• Professional Development
  • Medicine & Nursing
  • Arts & Crafts
  • Health & Wellbeing
  • Personal Development

13402 Educators providing Courses delivered Online

Education House Leeds

education house leeds

Leeds

WELCOME TO EDUCATION HOUSE LEEDS Education House Leeds is an independent training provider based in the United Kingdom that serves learners from both Britain and beyond. We were established in Leeds, West Yorkshire in 2014 with the singular mission to provide individuals with the critical skills that they needed to advance themselves in their career, or to affirm their status here within the United Kingdom. In short, we train you for success. When you work with Education House Leeds, you get a unique, life-changing experience that’s also great value for money. We continuously strive to both widen the scope of our qualification offerings, and deliver on real value that helps our learners achieve their aspirations and raise themselves up to where they want to be. How do we deliver on our mission? We differentiate ourselves in three key ways, namely: We provide a “hands-on” experiential learning approach. We strive for greater recognition from the UK’s top accreditation groups. We offer career-boosting courses in a number of areas, including preparation for some of the UK’s most fundamental and important tests. Hands-On Learning Education House Leeds has built its reputation by using a system of active, inspiring and experiential learning methods to help people gain the essential qualifications they need in a variety of fields. We challenge and inspire learners from all over the world to raise themselves up and reach new heights, which they can easily do thanks to our growing list of accreditations and courses we offer. Growing Recognition Education House Leeds is increasingly recognised as a centre of learning excellence. In recent years, we have gained valuable accreditations from some of the country’s most dynamic and rigorous awarding organisations:

T I G A - The International Gaming Agency

t i g a - the international gaming agency

Nuneaton

We specialise in assistance to experienced croupiers from outside the UK looking for employment We can help overseas applicants obtain a British Gaming Licence (PFL/PML), enabling them to work in the UK. We can provide individual tailored training to both people who wish to improve their dealing skills or for complete beginners. We can provide both class environments and one to one tuition to people who wish to learn to deal casino games, including Texas Hold'em Poker, all to recognised casino industry standards. We can provide help and advice relating to all forms of licensing in the UK for both individuals and operators. More info LICENSE REQUIREMENTS PFL application form from the Gambling Commission of the United Kingdom Supplied by TIGA - available in information and application pack PFL photo ID form from the Gambling Commission of the United KingdomsSupplied by TIGA - available in information and application pack – this will also require 2 recent passport style photographs Personal ID – Current Passport or National ID card These MUST be original documents and MUST be valid and NOT out of date. DBS (Disclosure and Barring Service)CRB check – form from the Criminal Records Bureau of the United Kingdom For applicants outside of the UK it MAY be possible not to require this form, however, where possible we advise completion of this document in order to facilitate the best possible chance of acquiring a license. Police record from the country of residence(s) over the last 5 years This document MUST be translated into English and have an “official” stamp of validation and authentication from the relevant authorities required. Where applicants have lived in more than one country over a five year period it is essential to have this documentation from all countries/jurisdictions that have been lived in over this period.

Bright Pi Education Consultancy

bright pi education consultancy

Solihull

At Bright Pi we are passionate about supporting all those involved with the teaching and learning of mathematics; raising standards and helping all to achieve their best in the early years and primary phases. Based in the Midlands, we form a highly regarded team with wide ranging experience and up to date skills providing support to schools across the UK. The team has taught across the early years and primary age range and all have experience in local authority school improvement working with teachers, leaders and other stakeholders. Having worked as regional co-ordinators for the National Centre for Excellence in the Teaching of Mathematics (NCETM), Bright Pi maintains a close working relationship with the NCETM delivering their ever-evolving national ‘Professional Development Lead’ programme. We are proud to work alongside other partner organisations including the National Maths Hub Network. We play a key role on the strategic board for our local hub and lead on the Mastery Readiness programme for the Origin Maths Hub. This supports those schools starting their journey in Teaching for Mastery, as well as those developing their practice. In addition, Bright Pi has also provided operational external key stage 1 moderation for the Standards and Testing Agency (STA), monitoring practice in various local authorities across the country. We are accredited by NCETM as Professional Development Leads and support individual schools as well as networks with bespoke packages of support, tailored to specific need and context. Bright Pi also offers CPD sessions for all those involved in mathematics education, supporting improvement in both subject and pedagogical knowledge. We are keen to raise the profile of mathematics as a subject and enjoy working with parents, governors and the wider community.

