Magic SquareArrange the given numbers in a three by three grid to make a magic square. 
Drag the numbers into the green cells to make a magic square.
The totals of each row, column and diagonal should be the same.
Congratulations!
Claim your trophy by clicking on the red button below.
Are there any other ways to make a magic square using these numbers?
Your answer is not correct.
The totals of each row, column and diagonal should be the same. Try again.
3
4
5
6
7
8
9
10
11
This is Magic Square level 3. You can also try:
Level 1
Level 2
Level 4
Level 5
Level 6
Level 7
Level 8


Transum.orgThis web site contains over a thousand free mathematical activities for teachers and pupils. Click here to go to the main page which links to all of the resources available. Please contact me if you have any suggestions or questions. 
More Activities: 

Mathematicians are not the people who find Maths easy; they are the people who enjoy how mystifying, puzzling and hard it is. Are you a mathematician? Comment recorded on the 1 May 'Starter of the Day' page by Phil Anthony, Head of Maths, Stourport High School: "What a brilliant website. We have just started to use the 'starteroftheday' in our yr9 lessons to try them out before we change from a high school to a secondary school in September. This is one of the best resources online we have found. The kids and staff love it. Well done an thank you very much for making my maths lessons more interesting and fun." Comment recorded on the 7 December 'Starter of the Day' page by Cathryn Aldridge, Pells Primary: "I use Starter of the Day as a registration and warmup activity for my Year 6 class. The range of questioning provided is excellent as are some of the images. 


Numeracy"Numeracy is a proficiency which is developed mainly in Mathematics but also in other subjects. It is more than an ability to do basic arithmetic. It involves developing confidence and competence with numbers and measures. It requires understanding of the number system, a repertoire of mathematical techniques, and an inclination and ability to solve quantitative or spatial problems in a range of contexts. Numeracy also demands understanding of the ways in which data are gathered by counting and measuring, and presented in graphs, diagrams, charts and tables." Secondary National Strategy, Mathematics at key stage 3 

Go MathsLearning and understanding Mathematics, at every level, requires learner engagement. Mathematics is not a spectator sport. Sometimes traditional teaching fails to actively involve students. One way to address the problem is through the use of interactive activities and this web site provides many of those. The Go Maths main page links to more activities designed for students in upper Secondary/High school. 

Do you have any comments? It is always useful to receive feedback and helps make this free resource even more useful for those learning Mathematics anywhere in the world. Click here to enter your comments. 
Transum,
Monday, December 2, 2013
"As an extension activity consider the following questions:
How many magic squares are there that contain the numbers 5, 8 and 12? (ignore rotations and reflections).
Is the centre number of a magic square always one third of the row and column totals?
Can you create a magic square using only prime numbers?"
Transum,
Friday, June 2, 2017
"In the year 1514 the German artist Albrecht Dürer created an engraving called Melencolia with a magic square in the background. The image below shows an enlargement of the magic square. The date appears in the bottom row of the magic square.
"
Ian Stewart, Cabinet Of Mathematical Curiosities
Friday, June 2, 2017
"Using consecutive whole numbers and counting rotations and reflections of a given square as being the same there are precisely:
1 magic square of size 3 × 3
880 magic squares of size 4× 4
275,305,224 5×5 magic squares of size 5 × 5.
For the 6×6 case, there are estimated to be approximately 1.77 × 10^{19} squares."
Transum,
Saturday, February 17, 2018
"One method of finding a solution to a puzzle in which the digits one to nine have to be arranged in a particular formation is by trying every different permutation. This strategy however is very time consuming. Even if it only took one second to arrange the numbers and check whether a solution has been found, you would need to allow over one hundred hours to complete the task!
Developing a strategy with some insight or consideration of the number patterns might be a better course of action. Good Luck! "