Download Climbing the Cosmic Distance Ladder: How Astronomers Measure

Document related concepts

Formation and evolution of the Solar System wikipedia , lookup

Ursa Major wikipedia , lookup

Orrery wikipedia , lookup

Astrobiology wikipedia , lookup

Aquarius (constellation) wikipedia , lookup

History of astronomy wikipedia , lookup

Copernican heliocentrism wikipedia , lookup

Corvus (constellation) wikipedia , lookup

International Ultraviolet Explorer wikipedia , lookup

Hipparcos wikipedia , lookup

Stellar kinematics wikipedia , lookup

Rare Earth hypothesis wikipedia , lookup

Observational astronomy wikipedia , lookup

Extraterrestrial life wikipedia , lookup

Astronomical spectroscopy wikipedia , lookup

Malmquist bias wikipedia , lookup

Comparative planetary science wikipedia , lookup

Lunar theory wikipedia , lookup

Extraterrestrial skies wikipedia , lookup

Geocentric model wikipedia , lookup

Ancient Greek astronomy wikipedia , lookup

Parallax wikipedia , lookup

Hebrew astronomy wikipedia , lookup

Timeline of astronomy wikipedia , lookup

Dialogue Concerning the Two Chief World Systems wikipedia , lookup

Cosmic distance ladder wikipedia , lookup

Astronomical unit wikipedia , lookup

Transcript
Climbing the Cosmic Distance
Ladder: How Astronomers
Measure the Distances to
Planets, Stars, and Galaxies
Gene Tracy, Physics
Department, W&M
Page 1 “Space is big. You just won't believe how
vastly, hugely, mind-bogglingly big it is.”
- The Hitchhiker's Guide to the Galaxy
Page 2 First consider the sizes of things, from the very small to the very large… http://apod.nasa.gov/apod/ap140112.html
From Astronomy Picture of the Day (APOD), Jan. 12, 2014.
Page 3 We need a map…
Page 4 Actually (truth in advertising), this is a
photo of Andromeda Nebula, not the Milky
Way…
(not)
Page 5 Our farthest space probe (Voyager 1) is only 18 light hours
from the Sun. Less than the size of the pointy part of the
‘you are here’ arrow.
100,000 light years
Page 6 So why are astronomers confident they know the shape of
our galaxy, and the distances to all those stars and planets?
100,000 light years
Page 7 •  These distances are too vast to be measured directly. •  Nevertheless, astronomers have several ways of measuring them indirectly. •  These methods are very clever, relying largely on careful observaFon and high school mathemaFcs. •  The farther out we go, we need to use different overlapping methods. This is the cosmic distance ladder. http://www.astro.virginia.edu/class/whittle/astr553/Topic16/t16_distance_overview.gif
QuesFon: How do we perceive distances in everyday life? List the ways… For example: binocular vision 10 Depth percepFon: in everyday life, we perceive 3D using •  Parallax (two eyes)
•  Motion parallax
•  Depth from motion
(change in apparent
size)
•  Perspective (using
knowledge of shapes)
•  Relative size (compared
to known object)
•  Luminance contrast
(distant things appear
hazy)
•  Occulomotor cues (you
perceive how hard your
eye needs to distort in
order to focus)
•  Occlusion (near things
occlude far things)
•  Texture gradients
(details are discerned if
close)
•  …
Source: wikipedia
11 Depth percepFon: in everyday life, we perceive 3D using •  Parallax (two eyes)
•  Occulomotor cues (you
perceive how hard your
•  Motion parallax
eye needs to distort in
•  Depth from motion
order to focus)
(change in apparent
•  Occlusion
works for (near things
size)Only ONE of these methods
determining the distances to
astronomical
occlude
far things)
•  Perspective
(using
bodies: parallax.
•  Texture gradients
knowledge of shapes)
But your eyes are nowhere near
far apart
to
(details
are
discerned
if
•  Relative
size
(compared
be of use for astronomical work.
close)
to known object)
•  …
•  Luminance contrast
(distant things appear
hazy)
Source: wikipedia
12 Depth percepFon: in everyday life, we perceive 3D using •  Parallax (two eyes)
•  Occulomotor cues (you
perceive how hard your
•  Motion parallax
eye needs to distort in
•  Depth from motion
order to focus)
(change in apparent
to judge the
•  Occlusion
(near things
size)This means we have no ability
distance to celestial bodiesocclude
without the
aid
of
far
things)
•  Perspective
(using
technology.
•  Texture gradients
knowledge
of
shapes)
But how does the technology work?
(details are discerned if
•  Relative size (compared
The basic principles are fairly
simple.
close)
to known object)
•  …