Black's Academy

black's academy

London

AQA A level Mathematics 7357 AS level Mathematics 7356 GCSE higher level Mathematics 8300H GCSE foundation level Mathematics 8300F Edexcel A level Mathematics 9MA0 AS level Mathematics 8MA0 GCSE higher level Mathematics 1MA1H GCSE foundation level Mathematics 1MA1F OCR A level Mathematics H240 AS level Mathematics H230 GCSE higher level Mathematics J560 GCSE foundation level Mathematics Other courses IGCSE extended level Mathematics 0580 Scholastic Apititude Test (USA Exam) GED (USA Exam) All other exams Click on any of the above links to obtain free resources Book free diagnostic now blacksacademy symbol Director Peter Fekete Educational consultancy | Curriculum design | Courses for adults | Public speaking | Publications CONTACT a CONTENT OF THE REMOTE LEARNING SYSTEM * US GRADE 6 / UK GCSE GRADE 2–3 1. Addition and subtraction 2. Starting number sequences 3. Further number sequences part I 4. Multiplication to 8 x 8 5. Further number sequences part II 6. Multiplication to 12 x 12 7. Square numbers 8. Positive and negative numbers 9. Sums 10. Shapes and perimiters 11. Measurement and areas 12. Reading information 14. Understanding fractions 15. Decimals 16. Percentages 17. Long multiplication 18. Beginning algebra 19. Beginning probability 20. Beginning geometry 21. Properties of numbers 22. Telling the time 23. Geometry in three dimensions US GRADE 7 / UK GCSE GRADE 4 1. Deeper understanding of number 2. Combinations 3. Long division 4. Operations 5. Practical problems 6. Order and type of numbers 7. Measurement 8. Time and time management 9. Fractions 10. Organising information 11. Ratio and proportion 12. Probability 13. Angles 14. Visual reasoning 15. Bearings 16. Working in two dimensions 17. Working in three dimensions 18. Transformation geometry 19. Continuing algebra US GRADE 8 / UK GCSE GRADE 5–6 1. Patterns and pattern recognition 2. Lines, regions and inequalities 3. Mastering fractions 4. Types of number 5. More about triangles 6. Measurement and computation 7. Proportionality 8. Working with space 9. Indices 10. Further work with ratio 11. Investments 12. Further algebra 13. Quadrilaterals and polygons 14. Speed and displacement 15. Continuing with probability 16. Describing data US GRADE 9 / UK GCSE GRADE 6–7 1. Further proportionality 2. Congruency 3. The tricky aspects of algebra 4. Lines and equations 5. Basic formal algebra 6. Analysis and display of data 7. Graphing functions 8. Dimension and algebra 9. Algebraic fractions 10. Circle theorems 11. Algebraic factors 12. Simultaneous equations 13. Velocity and acceleration 14. Proportionality and scatter 15. Number puzzles US GRADE 10/ UK GCSE GRADE 7–8 1. Transpositions 2. Patterns and pattern recognition 3. Algebraic manipulations 4. Quadratics 5. Surds 6. Linear inequalities 7. Functions 8. Trigonometry 9. Systems of linear equations 10. Further presentation and analysis of data 11. Polynomial functions 12. Algebraic products 13. Finding roots 14. Intersection of lines and curves 15. Indices and index equations US GRADE 11/ UK GCSE GRADE 8–9 1. Completing the square 2. Venn diagrams 3. Coordinate geometry with straight lines 4. Further trigonometry 5. Transformations of curves 6. Modulus 7. Basic vectors 8. Quadratic inequalities 9. The quadratic discriminant 10. Arcs, sectors and segments 11. Circles, curves and lines 12. Probability and Venn diagrams 13. Functions, domains and inverses 14. Trigonometric functions 15. Recurrence relations 16. Further elementary vectors FREE LEGACY RESOURCES Business Studies, Economics, History, Mathematics, Philosophy, Sociology Business Studies PEOPLE AND ORGANISATIONS 1. Management structures and organisations 2. Leadership and management styles 3. Classical theory of motivation 4. Human relations school 5. Management by objectives 6. Workforce planning 7. Recruitment 8. Payment systems MARKETING 1. The economic problem 2. Money and exchange 3. Price determination 4. Determinants of demand 5. Market analysis 6. Marketing and the product life cycle 7. Objectives and marketing EXTERNAL INFLUENCES 1. Stakeholders 2. Business ethics 3. Market conditions 4. Business and the trade cycle 5. Business and technological change 6. Business and inflation 7. Business and exchange rates 8. Business and unemployment ACCOUNTING & FINANCE 1. Cash Flow Management 2. Costs, Profits & Breakeven Analysis 3. Budgeting & Variance Analysis 4. Sources of Finance 5. Profit & Loss Account 6. The Balance Sheet 7. Depreciation by the fixed-rate method 8. Reducing Balance Method 9. Stock Evaluation 10. Working Capital and Liquidity 11. Accounting Principles and Window Dressing 12. Costing and Management Accounting 13. Investors and the Corporate Life Cycle 14. Investment Appraisal: Average Rate of Return 15. Investment Appraisal: Payback Method 16. Investment Appraisal: Net Present Value 17. Investment Appraisal: Internal Rate of Return 18. Profitability Ratios 19. Liquidity Ratios 20. Efficiency and shareholder ratios 22. Gearing and Risk 23. Net Asset Value Economics MARKETS & MARKET FAILURE 1. The economic problem 2. Productive and allocative efficiency 3. Money and exchange 4. Price determination 5. The money market 6. Introduction to the labour market 7. The determinants of demand 8. Supply and elasticity of supply 9. Excess supply and excess capacity 10. Elasticity of demand 11. Market structures 12. Income and cross elasticity 13. Market failure 14. Factor immobility 15. Public and private goods 16. Merit and non-merit goods 17. Cost-benefit analysis 18. Competition policy 19. Market failure and government intervention History ANCIENT HISTORY 1. Prehistory of Greece 2. Mycenae, the Heroic Age c.1550—1125 BC 3. The Greek Middle Ages c.1125—c.700 BC 4. The Greek Tyrannies c. 650—510 BC 5. Sparta 6th and 7th centuries BC 6. Athens and Solon 7. The early inhabitants of Italy 8. The Etruscans 9. Early Roman History up to Tarquin GERMANY & EUROPE 1870—1939 1. Social Change from 1870 to 1914 2. Socialism in Europe 1870 to 1914 3. The Balance of Power in Europe 1870 4. Anti Semitism in Europe 1870 to 1914 5. The Structure of Wilhelmine Germany 6. Bismarck and the Alliance System 7. Weltpolitik 