Matthew McCullagh Quality Manager

AN INTRODUCTION TO MOBIUS STRIPS LEARNING WITH A TWIST AN INTRODUCTION TO MOBIUS STRIPS

I could teach you about the man Möbius was born in Schulpforta, Saxony-Anhalt, and was descended on his mother's side from religious reformer Martin Luther.[1] He was home-schooled until he was 13 when he attended the College in Schulpforta in 1803 and studied there graduating in 1809. He then enrolled at the University of Leipzig, where he studied astronomy under the mathematician and astronomer, Karl Mollweide.[2] In 1813 he began to study astronomy under the mathematically inclined professor Carl Friedrich Gauss at the University of Göttingen while Gauss was the director of the Göttingen Observatory. From there he went to study with Carl Gauss's instructor, Johann Pfaff at the University of Halle, where he completed his doctoral thesis The occultation of fixed stars in 1815.[3] In 1816 he was appointed as Extraordinary Professor to the "chair of astronomy and higher mechanics" at the University of Leipzig.[4] Möbius died in Leipzig in 1868 at the age of 77. His son Theodor was a noted philologist.

I could teach you the maths Geometry and topology of a mobius strip One way to represent the Möbius strip as a subset of three-dimensional Euclidean space is using the parametrization: x ( u , v ) = ( 1 + v 2 cos ⁡ u 2 ) cos ⁡ u {\displaystyle x(u,v)=\left(1+{\frac {v}{2}}\cos {\frac {u}{2}}\right)\cos u} y ( u , v ) = ( 1 + v 2 cos ⁡ u 2 ) sin ⁡ u {\displaystyle y(u,v)=\left(1+{\frac {v}{2}}\cos {\frac {u}{2}}\right)\sin u} z ( u , v ) = v 2 sin ⁡ u 2 {\displaystyle z(u,v)={\frac {v}{2}}\sin {\frac {u}{2}}} where 0 ≤ u < 2π and −1 ≤ v ≤ 1. This creates a Möbius strip of width 1 whose center circle has radius 1, lies in the xy plane and is centered at (0, 0, 0). The parameter u runs around the strip while v moves from one edge to the other. I

I could teach you the applications There have been several technical applications for the Möbius strip. Giant Möbius strips have been used as conveyor belts that last longer because the entire surface area of the belt gets the same amount of wear, and as continuous-loop recording tapes (to double the playing time). Möbius strips are common in the manufacture of fabric computer printer and typewriter ribbons, as they let the ribbon be twice as wide as the print head while using both halves evenly.[14] A Möbius resistor is an electronic circuit element that cancels its own inductive reactance. Nikola Tesla patented similar technology in 1894:[15] "Coil for Electro Magnets" was intended for use with his system of global transmission of electricity without wires. I

Or YOU could LEARN (with a twist)

LEARNING WITH A TWIST

LEARNING WITH A TWIST

LEARNING WITH A TWIST

LEARNING WITH A TWIST

LEARNING WITH A TWIST

LEARNING WITH A TWIST How many sides does the mobius strip have? How many edges does the mobius strip have? What will happen if we cut along the line?