•  Luminance contrast
(distant things appear
hazy)
Source: wikipedia
13 Shape of Earth •  Ancient Greeks knew the Earth was round •  Pythagoras taught of a spherical earth (500 BC) •  Aristotle (4th Cent. BCE) >  Shape of earth’s shadow in eclipse 14 Shape of Earth •  Ancient Greeks knew the Earth was round •  Pythagoras taught of a spherical earth (500 BC) •  Aristotle (4th Cent. BCE) at B
izon
Hor
>  Shape of earth’s shadow in eclipse >  New Stars become visible as you travel south Horizon of A
15 Shape of Earth •  Ancient Greeks knew the Earth was round •  Pythagoras taught of a spherical earth (500 BC) •  Aristotle (4th Cent. BCE) http://www.astronomygcse.co.uk/
>  Shape of earth’s shadow in eclipse >  New Stars become visible as you travel south >  Distant ships disappear bo\om first 16 Size of the Earth •  Once you know the earth is a sphere,
the next logical question is how big is it?
•  Eratosthenes (approx 200 BC) devised
a clever way of measuring it using
shadows and a bit of geometry.
17 Alexandria/Syene (modern Aswan) Almost 1000 km, nearly at same longitude 18 Alexandria/Syene (modern Aswan) Because Alexandria and Syene lie on nearly same longitude, local noons occur at nearly the same ,me. 19 20 1. Ray of Sun shines straight down a well in Syene, Egypt at noon on a day in summer (i.e. the Sun is directly overhead at noon) 21 2. On same day, at local noon in Alexandria, the Sun is not directly over head θ
D = 5000 stadia θ
θ
D = distance from Alexandria to Syene 1. Ray of Sun shines straight down a well in Syene, Egypt at noon on a day in summer (i.e. the Sun is directly over head at noon) 22 θ D = 5000 stadia θ From the Geometry of a Circle θ (C = circumference of the Earth): 23 Aristarchus (250 BC) and the Moon •  He esFmated the relaFve size of the Earth and the moon >  Used Earth’s shadow on the moon in a lunar eclipse (Earth is about 3 Fmes larger) •  EsFmated distance to moon >  Time of a lunar eclipse (3 hours) i.e. the Fme it takes the Moon to move an Earth’s diameter >  Time of a lunar orbit (660 hours) >  Therefore circumference of the orbit is 660/3 Fmes bigger than Earth’s diameter >  Then found the radius in terms of Earth’s diameters (divide by 2π) •  Both are close (0.27 and 35 Earth diameters) 24 Aristarchus (250 BC) on the Earth and Moon •  He also esFmated distance to the Moon >  Time of a lunar eclipse (3 hours) i.e. the Fme it takes the Moon to move about an Earth’s diameter >  Time of a lunar orbit (1 month = 660 hours) >  Therefore the fracFon of the ,me in shadow (3/660) is also the fracFon of the shadowed part of the orbit to the full circumference (2πR). >  Use this to find radius of the Moon’s orbit in terms of the Earth’s diameters •  Get about 35 Earth diameters (true value ~ 32) 25 Aristarchus also esFmated the distance to the Sun •  At half moon the Earth‐Moon‐Sun make a right triangle >  We see them almost halfway across the sky •  We can use some trig >  The angle between the Sun and the Moon (A) >  The Earth‐Moon distance (adjacent) >  The Earth‐Sun distance (hypotenuse) cosA = adjacent / hypotenuse << 1 •  Therefore Sun is much further away than the Moon 26 27 Now we can bounce radar or laser beams off nearby objects to get the distances Astro 28 We can use this method to measure
the distance to the Moon to within a
few millimeters.
It is moving away from us at 3.8 cm/
year!
Astro 29 The radar/laser bounce method works within the solar system Light takes about a day to cross the solar system, so
the ‘echos’ can be heard
Astro 30 The radar/laser bounce method works within the solar system How do we measure distances outside the
solar system?
Light takes about a day to cross the solar system, so
the ‘echos’ can be heard
Astro 31 Remember parallax! Astro 32 The geometry of parallax Astro 33 How’s our map coming along?
Page 34 How’s our map coming along?
On this scale, until the late
1990’s the distances we could
measure using parallax were
still less than the pointy end of
the arrow!
Then….Hipparchos came
along!
Page 35 How’s our map coming along?
Hipparcos: the most important space
probe you’ve never heard of…
Improved our parallax
measurements significantly…
Page 36 How’s our map coming along?
This sphere contains 1,000,000 stars.
Page 37 How’s our map coming along?
The big news in parallax: GAIA (launched December 2013)
Page 38 GAIA will be a
big leap
forward…but it’s
precision still
only gets us to
the edge of the