8. Colonial Rivalries 9. First and Second Moroccan Crises 10. The First World War triggers 11. The Causes of the First World War 12. Germany and the First World War 13. Military history of the First World War 14. The Treaty of Versailles 15. The Domestic Impact of the First World War 16. The German Revolution 17. The Weimar Republic 18. The Early Years of the Nazi Party 19. The Rise of the Nazi Party 20. The Establishment of the Nazi Dictatorship 21. Nazi Rule in Germany 1934 to 1939 22. The Economics of the Third Reich 23. Appeasement RUSSIA & EUROPE 1855—1953 1. Alexander II and the Great Reforms 2. Imperial Russia under Alexander III 3. Nicholas II and the 1905 revolution 4. Social and economic developments in Russia 5. Russia: the Great war and collapse of Tsarism 6. Provisonal Government & October Revolution 7. The Era of Lenin 8. The Development of Lenin's Thought 9. New Economic Policy and the Rise of Stalin 10. Stalin and the Soviet Union 1924 to 1953 11. Stalin and the Soviet Economy 12. Stalin and International Relations BRITAIN 1914—1936 1. The Great War and Britain 1914—15 2. Britain during the Great War, 1915—16 3. Lloyd George & the Great War, 1916—1918 4. Great Britain after the War, 1918—22 5. British Politics, 1922—25 6. Class Conflict & the National Strike, 1926 7. Britain & International Relations, 1925—29 8. Social Trends in Britain during the 1920s 9. Social Issues during the late 1920s 10. British Politics 1926—29; Election of 1929 11. Britain — the crisis of 1929 12. The Labour Government of 1929—31 13. Britain and economic affairs, 1931—33 14. Britain and Foreign Affairs, 1931—36 15. Social Conditions in Britain during the 1930s Advanced level Mathematics ALGEBRA & GEOMETRY 1. Simultaneous Equations 2. Polynomial Algebra 3. Cartesian Coordinates 4. The equation of the straight line 5. Intersection of lines and curves 6. Remainder and Factor Theorems 7. Functions 8. Quadratic Inequalities 9. Graphs of Inequalities 10. Indices 11. Polynomial Division 12. Velocity-Time Graphs 13. Tally Charts 14. Absolute and relative errors 15. Sequences and Series 16. Arithmetic Progressions 17. Proof by Contradiction 18. Geometric Progressions 19. The Cartesian Equation of the Circle 20. Transformations of graphs 21. Plane Trigonometry 22. Modulus 23. Trigonometric Functions 24. Inverse Trigonometric Functions 25. Linear Inequalities 26. Proportionality 27. Probability 28. Surds 29. Special Triangles 30. Quadratic Polynomials 31. Roots & Coefficients of Quadratics 32. Radian measure 33. Permutations and Combinations 34. Set Theory and Venn Diagrams 35. Sine and cosine rules 36. Elementary Trigonometric Identities 37. Roots and curve sketching 38. Graphs and roots of equations 39. Picards Method 40. Small Angle Approximations 41. Simultaneous equations in three unknowns 42. Linear relations and experimental laws 43. Conditional Probability 44. Pascal's Triangle and the Binomial Theorem 45. Index Equations and Logarithms 46. The Binomial Theorem for Rational Indices 47. Exponential Growth and Decay 48. Exponential and Natural Logarithm 49. Compound Angle Formulas 50. Sinusoidal functions 51. Vector Algebra 52. The Vector Equation of the Straight Line 53. The Scalar Product of Vectors 54. Axiom Systems 55. Introduction to Complex Numbers 56. The algebra of complex numbers 57. Complex Numbers and the Argand plane 58. De Moivres Theorem 59. Eulers formula 60. Further loci of complex numbers 61. Further graph sketching 62. Mathematical Induction 63. Proof of the Binomial Theorem 64. Polar Coordinates 65. Conic sections 66. Partial Fractions 67. First-order linear recurrence relations 68. Summation finite series with standard results 69. Method of differences 70. Trigonometric Equations 72. Series Expansion 73. Lagrange Interpolating Polynomial 74. Error in an interpolating polynomial 75. Abelian groups 76. Geometrical uses of complex numbers 77. Cyclic Groups 78. The Cayley-Hamilton Theorem 2x2 Matrices 79. Cayley Theorem 80. Determinants 81. Isomorphisms 82. Lagrange theorem 83. Properties of groups 84. Group structure 85. Subgroups 86. Homomorphisms 87. Matrix Algebra 88. Determinant and Inverse of a 2x2 matrix 89. Gaussian elimination 90. Matrix representation of Fibonacci numbers 91. Matrix groups 92. Inverse of a 3 x 3 Matrix 93. Singular and non-singular matrices 94. Properties of Matrix Multiplication 95. Induction in Matrix Algebra 96. Properties of Determinants 97. Permutation groups 98. First Isomorphism Theorem for Groups 99. Roots of Polynomials of Degree 3 100. Scalar Triple Product 101. Systems of Linear Equations 102. Matrix Transformations 103. Mappings of complex numbers 104. Cross product of two vectors 105. Vector planes 106. Eigenvalues and Eigenvectors CALCULUS 1. Introduction to the Differential Calculus 2. Stationary points and curve sketching 3. Applications of Differentiation 4. Differentiation from First Principles 5. The Trapezium Method 6. Integration 7. Direct Integration 8. Applications of integration to find areas 9. Graphs of Rational Functions 10. Derivatives of sine and cosine 11. Products, Chains and Quotients 12. Volumes of Revolution 13. Exponential and Logarithmic Functions 14. Integration by Parts 15. Parametric Equations 16. The Integral of 1/x 17. Integration by Substitution 18. Implicit Differentiation 19. Formation of a differential equation 20. Separation of variables 21. Integrals of squares of trig functions 22. Maclaurin Series 23. Techniques of Integration 24. Integrating Factor 25. The Newton-Raphson formula 26. Errors in Numerical Processes 27. Roots and Recurrence Relations 28. Derivatives of Inverse Trig. Functions 29. Second order homogeneous equations 30. Second order inhomogeneous equations 31. Implicit differentiation — second derivative 32. Integrands to inverse trigonometric functions 33. Integrands to logarithmic function 34. Integration of Partial Fractions 35. Logarithms and Implicit Differentiation 36. Implicit differentiation and MaClaurin series 37. Separation of variables by substitution 38. Trigonometric Substitutions for Integrals 39. Truncation Errors 40. Euler and Trapezoidal Method 41. Numerical methods for differential equations 42. Simpson