance is 0 if and only if points are equal; distance is symmetric; and distance obeys the triangle inequality. A function between metric spaces is continuous if small changes in the input result in small changes in the output. A function is uniformly continuous if it is continuous with respect to all possible inputs, not just a single point. A metric space is connected if it cannot be represented as the union of two disjoint non-empty open sets.
Applications of Differentiation
This document discusses various applications of differentiation including finding extrema, Rolle's theorem, the mean value theorem, and determining whether a function is increasing or decreasing. It provides examples of using the derivative to find relative extrema, applying Rolle's theorem to show a horizontal tangent exists between two roots, using the mean value theorem to find a point where the tangent line is parallel to the secant line, and determining the intervals where a function is increasing or decreasing using the first derivative test.
Mathematics and History of Complex Variables
Mathematics of complex variables, plus history.
This presentation is at a Undergraduate in Science (Math, Physics, Engineering) level.
Please send comments and suggestions to solo.hermelin@gmail.com, thanks! For more presentations, please visit my website at http://www.solohermelin.com
Group theory notes
The document provides notes on group theory. It discusses the definition of groups and examples of groups such as (Z, +), (Q, ×), and Sn. Properties of groups like Lagrange's theorem and criteria for subgroups are also covered. The notes then discuss symmetry groups, defining isometries of R2 and showing that the set of isometries forms a group. Symmetry groups G(Π) of objects Π in R2 are introduced and shown to be subgroups. Specific examples of symmetry groups like those of triangles, squares, regular n-gons, and infinite strips are analyzed. Finally, the concept of group isomorphism is defined and examples are given to illustrate isomorphic groups.
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Real analysis
This document provides an overview of topics in real analysis including countable and uncountable sets, open and closed sets, connected sets, and limit points. It defines bounded and unbounded sets, with an unbounded set not being of finite size. Open sets are defined as sets containing all their limit points, while closed sets can be approximated in a metric space by containing limit points. Limit points are also defined as points that can be approximated by other points in a set's neighborhood excluding the point itself. Images are provided as examples of open and closed sets.
ABSTRACT ALGEBRA
This document provides an overview of abstract algebra and key concepts such as groups. It discusses how the word "algebra" is derived from an Arabian word meaning "union of broken parts." It also outlines important mathematicians who contributed to the development of algebra, such as Al Khwarizmi, the "father of algebra." The document defines what a set and group are, including the properties a group must satisfy like closure, associative, identity, and inverse elements. Examples of groups are given like integers, rational numbers, and matrices. Applications of group theory in fields like physics, chemistry, and technology are mentioned.
Set
This document introduces some basic concepts of set theory, including:
1) Defining sets by listing elements or describing properties. Common sets include real numbers, integers, etc.
2) Basic set operations like union, intersection, difference, and complement.
3) Relationships between sets like subset, proper subset, and equality.
4) Other concepts like partitions, power sets, and Cartesian products involving ordered pairs from multiple sets.
Symmetrics groups
The document defines symmetric groups and discusses their properties. Some key points:
- A symmetric group is the group of all permutations of a finite set under function composition.
- Symmetric groups of finite sets behave differently than those of infinite sets.
- The symmetric group Sn of degree n is the set of all permutations of the set {1,2,...,n}.
- Sn is a finite group under permutation composition. Subgroups include the alternating group An of even permutations.
- Examples discussed include S2, the Klein four-group, and S3, which is non-abelian with cyclic subgroups.
Real analysis
A metric space is a non-empty set together with a metric or distance function that satisfies four properties: distance is always greater than or equal to 0; distance is 0 if and only if points are equal; distance is symmetric; and distance obeys the triangle inequality. A function between metric spaces is continuous if small changes in the input result in small changes in the output. A function is uniformly continuous if it is continuous with respect to all possible inputs, not just a single point. A metric space is connected if it cannot be represented as the union of two disjoint non-empty open sets.
Applications of Differentiation
This document discusses various applications of differentiation including finding extrema, Rolle's theorem, the mean value theorem, and determining whether a function is increasing or decreasing. It provides examples of using the derivative to find relative extrema, applying Rolle's theorem to show a horizontal tangent exists between two roots, using the mean value theorem to find a point where the tangent line is parallel to the secant line, and determining the intervals where a function is increasing or decreasing using the first derivative test.
Mathematics and History of Complex Variables
Mathematics of complex variables, plus history.
This presentation is at a Undergraduate in Science (Math, Physics, Engineering) level.
