Maths Games and Starters Bundle 2024 – KS2
Get ready for a year filled with fun, interactive, and educational maths activities with this Maths Games and Starters Bundle 2024! This comprehensive collection of maths puzzles, games, and starters is designed to captivate and challenge KS2 students while reinforcing key mathematical concepts.
Included in the bundle:
Maths Puzzles and Games from Around the World – KS2 (£2.00)
Archer Maths Starter (Primary) (£2.00)
Black Hole Maths Starter (Primary) (£2.00)
Bunch of Grapes Maths Starter (Primary) (£2.00)
Connector Maths Starter (Primary) (Free)
Cram Maths Starter (Primary) (£2.00)
Dominoes Maths Starter (Primary) (£2.00)
Dots and Boxes Maths Starter (Free)
Hex Maths Starter (Primary) (£2.00)
Ladders Maths Starter (Primary) (Free)
Magic Square Maths Starter (Primary) (£2.00)
Moons and Craters Maths Starter (Primary) (£2.00)
Nim Maths Starter (Primary) (Free)
Reach 1000 Maths Starter (Primary) (Free)
Sim Maths Starter (Primary) (£2.00)
Space Algebra Maths Starter (Year 6) (Free)
Square Maths Starter (Primary) (Free)
Territories Maths Starter (Primary) (£2.00)
The missing triangles starter (primary)
Price:
Free Starters
£2.00 each for paid resources
This bundle covers a wide range of topics, from algebra and geometry to logic puzzles and strategic games, making it perfect for daily starters or fun maths challenges throughout the year. Whether you’re looking for quick starters or full-length games, this bundle has you covered!
The Maths of Ballet – Understanding Angles in Dance! (KS2 Worksheets)
Engage your students with these creative and educational Maths of Ballet Worksheets designed to teach KS2 learners about the four types of angles through the elegant movements of ballet. These worksheets combine maths and dance to help students explore angles in a fun and meaningful way.
What’s included:
Introduction to Four Types of Angles: Worksheets that explain and illustrate the four key types of angles – acute, right, obtuse, and reflex – using easy-to-understand definitions and examples.
Angles in Ballet: Students will explore how these angles are formed in ballet poses and movements, such as arm extensions and foot placements. They will learn to recognize these angles in the human body, connecting geometry to real-life examples.
Identify and Label: Interactive tasks where students identify and label acute, right, obtuse, and reflex angles in various ballet positions. This activity reinforces their understanding of angle types while keeping them engaged.
Drawing Practice: Students will have the opportunity to draw ballet-inspired shapes and angles, allowing them to create their own examples of the four types of angles.
Discussion Questions: Worksheets include reflection questions for students to discuss or write about how maths and dance are connected, encouraging deeper thinking.
These worksheets provide a creative way to learn about angles through the art of ballet, making geometry fun and relevant to students’ everyday lives.
Celebrate the end of the school year with this exciting and interactive End of Year Quiz designed especially for Year 6 students. This quick and fun quiz is a perfect way to reflect on the year’s learning while enjoying some friendly competition.
What’s included:
Multiple-Choice and Short Answer Questions: A mix of question formats keeps the quiz dynamic and suitable for all learners.
Team or Individual Play: Play the quiz as a class in teams, or have students compete individually to see who can score the most points.
Perfect for the Last Week: This quiz is a great way to wrap up the year, reinforce key learning areas, and help students unwind with a fun, educational activity.
Quick and Easy to Run: With everything prepared for you, this quiz requires minimal setup and is an enjoyable way to end the school year on a high note!
Instructions:
Charades is a game of pantomimes: you have to “act out” a phrase without speaking, while the other members of your team try to guess what the phrase is.
The objective is for your team to guess the phrase as quickly as possible.
Divide the players into two teams, preferably of equal size.
Divide the cards between the two teams.
Select a neutral timekeeper/scorekeeper, or pick members from each team to take turns.
Agree on how many rounds to play.
Review the gestures and hand signals and invent any others you deem appropriate.
The team that guesses more cards wins!
Instructions:
On each turn, you mark any box you like, but you must also eliminate an empty neighboring box.
