The development of NRICH Secondary resources is informed by the following beliefs:
- People are naturally curious about mathematics.
- Gaining mathematical understanding is intrinsically satisfying.
- There are many ways of working mathematically.
- Mathematics is a worthwhile, interesting intellectual activity.
- Truth in mathematics is established by deductive reasoning rather than empirical evidence or opinion.
- Mathematics has order and structure and can be beautiful.
- Exchanging questions and ideas is an important part of working mathematically.
- We learn by reflecting on our mistakes and misconceptions.
Growth Mindset and Determination
- A person's mathematical ability is not fixed: everyone can make progress.
- Everyone should have the opportunity to grapple with problems that they do not yet know how to solve.
- Eveyone should have the opportunity to succeed mathematically.
This leads us to believe that all learners are entitled to:
- a rich mathematical learning experience
- assessment criteria that offer them opportunities to succeed
- a challenging mathematical curriculum which offers them opportunities to struggle
NRICH aims to offer free resources for teachers who are committed to nurturing curious, confident, resourceful and enthusiastic learners of mathematics. To find out more, see Enriching the Secondary Curriculum.
Our beliefs are informed by articles, books, videos and research.
This article by Colin Foster presents the idea of mathematical etudes as a way to develop fluency without tedium.
Why Play I Spy When You Can Do Mathematics?
Robert Andrews and Paul Andrews have some conversations about mathematics.
Angle Measurement: an Opportunity for Equity
Paul Andrews attempts to establish a principle of worthwhile mathematical activity for all pupils.
Tasks Promoting Inquiry
A video of a talk Dan Meyer gave to a group of teachers in Cambridge.
Models for Teaching Mathematics
Alan Wigley invites us to take a closer look at the curriculum we offer to learners of mathematics. He questions whether it is the job of the teacher to make it easy for students.
Relational Understanding and Instrumental Understanding
Here is a selection which may interest you:
Richard Skemp draws attention to the need to teach for relational understanding (whereby students know what to do and are able to explain why) rather than instrumental understanding (whereby students know rules and procedures without understanding why they work).
Three linked articles by Dave Hewitt:
Arbitrary and Necessary Part 1: A Way of Viewing the Mathematics Curriculum
Arbitrary and Necessary Part 2: Assisting Memory
Arbitrary and Necessary Part 3: Educating Awareness
Train Spotters' Paradise
Dave Hewitt alerts us to 'the richness that can be gained by looking at a particular situation in some depth, rather than looking at it superficially in order to get a result for a table and then rushing on to the next example'.
Mathematics is beautiful (no, really)
Vicky Neale encourages us to offer students the opportunity to engage with rich questions, play with mathematical ideas, and experience multiple strategies to the same question rather than just getting the answer in the back of the textbook and moving on.
An Exploratory Approach to Advanced Mathematics
Kenneth Ruthven outlines a three-part approach to the teaching and learning of mathematics (exploration, codification, consolidation).
Learning and Doing Mathematics
by John Mason
by John Mason, Leone Burton and Kaye Stacey
Mathematics as human activity: a different handshakes problem
by Tim Rowland
Complex Instruction - Raising Achievement Through Group Worthy Tasks
Jo Boaler's research on the benefits of collaborative work in the classroom including a video clip of students working collaboratively.
Improving Reasoning: Analysing Alternative Approaches
Malcolm Swan describes a teaching approach designed to improve the quality of students' reasoning.
Mindset and Determination
Boosting Achievement with Messages that Motivate
Carol Dweck draws attention to fixed and growth mindsets, and what we do as teachers to reinforce them.
How Children Fail by John Holt
In particular, the section "October 1, 1959" where John Holt describes seeing Dr Gattegno teach a group of students. (p156-163 in 1990 edition. Extract also available online, see pages 94-98 of this
The power of believing that you can improve - TED Talk by Carol Dweck
Horizon: Fermat's Last Theorem
In this film mathematician Andrew Wiles talks about his personal experience of seeking a proof of Fermat's Last Theorem.
Mindset: How you can fulfil your potential by Carol S Dweck
Approaches to learning and teaching Mathematics
by members of the NRICH team
The Role of the Teacher
by David Wheeler
Building Learning Power
by Guy Claxton
- Project co-founded by Jo Boaler at Stanford University, with resources and articles supporting growth mindsets and effective teaching
Habits of Mind: an organizing principle for mathematics curriculum
by Al Cuoco, E. Paul Goldenberg & June Mark