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Course overview Learn multivariable calculus with this Calculus 3 (Multivariable) Masterclass course. In this course, you will understand the complexities of multivariable calculus and solve various problems. The Calculus 3 (Multivariable) Masterclass course will go over the fundamental ideas about multivariable functions. It will introduce you to analytical geometry and explain where it's used. You will identify the distance formula to calculate distance between two points and learn how to calculate dot and cross products. In addition, you will learn about conic sections, topology, partial derivatives and vector-valued functions and use them to solve problems. Many practice problems with solutions are included in this course to improve your problem-solving abilities. Learning outcomes Learn about limit, continuity and differentiability Know how to graph a parabola using conic sections Understand what is a paraboloid in calculus Identify the differentiation rules and use them to solve problems Learn about different coordinate systems Be able to compute a composite function's derivative using chain rule Learn how to use Taylor's formula Who Is This Course For? Anyone interested in learning Calculus most efficiently can take this Calculus 3 (Multivariable) Masterclass course. The skills gained from this training will provide excellent opportunities for career advancement. Entry Requirement This course is available to all learners of all academic backgrounds. Learners should be aged 16 or over. Good understanding of English language, numeracy and ICT skills are required to take this course. Certification After you have successfully completed the course, you will obtain an Accredited Certificate of Achievement. And, you will also receive a Course Completion Certificate following the course completion without sitting for the test. Certificates can be obtained either in hardcopy for £39 or in PDF format at the cost of £24. PDF certificate's turnaround time is 24 hours, and for the hardcopy certificate, it is 3-9 working days. Why Choose Us? Affordable, engaging & high-quality e-learning study materials; Tutorial videos and materials from the industry-leading experts; Study in a user-friendly, advanced online learning platform; Efficient exam systems for the assessment and instant result; United Kingdom & internationally recognized accredited qualification; Access to course content on mobile, tablet and desktop from anywhere, anytime; Substantial career advancement opportunities; 24/7 student support via email. Career Path The Calculus 3 (Multivariable) Masterclass course provides essential skills that will make you more effective in your role. It would be beneficial for any related profession in the industry, such as: Math's Teacher

Embark on an invigorating intellectual journey with this A-Level Maths course, meticulously crafted to imbibe the nuances of advanced mathematics. Delve into topics such as forces, probability, algebra, and vectors, honing your expertise while bolstering your critical thinking and analytical prowess. In the realm of UK education, A-levels stand as a testament to significant educational accomplishment. Our A-Level Maths course epitomises this, enhancing your appeal to both universities and employers while paving the way to a world of exciting opportunities. Adhering to the fresh AQA A-Level Maths syllabus, this online home study course is constructed to dovetail with your convenience, enabling you to learn at your own pace. Our comprehensive support system includes unlimited tutor assistance, a systematic induction, and well-structured assignments, preparing you efficiently for the exams. We ensure your access to our partnered exam centres for your final A-Level examinations. With our course, you'll have access to: Cutting-edge course content, shaped according to the latest specification. A Fast track option (for exams in 2022). A network of partnership exam centres. Unlimited tutor support and an exam pass guarantee. Awarding body: AQA Course code: X901 Qualification code: 7357 AQA qualifications enjoy international recognition, being taught in 30 countries and prized by employers and universities alike. These qualifications accommodate a wide range of abilities, encompassing GCSEs, IGCSEs, and A-levels. ⏱ Estimated Study Time Allocate between 300 and 360 hours for study, along with additional time for assignments. 