Method 43. Proof of Simpson Formula 44. Richardson Extrapolation 45. Arc length of a curve in Cartesian coordinates 46. Arc length of a curve in Polar coordinates 47. Arc length of a curve: Parametric form 48. Curves in Euclidean space 49. Functions and continuity 50. The gradient of a scalar field 51. The derivatives of the hyperbolic functions 52. Hyperbolic Functions 53. Inverse Hyperbolic Functions 54. Hyperbolic Identities 55. Integrals with inverse hyperbolic functions 56. Reduction formulae 57. Simultaneous differential equations 58. Surface of Revolution 59. Vector differential calculus 60. Scalar Fields and Vector Functions STATISTICS & PROBABILITY 1. Central Tendency: Mean, Median and Mode 2. Standard Deviation 3. Cumulative Frequency 4. Discrete Random Variables 5. Mutually exclusive and independent events 6. The Binomial Distribution 7. The Normal Distribution 8. Standardised Normal Distribution 9. Regression Lines 10. Correlation 11. The Geometric Distribution 12. Hypothesis Testing — Binomial Distribution 13. Index Numbers 14. Time Series Analysis 15. Bayes Theorem 16. Confidence interval mean — known variance 17. The Central Limit Theorem 18. Pearsons product moment correlation 19. Spearmans Rank Correlation Coefficient 20. Hypothesis Testing — Normal Distribution 21. The Poisson Distribution 22. The Normal Approximation to the Binomial 23. The Normal Approximation to the Poisson 24. The Poisson Approximation to the Binomial 25. Type I and type II errors 26. Scalar multiples of a Poisson variable 27. Test for the Mean of a Poisson distribution 28. Random Number Sampling 29. Estimating Population Parameters 30. Random Samples and Sampling Techniques 31. The Concept of a Statistic 32. Hypothesis test for the population variance 33. Central Concepts in Statistics 34. Continuous Probability Distributions 35. Modeling: Chi squared goodness of fit 36. Chi squared test for independence 37. Degrees of Freedom 38. Difference Sample Means Unknown Variance 39. Moment generating functions 40. Probability generating functions 41. Linear Combinations of Random Variables 42. Maximum Likelihood Estimators 43. Wilcoxon signed rank test on median 44. Non-parametric significance tests 45. Single-sample sign test of population median 46. Paired-sample sign test on medians 47. Paired sample t-test for related data 48. Paired sample Wilcoxon signed rank test 49. Difference of two sample means 50. Pooled sample estimate 51. Testing the Sample Mean 52. The Uniform Distribution MECHANICS 1. Velocity-Time and Displacement-Time Graphs 2. Force diagrams 3. Representation of Forces by Vectors 4. Static Equilibrium 5. Equilibrium of coplanar forces 6. Weight and Free Fall 7. Normal Reaction and Friction 8. Newtons First and Second Laws 9. Relative Motion 10. Projectiles 11. Calculus and Kinematics 12. Motion of a Particle: Vector calculus form 13. Work 14. Energy Conversions 15. Gravitational potential and kinetic energy 16. Connected Particles 17. Moments 18. Linear momentum 19. Power 20. Hookes Law 21. Simple Harmonic Motion 22. Simple Harmonic Motion and Springs 23. Calculus, Kinematics in Three Dimensions 24. Sliding, toppling and suspending 25. Impulsive Tensions in Strings 26. Angular Velocity 27. Motion in a Horizontal Circle 28. Centre of Mass of a Uniform Lamina 29. Motion in a Vertical Circle 30. Motion under a Variable Force 31. Conservation of Angular Momentum 32. Centre of Mass of a Composite Body 33. Motion under a central force 34. Centre of Mass of a Uniform Lamina 35. Centre of Mass Uniform Solid of Revolution 36. Equilibrium of Rigid Bodies in Contact 37. Damped Harmonic Motion 38. Moment of Inertia 39. Impulse, elastic collisions in one dimension 40. Parallel and Perpendicular Axis Theorems 41. Motion described in polar coordinates 42. Simple pendulum 43. Compound pendulum 44. Stability and Oscillations 45. Vector calculus 46. Linear Motion of a Body of Variable Mass DISCRETE & DECISION 1. Algorithms 2. Introduction to graph theory 3. Dijkstra algorithm 4. Sorting Algorithms 5. Critical Path Analysis 6. Dynamic Programming 7. Decision Trees 8. The Maximal Flow Problem 9. The Hungarian algorithm 10. Introduction to Linear Programming 11. Simplex Method 12. Matching Problems 13. Game Theory 14. Minimum connector problem 15. Recurrence relations 16. Proofs for linear recurrence relations 17. Simulation by Monte Carlo Methods 18. Travelling and Optimal Salesperson Problems 19. The Travelling Salesperson Problem Philosophy INTRODUCTION TO PHILOSOPHY 1. The problem of evil 2. Introduction to Plato 3. Knowledge, belief and justification 4. Descartes Meditation I 5. Introduction to the problem of universals 6. Introduction to metaethics 7. Subjectivism versus objectivism 8. Aristotle's function argument 9. Natural Law Theory 10. Utilitarianism 11. The Nicomachaen Ethics of Aristotle 12. Virtue Ethics 13. Descartes Meditation II 14. Hume and empiricism 15. The paradox of induction 16. Hume's attack on Descartes 17. The Cosmological Argument 18. The Ontological Argument 19. The Teleological Argument 20. The Argument from religious experience 21. The Moral Argument 22. The argument from illusion 23. Materialism 24. Human Identity Sociology PERSPECTIVES & METHODOLOGY 1. Introduction to Marxism 2. Introduction to Durkheim 3. Weber: classes, status groups and parties 4. Introduction to patriarchy and gender roles 5. Mass culture theory 6. The Frankfurt school STRATIFICATION & DIVERSITY 1. Ethnic groups and discrimination 2. Race, Ethnicity and Nationalism 3. Social Inequality 4. Theories of Racism 5. Class structure 6. Modern Functionalism and Stratification 7. Social Mobility 8. Bottomore: Classes in Modern Britain 9. American exceptionalism ASPECTS OF SOCIETY 1. Definitions of Poverty 2. Theories of Poverty 3. Solutions to Poverty 4. Alienation 5. Leisure 6. Work and Technological Change 7. Conflict and Cooperation at Work 8. Attitudes to Work 9. Unemployment 10. Perspectives on Education 11. Education and Ethnicity 12. Education and Gender 13. The Family and Social Structure 14. The Family and Household Structure 15. Conjugal Roles 16. Marital Breakdown 17. Post War Education in Britain 18. British Social Policy 1945—1990

