Square Deal
- maker:
- Pat Ashforth
This image is released under a CC BY-NC-SA 4.0
Licence
Buy this image as a print
BuyLicense this image for commercial use at Science and Society Picture Library
LicenseThis image is released under a CC BY-NC-SA 4.0
Licence
Buy this image as a print
BuyLicense this image for commercial use at Science and Society Picture Library
LicenseThis image is released under a CC BY-NC-SA 4.0
Licence
Buy this image as a print
BuyLicense this image for commercial use at Science and Society Picture Library
LicenseThis image is released under a CC BY-NC-SA 4.0
Licence
Buy this image as a print
BuyLicense this image for commercial use at Science and Society Picture Library
LicenseThis image is released under a CC BY-NC-SA 4.0
Licence
Buy this image as a print
BuyLicense this image for commercial use at Science and Society Picture Library
License'Square Deal' woollen knitting 91x83cm showing minimum number
Science Museum Group
© The Board of Trustees of the Science Museum
'Square Deal' woollen knitting 91x83cm showing minimum number
Science Museum Group Collection
© The Board of Trustees of the Science Museum
'Square Deal' woollen knitting 91x83cm showing minimum number
Science Museum Group Collection
© The Board of Trustees of the Science Museum
'Square Deal' woollen knitting 91x83cm showing minimum number
Science Museum Group Collection
© The Board of Trustees of the Science Museum
'Square Deal' woollen knitting 91x83cm showing minimum number
Science Museum Group Collection
© The Board of Trustees of the Science Museum
'Square Deal' woollen knitting 91x83cm showing minimum number of squares of different sizes in a square, 1996.
The acrylic knitting shows the minimum number of squares of different sizes that can be fitted into a square. A square which can be dissected into a number of smaller squares with no two equal is known as a perfect square dissection. It was thought they were impossible to construct, until T H Wilcox published a 24-square solution in Fairy Chess Review in 1948. Thirty years later a smaller version was discovered by A J W Duijvestijn in which 21 squares of different sizes were fitted into a square. It is this solution that Ashforth has reproduced.
Details
- Category:
- Mathematics
- Object Number:
- 1997-223
- Materials:
- acrylic fibre
- Measurements:
-
overall: 4 x 910 x 830 mm
- type:
- knitting (mathematical)
- credit:
- Ashforth, Pat
