Updating search results...

Search Resources

4 Results

View
Selected filters:
  • formula
Algebra Toothpick Patterns
Conditional Remix & Share Permitted
CC BY-NC-SA
Rating
0.0 stars

In this lesson, toothpick patterns are used to explore growth patterns. Students are asked to extend patterns using toothpicks, drawing, and numbers. By observing patterns, students will strengthen their ability to represent real-world patterns to the abstract language of algebra.

Subject:
Mathematics
Material Type:
Lesson Plan
Date Added:
02/12/2016
Let's Take a Slice of Pi
Read the Fine Print
Educational Use
Rating
0.0 stars

Working as a team, students discover that the value of pi (3.1415926...) is a constant and applies to all different sized circles. The team builds a basic robot and programs it to travel in a circular motion. A marker attached to the robot chassis draws a circle on the ground as the robot travels the programmed circular path. Students measure the circle's circumference and diameter and calculate pi by dividing the circumference by the diameter. They discover the pi and circumference relationship; the circumference of a circle divided by the diameter is the value of pi.

Subject:
Applied Science
Computing and Information
Engineering
Mathematics
Technology
Material Type:
Activity/Lab
Provider:
TeachEngineering
Provider Set:
TeachEngineering
Author:
Carole Chen
Michael Hernandez
Date Added:
09/18/2014
Logic II
Conditional Remix & Share Permitted
CC BY-NC-SA
Rating
0.0 stars

This course begins with an introduction to the theory of computability, then proceeds to a detailed study of its most illustrious result: Kurt Gödel’s theorem that, for any system of true arithmetical statements we might propose as an axiomatic basis for proving truths of arithmetic, there will be some arithmetical statements that we can recognize as true even though they don’t follow from the system of axioms. In my opinion, which is widely shared, this is the most important single result in the entire history of logic, important not only on its own right but for the many applications of the technique by which it’s proved. We’ll discuss some of these applications, among them: Church’s theorem that there is no algorithm for deciding when a formula is valid in the predicate calculus; Tarski’s theorem that the set of true sentence of a language isn’t definable within that language; and Gödel’s second incompleteness theorem, which says that no consistent system of axioms can prove its own consistency.

Subject:
Applied Science
Arts and Humanities
Computer Science
Engineering
Mathematics
Philosophy
Material Type:
Full Course
Provider Set:
MIT OpenCourseWare
Author:
McGee, Vann
Date Added:
02/01/2004
The Optimization of Slime
Read the Fine Print
Educational Use
Rating
0.0 stars

Using their knowledge of the phases of matter, the scientific method, and polymers, student teams work as if they are chemical engineers to optimize the formula for slime. Hired by the fictional company, Slime Productions, students are challenged to modify the chemical composition of the basic formula for slime to maximize its "bounce factor."

Subject:
Applied Science
Chemistry
Engineering
Physical Science
Material Type:
Activity/Lab
Provider:
TeachEngineering
Provider Set:
TeachEngineering
Author:
Leslie Stiles
Date Added:
09/18/2014