Intent
The 2014 National Curriculum for Maths aims to ensure that all children:
- Become fluent in the fundamentals of Mathematics
- Are able to reason mathematically
- Can solve problems by applying their Mathematics
At St-Monica’s, these skills are embedded within Maths lessons and developed
consistently over time. We are committed to ensuring that children are able to recognise the importance of Maths in the wider world and that they are also able to use their mathematical skills and knowledge confidently in their lives in a range of different contexts.
We want all children to enjoy Mathematics and to experience success in the subject, with the ability to reason mathematically. We are committed to developing children’s curiosity about
the subject, as well as an appreciation of the beauty and power of Mathematics.
Implement
The content and principles underpinning the 2014 Mathematics curriculum and the Maths
curriculum at St-Monica’s reflect those found in high-performing education systems
internationally. These principles and features characterise this approach and convey how our curriculum is implemented:
- Teachers reinforce an expectation that all children are capable of achieving high standards in Mathematics.
- The large majority of children progress through the curriculum content at the same pace; significant time is spent developing deep knowledge of the key ideas that are needed to underpin future learning. This ensures that all can master concepts before moving to the next part of the curriculum sequence, allowing no pupil to be left behind.
- The structure and connections within the mathematics are emphasised, so that pupils develop deep learning that can be sustained.
- Lesson design identifies the new mathematics that is to be taught, the key points, the difficult points and a carefully sequenced journey through the learning. In a typical lesson pupils sit facing the teacher and the teacher leads back and forth interaction, including questioning, short tasks, explanation, demonstration, and discussion.
- Practice and consolidation play a central role. Carefully designed variation within this builds fluency and understanding of underlying mathematical concepts.
- Teachers use precise questioning in class to test conceptual and procedural knowledge and assess children regularly to identify those requiring intervention, so that all children keep up.
- Children’s explanations and their proficiency in articulating mathematical reasoning, with the precise use of mathematical vocabulary, are supported through the use of stem sentences and generalisations provided by the teacher. These help the children to make connections and expose the structure of the maths.
Stem sentence example:
Greater or Smaller?
-
The greater the numerator is in a set of fractions with the same denominator, the
_____, the fraction. -
The higher the denominator of a unit fraction, the ______, the fraction.
Generalisation example:
-
The length of one side of the square can be found by dividing its perimeter by 4.
· Key facts, such as multiplication tables and addition facts within 10, are learnt to
automaticity to avoid cognitive overload in the working memory and enable pupils to
focus on new concepts.
To ensure whole consistency and progression, the school uses the nationally recognised White Rose Maths scheme. The White Rose curriculum is a cumulative curriculum, so that once a topic is covered, it is met many times again in other contexts. For example, place value is revisited in addition and subtraction and multiplication and division. The curriculum recognises the importance of children’s conceptual understanding of number. It is therefore designed to ensure that time is invested in reinforcing this to build competency.
Lessons are planned to provide plenty of opportunities to build reasoning and problem solving elements into the curriculum. When introduced to a new concept, children have the opportunity to use concrete objects and manipulatives to help them understand what they are doing. Alongside this, children are encouraged to use pictorial representations. These representations can then be used to help reason and solve problems. Both concrete and pictorial representations support children’s understanding of abstract methods.
Mathematical topics are taught in blocks, to enable the achievement of ‘mastery’ over time. These teaching blocks are broken down into smaller steps, to help children understand concepts better. This approach means that children do not cover too many concepts at once which can lead to cognitive overload.
Impact
The school has a supportive ethos and our approaches supports the children in developing their collaborative and independent skills, as well as empathy and the need to recognise the achievement of others. Students can underperform in Mathematics because they think they cannot do it or are not naturally good at it. The school’s use of White Rose Maths addresses these preconceptions by ensuring that all children experience challenge and success in Mathematics by developing a growth mindset.
- Regular and ongoing assessment informs teaching.
- Monitoring of teaching and learning shows evidence of good staff knowledge and understanding of the concepts being taught.
- Vocabulary is being modelled consistently in most lessons and pupils expected to use the correct mathematical terminology.
- Pupils’ work in books consistently shows evidence of opportunities for fluency, reasoning and problem solving.
- Past learning is repeatedly revisited which enables pupils to recall and build upon work from previous years.
If you were to walk into a mathematics lesson at St-Monica’s, you would see:
- Opportunities for pupils to recap previous learning.
- Discussions of a mathematical problem as a pair, group or class.
- Adults modelling key vocabulary consistently and pupils expected to use the same when explaining their understanding.
- Pupils having the chance to share their answers with each other and provide feedback
- Adults using questioning to support and challenge pupils’ learning.