This is a 6 session programme with multiplicative relationships as the focus. The key learning objectives (evidence based) will be:
Multiplication as relationship
Serpinski shapes
Napier bones/chinese/lattice
multiplication table jigsaw
slide rule
Area multiplication grid
multiplication patterns algebra
Multiplication of tens (twenties etc.)
place value (base 10)
criptarythms times tables
unit circles
digital roots and roots in times tables that coincide
Multiplication as relationship
recall of multiplication facts
ability to represent multiplication facts in different ways
organisation of multiplication facts in tabular and possibly other forms
use of keywords (multiple, factor, prime)
decomposition of composite numbers
Sessions
ability to represent multiplication facts in different ways
organisation of multiplication facts in tabular and possibly other forms
use of keywords (multiple, factor, prime)
decomposition of composite numbers
Sessions
Doubling/halving & tripling/thirding Multiplication and Division by 10, chessboard problem - big numbers and place value - make sliders
Multiplication table - napier bones, lattice method - cuisenaire/commutativity
Multiplication as area and volume - types of number (prime, rectangular, cuboidal, multiple cuboid, cuboid array) dimensions
Prime factor decomposition - hundred square analysis
Number characters - primes as building blocks
Multiplication of binomial - Cuisenaire squares and rectangles
Serpinski shapes
Napier bones/chinese/lattice
multiplication table jigsaw
slide rule
Area multiplication grid
multiplication patterns algebra
Multiplication of tens (twenties etc.)
place value (base 10)
criptarythms times tables
unit circles
digital roots and roots in times tables that coincide
Cuisenaire rods and squares
Arithmagons
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