Please send comments and suggestions to solo.hermelin@gmail.com, thanks! For more presentations, please visit my website at http://www.solohermelin.com
Group theory notes
The document provides notes on group theory. It discusses the definition of groups and examples of groups such as (Z, +), (Q, ×), and Sn. Properties of groups like Lagrange's theorem and criteria for subgroups are also covered. The notes then discuss symmetry groups, defining isometries of R2 and showing that the set of isometries forms a group. Symmetry groups G(Π) of objects Π in R2 are introduced and shown to be subgroups. Specific examples of symmetry groups like those of triangles, squares, regular n-gons, and infinite strips are analyzed. Finally, the concept of group isomorphism is defined and examples are given to illustrate isomorphic groups.
27 triple integrals in spherical and cylindrical coordinates
The document discusses cylindrical and spherical coordinate systems. It defines cylindrical coordinates as using polar coordinates in the xy-plane with z as the third coordinate. It provides an example of converting between rectangular and cylindrical coordinates. Spherical coordinates represent a point as (ρ, θ, φ) where ρ is the distance from the origin and θ and φ specify the direction. Conversion rules between the different systems are given.
Abstract Algebra
This document provides a summary and review of key concepts from Abstract Algebra Part 1, including:
- Groups and their properties of closure, associativity, identity, and inverses
- Examples of finite and infinite, abelian and non-abelian groups
- Subgroups, including cyclic subgroups, tests for subgroups, and examples
- Additional concepts like the order of an element, conjugation, and the center of a group
Taylor's series
This presentation introduces Taylor series. It begins with background on Brook Taylor, who formally introduced Taylor series in 1715, and discusses their history. The presentation defines Taylor series as representing a function as an infinite sum of terms calculated from the function's derivatives at a single point. Examples are provided of using Taylor series to approximate functions and solve otherwise difficult problems in restricted domains. Applications of Taylor series mentioned include finding sums of series, evaluating limits, and approximating polynomial functions. The presentation concludes by thanking the audience and asking for any questions.
Abstract algebra - Algebraic closed field, unit - 2 , M.Sc. l semester Maths
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This ppt covers the topic of Abstract Algebra in M.Sc. Mathematics 1 semester topic of Algebraic closed field is Introduction , field & sub field , finite extension field , algebraic element.Complex Number I - Presentation
This document discusses approaches to teaching complex numbers. It describes an axiomatic approach, utilitarian approach, and historical approach. The historical approach builds on prior knowledge of quadratic equations and introduces complex numbers to solve problems like finding the roots of quadratic and cubic equations. The document also covers definitions of complex numbers, addition, subtraction, multiplication, and division of complex numbers. It discusses pedagogical considerations like using multiple representations and building on students' prior knowledge.
Unit 1: Topological spaces (its definition and definition of open sets)
Learning Objectives:
1. To understand the definition of topology with examples
2. To know the intersection and union of topologies
3. To understand the comparison of topologies
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The document announces a mathematics project competition open to students in forms 3 and 4 at Maria Regina College Boys' Junior Lyceum. Teams of two students can participate by creating one of the following: a statistics project, charts, or a PowerPoint presentation on a given theme related to mathematics history or concepts. The top five entries will represent the school in the national competition and prizes will be awarded to the top teams nationally. Proposals are due by November 30th and completed projects by January 18th.
Lesson 7: Vector-valued functions
We define vector-valued functions, whose image is a curve in the plane or space. We also show how to differentiate and integrate them
Abstract algebra & its applications (1)
This document provides information about a state level workshop on abstract algebra and its applications that was held on August 28, 2015 at Sri Sarada Niketan College for Women in Amaravathipudur, India. The workshop included a presentation by Dr. S. SelvaRani, the principal of the college, on the topic of abstract algebra and its applications. Abstract algebra is the study of algebraic structures like groups, rings, and fields. It has many applications in areas like number theory, geometry, physics, and more. Representation theory is also discussed as an important branch of abstract algebra.
Cauchy riemann equations
The document discusses Cauchy Riemann equations, including its history, important features, definition, and applications. It was discovered in 1851 by Augustin Cauchy and Bernhard Riemann during work on the theory of functions. The equation is used to check the differentiability and analyticity of complex functions. It has applications in engineering fields like triangular grid generation for computational fluid dynamics simulations. It also has applications in verifying Maxwell's equations and calculating fluid intensity and divergence.
