F-10 Curriculum (V8)
F-10 Curriculum (V9)
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Space Race is a simple board game that teachers can use to introduce the concept of algorithmic sequencing to students. The teaching points provided with the game assist teachers to introduce the use of an algorithm (a simple set of mathematical instructions) to describe the trajectory of an object across a grid plane from ...
This video explores the use of computation strategies, rounding and estimation in real-world, additive situations. Use the video with the supporting teacher guide as a springboard to explore mathematical concepts. A range of strategies such as compensation and partitioning are demonstrated. Estimation and rounding are highlighted ...
Decrypt the ancient cipher box used by Julius Caesar over 2,000 years ago! By shifting the alphabet or replacing one letter for another further down the alphabetical sequence, you can crack a coded message. The secret to a cipher is one special piece of shared information, known as a key. This shared key is required for ...
Selected links to a range of interactive online resources for the study of patterns and algebra in Foundation to Year 6 Mathematics.
This learning object is designed around a series of videos with Lisa Shanahan, author, and Emma Quay, illustrator, including a reading experience of their collaborative work, Bear and Chook by the Sea. Taken as a whole, this sequence of lessons is a Stage 1 unit of work that results in students working in pairs to produce ...
In this sequence students plan, create and edit a program that will ask maths questions that are harder or easier depending on user performance.
Do you know what a fractal is? Basically, fractals are never-ending patterns created by repeated mathematical equations. In this clip, Yuliya, a student at MIT (in the USA) describes the properties of fractals and shows you where they can be found in technology and nature. Have a good look at the world around you and see ...
Do you know how to recognise a fractal? Watch this video to find out! What are the examples given of fractals found in nature? Can you think of any others? Why not have a go at doing your own drawing of the Sierpinski Triangle?
Learn programming skills by snapping together programming blocks. Make characters walk, jump, dance and sing. Add your own voice or modify your own characters and make your own interactive story. Free when reviewed on 12/5/2015.
This resource is a web page containing a sample flow chart. The flow chart shows multiple pathways depending on the answer to questions identified as a decision (diamond shape). A printable resource is also available to support the task. This resource is an activity from the NRICH website.
Learn programming skills by animating characters in the puzzle levels. Use your new programming skills to create interactions between characters in the 'toy box' area. Free when reviewed on 12/5/2015.
This learning sequence Buzzing with Bee-Bots can be used to develop foundation skills in computational thinking and to develop an awareness of personal experiences using digital technologies. Students follow and describe a series of steps to program a floor robot. They plan a route to program a robot to follow a path and ...
In this sequence students implement a digital solution for a maths quiz. They test and assess how well it works.
In this lesson sequence, students use big data sets and school surveys, to design (and as an extension activity, make) a new digital communication solution for the school.
Make some music by building up rhythms from four instruments. Make a counting rule that matches a pattern on a number line. Select the start number and then select a number to count by. For example, describe a sound pattern where a saxophone waits on the first note, and then plays on every eighth note. Add a second number ...
Work out how many acrobats are needed to form square-shaped human towers. Start by building a square tower with four acrobats: two acrobats in the base layer and two acrobats standing on their shoulders. Examine a table and graph of the total number of acrobats in the towers. Predict the number of acrobats needed to build ...