Act Fast Nl

act fast nl

Scunthorpe

Act Fast is a well-established Independent School near Scunthorpe in North Lincolnshire. Act Fast has grown organically as the need for a high standard of provision has emerged and developed. The premise of Act Fast’s provision is that we are promoting the value of education to previously disaffected young people. what we do We operate a bespoke curriculum at Act Fast, which is both written and delivered by in house staff and is in line with the DfE Independent Schools Standards. We overtly deliver lessons in the following subject areas: Maths up to Functional Skills level 2 standard English up to Functional Skills level 2 standard Motor Vehicle Technology with the Institute of the Motor Industry up to level 2 standard PSHE (Including RSE) against a verified and recognised scheme Motocross, delivered by qualified and experienced staff Physical Education through a range of on-site and off-site activities. Art/Crafts Music Further to this, lessons in the following subject areas are delivered as embedded features of the timetabled lessons. Human and Social Understanding Aesthetic and Creative Scientific Technological British Values Our learners know if they work hard, they are awarded by riding the motorcycles here at Act Fast. This has proven to be successful, helping young adults to achieve their qualifications and have a positive attitude towards learning. Curriculum Act Fast has made a commitment to give every young person who is capable of the opportunity to reintegrate and to take a range of exams. For those subjects that Act Fast does not currently deliver, as we develop learners opportunities will increase. We are an accredited exam centre through OCR, NCFE, ABC, D of E, and when required will extend this to meet the needs of our learners. Our curriculum also enables and encourages learners to develop their interests and talents. We have a number of students here who have found their passion for music, learning how to play the guitar, as well as a large number of young, talented motorbike riders who love learning about riding, fixing and maintaining the bikes. It’s important to us to support our learners in keeping them physically and mentally healthy. We have access to: Mental Health Champions, outreach support and therapeutic counselling services, available to all our learners. We have regular sports activities within our timetable to encourage physical exercise, as well as access to local gyms and leisure centres. These activities help to prepare young people to access their community in adulthood. Hidden Curriculum Act Fast’s curriculum, throughout the range of its delivery, is heavily invested in the “Hidden Curriculum”. The Hidden Curriculum argument is that the most valuable lessons our young people receive here are to arrive on time, respect authority, follow instructions, keep regard for safety, take responsibility for their actions, behave in an acceptable standard, liaise with other people respectfully, and respect other people’s personal choices, encouraging equality and diversity. Other ways in which we promote equality and diversity include: Challenging negative attitudes amongst students. Setting clear rules regarding how people treat each other. Treating all students and staff equally and fairly. Using resources that have multicultural themes. Creating lessons that reflect and promote diversity in the classroom. Making sure that all students have equal access to participation and opportunities. Ensuring that all procedures and policies are non-discriminatory. Making sure that classroom materials never discriminate against anyone. Safeguarding protected characteristics throughout our culture and ethos. All of these things, to a greater extent than formalised subject lessons, will make them responsible, independent, resilient and above all else employable young people once they finish their school career. Act Fast has trained and qualified staff to recognise some of the barriers to learning that students face. These barriers might be due to Adverse Childhood Experiences and with knowledge and understanding of such issues Act Fast staff can help students overcome them to maximise their potentials. Referral, Application and Introduction After a referral is made to Act Fast, we invite a representative from the referring body (usually the Inclusion Officer), the learner and the learner’s parents into Act Fast for a familiarisation visit. During that visit the learner is given a tour of the facility, is introduced to key staff members and receives an explanation of the culture of Act Fast. Learners are given the opportunity to voice any concerns and any questions they have are answered. We set a high expectation on behaviour here, and partly because expectations are high, but also because more established learners mentor new arrivals, new learners very soon fall into compliance with our way of doing things. Act Fast works because our learners buy into the culture. This is the first opportunity that a young person has to involve themselves in how we operate here. Application forms must be completed prior to a young person starting at Act Fast. Once applications are complete, the referring body typically takes a few days (sometimes up to a week) to arrange their transport. Personal data will be stored and processed at this point, and details entered into our MIS system, Arbor. We insist on a Personal Learning Plan (PLP) meeting with stakeholders and the young person present within the first month. This allows any teething troubles to be voiced and solutions to be sought. Further PLP meetings are held regularly, no less frequently than once a term. At those meetings, Act Fast staff will deliver a report detailing the engagement of the young person, levels of educational attainment, attendance, general engagement, and commentary on the likelihood of a reintegration being successful. Reintegration planning must be tailored to suit the needs of the individual. Staff Investment Our staff all take part in quality training including regular CPD sessions and ongoing programmes of accreditation such as SSS online training (recently completed by all staff members). Training needs identified are acted on as soon as practical. The organisation believes and invests in the continuous professional development of its people. Our commitment to CPD is such that every member of staff has received CPD accredited training in the last 12 months. Our qualified teachers ensure pedagogical content methods are in place to deliver