Lesson 8: Curves, Arc Length, Acceleration
The velocity of a vector function is the absolute value of its tangent vector. The speed of a vector function is the length of its velocity vector, and the arc length (distance traveled) is the integral of speed.
topology definitions
Topology is the branch of mathematics concerned with properties that remain unchanged by deformations such as stretching or shrinking. It studies concepts like open sets, closed sets, limits, and neighborhoods. The product topology on X × Y has as its basis all sets of the form U × V, where U is open in X and V is open in Y. Projections map elements of a product space X × Y onto the first or second factor. The subspace topology on a subset Y of a space X contains all intersections of Y with open sets of X. The interior of a set A is the largest open set contained in A, while the closure of A is the smallest closed set containing A.
Vector calculus
The document discusses vector calculus concepts including:
1) Coordinate systems used in vector calculus problems including rectangular, cylindrical, and spherical coordinates.
2) How to write vectors and their components in each coordinate system.
3) Relationships between vectors in different coordinate systems using transformation matrices.
4) Concepts of gradient, divergence, and curl and their definitions and representations in different coordinate systems.
5) Theorems relating integrals, including the divergence theorem and Stokes' theorem.
Laplace transforms
This document provides an overview of Laplace transforms. Key points include:
- Laplace transforms convert differential equations from the time domain to the algebraic s-domain, making them easier to solve. The process involves taking the Laplace transform of each term in the differential equation.
- Common Laplace transforms of functions are presented. Properties such as linearity, differentiation, integration, and convolution are also covered.
- Partial fraction expansion is used to break complex fractions in the s-domain into simpler forms with individual terms that can be inverted using tables of transforms.
- Solving differential equations using Laplace transforms follows a standard process of taking the Laplace transform of each term, rewriting the equation in the s-domain, solving
Types of function
The document discusses different types of functions including:
1) Surjective functions where the range equals the co-domain.
2) Injective functions where distinct inputs have distinct outputs.
3) Bijective functions which are both injective and surjective.
It also discusses even and odd functions, inverses, composites, and examples of calculating different functions.
Metric space
This document defines and provides examples of metric spaces. It begins by introducing metrics as distance functions that satisfy certain properties like non-negativity and the triangle inequality. Examples of metric spaces given include the real numbers under the usual distance, the complex numbers, and the plane under various distance metrics like the Euclidean, taxi cab, and maximum metrics. It is noted that some functions like the minimum function are not valid metrics as they fail to satisfy all the required properties.
Isomorphism
This is a handout about Homomorphism, Isomorphism, Kernel and Cayley's Theorem.
This is a group effort.
#LoveforAbstractAlgebra
application of partial differentiation
This document discusses topics in partial differentiation including:
1) The geometrical meaning of partial derivatives as the slope of the tangent line to a surface.
2) Finding the equation of the tangent plane and normal line to a surface.
3) Taylor's theorem and Maclaurin's theorem for functions with two variables, which can be used to approximate functions and calculate errors.
Second Order Derivative | Mathematics
The document discusses second order derivatives. The second derivative of a function is the derivative of the first derivative. It can tell us whether a function is concave up or down at a point. If the second derivative is zero at a point, it does not tell us the slope. The point where a function changes from concave up to down is called the point of inflection. The second derivative test can determine if a point is a local minimum or maximum.
Pythagorean triples
Pythagorean triples are sets of three whole numbers that satisfy the Pythagorean theorem. A primitive Pythagorean triple has no common factors between the three numbers. Euclid developed a formula to generate primitive Pythagorean triples using two integers where one is odd and they are relatively prime. The document discusses using Euclid's formula to find primitive Pythagorean triples and prove the formula, as well as properties of primitive Pythagorean triples.
50 democracy in america short essay with quotations the college study
Democracy is a form of government where elected representatives represent the people and power is derived from the citizens. It aims to promote the welfare of all citizens regardless of class, religion, or other factors. Several prominent figures throughout history are quoted defining and praising key aspects of democracy. Challenges to democracy include threats from forces like communalism, separatism, and illiteracy. As long as democratic foundations of free elections and civil rights are protected, the future of democracy remains bright.
49 essay on cable and satellite television the college study
Cable and satellite television have revolutionized broadcasting globally by providing over 100 channels to Pakistani families. This wide selection of channels from around the world, available at any time of day, has become highly popular and attracted many viewers who now spend long hours watching television. While cable television provides entertainment and information that educates and enlightens viewers, it also has negative effects like disrupting sleep and studies as well as potentially influencing morality. Both the advantages of enrichment and disadvantages of overuse must be recognized in evaluating the impact of this new technology.
