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Yr 10 Unit 8 – Algebra – Foundation - Algebraic Proofs
2 lessons
Support Objectives
Grade
Ref
Grade
E
Ref
F2.1j
D
F2.1j
D
F2.1j
Grade
C
Ref
F2.1l
C
F2.1k
1
2
Core Objectives
1 Decide with a reason whether a simple statement is true or
false.
AQA Foundation book II pages 225 – 228.
2 Decide with a reason whether a harder statement is true or
false.
AQA Foundation book II pages 225 – 228.
3 Identify a counter example.
AQA Foundation book II pages 225 – 228.
Extension Objectives
1 Understand the difference between a demonstration and a
proof.
AQA Foundation book II pages 225 – 228.
2 Show step – by – step deductions in proving a basic algebraic
explanation.
AQA Foundation book II pages 225 – 228.
Student Self Assessment Sheet
Objectives
Grade
1
2
3
4
5
Decide with a reason whether a simple statement is
true or false.
Decide with a reason whether a harder statement is
true or false.
Identify a counter example.
Understand the difference between a
demonstration and a proof.
Show step – by – step deductions in proving a basic
algebraic explanation.
Vocabulary
Sum
Counter example
Theorem
Product
Proof
  
E
D
D
C
C
Consecutive numbers
Prove
Ideas for starters
1) Provide definitions of:
- Odd and even numbers
- Prime numbers
- Factors and multiples
- Square and cube numbers
- Consecutive numbers
2) If a is any whole number, what can you say about:
2a
3a
5a
3a + 3
5a + 5
2a – 1
2a + 2
3) Practise:
O+O=E
E+E=E
ExO=E
O+E=O
OxO=O
ExE=E
2a + 1
5a + 10
E+O=O
OxE=E
4) Explore consecutive numbers through questions such as:
* What two numbers are consecutive to 15?
* What can you say about any two / three / four … consecutive numbers?
* What can you say about the sum of any two / three consecutive numbers?
* What can you say about the product of two consecutive numbers?
* Find two consecutive numbers whose sum is 9 etc.
* What numbers cannot be made using two / three consecutive numbers?
* What numbers can be made using products of consecutive numbers?
5) Undertake some research on divisibility rules.
HOLS/maths investigations
ICT links / citizenship
Ideas for plenaries
1) Provide definitions of:
- Odd and even numbers
- Prime numbers
- Factors and multiples
- Square and cube numbers
- Consecutive numbers
2) Practise:
O+O=E
E+E=E
ExO=E
O+E=O
OxO=O
ExE=E
E+O=O
OxE=E
3) Identify exceptions to the following statements:
* All prime numbers are odd.
* All numbers have an even numbers of factors.
* The square of a number is always bigger than the number itself.
* The cube of a number is always bigger than the number itself.
* The square root of a number is always smaller than the umber itself.
* The cube root of a number is always smaller than the number itself.
Ideas for homework
1) AQA Foundation homework book II pages 103 - 105 homework 1.
Ideas for Formative Comments
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