1 / 103

Technically Speaking: Have Your Cake And Eat It Too!

Technically Speaking: Have Your Cake And Eat It Too!. Steven Rudich Andrew’s Leap 2011. Anne Willan’s Look & Cook books are the model of technical exposition. Presumes little . Each recipe is self contained Picture of each ingredient Picture of each tool Picture of each step

hua
Télécharger la présentation

Technically Speaking: Have Your Cake And Eat It Too!

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. Technically Speaking:Have Your Cake And Eat It Too! Steven RudichAndrew’s Leap 2011

  2. Anne Willan’s Look & Cook books are the model of technical exposition.

  3. Presumes little. • Each recipe is self contained • Picture of each ingredient • Picture of each tool • Picture of each step • Picture of techniques • A kid can do it!

  4. Promises much. • Professional recipes • Professional techniques • Cooking school curriculum

  5. Optimized content. “All the great recopies and techniques were collected and evaluated. Experts masterfully distilled the material, without tossing out any key idea or recipe.”

  6. Substantial promise. “From thousands, the 40 key recipes and techniques of • French Country Cooking”.

  7. Have your cake, and eat it too! • Presumes little. • Promises much. • Step by step illustrations anticipate every problem. • Provokes active curiosity .

  8. Technical Speaking • Presume the least. • Promise the most. • Pamper their brains. • Provoke active curiosity

  9. Talk Outline(Standard practice) • Title: Standard Security Protocols • SSL • RSA • DES • DSS • MACs The SSL protocol was first developed by the Netscape corporation and then extended to TLS ………….

  10. Title: Standard Security Protocols • SSL • RSA • DES • DSS • MACs Presumes Jargon Content promise unclear Causes emotional anxiety Curiosity impulse is squandered

  11. Title: Standard Security Protocols • “SSL” • “RSA” • “DES” • “DSS” • “MACs” Internet Security is an ocean of confusing acronyms. What do these stand for exactly? How do they work? Why are they important technically and economically? By the end of today’s lecture you should be able to answer these questions.

  12. Pamper their brains. Brains are perceptually, computationally, and emotionally constrained.

  13. Intellectual Fantasy:Brain To Brain Transfer More! Harder!Faster!

  14. Platonic Fantasy:A Talk Is An Aesthetic Object Perfect Truth Is Beauty.

  15. Human Reality When’s lunch? blah, blah, blah What’s a DAG?

  16. Demands Accumulate,Brains Deplete!

  17. Demands Accumulate,Brains Deplete! • Visual Processing.

  18. Demands Accumulate,Brains Deplete! • Visual Processing. • Auditory Processing.

  19. Demands Accumulate, Brains Deplete! • Visual Processing. • Auditory Processing. • Concentration.

  20. Demands Accumulate,Brains Deplete! • Visual Processing. • Auditory Processing. • Concentration. • Calculation.

  21. Demands Accumulate,Brains Deplete! • Visual Processing. • Auditory Processing. • Concentration. • Calculation. • Short Term Memory.

  22. Demands Accumulate,Brains Deplete! • Visual Processing. • Auditory Processing. • Concentration. • Calculation. • Short Term Memory. • Recall From Long Term Memory.

  23. Demands Accumulate, Brains Deplete! • Visual Processing. • Auditory Processing. • Concentration. • Calculation. • Short Term Memory. • Recall From Long Term Memory. • Stress Of Unresolved Concerns.

  24. Demands Accumulate,Brains Deplete! • Visual Processing. • Auditory Processing. • Concentration. • Calculation. • Short Term Memory. • Recall From Long Term Memory. • Stress Of Unresolved Concerns. • Etc . . . Duh.

  25. Work Hard To Be Easy! • Be easy to see • Minimize info/slide • .

  26. Work Hard To Be Easy! • Be easy to hear • Speak up, or use mic • Enunciation habits matter

  27. Work Hard To Be Easy! • Memory and reference • Eliminate pronouns • (its, this, that) • unless you are pointing

  28. a b b a a a b a b b Work Hard To Be Easy! • Kid Friendly Illustrations.

  29. Pamper their brains! Brain stress is additive.

  30. Correspondence is content! Spell out the exact correspondencebetween arguments in different representations.

  31. 1 + 2 + 3 + … + n-1 + n = ½n(n+1) Algebraic Proof Geometric Proof S = 1 + 2 + 3 + + n-1 + n S = n + n-1 + n-2 + … + 2 + 1 2S = n+1 + n+1 + n+1 + … + n+1 + n+1 2S = n(n+1) S = ½n(n+1)

  32. 1 + 2 + 3 + … + n-1 + n = ½n(n+1) Algebraic Proof Geometric Proof S = 1 + 2 + 3 + + n-1 + n S = n + n-1 + n-2 + … + 2 + 1 2S = n+1 + n+1 + n+1 + … + n+1 + n+1 2S = n(n+1) S = ½n(n+1)