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Abstract Algebra
This document provides a summary and review of key concepts from Abstract Algebra Part 1, including:
- Groups and their properties of closure, associativity, identity, and inverses
- Examples of finite and infinite, abelian and non-abelian groups
- Subgroups, including cyclic subgroups, tests for subgroups, and examples
- Additional concepts like the order of an element, conjugation, and the center of a group
Taylor's series
This presentation introduces Taylor series. It begins with background on Brook Taylor, who formally introduced Taylor series in 1715, and discusses their history. The presentation defines Taylor series as representing a function as an infinite sum of terms calculated from the function's derivatives at a single point. Examples are provided of using Taylor series to approximate functions and solve otherwise difficult problems in restricted domains. Applications of Taylor series mentioned include finding sums of series, evaluating limits, and approximating polynomial functions. The presentation concludes by thanking the audience and asking for any questions.
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This ppt covers the topic of Abstract Algebra in M.Sc. Mathematics 1 semester topic of Algebraic closed field is Introduction , field & sub field , finite extension field , algebraic element.Complex Number I - Presentation
This document discusses approaches to teaching complex numbers. It describes an axiomatic approach, utilitarian approach, and historical approach. The historical approach builds on prior knowledge of quadratic equations and introduces complex numbers to solve problems like finding the roots of quadratic and cubic equations. The document also covers definitions of complex numbers, addition, subtraction, multiplication, and division of complex numbers. It discusses pedagogical considerations like using multiple representations and building on students' prior knowledge.
Unit 1: Topological spaces (its definition and definition of open sets)
Learning Objectives:
1. To understand the definition of topology with examples
2. To know the intersection and union of topologies
3. To understand the comparison of topologies
Maths Project Power Point Presentation
The document announces a mathematics project competition open to students in forms 3 and 4 at Maria Regina College Boys' Junior Lyceum. Teams of two students can participate by creating one of the following: a statistics project, charts, or a PowerPoint presentation on a given theme related to mathematics history or concepts. The top five entries will represent the school in the national competition and prizes will be awarded to the top teams nationally. Proposals are due by November 30th and completed projects by January 18th.
Lesson 7: Vector-valued functions
We define vector-valued functions, whose image is a curve in the plane or space. We also show how to differentiate and integrate them
Abstract algebra & its applications (1)
This document provides information about a state level workshop on abstract algebra and its applications that was held on August 28, 2015 at Sri Sarada Niketan College for Women in Amaravathipudur, India. The workshop included a presentation by Dr. S. SelvaRani, the principal of the college, on the topic of abstract algebra and its applications. Abstract algebra is the study of algebraic structures like groups, rings, and fields. It has many applications in areas like number theory, geometry, physics, and more. Representation theory is also discussed as an important branch of abstract algebra.
Cauchy riemann equations
The document discusses Cauchy Riemann equations, including its history, important features, definition, and applications. It was discovered in 1851 by Augustin Cauchy and Bernhard Riemann during work on the theory of functions. The equation is used to check the differentiability and analyticity of complex functions. It has applications in engineering fields like triangular grid generation for computational fluid dynamics simulations. It also has applications in verifying Maxwell's equations and calculating fluid intensity and divergence.
Lesson 8: Curves, Arc Length, Acceleration
The velocity of a vector function is the absolute value of its tangent vector. The speed of a vector function is the length of its velocity vector, and the arc length (distance traveled) is the integral of speed.
topology definitions
Topology is the branch of mathematics concerned with properties that remain unchanged by deformations such as stretching or shrinking. It studies concepts like open sets, closed sets, limits, and neighborhoods. The product topology on X × Y has as its basis all sets of the form U × V, where U is open in X and V is open in Y. Projections map elements of a product space X × Y onto the first or second factor. The subspace topology on a subset Y of a space X contains all intersections of Y with open sets of X. The interior of a set A is the largest open set contained in A, while the closure of A is the smallest closed set containing A.
Vector calculus
The document discusses vector calculus concepts including:
1) Coordinate systems used in vector calculus problems including rectangular, cylindrical, and spherical coordinates.
2) How to write vectors and their components in each coordinate system.
3) Relationships between vectors in different coordinate systems using transformation matrices.
4) Concepts of gradient, divergence, and curl and their definitions and representations in different coordinate systems.
