## Oxford Cambridge and RSA

All syllabi by Oxford Cambridge and RSA

## 2,559 pages

1,972

Pure Maths344

Statistics243

Mechanics## Some Free Sample Pages

## OCR AS Maths 2017

## Not your syllabus?

## Study Online

## Assessment Content

O-tests (Online Tests) arranged in levels as follows:

Module | 8 | 7 | 6 | 5 | 4 | 3 | 2 | 1 | Total |
---|---|---|---|---|---|---|---|---|---|

Pure Maths | 13 | 1 | 6 | 39 | 57 | 142 | 81 | 34 | 373 |

Statistics | 0 | 4 | 1 | 4 | 13 | 17 | 12 | 19 | 70 |

Mechanics | 0 | 0 | 1 | 4 | 5 | 19 | 7 | 0 | 36 |

Totals | 13 | 5 | 8 | 47 | 75 | 178 | 100 | 53 | 479 |

## Online Help

There is extensive online help available for assisting with subjects such as:

- handling your account(s) - for schools how to set up and use separate teacher and student personal accounts;
- setting up student classes and accounts, including importing data from external sources;
- assessment from both the student's and teacher's perpective (including, for teachers, how to create and allocate student tasks);
- using the forum and conferencing facilities;
- how to use o-test progress charts;
- how teachers can monitor the progress of their students;
- setting up and printing exam papers (including how to handle common printing problems).

To access the online help click or touch the

button near the top-right of the page. This button will appear with a green background when there is help available directly related to the page currently displayed.## Recent Additions

ID 142: Inequalities and Polynomials : Advanced Inequalities : Investigate Rational Inequalities 1

OCR AS Maths 2017 Pure Maths

ID 1036: Inequalities and Polynomials : Factor Theorem : Visualise Factor Theorem 2

OCR AS Maths 2017 Pure Maths

ID 8187: Exponentials and Logarithms : Logarithm Basics and Laws : Law: a log(b)=log(b

OCR AS Maths 2017 Pure Maths

ID 8186: Exponentials and Logarithms : Logarithm Basics and Laws : Law: log(

OCR AS Maths 2017 Pure Maths

ID 8184: Exponentials and Logarithms : Logarithm Basics and Laws : Law: log(ab)=log(a)+log(b)

OCR AS Maths 2017 Pure Maths

ID 5045: Discrete and Binomial Distributions : Permutations and Combinations : Factorials

OCR AS Maths 2017 Statistics

ID 5044: Binomial Expansion : Binomial Expansion : Factorial

OCR AS Maths 2017 Pure Maths

ID 8057: Differentiation Basics : Gradients : The graph of y = x³

OCR AS Maths 2017 Pure Maths

ID 8056: Differentiation Basics : Gradients : Straight v curved

OCR AS Maths 2017 Pure Maths

ID 8050: Differentiation Basics : Gradients : The graph of y = x²

OCR AS Maths 2017 Pure Maths

ID 8048: Exponentials and Logarithms : Exponential Functions : The graph of a

OCR AS Maths 2017 Pure Maths

ID 8047: Graphs and Transformations : Transformations : Some More y=af(x) Examples

OCR AS Maths 2017 Pure Maths

OCR AS Maths 2017 Pure Maths

ID 1036: Inequalities and Polynomials : Factor Theorem : Visualise Factor Theorem 2

OCR AS Maths 2017 Pure Maths

ID 8187: Exponentials and Logarithms : Logarithm Basics and Laws : Law: a log(b)=log(b

^{a})OCR AS Maths 2017 Pure Maths

ID 8186: Exponentials and Logarithms : Logarithm Basics and Laws : Law: log(

^{a}/_{b})=log(a)-log(b)OCR AS Maths 2017 Pure Maths

ID 8184: Exponentials and Logarithms : Logarithm Basics and Laws : Law: log(ab)=log(a)+log(b)

OCR AS Maths 2017 Pure Maths

ID 5045: Discrete and Binomial Distributions : Permutations and Combinations : Factorials

OCR AS Maths 2017 Statistics

ID 5044: Binomial Expansion : Binomial Expansion : Factorial

OCR AS Maths 2017 Pure Maths

ID 8057: Differentiation Basics : Gradients : The graph of y = x³

OCR AS Maths 2017 Pure Maths

ID 8056: Differentiation Basics : Gradients : Straight v curved

OCR AS Maths 2017 Pure Maths

ID 8050: Differentiation Basics : Gradients : The graph of y = x²

OCR AS Maths 2017 Pure Maths

ID 8048: Exponentials and Logarithms : Exponential Functions : The graph of a

^{x}OCR AS Maths 2017 Pure Maths

ID 8047: Graphs and Transformations : Transformations : Some More y=af(x) Examples

OCR AS Maths 2017 Pure Maths

How exam papers are marked

Get advice from examiners and some tips on improving your exam technique - particularly how to avoid zero marks!

Get advice from examiners and some tips on improving your exam technique - particularly how to avoid zero marks!

Mathematicians

Read brief biographies of famous Mathematicians who were instrumental in creating advanced mathematics.

Read brief biographies of famous Mathematicians who were instrumental in creating advanced mathematics.

Interactive glossary

Check the meaning of words and phrases used throughout your course. A relevant glossary also appears on each page.

Check the meaning of words and phrases used throughout your course. A relevant glossary also appears on each page.