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H2 Math Summary Notes
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Pure Mathematics
Inequalities1 Question -
Graphing Techniques7 Questions
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Transformation of Graphs2 Questions
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Functions6 Questions
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APGP & Recurrence Relations6 Questions
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Sigma Notation6 Questions
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Techniques of Differentiation2 Questions
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Applications of Differentiation9 Questions
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Maclaurin Series2 Questions
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Techniques of Integration6 Questions
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Applications of Integration4 Questions
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Differential Equations2 Questions
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Vectors11 Questions
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Complex Numbers6 Questions
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StatisticsPermutation and Combinations7 Questions
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Probability5 Questions
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Discrete Random Variable4 Questions
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Binomial Distribution5 Questions
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Normal Distribution7 Questions
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Sampling and Estimation8 Questions
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Hypothesis Testing6 Questions
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Correlation and Linear Regression5 Questions
Lesson 6,
Question 3
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Worked Example 3
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By expressing \(\frac{1}{(4r-1)(4r+3)}\) in partial fractions, evaluate \(\sum\limits_{r=1}^{n}{\frac{1}{(4r-1)(4r+3)}}\).
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