The really useful maths book

O1: Number lines

page 64

Singapore Bar Model

John Bessant and Phil Bagge “Number Lines and Vertical Methods” Maths Video Help Files

page 67

Henry Liebling“Using an Urdhu Number Grid” [View T14]

O2: The story of 24

Rudy Rucker, author of Mind Tools

Factors of 24 and templates for number sentences available in the Resources section

O3: Arithmetic operations

More ideas page 77

Possible resources to choose from:

• number line or track
• time line
• blank number line
• number grid
• fingers
• number cards
• Cuisenaire rods
• multilink or cubes
• teddy counters
• base 10 equipment
• money
• bundles of straws, etc.

More ideas page 79

Countdown

More ideas page 81

The Treviso Arithmetic contained the first printed version of the Gelosia (Lattice) method of multiplication

“In the footsteps of mathematics” blog explains the history of this method

Russian Peasant method of multiplication

Ancient Egyptian method

John Napier “Napier’s Bones”

For more on Rudolf Steiner’s “Robber Sum” and other methods of teaching arithmetic see here

page 84

Here are some solutions to “All the Fours”.

If 4/4 = 1 then it is possible to make any number. 5 = 4/4 + 4/4 + 4/4 + 4/4 + 4/4

Better would be 5 = 4 + 4/4

4 x 4 = 16 so 9 could be 4 x 4/√4 + 4/4

Try to find the most elegant solutions.

! is the factorial sign, so 4! = 4 x 3 x 2 x 1 = 24

√ is the “square root” sign, so √16 = 4, √25 = 5, √4 = 2

These signs could be used like this: 8 = 4 x √4 or 6 = 4!/4

page 86

Conversion site and apps.

O4: Arithmogons and other puzzles

page 88

More Arithmogons: Examples of subtraction and multiplication [View]

More ideas

Arithmogons and pyramids are available in the Resources section

Blank arithmogons and pyramids are available in the Resources section

Hungarian puzzles are available in the Resources section

Japanese puzzles are available in the Resources section

page 95

These puzzles are based on resources from CIMT Maths Enhancement Programme

O5: Teaching multiplication tables

page 102

Truth tables for odd and even for all four operations, and strings of operations [View]

page 103

Loop Cards [View]

O6: Divisibility rules

Vedic maths and Trachtenberg speed methods. You and your students might be interested in shortcuts for calculations. Sometimes they make the concept of multiplication clearer, but sometimes they complicate and confuse.

A Russian pacifist, Jacow Trachtenberg developed a complete set of arithmetic shortcuts, which rely on doubling, halving, addition and subtraction, in a Nazi concentration camp during the World War II. His book of arithmetic shortcuts “Trachtenberg speed system of basic Maths” was published after the end of World War II in the 1940s. Read about his amazing story. You could try the “Trachtenberg speed system” iPhone app

Bharti Krishna Tirthaji, a Hindu nationalist, wrote “Vedic Mathematics” in 1957, and it was published in English in 1965. It often uses an algebraic method such as (a + b)(c + d) = ac + bc + ad + bd which, as vertical method, makes a pattern I x I. Some good examples of the method can be found on YouTube. The origins of Vedic Maths are, however, disputed.

See also Chisanbop (Korean finger counting), and the mental abacus