Table of Contents

Navigate back to the activity.

Navigate back to the Symmetries and Idealizations Course Page.

Internal Energy of the "Derivative Machine": Instructor's Guide

Main Ideas

• Integration as “accumulating pieces”

• Measuring integrals experimentally

Students' Task

Estimated Time:

Prerequisite Knowledge

Props/Equipment

Activity: Introduction

The following prompts can be used to begin this activity:

This activity serves as an introduction to experimentally measuring an integral. Students are asked to determine the internal energy, $U$, of the system at several locations. This integration can be done by approximating the internal energy as $U=\int Fdx\approx\sum F_{i}\Delta x_i$. This requires students to choose a starting point, or zero point, for internal energy of the system and then add up, incrementally, the force at each small change in distance. This type of integration is numerical rather than the typical integration students perform with formulas. By doing integration numerically, the idea of integration as a way of adding up small changes is emphasized.

Activity: Student Conversations

Activity: Wrap-up

A whole class discussion can follow about measuring integrals experimentally and different representations of integration.

An alternative wrap-up can be in a homework problem where students write a brief report on how to calculate the internal energy of their system using the data that was collected in class.

Extensions

This is the initial activity within a sequence of activities addressing Scalar Integration in Curvilinear Coordinates. The following activities are included within this sequence: