tag:blogger.com,1999:blog-8256492698354362046.post1558585373141637059..comments2024-02-27T16:50:02.895+11:00Comments on Authentic Inquiry Maths: Playing with QuadrilateralsBruce Ferringtonhttp://www.blogger.com/profile/07947474361978469990noreply@blogger.comBlogger1125tag:blogger.com,1999:blog-8256492698354362046.post-32138014214482805012012-05-04T22:29:26.313+10:002012-05-04T22:29:26.313+10:00Hello again everyone,
I can see you came up with ...Hello again everyone,<br /><br />I can see you came up with the same solution as me by using quadrilaterals to form a heptagon. I can see our minds work alike. :)<br /><br />I think the solution in making a pentagon is brilliant. As quadrilaterals are any four-sided shapes we must be willing to think outside the square. <br /><br />Sorry about the above pun but I just finished sending a comment to a school looking at puns. :)<br /><br />I can see by the 32-gon, you have also looked at a formula for determining the maximum number of possible sides using quadrilaterals. Maths can be wonderful, especially when we discover shortcuts to speed up calculation.<br /><br />Thanks for sharing another interesting post.<br /><br />@RossMannell<br />Teacher, NSW, Australiarmannellhttps://www.blogger.com/profile/10325881715643049499noreply@blogger.com