Eliminating a diagonal neighbor is allowed
The winner is whoever creates the largest group of connected marks. (Diagonal connections count)
Play until no more moves are possible
Instructions:
Each player takes it in turns to draw a 2 x 1 (or 1 x 2) rectangle on the grid.
Whoever cannot fit in another rectangle onto the grid loses.
With the tricky grid templates (template 3 onwards), the rectangle must fit perfectly onto two squares.
Instructions:
Each player takes turns rolling two dice
Colour in the number of squares which is equal to the two dice numbers multiplied together
The player with the most squares covered wins
Instructions:
The teacher will roll a dice and read out the number
Children put this number somewhere in the grid
This is done another eight times (until all of the grid is filled out)
Add each of the three numbers in each column to find the total
The number closest to 1000 wins!
Graphing Dance Party: Transform the classroom into a graphing dance party! Each student represents a point on a coordinate grid, and they dance to music while moving along the x-axis and y-axis.
You can make this into a challenge by saying ‘Dancing only allowed in the 1st quadrant.’ The slowest one to move into the correct quadrant is out.
Make it into a team game if you want to make it more competitive. The first team to have all members dancing in a quadrant win a point. First team to ten points wins.
Moons and Craters Maths Starter – A Fun Dice Game for Primary Students!
Turn maths into a fun and creative game with Moons and Craters! This simple dice game helps students practice multiplication, repeated addition, and mental maths while keeping them engaged.
Instructions:
Roll and Draw: One player starts by rolling the die twice. The first roll determines how many moons they will draw, and the second roll determines how many craters to draw for each moon. For example, if a player rolls a 4, they will draw 4 moons, and if they roll a 3 on the next roll, they will draw 3 craters in each moon.
Write the Number Sentence: After drawing, the player writes a multiplication sentence to represent the model. For example, if the rolls were 4 and 3, the player writes 4 x 3 = 12. Alternatively, they can write a repeated addition sentence like 3 + 3 + 3 + 3 = 12.
Scoring: The total from the multiplication or addition sentence is the score for that round (e.g., 12 for this example).
Take Turns: Players take turns rolling the dice, drawing moons and craters, and writing number sentences. Keep a running total of scores for each round.
Winning: After a predetermined number of rounds, the player with the highest (or lowest, depending on the rules) total score wins the game.
This game is a great way to reinforce multiplication and repeated addition, while also encouraging creativity through drawing and friendly competition!
Dominoes Maths Starter – A Fun Strategy Game for Primary Students!
Get your students thinking strategically with this engaging Dominoes Maths game. It’s an exciting way to introduce concepts of space, geometry, and logical thinking.
Instructions:
Set Up: Players take turns filling in pairs of adjacent squares on the grid, as if covering them with a domino (a 1x2 rectangle). These squares are not owned by any player.
Objective: The goal is to claim control of squares by enclosing them. When you place a domino that completes a fence closing off a region with an odd number of squares (1, 3, 5, etc.), you get to claim those squares.
Even Regions Don’t Count: Closing off a region of 2, 4, 6, or 8 squares doesn’t count. You can only claim regions that have an odd number of squares.
Claiming Squares: When you close off a valid region, mark those squares as yours. Continue playing until no more dominoes can be placed.
Winning: The player who claims the most squares by the end of the game wins.
This game is a fun and challenging way to develop spatial awareness, strategy, and logical thinking, while keeping students engaged and motivated.
Hex Maths Starter – A Fun Strategy Game for Primary Students!
Challenge your students with the engaging Hex game, a perfect way to develop logical thinking and spatial strategy skills.
Instructions:
Set Up: Each player chooses a different coloured pencil or marker. Mark two opposite sides of the board as yours, and your opponent colours the remaining two sides with their colour.
Objective: The goal is to create a continuous path of hexagons connecting your two sides of the board.
Taking Turns: On each turn, players take turns colouring in one uncoloured hexagon anywhere on the board.
Claiming Hexagons: Once a hexagon is filled in with a player’s colour, it belongs to them and cannot be changed or used by the other player.
Winning: The first player to successfully create an unbroken path of hexagons between their two sides wins the game.