5) Theorems relating integrals, including the divergence theorem and Stokes' theorem.
Laplace transforms
This document provides an overview of Laplace transforms. Key points include:
- Laplace transforms convert differential equations from the time domain to the algebraic s-domain, making them easier to solve. The process involves taking the Laplace transform of each term in the differential equation.
- Common Laplace transforms of functions are presented. Properties such as linearity, differentiation, integration, and convolution are also covered.
- Partial fraction expansion is used to break complex fractions in the s-domain into simpler forms with individual terms that can be inverted using tables of transforms.
- Solving differential equations using Laplace transforms follows a standard process of taking the Laplace transform of each term, rewriting the equation in the s-domain, solving
Types of function
The document discusses different types of functions including:
1) Surjective functions where the range equals the co-domain.
2) Injective functions where distinct inputs have distinct outputs.
3) Bijective functions which are both injective and surjective.
It also discusses even and odd functions, inverses, composites, and examples of calculating different functions.
Metric space
This document defines and provides examples of metric spaces. It begins by introducing metrics as distance functions that satisfy certain properties like non-negativity and the triangle inequality. Examples of metric spaces given include the real numbers under the usual distance, the complex numbers, and the plane under various distance metrics like the Euclidean, taxi cab, and maximum metrics. It is noted that some functions like the minimum function are not valid metrics as they fail to satisfy all the required properties.
Isomorphism
This is a handout about Homomorphism, Isomorphism, Kernel and Cayley's Theorem.
This is a group effort.
#LoveforAbstractAlgebra
application of partial differentiation
This document discusses topics in partial differentiation including:
1) The geometrical meaning of partial derivatives as the slope of the tangent line to a surface.
2) Finding the equation of the tangent plane and normal line to a surface.
3) Taylor's theorem and Maclaurin's theorem for functions with two variables, which can be used to approximate functions and calculate errors.
Second Order Derivative | Mathematics
The document discusses second order derivatives. The second derivative of a function is the derivative of the first derivative. It can tell us whether a function is concave up or down at a point. If the second derivative is zero at a point, it does not tell us the slope. The point where a function changes from concave up to down is called the point of inflection. The second derivative test can determine if a point is a local minimum or maximum.
Pythagorean triples
Pythagorean triples are sets of three whole numbers that satisfy the Pythagorean theorem. A primitive Pythagorean triple has no common factors between the three numbers. Euclid developed a formula to generate primitive Pythagorean triples using two integers where one is odd and they are relatively prime. The document discusses using Euclid's formula to find primitive Pythagorean triples and prove the formula, as well as properties of primitive Pythagorean triples.
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It is an educational blog and intended to serve as complete and self-contained work on essays, paragraph, speeches, articles, letters, stories, quotes.
https://www.thecollegestudy.net/
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It is an educational blog and intended to serve as complete and self-contained work on essays, paragraph, speeches, articles, letters, stories, quotes.
https://www.thecollegestudy.net/
28 corruption or bribery (complete english essay) the college study
Corruption takes many forms and has severe negative consequences for society. It is a serious problem in many countries, including Pakistan. Common forms of corruption include bribery, abuse of power for personal gain, and selling goods illegally on the black market. Corruption undermines trust in government, leads to inequality, and can ultimately destabilize a country if left unchecked. While eliminating corruption completely may not be possible, concerted efforts are needed from both government and citizens to curb it, through measures like increasing accountability, reforming rules and procedures, and changing cultural attitudes that have allowed corruption to spread.
21 kashmir conflict long and short essay the college study
It is an educational blog and intended to serve as complete and self-contained work on essays, paragraph, speeches, articles, letters, stories, quotes.
https://www.thecollegestudy.net/
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XP 2024 presentation: A New Look to Leadership
Presentation slides from XP2024 conference, Bolzano IT. The slides describe a new view to leadership and combines it with anthro-complexity (aka cynefin).
Pro-competitive Industrial Policy – LANE – June 2024 OECD discussion
Pro-competitive Industrial Policy – LANE – June 2024 OECD discussionOECD Directorate for Financial and Enterprise Affairs
This presentation by Nathaniel Lane, Associate Professor in Economics at Oxford University, was made during the discussion “Pro-competitive Industrial Policy” held at the 143rd meeting of the OECD Competition Committee on 12 June 2024. More papers and presentations on the topic can be found at oe.cd/pcip.
This presentation was uploaded with the author’s consent.
