Transforming Teacher Learning to Student Learning
Sue Lampkin - Mountain View, California - Kenneth E. Slater Elementary School
What first grade math teachers need to know

Problem Solving
Applying math knowledge to teaching practice

Looking closely at student learning

Faculty learning in collaboration

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Sue Lampkin and Slater School

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Case Development:
The Carnegie Foundation for the Advancement of Teaching

In any endeavor it’s important to know why you’re doing what you're doing.  This is no different.  To the unpracticed eye, addition and subtraction problems are pretty much the same, although they may be phrased slightly differently from time to time.  However, I’ve come to learn that these differences are really huge in the minds of my young math students and absolutely crucial to for me to understand in order to perceive of what my students are thinking!

more from Sue

The essential elements of addition and subtraction:

Addition/Subtraction Concept Example of Math Problems Related to Concept Also consider...

increasing

Basic: I had three shells in my bucket. I put two more shells in my bucket. How many shells are in my bucket now?

number model: 3 + 2 = ___

Intermediate: Twenty-five children are riding on the bus. At the next stop, 5 more children get on. How many children are on the bus now?

This concept can also be framed as "change to more." The Univ. of Chicago Math Project diagrams the concept this way:

 25 ? start change end

important variation...

decreasing

Basic: I had five shells in my bucket. I threw two shells back into the bay. How many shells are in my bucket now?

number model: 5 – 2 = ___

Intermediate: A bus leaves school with 35 children. At the first stop, 6 children get off. How many children are left on the bus?

number model: 35 – 6 = ___

The situations to the left can also be considered "change to less" problems and diagrammed as:

 35 ? start change end

important variation...

combining

Basic: I put three shells in my bucket and my brother put two shells in my bucket. How many shells are in my bucket now?

number model: 3 + 2 = ___

Intermediate: Twelve fourth graders and 15 first graders are on the bus. How many children are on the bus?

number model: 12 + 15 = ___

This raises the idea of total. We can frame this concept by calling it "parts and total" as diagrammed here with the bus problem's data:

 Total ? Part Part 12 15

separating

Basic: I have five shells in my bucket. Three of them are mine, and the rest of them are Bill's. How many of the shells belong to Bill?

number models:
5 – 3 = ___
3 + ___ = 5

Intermediate: Thirty-five children are riding on the bus. Twenty of them are boys. How many girls are riding on the bus?

number models:
35 – 20 = ___
20 + ___ = 35

Here is a similar problem, but the total is known and one of the parts is unknown.

 Total 35 Part Part 20 ?

important variation...

comparing

Basic: Bill has three shells in his bucket. I have two more shells than Bill. How many shells do I have in my bucket?

number model: 3 + 2 = ___

Intermediate: I know that I am four inches taller than my younger brother. If he is 41 inches tall, how tall am I?

number model: 41 + 4 = ___

What is so different here is that we are now working with two quantities! In this particular comparison situation, the smaller quantity and the difference are known:
 Quantity ?
 Quantity Difference 41 4

important variation...

finding the difference

Basic: I have five shells and Bill has three. How many more shells do I have than Bill?

number models:
5 – 3 = ___
3 + ___ = 5

number models:
12 – 8 = ___
8 + ___ = 12

Most comparison situations are not like the one shown above. Instead, we are more often determining the difference between two quantities:

 Quantity 12
 Quantity Difference 8 ?

Liping Ma organizes problem types in such a way that addition serves as a bridge to subtraction.