high standards of teaching for our young learners. We engage with our staff continuously here and know of the main pressures on them, including managing workload. We aim to support every staff member to help guide them throughout their career at Act Fast. Educational Framework It is our aim to provide an educational framework which is heavily invested in the hidden curriculum. By that, we mean that as well as lessons formalised in Maths and English for example, our young people develop an understanding of: working to a process arriving on time respecting authority abiding by the rules accepting that their first choice may not always be the right choice following instructions not expecting to leave early attending every day These are the skills whereby a young person will be employable post 16. Without these key skills, a young person is unlikely to be able to function in the workplace. We develop the hidden curriculum, embedded in everything we do, in order that our learners gain an understanding of their expectations being matched by the expectations of attendance, compliance and engagement We have a tracking system in place for our core subjects. We also use a “readiness to learn” scale, whereby a learners attitude, engagement, and involvement in their own work is measured. Bespoken When evolving Act Fast into an independent school I was very mindful that Mainstream school had not been a successful outcome for the majority if not all of our learners. It was imperative that we were bespoke and able to meet the needs of all our learners and not just the few. For this reason we created our own curriculum that is more sympathetic to our learners’ needs. Our teachers create an environment that allows our young people to focus on learning. 1:1 support as well as small group teaching (where appropriate) is in place to make teaching more effective, allowing tutors to concentrate on each individual learner’s needs. We believe in student voice here at Act Fast. Our EHCP’s (Educational Health Care plans) allow us to capture our learners’ views. It’s not only in our annual reviews that we give learner’s opportunity to be heard. For example, one young adult suggested we invested in a bigger bike here, so we put arrangements in place and made this happen. We encourage our learners to make their voices heard. Below are some examples of student voice council meetings held at Act Fast and how they shape decisions made at the school. Student Voice Meeting 040322 We have effective arrangements to identify learners who may need early help or are at risk of neglect, abuse, grooming or exploitation. We strongly promote our policies and legislation such as safeguarding, diversity and equality of our staff and learners at Act Fast. Ofsted Report 2022 Best Bits: “Act Fast school is a place where the proprietor and staff go the extra mile to support the pupils who attend. It has a unique vision of how to ‘hook’ pupils back into education, and it is successful in doing so. Act Fast has started to re-engage pupils who have experienced difficulties in their education”. “Parents believe that, finally, a school ‘gets’ their child. The wider curriculum, built around motor-cross, is a distinctive feature of the school. It motivates pupils to attend and to behave well. For those pupils who do not wish to ride the bikes, staff work with them to find alternatives. The proprietor and staff have limitless ambition for what pupils can achieve in their personal development. At the heart of this is a patient, careful building of relationships, and, in many cases, a re-building of trust between the pupil and their experience of education.” “The special educational needs coordinator (SENCo) has a strong understanding of the requirements of pupils with special educational needs and/or disabilities (SEND). Recently, the SENCo has started to work with a senior leader to more effectively incorporate pupils’ SEND targets from their education, health and care (EHC) plans into teachers’ planning.” “Leaders have also recently taken action to improve the school’s support for pupils’ reading. For instance, a primary specialist has been appointed with experience of teaching phonics to the weakest readers. The English lead is in the process of building a programme to encourage pupils to read widely and for enjoyment. Leaders’ wider curriculum for pupils’ personal development is, to very large extent, a strength of the school.” “The proprietor’s vision for getting young people who have had difficult experiences of school back into education is impressive. It is backed up by an innovative personal development curriculum, built on a range of activities that take place in the afternoons. These include a variety of motor vehicle-related opportunities, as well as visits out of school to a range of venues. Recently, for instance, pupils have started to be taken to a local engineering firm to participate in a scheme to broaden their career aspirations. Pupils know that there is a plan in place for them to make a suitable next step into further education or training at the end of Year 11.” Improvements: “Leaders’ PSHE curriculum includes reference to the protected characteristics and the school is a respectful community: however, coverage of the protected characteristics in the curriculum strategy is not as detailed as it could be, so pupils’ understanding is not as developed as it could be. Leaders should revisit their curriculum thinking for PSHE so that teaching of the protected characteristics is made more overt.” “The current curriculum is based on a limited set of qualifications in two subjects. For a registered special school, this lacks ambition. As a result, pupils experience a narrow curriculum, including a limited suite of qualifications. Leaders should take action to broaden and deepen their curriculum so that pupils have opportunities to study a wider range of subject content, organised coherently and cumulatively over the entire secondary and post-16 phases; and, for those who are capable, to a higher level of accreditation.” “Leaders have not taken the required action with regard to the statutory guidance for the teaching of RSHE. Consequently, parents have not been made aware of the school’s policy and their parental rights within the policy. Also, the teaching of Inspection report: Act Fast NL Ltd. RSHE is not clearly planned in the school’s curriculum. Leaders should take action to be compliant with the statutory guidance and to ensure that curriculum thinking incorporates structured RSHE teaching.”