Artificial Intelligence, Data and Competition – LIM – June 2024 OECD discussion
Artificial Intelligence, Data and Competition – LIM – June 2024 OECD discussionOECD Directorate for Financial and Enterprise Affairs
This presentation by Yong Lim, Professor of Economic Law at Seoul National University School of Law, was made during the discussion “Artificial Intelligence, Data and Competition” held at the 143rd meeting of the OECD Competition Committee on 12 June 2024. More papers and presentations on the topic can be found at oe.cd/aicomp.
This presentation was uploaded with the author’s consent.
Artificial Intelligence, Data and Competition – OECD – June 2024 OECD discussion
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This presentation by OECD, OECD Secretariat, was made during the discussion “Artificial Intelligence, Data and Competition” held at the 143rd meeting of the OECD Competition Committee on 12 June 2024. More papers and presentations on the topic can be found at oe.cd/aicomp.
This presentation was uploaded with the author’s consent.
原版制作贝德福特大学毕业证(bedfordhire毕业证)硕士文凭原版一模一样
原版一模一样【微信:741003700 】【贝德福特大学毕业证(bedfordhire毕业证)硕士文凭】【微信:741003700 】学位证,留信认证(真实可查,永久存档)offer、雅思、外壳等材料/诚信可靠,可直接看成品样本,帮您解决无法毕业带来的各种难题!外壳,原版制作,诚信可靠,可直接看成品样本。行业标杆!精益求精,诚心合作,真诚制作!多年品质 ,按需精细制作,24小时接单,全套进口原装设备。十五年致力于帮助留学生解决难题,包您满意。
本公司拥有海外各大学样板无数,能完美还原海外各大学 Bachelor Diploma degree, Master Degree Diploma
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留信网认证的作用:
1:该专业认证可证明留学生真实身份
2:同时对留学生所学专业登记给予评定
3:国家专业人才认证中心颁发入库证书
4:这个认证书并且可以归档倒地方
5:凡事获得留信网入网的信息将会逐步更新到个人身份内,将在公安局网内查询个人身份证信息后,同步读取人才网入库信息
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The Intersection between Competition and Data Privacy – OECD – June 2024 OECD...
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This presentation by OECD, OECD Secretariat, was made during the discussion “The Intersection between Competition and Data Privacy” held at the 143rd meeting of the OECD Competition Committee on 13 June 2024. More papers and presentations on the topic can be found at oe.cd/ibcdp.
This presentation was uploaded with the author’s consent.
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This presentation was uploaded with the author’s consent.
Artificial Intelligence, Data and Competition – ČORBA – June 2024 OECD discus...
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This presentation by Juraj Čorba, Chair of OECD Working Party on Artificial Intelligence Governance (AIGO), was made during the discussion “Artificial Intelligence, Data and Competition” held at the 143rd meeting of the OECD Competition Committee on 12 June 2024. More papers and presentations on the topic can be found at oe.cd/aicomp.
This presentation was uploaded with the author’s consent.
ServiceNow CIS-ITSM Exam Dumps & Questions [2024]
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Carrer goals.pptx and their importance in real life
Career goals serve as a roadmap for individuals, guiding them toward achieving long-term professional aspirations and personal fulfillment. Establishing clear career goals enables professionals to focus their efforts on developing specific skills, gaining relevant experience, and making strategic decisions that align with their desired career trajectory. By setting both short-term and long-term objectives, individuals can systematically track their progress, make necessary adjustments, and stay motivated. Short-term goals often include acquiring new qualifications, mastering particular competencies, or securing a specific role, while long-term goals might encompass reaching executive positions, becoming industry experts, or launching entrepreneurial ventures.
Moreover, having well-defined career goals fosters a sense of purpose and direction, enhancing job satisfaction and overall productivity. It encourages continuous learning and adaptation, as professionals remain attuned to industry trends and evolving job market demands. Career goals also facilitate better time management and resource allocation, as individuals prioritize tasks and opportunities that advance their professional growth. In addition, articulating career goals can aid in networking and mentorship, as it allows individuals to communicate their aspirations clearly to potential mentors, colleagues, and employers, thereby opening doors to valuable guidance and support. Ultimately, career goals are integral to personal and professional development, driving individuals toward sustained success and fulfillment in their chosen fields.
The Intersection between Competition and Data Privacy – CAPEL – June 2024 OEC...