Milky Way.
The big news in parallax: GAIA (launched December 2013)
Page 39 How can we measure distances beyond our
Milky Way?
A new method for measuring distance has to be
introduced.
Use the fact that the apparent brightness of a star
or galaxy depends upon how many photons fall on
our eyeballs (or electronic detectors).
Page 40 Apparent brightness vs distance The apparent brightness
falls like 1 over the
distance squared.
This means that if we
know the true
brightness, and we
measure the apparent
brightness, we can infer
the distance!
Distance with the Inverse‐Square Law
•  If the true brightness is known in advance, an object’s distance can be determined > This is the method of standard candles > It is the primary method used to measure astronomical distances beyond a few hundred light years. > The trick is finding objects with known brightness (the standard candles). > This is where the hard work comes in… Astro Page 43 Light spectra http://csep10.phys.utk.edu/astr162/lect/light/absorption.html
William and
Margaret Huggins’
observatory, 1860’s
A stellar spectrum…
Each of these stars has a disFncFve spectrum, like a fingerprint In the 1880s, astronomers embarked upon spectrographic studies of
thousands of stars and nebulae.
Annie Jump Cannon and the Harvard computers , ca. 1890. (Images from wikipedia.)
Category designation
Not all stars are alike…
http://www.csupomona.edu/~pbsiegel/phy303/ch13.html
http://www.astro.cornell.edu/academics/courses/astro201/
hr_diagram.htm
By ca. 1910 Hertzsprung and Russell used these methods, combined with knowledge of the
distance to the nearest stars, to show that a star s brightness is a function of its spectral
class .
To understand the importance of this result, let s simplify things and
assume there are only three types of stars…
Red
Yellow
Blue
…and they are close enough that we can resolve their sizes.*
*In reality, stars are too far away for us to resolve their discs. This is a thought experiment to illustrate
the method.)
Suppose we didn’t know there were only three types to
begin with. How would we discover it?
Red
Yellow
Blue
The night sky…
Only three colors, but varying
brightness and apparent size.
Suspect this is due to varying
distances. How to prove it?
Suppose we can measure the
distance to these closest stars
using parallax methods…
For these nearby stars, we can
correct for the effects of the known
distance and find the true size and
absolute brightness of these stars.
Uncover the fact that there are only
three types of star in the local
neighborhood…
And establish that color correlates
with energy output…
1026 Watts
5X1026 Watts
1027 Watts
Now assume stars everywhere obey
the same natural laws. Therefore, all
red, yellow, and blue stars are
similar.
1026 Watts
5X1026 Watts
1027 Watts
Now use the regularity of stellar
behavior (i.e. only three types of
known size and energy output) to
measure distances to all other
stars, even those we cannot
measure using parallax methods.
These three types of stars are now
our ‘standard candles’.
Reality check:
1] Stars do not come in only three types.
2] We cannot resolve their discs. Even the closest stars are too far away.
3] Stars evolve in time, so their brightness and color change.
Category designation
Roughly a dozen types of stars are the most common
http://www.csupomona.edu/~pbsiegel/phy303/ch13.html
A star spends most
of its life on the
main sequence
http://www.astro.cornell.edu/academics/courses/astro201/
hr_diagram.htm
Distances to very distant stars •  Henrie\a Swan Leavi\ (1868‐1921) observed that a certain class of stars (the Cepheids) oscillated in brightness periodically; plopng the absolute brightness against the periodicity she found something very interesFng… Distances to very distant stars •  This gave a way to obtain the absolute brightness for these stars, and hence observed distances. •  Because Cepheids are so bright, this method works up to 13,000,000 light years, well beyond the Milky Way! Most galaxies are fortunate to have at least one Cepheid in them, so we know the distances to all galaxies out to a reasonably large distance. •  Beyond that scale, other methods of measuring distances are used (e.g. relying on supernovae measurements, which are of the few isolated events that can sFll be detected at such distances). How’s our map coming along?
Page 68 http://www.astro.virginia.edu/class/whittle/astr553/Topic16/t16_distance_overview.gif