类别 全部 - mathematics - background - students - learning

作者:Mikayla Smith 8 年以前

170

Experiencing the change: The mathematics of change in multiple environments

The article explores how changes in the learning environment can influence students' mathematical learning. It examines various factors, such as family resemblances and the students'

Experiencing the change: The mathematics of change in multiple environments

Experiencing the change: The mathematics of change in multiple environments

3-4 sentence summary in my own words.

They wanted to figure out how students learned better in a change of environment. They looked at many different aspects, including family resemblances. They looked at the situation in several different ways, and found that it depended on the students background and lie experience.

Questions I still have after reading this article.

How can you encourage the multiple environments needed to a student or class?
Why don't more teachers focus on making the classroom the best mathematical learning environment?

What are the main findings/topics?

One of the main topics was about researchers showing perspective in family resemblances based on how the student may learn.
It can depend on the students background and experience.
Mathematical environments can be lived in places.

What do you already know about the article just reading the title? Some initial thoughts.

I know that teachers need to be able to adapt to the way that students learn in different environments.
I know that students learn mathematics in several different environments.

What can you take away from the article to make your future math classroom successful?

Help students make connections with their learning environment
To watch for students that need extra help finding their learning environment and to help guide them in their mathematics problems.
That I must adjust to my students needs in order for them to learn to their greatest ability.

What are the ideas/hypotheses the article will explore?

They want to recognize an environment that connects to mathematical learning.
They propose an alternative way of learning

What is the articles guiding question(s)?

How do students make connections among different environments?
How can these multiple environemnts be used to help students learn mathemaics?