1	Astro 1050 Jan. 11, 2006 Extra Credit (once per semester): Astronomy Articles on Fridays Planetarium shows Friday nights (tickets/info from Physics and Astronomy Department office) Some more from chapter 1: Scientific Notation, Units, and the Scale of the Universe Start Chapter 2 on the Sky
2	Questionnaire Results Some math strong, some weak, as normal. We’ll try to hit a balance. May add some options to lab. Science backgrounds weakish in general, again normal. Popular topics include black holes and constellations. Constellations are not of great interest scientifically (we’ll see why), but we’ll make sure some constellations are covered in lab for certain. Mixed on issues of coverage, depth. OK. Science fiction, in moderate doses OK, and many have a genuine interest in astronomy. Some of your classmates play guitar, rugby, dance, and one admits that s/he likes “getting wasted.” One of you will apparently “throw up” if called on in class – so I’ll usually ask for volunteers first! Please volunteer when asked, so we can avoid this potential timebomb.
3	Scientific Notation 10¹= 10 10²= 100 10³= 1,000 (one thousand) 10⁶ = 1,000,000 (one million) You can think of this as raising 10 to some power – or just think of it as moving decimal place over some given number of steps. Think of computer speeds and disk space. 10⁰ = 1 10^-1= 0.1 = 1 / 10 10^-2= 0.01 = 1 / 100 10^-3 = 0.001 = 1 / 1,000 10^-6 = 0.000001 = 1 / 1,000,000 How to write numbers which are not powers of 10: 1 A.U. = 149,597,900 km = 1.496 ´ 10⁸ km = mantissa ´ 10^exponent
4	Arithmetic and Scientific Notation Multiplication: Multiply the mantissa Add the exponents 20 AU = (2 ´ 10¹)´ (1.496 ´10⁸ km) = (2 ´ 1.496) ´ (10¹ x 10⁸) km = 2.9992 ´ 10⁹km Division: Divide the mantissa Subtract the exponents 1 AU / 500 = (1.496 ´10⁸ km) / (5 ´ 10²) = (1.496 / 5 ) ´ (10⁸ / 10²) km = 0.2992 ´ 10⁶ km = 2.992 ´ 10⁵ km Be careful when adding or subtracting: (2.0´10⁶⁾+ (2.0´10³) = 2,002,000 = 2.002´10⁶ not 4. ´10⁶
5	Scientific notation and the metric system
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7	What is a light-year, mathematically? 1 light-year = c ´ t (where c is the speed of light and t is one year) = 3.0 ´ 10⁸ m/s ´ 365 days = 1.1 ´ 10¹¹ (m ´ days /s) but we know light-years is a distance and must have “dimensions” of distance. We should have units of just meters. The fact that we have this extra (days/s) means we have left something out. If we multiply by (24 hr/day ´ 60 min/hr ´ 60 sec/min) the units will work out right and so will the numerical answer = 1.1 ´ 10¹¹´ 24 ´ 60 ´ 60 m = 9.5 ´ 10¹⁵m = 9.5 ´ 10¹² km
8	A final word from the Guide… “The simple truth is that interstellar distances will not fit into the human imagination.” -- Douglas Adams
9	Chapter 2: The Sky
10	Constellations
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14	The Magnitude Scale First introduced by Hipparchus (160 - 127 B.C.): Brightest stars: ~1^st magnitude Faintest stars (unaided eye): 6^th magnitude More quantitative: 1^st mag. stars appear 100 times brighter than 6^th mag. stars 1 mag. difference gives a factor of 2.512 in apparent brightness (larger magnitude = fainter object!)
15	Example:
16	Formula for Intensity vs. m:
17	More Examples:
18	More Examples:
19	More Examples:
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21	The Celestial Sphere
22	The Celestial Sphere (II)
23	Example:
24	The Celestial Sphere (III)
25	Apparent Motion of the Celestial Sphere
26	Apparent Motion of the Celestial Sphere II
27	Precession (I)
28	Precession (II)