👩‍🏫 Learning Methodology Our course is delivered via an immersive online learning platform, complete with diverse media resources like videos. However, if you prefer a more traditional approach, you can print the learning materials. 📆 Course Duration Enrol and benefit from our unlimited tutor support for up to 24 months. Upon enrolment, you will receive access to MyOxbridge, where all your learning materials are housed. 📋 Evaluation Examinations start from Summer 2022.  You will be evaluated on three written exams: Paper 1: 2 hours, 33.3% of A-Level, 100 marks. Paper 2: 2 hours, 33.3% of A-Level, 100 marks. Paper 3: 2 hours, 33.3% of A-Level, 100 marks. The exams will consist of a range of question types, from single-mark questions to multi-step problems. Our students are provided with a guaranteed exam space and an exam pass guarantee. Assignments The course includes several assignments. Though not contributing to your final grade, they allow you to receive feedback from your tutor, helping you track your progress. 👩‍🎓 Course Outcomes Upon successful course completion, you will receive an AQA-issued A-Level in Maths. This certificate mirrors those awarded to students at any other educational institution.  ℹ️ Further Details Difficulty - Level 3 Entry requirements - A GCSE or equivalent level in Mathematics is strongly advised. UCAS Points - 56 Course Content Core Content Mathematical argument, language, and proof Mathematical problem solving Mathematical modelling Proof Algebra and functions Coordinate geometry in the (x,y) plane Sequences and series Trigonometry Exponentials and logarithms Differentiation Integration Numerical methods Vectors Statistical sampling Data presentation and interpretation Probability Statistical distributions Statistical hypothesis testing Quantities and units in mechanics Kinematics Forces and Newton’s laws Moments

Dive into the enthralling world of numbers and equations with 'High School Math (Pure Mathematics 1),' a course designed to unravel the mysteries of mathematics. Your journey begins with an Introduction that lays the foundation, not just in terms of concepts but igniting a passion for the beauty of math. As you progress, Functions become more than just equations; they turn into a language that describes the universe. Imagine the elegance of Quadratic Equations unfolding before your eyes, revealing patterns and solutions that were once hidden. Embark on an adventure through Co-ordinate Geometry, where every point and line tells a story of space and dimensions. Sequence and Series will no longer be just about numbers; they will be about the rhythm and flow of mathematical logic. The course takes a deeper dive with the Binomial Theorem, Differentiation, Tangents and Normals, each module building on the last, turning complexity into simplicity. Stationary Points & Curve Sketching, and the Second Derivative Test open new vistas in understanding the nature of graphs. As you master Simultaneous Linear Equations, you're not just solving problems; you're unlocking a new perspective on mathematical relationships. The Essential Revision at the end is your bridge to excellence, consolidating your knowledge and skills. Learning Outcomes Develop a foundational understanding of key mathematical concepts and functions. Master the intricacies of quadratic equations and co-ordinate geometry. Explore and apply the principles of sequences, series, and the binomial theorem. Gain proficiency in differentiation and its practical applications in tangents and normals. Understand and implement techniques in curve sketching, stationary points, and optimisation. Why choose this High School Math (Pure Mathematics 1) course? Unlimited access to the course for a lifetime. Opportunity to earn a certificate accredited by the CPD Quality Standards and CIQ after completing