University of St. MichaelĀ´s College

university of st. michaelā´s college

The University of St. Michael’s College offers full conference and event services including AV equipment and catering. We also provide hospitality services during our summer months.St. Michael’s was established in 1852 by the Basilian Fathers to serve the growing Catholic population in Toronto, educating the children of immigrants who had come to Canada in search of a better life for their families. Historically rooted in the educational mission shaped by the Basilians, the Sisters from the Congregations of St. Joseph and Loretto and other key community members, St. Michael’s seeks to build a transformational faith and learning community committed to the search for truth and meaning in our contemporary world. Our graduates are leaders in their communities, effecting positive change that respects and honours the dignity of all. As the university looks forward to its 180th anniversary in 2032, it is operating with a strategic plan titled St. Mike’s 180: Rooted in the Future. The plan, which imbues all aspects of university life, is built on three pillars: acdemics, community and sustainability, all stemming from the university’s commitment to the Catholic Intellectual Tradition. Today, St. Michael’s is home to 5,000 students studying everything from astronomy and English to architecture and zoology. Our status as a federated college within the University of Toronto, one of the world’s top research universities, offers students a wealth of academic and extra-curricular choices. At the undergraduate level, St. Michael’s sponsors four programs, including Christianity and Culture, Book and Media Studies, Celtic Studies and Mediaeval Studies. These are linked with University’s first-year seminars: the Gilson Seminar in Faith and Ideas, the Boyle Seminar in Scripts and Stories and the McLuhan Seminar in Creativity and Technology. At the graduate level, St. Michael’s has recently signed a Memorandum of Agreement with the local Jesuit theologate, Regis College, that will see Regis and St. Michael’s Faculty of Theology come together to better serve students, increasing course and degree options while enriching an already diverse community with new opportunities. Harmonized programming will begin in 2022. Currently, the Faculty of Theology at St. Michael’s offers MDiv, MRE and MTS programs, as well as a number of advanced degree programs (including a research-oriented MA in theology, a ThM, DMin and PhD) intended to prepare students for scholarly work and careers in academia. Both the undergraduate and the graduate divisions offer regular extra-curricular programming for students to meet new people nd learn new hobbies and interests, while resource people like our Wellness Counsellor are available to help students manage the challenges of University life. As we look toward our future, we also recall the past and the tremendous scholars who have worked and studied at St. Michael’s, including media theorist Marshall McLuhan and 20th-century French philosophers Etienne Gilson and Jacques Maritain. The University’s alumni include many notable figures such as Paul Martin, Canada’s 21st Prime Minister, Victor Dodig, President and Chief Executive Officer of the CIBC group of companies, Tony Comper, the former President and Chief Executive Officer of BMO Financial Group, and Bonnie Crombie, Mayor of Mississauga.

Irresistible Headdresses

irresistible headdresses

Born in the East End of London Valerie Masters was passionate about singing and entertaining even from the tiny age of 4 years old when people would ask her grandfather to hold her up to the microphone and sing. Her career started when she left school at 16 to join a well known Jazz Group, the Ray Ellington Quartet. She was auditioned by Dick Katz, the great pianist with the Group and who was awarded the title of Jazz Musician of the year in the 1960s and to whom Valerie later married. Valerie travelled with the quartet until she ventured on a solo career internationally . She had her own radio show on Radio Luxembourg, the Valerie Masters Show. She was voted Top Girl of the North East when she had the series "The One o'Clock Show" and the series "Young At Heart" with Jimmy Saville, starred in countless TV Shows and series and Sunday at Winchester with Jess Yates, and appeared at the London Paladium on several occasions. Valerie has appeared on film and TV and you would have seen and heard her in the series Secret Army, Seaside Special, the Singing Detective, the Wombles, the Faith Brown Show, the Stanley Baxter Show, Russ Abbott, Grace Kennedy and many others during the 1960s and 1970s. During her time as a solo artist and entertainer she sang with Quincy Jones in the Tivoli Gardens, Sweden and Denmark and many other famous names including Shirley Bassey, Petula Clark, Cilla Black, Lulu, to name just a few. She Led the BBC team singing to come first in the Nordring Festival in 1983 with their Winning Show. She has also sung titles in many films including The Helion for John Hayman, who went on to work with Cubby Broccoli on the James Bond Films, Hobs Choice, The Wall with Bob Geldorf, Yentl with Barbara Streisand, Dutch girls with Timothy Spall and has also been heard on the TV singing American and British adverts/jingles such as Scottish Cheddar, Knorr Soups, Bangor Jeans, Tetley Teabags and many more, too numerous to mention! Since the passing of her husband Dick Katz Valerie is now married to the Property Owner and Theatrical Agent Tony Nunn the former great violinist. With her knowledge and experience of glamorous show business and changing fashions through the years and her absolute passion for jewellery, this enables and inspires her to come up with the most beautiful elegant designs. Her personality and flair shows through in each and every one of her designs and they are all made by her and her team with the utmost love and care as she throws her heart into them. Make an appointment with Valerie in her Studio and come out feeling happy and content. Her partner and daughter TV and Film Hair and Makeup Stylist Gillian Katz have devised and designed something to suit every wedding hairstyle whether you have an updo, long or short hair style. Valerie, Gillian and their team have a motto "You Are Our Star - Call - and Let us Make You Feel That Way!"

