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Shared lesson activities for 'After the Race' from Joyce's Dubliners: Summary & Analysis
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AQA Decision 1 9.02 Linear Programming: Finding the Inequalities from a worded problem
I work through a worded problem, turning it into a linear programming problem by finding five inequalities and an objective function.
AQA Core 3 7.04e When you do Integration by Parts INCORRECTLY
I go through an example where I PURPOSEFULLY use Integration by Parts wrongly, choosing the wrong function to be u, the one I differentiate.
AQA Statistics 1 5.04 An Example using the Central Limit Theorem
AQA Core 2 5.09 Summing an Arithmetic Series
D1 Q8 June 2013 (Replacement) Edexcel Maths A-Level
D1 Q8 June 2013 (Replacement) Edexcel Maths A-Level
AQA Decision 1 9.01 Linear Programming: Drawing Inequalities and the Objective Line
An introduction to Linear Programming, including drawing straight lines on a graph, as well as the Objective Line, and then calculating the maximum for an Objec...
AQA Core 3 7.04d Integration by Parts: Integrating ln(x)
I show you how to integrate ln(x) using Integration by Parts.
AQA Statistics 1 5.03 Introducing the Central Limit Theorem
AQA Statistics 1 5.02 An Example using the Standard Error
AQA Core 2 5.07 Arithmetic Sequences: Finding a and d
OCR MEI Statistics 1 5.04 Binomial Probability: Using the Formula
AQA Core 3 7.04b Integration by Parts TWICE: an indefinite integral example
I work through an example of an indefinite integral that needs Integration by Parts to be used twice.
AQA Statistics 1 5.01 Introducing Estimation and the Standard Error
AQA Decision 1 8.05 The Travelling Salesperson Problem: The Lower Bound Algorithm
I work through a first try at the Lower Bound Algorithm and discuss what our result means alongside the upper bound given by the Nearest Neighbour Algorithm
AQA Core 2 5.06 How many terms in an Arithmetic Sequence
AQA Statistics 1 4.09 Inverse Norm Example 3 (TI-82 STATS)
AQA Decision 1 8.04 The Travelling Salesperson Problem: The Nearest Neighbour Algorithm
I work through an example of the Nearest Neighbour Algorithm using a matrix and go through what to look out for.
OCR MEI Statistics 1 5.02 Rolling Twelve Fair Dice: The Probability of Three Sixes
AQA Core 3 7.03d Integration by Substitution: A Tricky Example
I work through a complicated integration by substitution problem involving trigonometric identities.
AQA Decision 1 8.03 The Travelling Salesperson Problem: An example of a Hamiltonian Cycle / Tour
By inspection, I find a Hamiltonian cycle that may or may not be improved upon as a solution for the Travelling Salesperson Problem
OCR MEI Statistics 1 5.01 Rolling Three Fair Dice: An Introduction to Binomial Probabilities
AQA Statistics 1 4.07 Inverse Norm Example 1 (TI-82 STATS)
AQA Core 2 5.04 Finding the Limit of a Sequence
AQA Core 3 7.03c Integration by Substitution: Definite Integrals
I work through a pair of examples of definite integrals, using the method of integration of substitution, changing the limits of integration.
AQA Decision 1 8.02 The Travelling Salesperson Problem: Making a Graph Complete
I work through building up a matrix from a network and filling in the shortest distances.
OCR MEI Statistics 1 4.12 Permutations and Combinations: An Exam-Style Question example 1
AQA Statistics 1 4.06 Normal Distribution: Probability of an Exact Value
AQA Core 2 5.03 Generating a Constant Sequence
AQA Core 3 7.03b Integration by Substitution: More Indefinite Integrals
I look at some more examples of indefinite integrals using the method of integration by substitution.
AQA Decision 1 8.01 The Travelling Salesperson Problem: An Introduction
I introduce the concept of the Travelling Salesperson problem and how we are going to go about attempting to solve it.
OCR MEI Statistics 1 4.11 A Second Example of using nCr
AQA Statistics 1 4.05 Using the Normal Distribution Example 3 (TI-82 STATS)
AQA Core 2 5.02 Given a Sequence, find the Recurrence Relation
AQA Core 3 7.03a Integration by Substitution: Indefinite Integrals
I introduce Integration by Substitution with some straightforward examples, leading on to a slightly harder problem.
AQA Decision 1 7.03 Chinese Postman Algorithm: a third example w/extras
I work through a third example of using the Chinese Postman algorithm and throw in a couple of extra part (b) and (c) questions at the end.
OCR MEI Statistics 1 4.10 An Example of using nCr
C1 Sequences & Series (3)
C1 Sequences & Series (2)
AQA Statistics 1 4.03 Using the Normal Distribution Example 1 (TI-82 STATS)
AQA Core 2 4.06 Transforming a Graph and Sketching
AQA Core 3 7.01 Integration: Reversing the Chain Rule
I work through several examples of increasing difficulty that look at reversing the Chain Rule, rather than using Integration by Substitution.
AQA Decision 1 7.01 Introducing the Chinese Postman Algorithm
I introduce the Chinese Postman algorithm and give an example of how it works for a simple graph.
AQA Statistics 1 4.02 Introducing the Normal Distribution
AQA Core 3 6.04 Differentiation: The Quotient Rule
AQA Decision 1 6.04 Bipartite Graphs: a third (more coherent) example
I work through a third example of finding two alternating paths for a Bipartite graph matching problem.
C1 Sequences & Series (2)
C1 Sequences & Series (2)
AQA Statistics 1 4.01 Introducing the Bell Curve
AQA Core 2 4.04 Graph Transformations Summary
OCR MEI Core 4 3.02 Extending Binomial Expansion - where does the formula come from?
If you want to learn where Maclaurin Series comes from, watch: . Maclaurin Series is a special case of Taylor Series where we are centred at 0, so a=0.
OCR MEI Statistics 1 4.07 A Password with 3 letters and 4 numbers: How many arrangements?
AQA Core 3 6.03 Differentiation: The Product Rule
I introduce the Product Rule for Differentiation.
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