this course. Structured lesson planning in line with industry standards. Immerse yourself in innovative and captivating course materials and activities. Assessments designed to evaluate advanced cognitive abilities and skill proficiency. Flexibility to complete the Course at your own pace, on your own schedule. Receive full tutor support throughout the week, from Monday to Friday, to enhance your learning experience. Unlock career resources for CV improvement, interview readiness, and job success. Who is this High School Math (Pure Mathematics 1) course for? High school students seeking to excel in mathematics. Individuals preparing for college-level math courses. Math enthusiasts looking to deepen their understanding of pure mathematics. Students requiring a comprehensive revision of key mathematical concepts. Anyone aspiring to pursue a career involving advanced mathematics. Career path Mathematician: £30,000 - £60,000 Data Analyst: £25,000 - £50,000 Actuarial Analyst: £28,000 - £55,000 Research Scientist (Mathematics): £32,000 - £60,000 Engineering Consultant: £27,000 - £55,000 Academic Tutor (Mathematics): £24,000 - £40,000 Prerequisites This High School Math (Pure Mathematics 1) does not require you to have any prior qualifications or experience. You can just enrol and start learning.This High School Math (Pure Mathematics 1) was made by professionals and it is compatible with all PC's, Mac's, tablets and smartphones. You will be able to access the course from anywhere at any time as long as you have a good enough internet connection. Certification After studying the course materials, there will be a written assignment test which you can take at the end of the course. After successfully passing the test you will be able to claim the pdf certificate for £4.99 Original Hard Copy certificates need to be ordered at an additional cost of £8. Course Curriculum Introduction Introduction 00:03:00 Functions What is Function? 00:07:00 Vertical Line Test 00:04:00 Value of a Function Graphically 00:08:00 Domain Range of a function Algebraically 00:13:00 Domain Range of a function Graphically 00:06:00 Even & Odd Functions 00:07:00 One to one Function 00:05:00 Composite Functions 00:09:00 How to draw Rational Functions- 1 00:04:00 How to draw Rational Functions- 2 00:10:00 Inverse of a function Algebraically 00:05:00 Inverse of a function Graphically 00:09:00 Practice Problems 00:15:00 Practice Problems 00:11:00 Resources Downloads 00:40:00 Quadratic Equations Introduction to Quadratic Equations 00:04:00 Solving Quadratic Equations by Factorization method 00:10:00 Writing in completed square form 00:08:00 Solving by completed square method 00:08:00 Sketching of Quadratic Graphs 00:11:00 Quadratic graphs using Transformations 00:06:00 Quadratic inequalities 00:11:00 Deriving Quadratic formula 00:05:00 Solving problems using Quadratic Formula 00:06:00 Equations reducible to Quadratic 00:07:00 Nature of Roots of Quadratic Equations 00:04:00 Nature of roots continues 00:12:00 Quadratic Equations (Resources) 00:50:00 Co-ordinate Geometry Distance formula 00:15:00 Mid point formula 00:05:00 Gradient of a line 00:10:00 Graphing using gradient and y intercept 00:02:00 Some standard lines 00:04:00 Slope intercept form y = m x +c 00:05:00 Point slope form and two point form 00:10:00 Intersection of line and parabola 00:09:00 Practice Problems from past papers (part 3) 00:12:00 Sequence and series Sequence and series ( video) 00:08:00 Arithmetic Sequence 00:10:00 General term of an A.P. 00:07:00 Finding given term is which term? 00:05:00 Writing sequence when two terms are known 00:08:00 Condition for three terms to be in A.P. 00:05:00 Sum to n terms of A.P. 00:06:00 Practice Problems 1 (A.P.) 00:08:00 Practice problems 3 (A.P.) 00:07:00 Practice problems 4 (A.P.) 00:10:00 Geometric Progressions 00:11:00 Sum to n terms in G.P. 00:14:00 Sum to infinite Terms in G.P. 00:13:00 Practice Problems 1 (GP) 00:13:00 Practice Problems 2 (GP) 00:06:00 Practice Problems based on AP and GP both 00:15:00 Sequence and series Text 1 00:40:00 Sequence and series Text 2 00:55:00 Binomial Theorem What is Factorial? 