Spectacular Woman

spectacular woman

I am Victoria Griffith and I wanted to share my excitement about this forum for women and to also let you know a little bit about myself so that you realize that I understand where you are coming from. I am one of you. As a domestic violence survivor, I went through the mental and physical challenges that each of us go through and my struggle took me to the dark places. As a teenager, I felt that sense of disconnect and doubt but my journey led me to the other side where I was able to overcome and heal. My goal is to let you know that there is hope and through patience and focus, you can believe in yourself, let go of self-doubt and take charge of your life again. Working together, I will take your hand and walk you through the process of releasing the fears and insecurities and begin the discovery of awakening your confidence and passion again. I believe that you deserve to be empowered and I can show you the path that can take you there. I will not let you down in your faith and trust in me. I am a mother, transformational life skills strategist, author, consultant, inspirational speaker, survivor of domestic violence, school governor and founder and CEO of Spectacular Woman. My personal road has led me to that sense of well-being and I have found my purpose. Working with women within these realms, I have seen wonderful things happen. Many have escaped the barriers to become the incredible individuals that they were meant to be, achieving their dreams, moving forward with promotions, careers and love. I created Spectacular Woman as a combination safe place, with carefully crafted inspirational and empowering networks and programs. Our shared experiences have given me the chance to see that many have limited beliefs and lack self-worth and confidence. My mission is to unlock as well as unblock these limitations so that you become energized in your life and take the action steps that will give you the ability to fulfill your complete potential. As a result of the many relationships and successes, I established the Spectacular Woman Club. This is a shared place where everyone feels safe, secure, and supported as they make their personal journeys. Our club amplifies, transforms and equips each woman so that they feel empowered to make the changes they want in their lives to achieve their ultimate goals for every life aspect. I have devoted many years working as a lecturer of Social Policy in the secondary school and further education system areas. Having spent thirteen years in the Criminal Justice System, including the Youth Offending Team, I have a unique perspective as well as compassion. I was privileged to work with the Women’s Victim Support Unit, working closely with women who were victims of domestic violence. In my local community, I organized conferences on domestic violence and also facilitated parenting support for parents with challenging teenagers. This background allowed me to develop and deliver the Live Wise TeenDV SRE Preventative Program for Teenagers on the topic of healthy relationships in secondary schools and within my local community.

Marshall Assessment

marshall assessment

Birmingham

End point assessments are the final tests given to an apprentice during their apprenticeship. The goal of this activity is to offer an impartial, objective review of individual skills, knowledge, and behaviours. Although the activities are different for each apprenticeship, end-point assessments follow the same general structures. The end-point assessment is performed after a minimum of 12 months after the start of the apprenticeship. It must be successfully completed before the issuance of an apprenticeship completion certificate. Every training provider delivering on Apprenticeship standards must have an agreement with an End Point Assessment Organisation (EPAO). Assessment Organisations must be registered on the Government approved register (RoEPAO). If you have apprentices in the life science, chemical science, physical science or in the science education sector, our fair and straight-forward EPA process provides a cost effective, quality-assured assessment solution for your business. Marshall Assessment has over 30 years’ experience of work based learning and assessment. We make the unfamiliar structures of end-point assessment easily navigable with comprehensive customer support and assessment resources. We have a broad range of occupational competence that spans most of the UK science sector. Our industry-competent assessors focus on precise communication, clear expectations, and rapid reporting of assessment decisions. Assessment activities depend on the apprenticeship under evaluation. Individuals might participate in professional discussions, complete skill-based challenges, or perform in situational judgement tests. Portfolios and practical observations are sometimes part of the process, as are presentations, showcases, and interviews. Each assessment activity works to evidence the knowledge, skills and behaviours that each learner has developed during their apprenticeship. This complete and careful evaluation of their skills, knowledge, and behaviours is an impartial, yet rigorous process that tests the candidates core ability to perform their job role effectively and safely. The unique benefit that the end-point assessment brings is its holistic design. People retain knowledge and learn new skills in unique ways. Instead of trying to fit each candidate into the same profile, this process looks at the competency of the individual from all facets. Assessment Plans Achieve Crucial Outcomes. Assessment plans are delivered by the training provider with guidance from the EPAO. This provides structure to the EPA and signposts our assessors to maximise our assessment opportunities. End point assessments remove managers being the sole decision-makers on the competencies of a candidate. Although, that change can be challenging for some, working with our team ensures that your assessment plan achieves the best possible outcome. Our assessment team are flexible and will rapidly understand the requirements of your business. We will partner with you to give your apprentices the best possible chance to shine and demonstrate their competencies. This partnership begins with initial assessment and progresses to EPA and beyond, as we will stay in touch with you regarding your apprentice’s progression. Now is the time to link up with your EPAO. Our future depends on the expertise that your apprentices demonstrate in the science sector. Together we are responsible for building a brighter, safer world through a highly trained and competent scientific workforce. Use the experience our team provides to help your organisation and the science sector to bounce forward.