Transcript

INSTRUCTOR:

Mathematical cakes, a diagrammatic representation of the equivalence of fractions, decimals, and percentages. Here is a mathematical cake, which is rectangular in shape and split into 10 equal slices. We'll consider the percentages first the whole cake is 100%. so one slice must be 100% divided by 10, or 10%. No slices is 0%, one slice is 10%, two slices are 20%, three slices of 30%, and so on and one whole cake is 100%.

Next the decimals, the whole cake is 1.0. So each slice must be 1.0 divided by 10, which is 0.1. No slices is 0.0, one slice is 0.1. two slices are 0.2, three slices are 0.3, and so on. And the whole cake is 1.0.

Finally, the fractions, the whole cake is one whole, so each slice must be 1/10. No slices is 0, one slice is 1/10, two slices are 2/10, three slices are 3/10, and so on. And the whole cake is one whole.

Some of these fractions have equivalent simpler fractions. 5/10 is half of the cake. And that can be seen to be equivalent to 0.5 and 50%. 3/10 is 0.3 and 30%. and 60% is equivalent to 0.6 and 6/10, which can be simplified to 3/5.

You can easily read across to find equivalences from the diagram. The fractions, decimals, and percentages shown on the diagram are some of the important equivalences to know. Supposing you wanted to find out 1/4 from this diagram, how would you find where 1/4 is and work out its equivalences in decimals and percentages? What would you do about 3/4?