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This presentation by Tim Capel, Director of the UK Information Commissioner’s Office Legal Service, was made during the discussion “The Intersection between Competition and Data Privacy” held at the 143rd meeting of the OECD Competition Committee on 13 June 2024. More papers and presentations on the topic can be found at oe.cd/ibcdp.
This presentation was uploaded with the author’s consent.
The Intersection between Competition and Data Privacy – KEMP – June 2024 OECD...
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This presentation by Katharine Kemp, Associate Professor at the Faculty of Law & Justice at UNSW Sydney, was made during the discussion “The Intersection between Competition and Data Privacy” held at the 143rd meeting of the OECD Competition Committee on 13 June 2024. More papers and presentations on the topic can be found at oe.cd/ibcdp.
This presentation was uploaded with the author’s consent.
BRIC_2024_2024-06-06-11:30-haunschild_archival_version.pdf
These are the slides of my presentation at BRIC 2024 about global science overlay maps using OpenAlex.
The Intersection between Competition and Data Privacy – COLANGELO – June 2024...
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This presentation by Professor Giuseppe Colangelo, Jean Monnet Professor of European Innovation Policy, was made during the discussion “The Intersection between Competition and Data Privacy” held at the 143rd meeting of the OECD Competition Committee on 13 June 2024. More papers and presentations on the topic can be found at oe.cd/ibcdp.
This presentation was uploaded with the author’s consent.
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Proposal: The Ark Project and The BEEP Inc
1.) Introduction
Our Movement is not new; it is the same as it was for Freedom, Justice, and Equality since we were labeled as slaves. However, this movement at its core must entail economics.
2.) Historical Context
This is the same movement because none of the previous movements, such as boycotts, were ever completed. For some, maybe, but for the most part, it’s just a place to keep your stable until you’re ready to assimilate them into your system. The rest of the crabs are left in the world’s worst parts, begging for scraps.
3.) Economic Empowerment
Our Movement aims to show that it is indeed possible for the less fortunate to establish their economic system. Everyone else – Caucasian, Asian, Mexican, Israeli, Jews, etc. – has their systems, and they all set up and usurp money from the less fortunate. So, the less fortunate buy from every one of them, yet none of them buy from the less fortunate. Moreover, the less fortunate really don’t have anything to sell.
4.) Collaboration with Organizations
Our Movement will demonstrate how organizations such as the National Association for the Advancement of Colored People, National Urban League, Black Lives Matter, and others can assist in creating a much more indestructible Black Wall Street.
5.) Vision for the Future
Our Movement will not settle for less than those who came before us and stopped before the rights were equal. The economy, jobs, healthcare, education, housing, incarceration – everything is unfair, and what isn’t is rigged for the less fortunate to fail, as evidenced in society.
6.) Call to Action
Our movement has started and implemented everything needed for the advancement of the economic system. There are positions for only those who understand the importance of this movement, as failure to address it will continue the degradation of the people deemed less fortunate.
No, this isn’t Noah’s Ark, nor am I a Prophet. I’m just a man who wrote a couple of books, created a magnificent website: http://www.thearkproject.llc, and who truly hopes to try and initiate a truly sustainable economic system for deprived people. We may not all have the same beliefs, but if our methods are tried, tested, and proven, we can come together and help others. My website: http://www.thearkproject.llc is very informative and considerably controversial. Please check it out, and if you are afraid, leave immediately; it’s no place for cowards. The last Prophet said: “Whoever among you sees an evil action, then let him change it with his hand [by taking action]; if he cannot, then with his tongue [by speaking out]; and if he cannot, then, with his heart – and that is the weakest of faith.” [Sahih Muslim] If we all, or even some of us, did this, there would be significant change. We are able to witness it on small and grand scales, for example, from climate control to business partnerships. I encourage, invite, and challenge you all to support me by visiting my website.
Competition and Regulation in Professions and Occupations – ROBSON – June 202...
Competition and Regulation in Professions and Occupations – ROBSON – June 202...OECD Directorate for Financial and Enterprise Affairs
This presentation by Professor Alex Robson, Deputy Chair of Australia’s Productivity Commission, was made during the discussion “Competition and Regulation in Professions and Occupations” held at the 77th meeting of the OECD Working Party No. 2 on Competition and Regulation on 10 June 2024. More papers and presentations on the topic can be found at oe.cd/crps.