00:06:00 n-choose -r problems 00:06:00 Properties of n - choose -r 00:05:00 Expanding using Binomial Theorem 00:11:00 Finding the indicated term in the Binomial expansion 00:10:00 Finding the indicated term from end 00:09:00 Finding the coefficient for given exponent (index) of the variable 00:08:00 Finding the term independent of variable 00:05:00 Expanding in increasing and decreasing powers of x 00:09:00 Practice problems 1 00:12:00 Practice Problems 2 00:09:00 Practice problems 3 00:10:00 Past papers problems 1 00:15:00 Past Paper problems 2 00:13:00 Past Paper problems 3 00:09:00 Resources in this section 00:50:00 Differentiation What is Derivative? 00:07:00 Derivation of formula for Derivative 00:06:00 Differentiation by definition or First Principle 00:06:00 Power Rule 00:20:00 Practice Problems on Power Rule 1 00:07:00 Practice Problems on Power Rule 2 00:07:00 Practice Problems on Power Rule 3 00:05:00 Practice Problems on Power Rule 4 00:11:00 Practice Problems on Power Rule 5 00:07:00 Tangents and Normals Tangents and Normals- Basics 00:12:00 Practice- Tangents and Normals Part 1 00:16:00 Practice- Tangents and Normals Part 2 00:13:00 Practice- Tangents and Normals Part 3 00:11:00 Practice- Tangents and Normals Part 4 00:14:00 Stationary Points & Curve Sketching Stationary Points - Basics 00:13:00 Practice- Increasing Decreasing & Maxima Minima part 1 00:11:00 Practice- Increasing Decreasing & Maxima Minima part 2 00:12:00 Practice- Increasing Decreasing & Maxima Minima part 3 00:10:00 Second Derivative Test (Maximum & Minimum Points) Concavity-Basics 00:02:00 Concavity & Second Derivative 00:08:00 Second Derivative Test 00:09:00 Practice Problems on second derivative 00:04:00 Practice Problem of Maxima Minima using second derivative test Part 1 00:17:00 Practice Problem of Maxima Minima using second derivative test Part 2 00:10:00 Practice Problem of Maxima Minima using second derivative test Part 3 00:07:00 Practice Problem of Maxima Minima using second derivative test Part 4 00:07:00 Applications of Maxima and Minima Part 1 00:09:00 Applications of Maxima and Minima Part 2 00:07:00 Applications of Maxima and Minima Part 3 00:10:00 Applications of Maxima and Minima Part 4 00:09:00 Applications of Maxima and Minima Part 5 00:10:00 Applications of Maxima and Minima Part 6 00:08:00 Past Paper Problems on applications of maxima and minima Part 1 00:09:00 Past Paper Problems on applications of maxima and minima Part 2 00:09:00 Past Paper Problems on applications of maxima and minima Part 3 00:08:00 Past Paper Problems on applications of maxima and minima Part 4 00:07:00 Chain Rule 00:12:00 Rate of change part 1 00:05:00 Rate of change part 2 00:10:00 Rate of change part 3 00:07:00 Past Paper Problems using chain rule -1 00:06:00 Past Paper Problems using chain rule - 2 00:07:00 Past Paper Problems using chain rule 3 00:07:00 Past Paper Problems using chain rule -4 00:04:00 Simultaneous Linear equations Graphical Method of solving pair of linear equations 00:10:00 Video lecture on Graphical method 00:05:00 Method of elimination by substitution 00:10:00 Video lecture on substitution method 00:06:00 Method of elimination by equating the coefficients 00:10:00 Video lecture on equating coefficients method 00:09:00 Practice Problems on Linear equation 00:20:00 Essential Revision How to take up this course? 00:10:00 Background of Algebra 00:10:00 Language of Alg ebra 00:10:00 Finding Values of algebraic expressions 00:14:00 Fractional Indices 00:10:00 Higher Indices 00:07:00 Rules of Brackets 00:04:00 Simplification by removing brackets (BODMAS) 00:11:00 Simplifications of Algebraic Fractions 00:07:00 Solving complex Linear Equations in one variable 00:10:00 Factorization by taking out common factor 00:10:00 Factorization by grouping the terms 00:09:00 Factorize using identity a ² - b ² 00:07:00 Factorization by middle term split 00:12:00

