Which is the most pleasing rectangle?
My good friend William Emeny of Great Maths Teaching Ideas has a survey on the most pleasing rectangle.
You are all welcome to participate. Please cast your vote here.
School math, multimedia, and technology tutorials.
My good friend William Emeny of Great Maths Teaching Ideas has a survey on the most pleasing rectangle.
You are all welcome to participate. Please cast your vote here.
In tossing a fair coin, there are only two possible outcomes, a Head (H) and a Tail (T). If we let S be the set of all possible outcomes of this event, then, we write the set of possible outcomes as S = {H,T}.
If two fair coins are tossed, then the outcomes can be both heads {H,H} or both tails {T,T}. It can also be a head first then a tail {H,T}, or a tail first and then a head {T,H}. So, in tossing two coins, we have the set of possible outcomes S = {{T,T}, {T,H}, {H,T}, {H,H}}.
As the number of tosses increases, listing gets more difficult. One of the strategies that can be used to remedy this problem is by creating a tree diagram. The following problem is solved using a tree diagram. Notice that it is a three-coin tossing problem in disguise (try replacing B with H and G with T). » Read more
Michael Blake integrates mathematics with music as he interprets the sound of pi ().
I think this only shows that we can just pick random notes and still create beautiful music. You may also want to listen to the musical beauty of .