This game helps students improve their strategic planning while having fun with a visual and competitive challenge. It’s a fantastic maths starter activity that encourages critical thinking and cooperation!
Sim Maths Starter – A Fun Geometry Game for Primary Students!
Kickstart your maths lesson with this exciting and interactive game of Sim, where strategy and geometry come together. This activity is perfect for engaging students while reinforcing key mathematical concepts like shapes and lines.
Instructions:
Set Up: Start by drawing six points on a piece of paper. Arrange them in a way that resembles a regular hexagon.
Taking Turns: Players take turns drawing line segments to connect two of the points. These lines can be straight or curved, but they must not intersect any existing lines on the paper.
Objective: The goal is to avoid forming a triangle with three of your lines.
The Challenge: The game continues as each player carefully connects points, trying not to be the one to complete a triangle with their own lines.
How to Win: The first player to accidentally form a triangle with three of their lines loses the game. The other player is declared the winner.
This game encourages students to think ahead, use strategic planning, and apply basic geometry skills, making it both a fun and educational maths starter for primary learners.
Maths Puzzles and Games from Around the World – KS2
Take your students on a mathematical adventure around the world with this fun and interactive resource! This collection of maths puzzles and games introduces children to different cultures while enhancing their problem-solving and reasoning skills.
What’s included:
International Maths Puzzles: Solve unique maths puzzles inspired by different countries, from African counting sticks to Chinese tangrams and the ancient Indian game of snakes and ladders.
Logic and Strategy Games: Engage students with exciting maths-based games from various cultures, such as the Japanese game of Sudoku and traditional African Mancala. These games help build critical thinking and strategic planning skills.
Hands-on Activities: Printable puzzles and game boards for students to play individually or in groups, making learning both fun and interactive.
Cultural Insights: Each puzzle or game is paired with a short description of its origin, providing students with a glimpse into the history and traditions of other cultures.
Suitable for KS2: These activities are ideal for enhancing maths lessons, supporting cross-curricular learning, and encouraging teamwork in a fun and engaging way.
Fractal Art and the Golden Ratio PowerPoint Lesson – KS2
Introduce your students to the fascinating world of fractal art and the beauty of the Golden Ratio with this engaging and educational PowerPoint lesson. This resource is designed to help children understand the mathematical concepts behind famous artworks like the Mona Lisa and modern fractal art, which combines abstract art and mathematics.
Lesson Features:
An introduction to the Golden Ratio: Learn how this ratio of 1 to 1.618, found in nature and famous artworks, creates pleasing and balanced designs.
A deep dive into fractals: Explore the concept of fractals, coined by Benoit Mandelbrot in 1975, and how fractal patterns are created through simple mathematical equations.
Stunning visuals: See examples of fractal art, which uses vivid colors, precise lines, and self-repeating patterns to resemble natural shapes.
Interactive fractal template: A creative activity where students can design their own fractals using a provided template, fostering both mathematical and artistic skills.
Suitable for KS2: This resource is perfect for introducing key concepts in both mathematics and art, making learning about patterns, geometry, and natural design fun and accessible.
Bonus: Includes a template for students to create their own fractals, helping to reinforce their understanding of patterns, self-similarity, and creativity!
Find included a scaffolded (LA/MA/HA) set of percentages worksheets, suitable for year six.
NC: recall and use equivalences between simple fractions, decimals and percentages, including in different contexts
Find included a hilarious scaffolded SATs area and volume PowerPoint (meme edition!) This scaffolds the questions with funny meme images, suitable for primary school, year six. It will cover all key area and volume concepts that typically appear in SATs, scaffolded with humor and memes to keep students engaged. Each day, the class will aim to get through a set of area and volume questions in preparation for the SATs. Also includes a separate set of HA worksheets on volume and area with model answers.
NC OBJECTIVES:
Calculate, estimate and compare volume of cubes and cuboids using standard units, including cubic centimetres (cm3) and cubic metres (m3), and extending to other units [for example, mm3 and km3].
Recognise that shapes with the same areas can have different perimeters and vice versa
Recognise when it is possible to use formulae for area and volume of shapes
calculate the area of parallelograms and triangles