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On the evening of December 21st, 2012: Which do you prefer?

nerdpocalypse

Just a note for the general global sciencegeek community at large. I invite you all to have an upstanding drink and toast on the night of December 21st, because (you know) it’s not an Apocalypse, it’s a Nerdpocalypse. At least that’s what the science says.

(And if you’re in Vancouver, feel free to pop by the Railway Club at 6pm on, where some of the local Science Scouts and Nerd Nite folks will be on hand to collect data on the prospect of hypothesis 2. We’ll be at the back, and give me a heads up so that we make sure our numbers are doable for the place – @ng_dave).

Sun Power – lovely illustrations by Don Madden

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sunpower21

sunpower13

sunpower16

sunpower20

By Don Madden, via myvintagebookcollectioninblogform.blogspot.ca, via Stacy Thinx.

Sciencegeek Advent Calendar Extravaganza! – Day 18

day18

IMAGES IN CHRISTMAS BALLS: A.K.A. CRAZY OPTICS CALCULATIONS
By Eef van Beveren, Frieder Kleefeld, George Rupp | pdf

ABSTRACT: We describe light-reflection properties of spherically curved mirrors, like balls in the Christmas tree. In particular, we study the position of the image which is formed somewhere beyond the surface of a spherical mirror, when an eye observes the image of a pointlike light source. The considered problem, originally posed by Abu Ali Hasan Ibn al-Haitham — alias Alhazen — more than a millennium ago, turned out to have the now well known analytic solution of a biquadratic equation, being still of great relevance, e.g. for the aberration-free construction of telescopes. We do not attempt to perform an exhaustive survey of the rich historical and engineering literature on the subject, but develop a simple pedagogical approach to the issue, which we believe to be of continuing interest in view of its maltreating in many high-school textbooks.

christmasballs01

Figure 6: The locations of the various images as seen by each of the five observers introduced in Fig. 1. We also indicate the angles of incidence and reflection, in order to make sure that they are equal.

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Figure 7: Images of an extended object, as seen in a Christmas ball from different angles.

(see more of Popperfont’s Sciencegeek Advent Calendar Extravanganza here)

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