This presentation was uploaded with the author’s consent.怎么办理(lincoln学位证书)英国林肯大学毕业证文凭学位证书原版一模一样
原版定制【微信:bwp0011】《(lincoln学位证书)英国林肯大学毕业证文凭学位证书》【微信:bwp0011】成绩单 、雅思、外壳、留信学历认证永久存档查询,采用学校原版纸张、特殊工艺完全按照原版一比一制作(包括:隐形水印,阴影底纹,钢印LOGO烫金烫银,LOGO烫金烫银复合重叠,文字图案浮雕,激光镭射,紫外荧光,温感,复印防伪)行业标杆!精益求精,诚心合作,真诚制作!多年品质 ,按需精细制作,24小时接单,全套进口原装设备,十五年致力于帮助留学生解决难题,业务范围有加拿大、英国、澳洲、韩国、美国、新加坡,新西兰等学历材料,包您满意。
【业务选择办理准则】
一、工作未确定,回国需先给父母、亲戚朋友看下文凭的情况,办理一份就读学校的毕业证【微信bwp0011】文凭即可
二、回国进私企、外企、自己做生意的情况,这些单位是不查询毕业证真伪的,而且国内没有渠道去查询国外文凭的真假,也不需要提供真实教育部认证。鉴于此,办理一份毕业证【微信bwp0011】即可
三、进国企,银行,事业单位,考公务员等等,这些单位是必需要提供真实教育部认证的,办理教育部认证所需资料众多且烦琐,所有材料您都必须提供原件,我们凭借丰富的经验,快捷的绿色通道帮您快速整合材料,让您少走弯路。
留信网认证的作用:
1:该专业认证可证明留学生真实身份
2:同时对留学生所学专业登记给予评定
3:国家专业人才认证中心颁发入库证书
4:这个认证书并且可以归档倒地方
5:凡事获得留信网入网的信息将会逐步更新到个人身份内,将在公安局网内查询个人身份证信息后,同步读取人才网入库信息
6:个人职称评审加20分
7:个人信誉贷款加10分
8:在国家人才网主办的国家网络招聘大会中纳入资料,供国家高端企业选择人才
【关于价格问题(保证一手价格)】
我们所定的价格是非常合理的,而且我们现在做得单子大多数都是代理和回头客户介绍的所以一般现在有新的单子 我给客户的都是第一手的代理价格,因为我想坦诚对待大家 不想跟大家在价格方面浪费时间
对于老客户或者被老客户介绍过来的朋友,我们都会适当给一些优惠。
Why Psychological Safety Matters for Software Teams - ACE 2024 - Ben Linders.pdf
Psychological safety in teams is important; team members must feel safe and able to communicate and collaborate effectively to deliver value. It’s also necessary to build long-lasting teams since things will happen and relationships will be strained.
But, how safe is a team? How can we determine if there are any factors that make the team unsafe or have an impact on the team’s culture?
In this mini-workshop, we’ll play games for psychological safety and team culture utilizing a deck of coaching cards, The Psychological Safety Cards. We will learn how to use gamification to gain a better understanding of what’s going on in teams. Individuals share what they have learned from working in teams, what has impacted the team’s safety and culture, and what has led to positive change.
Different game formats will be played in groups in parallel. Examples are an ice-breaker to get people talking about psychological safety, a constellation where people take positions about aspects of psychological safety in their team or organization, and collaborative card games where people work together to create an environment that fosters psychological safety.
IEEE CIS Webinar Sustainable futures.pdf
The importance of sustainable and efficient computational practices in artificial intelligence (AI) and deep learning has become increasingly critical. This webinar focuses on the intersection of sustainability and AI, highlighting the significance of energy-efficient deep learning, innovative randomization techniques in neural networks, the potential of reservoir computing, and the cutting-edge realm of neuromorphic computing. This webinar aims to connect theoretical knowledge with practical applications and provide insights into how these innovative approaches can lead to more robust, efficient, and environmentally conscious AI systems.
Webinar Speaker: Prof. Claudio Gallicchio, Assistant Professor, University of Pisa
Claudio Gallicchio is an Assistant Professor at the Department of Computer Science of the University of Pisa, Italy. His research involves merging concepts from Deep Learning, Dynamical Systems, and Randomized Neural Systems, and he has co-authored over 100 scientific publications on the subject. He is the founder of the IEEE CIS Task Force on Reservoir Computing, and the co-founder and chair of the IEEE Task Force on Randomization-based Neural Networks and Learning Systems. He is an associate editor of IEEE Transactions on Neural Networks and Learning Systems (TNNLS).
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