compare the models for 1/3 and 2/6. How does the number of parts relate to the size of the parts.

To compare the models for 1/3 and 2/6, we need to understand how the number of parts relates to the size of the parts.

First, let's consider 1/3. This fraction represents dividing a whole into 3 equal parts and selecting one of those parts. If you were to visually represent this fraction, you would draw a whole shape, such as a circle or a rectangle, and divide it into three equal sections. One of those sections would represent 1/3.

Now let's move on to 2/6. This fraction also represents dividing a whole into 6 equal parts, but selecting two of those parts. Visually, you would draw a whole shape and divide it into six equal sections. Then you would shade or mark two of those sections to represent 2/6.

Comparing the models, we can see that in both cases, a whole is divided into equal parts. However, the difference lies in the number of selected parts.

In the case of 1/3, out of the three equal parts, only one is selected. This means each selected part is larger compared to 2/6, where two out of the six equal parts are selected. In other words, selecting two parts out of six results in smaller individual parts compared to selecting one part out of three.

Therefore, when comparing the models for 1/3 and 2/6, we can say that as the number of parts increases while keeping the division of the whole equal, the size of each individual part decreases.

What do you think?

i think you have to add 1/3 to 2/6 and that is how you get your answer