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The aim of a Strategic Approach to International Business course is to provide students with an understanding of the strategic management principles and practices that apply to international business operations. The course typically covers topics such as global strategy, cross-cultural management, international market analysis, foreign market entry strategies, global organizational design, and global corporate governance.After the successful completion of the course, you will be able to learn about the following, Standardisation Vs Differentiation. Types of International Strategy. Global Portfolio Management. Modes of global portfolio management. Modes of Entry. The aim of a Strategic Approach to International Business course is to provide students with an understanding of the strategic management principles and practices that apply to international business operations. The course typically covers topics such as global strategy, cross-cultural management, international market analysis, foreign market entry strategies, global organizational design, and global corporate governance. This course focuses on developing a strategic perspective on conducting business in a global context. The course covers a range of topics, including global strategy development, strategic alliance formation, risk management, and cultural intelligence. Students in this course will learn how to analyze global market trends and develop effective strategies for managing cross-border business operations. They will also gain a deeper understanding of the cultural and institutional differences that shape international business environments and learn how to apply this knowledge to make strategic decisions in a global context. By the end of the course, students will have developed a strategic mindset that will enable them to excel in international business. VIDEO - Course Structure and Assessment Guidelines Watch this video to gain further insight. Navigating the MSBM Study Portal Watch this video to gain further insight. Interacting with Lectures/Learning Components Watch this video to gain further insight. Strategic Approach To International Business Self-paced pre-recorded learning content on this topic. Strategic Approach to International Business Put your knowledge to the test with this quiz. Read each question carefully and choose the response that you feel is correct. All MSBM courses are accredited by the relevant partners and awarding bodies. Please refer to MSBM accreditation in about us for more details. There are no strict entry requirements for this course. Work experience will be added advantage to understanding the content of the course. The certificate is designed to enhance the learner's knowledge in the field. This certificate is for everyone eager to know more and get updated on current ideas in their respective field. We recommend this certificate for the following audience. Global Business Manager International Business Development Manager International Marketing Manager International Sales Manager Global Operations Manager Global Strategy Manager Director of Global Business Development Director of International Operations Chief Global Strategy Officer CEO of a multinational corporation Average Completion Time 2 Weeks Accreditation 3 CPD Hours Level Advanced Start Time Anytime 100% Online Study online with ease. Unlimited Access 24/7 unlimited access with pre-recorded lectures. Low Fees Our fees are low and easy to pay online.

Calculus Basics is yet another 'Teacher's Choice' course from Teachers Training for a complete understanding of the fundamental topics. You are also entitled to exclusive tutor support and a professional CPD-accredited certificate in addition to the special discounted price for a limited time. Just like all our courses, this Calculus Basics and its curriculum have also been designed by expert teachers so that teachers of tomorrow can learn from the best and equip themselves with all the necessary skills. Consisting of several modules, the course teaches you everything you need to succeed in this profession. The course can be studied part-time. You can become accredited within 16 hours studying at your own pace. Your qualification will be recognised and can be checked for validity on our dedicated website. Why Choose Teachers Training Some of our website features are: This is a dedicated website for teaching 24/7 tutor support Interactive Content Affordable price Courses accredited by the UK's top awarding bodies 100% online Flexible deadline Entry Requirements No formal entry requirements. You need to have: Passion for learning A good understanding of the English language Be motivated and hard-working Over the age of 16. Certification CPD Certification from The Teachers Training Successfully completing the MCQ exam of this course qualifies you for a CPD-accredited certificate from The Teachers Training. You will be eligible for both PDF copy and hard copy of the certificate to showcase your achievement however you wish. You can get your digital certificate (PDF) for £4.99 only Hard copy certificates are also available, and you can get one for only £10.99 You can get both PDF and Hard copy certificates for just £12.99! The certificate will add significant weight to your CV and will give you a competitive advantage when applying for jobs. Unit 01: Supplements 1.1 Number Sets 00:10:00 1.2 Graphing Tools 00:06:00 Unit 02: Functions 2.1 Introduction 00:01:00 2.2 Functions 00:15:00 2.3 Evaluating a Function 00:13:00 2.4 Domain 00:16:00 2.5 Range 00:05:00 2.6 One to One Function 00:09:00 2.7 Inverse Functions 00:10:00 2.8 Exponential Functions 00:05:00 2.9 The Natural Exponential Function 00:06:00 2.10 Logarithms 00:13:00 2.11 Natural Logarithms 00:07:00 2.12 Logarithm Laws 00:06:00 2.13 Trigonometric Ratios 00:15:00 2.14 Evaluating Trig Functions and Points 00:18:00 2.15 Inverse Trigonometric Functions 00:12:00 Unit 03 Limits 3.1 Introduction 00:01:00 3.2 What is a Limit? 00:17:00 3.3 Examples 00:15:00 3.4 One-Sided Limits 00:12:00 3.5 The Limit Laws 00:08:00 3.6 Examples 00:15:00 3.7 More Examples 00:15:00 3.8 The Squeeze (Sandwich) Theorem 00:09:00 3.9 Examples 00:10:00 3.10 Precise Definition of Limits 00:08:00 3.11 Examples 00:15:00 3.12 limits at Infinity 00:21:00 3.13 Examples 00:15:00 3.14 Asymptotes and Limits at Infinity 00:10:00 3.15 Infinite Limits 00:12:00 Unit 04: Continuity 4.1 Introduction 00:01:00 4.2 Continuity 00:12:00 4.3 Types of Discontinuity 00:12:00 4.4 Examples 00:17:00 4.5 Properties of Continuous Functions 00:11:00 4.6 Intermediate Value Theorem for Continuous Functions 00:06:00 Unit 05: Derivatives 5.1 Introduction 00:01:00 5.2 Average Rate of Change 00:09:00 5.3 Instantaneous Rate of Change 00:12:00 5.4 Derivative Definition 00:14:00 5.5 Examples 00:10:00 5.6 Non-Differentiability 00:06:00 5.7 Constant and Power Rule 00:09:00 5.8 Constant Multiple Rule 00:07:00 5.9 Sum and Difference Rule 00:07:00 5.10 Product Rule 00:14:00 5.11 Quotient Rule 00:08:00 5.12 Chain Rule 00:14:00 5.13 Examples 00:09:00 5.14 Derivative Symbols 00:04:00 5.15 Graph of Derivatives 00:10:00 5.16 Higher Order Derivatives 00:08:00 5.17 Equation of the Tangent Line 00:07:00 5.18 Derivative of Trig Functions 00:07:00 5.19 Examples 00:19:00 5.20 Derivative of Inverse Trig Functions 00:08:00 5.21 Examples 00:12:00 5.22 Implicit Differentiation 00:17:00 5.23 Derivative of Inverse Functions 00:13:00 5.24 Derivative of the Natural Exponential Function 00:11:00 5.25 Derivative of the Natural Logarithm Function 00:07:00 5.26 Derivative of Exponential Functions 00:06:00 5.27 Derivative of Logarithmic Functions 00:06:00 5.28 Logarithmic Differentiation 00:15:00 Unit 06: Application of Derivatives 6.1 Introduction 00:01:00 6.2 Related Rates 00:08:00 6.3 Examples 00:13:00 6.4 More Example 00:09:00 6.5 More Example 00:10:00 6.6 Optimisation 00:16:00 6.7 Example 00:11:00 6.8 More Example 00:07:00 6.9 Extreme Values of Functions 00:12:00 6.10 Critical Points 00:08:00 6.11 Examples (First Derivative Test) 00:16:00 6.12 More Examples 00:18:00 6.13 Concavity 00:15:00 6.14 Examples 00:13:00 6.15 Second Derivative Test 00:08:00 6.16 Graphing Functions 00:08:00 6.17 Examples 00:21:00 6.18 L' Hôpital's Rule 00:12:00 6.19 Other Indeterminate Forms 00:15:00 6.20 Rolle's Theorem 00:09:00 6.21 The Mean Value Theorem 00:19:00 6.22Application of the Mean Value Theorem 00:04:00 Resources Resource - Fundamentals of Calculus 00:00:00

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