  33. 1 + 2 + 3 + … + n-1 + n = ½n(n+1) Algebraic Proof Geometric Proof S = 1 + 2 + 3 + + n-1 + n S = n + n-1 + n-2 + … + 2 + 1 2S = n+1 + n+1 + n+1 + … + n+1 + n+1 2S = n(n+1) S = ½n(n+1)

  34. 1 + 2 + 3 + … + n-1 + n = ½n(n+1) Algebraic Proof Geometric Proof S = 1 + 2 + 3 + + n-1 + n S = n + n-1 + n-2 + … + 2 + 1 2S = n+1 + n+1 + n+1 + … + n+1 + n+1 2S = n(n+1) S = ½n(n+1)

  35. 1 + 2 + 3 + … + n-1 + n = ½n(n+1) Algebraic Proof Geometric Proof S = 1 + 2 + 3 + + n-1 + n S = n + n-1 + n-2 + … + 2 + 1 2S = n+1 + n+1 + n+1 + … + n+1 + n+1 2S = n(n+1) S = ½n(n+1)

  36. 1 + 2 + 3 + … + n-1 + n = ½n(n+1) Algebraic Proof Geometric Proof S = 1 + 2 + 3 + + n-1 + n S = n + n-1 + n-2 + … + 2 + 1 s = 2S = n+1 + n+1 + n+1 + … + n+1 + n+1 1 2 n 2S = n(n+1) S = ½n(n+1)

  37. 1 + 2 + 3 + … + n-1 + n = ½n(n+1) Algebraic Proof Geometric Proof s = S = 1 + 2 + 3 + + n-1 + n S = n + n-1 + n-2 + … + 2 + 1 s = 2S = n+1 + n+1 + n+1 + … + n+1 + n+1 1 2 n 2S = n(n+1) S = ½n(n+1)

  38. 1 + 2 + 3 + … + n-1 + n = ½n(n+1) Algebraic Proof Geometric Proof s = S = 1 + 2 + 3 + + n-1 + n S = n + n-1 + n-2 + … + 2 + 1 s = 2S = n+1 + n+1 + n+1 + … + n+1 + n+1 1 2 n 2S = n(n+1) 2s = S = ½n(n+1)

  39. 1 + 2 + 3 + … + n-1 + n = ½n(n+1) Algebraic Proof Geometric Proof s = S = 1 + 2 + 3 + + n-1 + n S = n + n-1 + n-2 + … + 2 + 1 s = 2S = n+1 + n+1 + n+1 + … + n+1 + n+1 1 2 n 2S = n(n+1) 2s = S = ½n(n+1) n+1 = n(n+1)

  40. 1 + 2 + 3 + … + n-1 + n = ½n(n+1) Algebraic Proof Geometric Proof s = S = 1 + 2 + 3 + + n-1 + n S = n + n-1 + n-2 + … + 2 + 1 s = 2S = n+1 + n+1 + n+1 + … + n+1 + n+1 1 2 n 2S = n(n+1) 2s = S = ½n(n+1) n+1 S = ½n(n+1)

  41. I own 3 beanies and 2 ties. How many different ways can I dress up in a beanie and a tie?

  42. t2 b1 t1 b2 b2 t2 b3 b3 b1 t1 t2 t1 b3 b1 b2 t t2 t t2 t2 t

  43. b3 b b2 b b2 b3 t2 t t t2 t2 t b2t b3t b3t2 bt2 b2t2 bt ( b + b2 + b3 )( t + t2 )=

  44. b3 b b2 b b2 b3 t2 t t t2 t2 t b2t b3t b3t2 bt2 b2t2 bt ( b + b2 + b3 )( t + t2 )= bt +

  45. b3 b b2 b b2 b3 t2 t t t2 t2 t b2t b3t b3t2 bt2 b2t2 bt ( b + b2 + b3 )( t + t2 )= bt + bt2 +

  46. b3 b b2 b b2 b3 t2 t t t2 t2 t b2t b3t b3t2 bt2 b2t2 bt ( b + b2 + b3 )( t + t2 )= bt + bt2 + b2t +

  47. b3 b b2 b b2 b3 t2 t t t2 t2 t b2t b3t b3t2 bt2 b2t2 bt ( b + b2 + b3 )( t + t2 )= bt + bt2 + b2t + b2t2 +

  48. b3 b b2 b b2 b3 t2 t t t2 t2 t b2t b3t b3t2 bt2 b2t2 bt ( b + b2 + b3 )( t + t2 )= bt + bt2 + b2t + b2t2 + b3t +

  49. b3 b b2 b b2 b3 t2 t t t2 t2 t b2t b3t b3t2 bt2 b2t2 bt ( b + b2 + b3 )( t + t2 )= bt + bt2 + b2t + b2t2 + b3t + b3t2

More Related