92 ◆ Reasoning About Problems
Mike had some beans. Three were white beans. There were twice as
many butter beans as white beans. There were 2 fewer black beans
than white beans. How many of each bean was there? How many
beans were there altogether?Figure 6.4 2-Bean Salad Problem
There are 2 types of beans.
There are 3 times as many red
beans as white beans. There are
15 red beans. How many white
beans are there? How many
beans are there altogether?- Use the beans to solve.
2. Draw a sketch of the
beans.
3. Make the sketch a bar
diagram.
Figure 6.5 3-Bean Salad ProblemThere are 10 beans. Half of
them are red beans;^1 ⁄ 5 of them
are white beans. The rest are
black-eyed peas. How many
beans of each are there?- Use the beans to solve.
2. Draw a sketch of the
beans.
3. Make a bar diagram.
Step 1: Act out the bean problem.
Step 2: Draw out the beans.
Step 3: Put the beans in a rectangle.engaging, hands-on and rigorous. Students start out with simple prob-
lems that get progressively more difficult. See Figures 6.4 and 6.5 for
examples.
The absolutely most fantastic thing about the 2- and 3-bean problems
is that they scaffold nicely into a bar diagram. So, the students solve with
the beans. Then they draw a picture of what they solved. Then they put
a rectangle around that picture. Then they take out the beans and just put
numbers and label the rectangles. Voila! A bar diagram. Of course, you
don’t teach all of this at once. But you scaffold into the bar diagram (see
Figures 6.6 and 6.7).