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| - | ====== Almagest | + | ====== Almagest |
| + | The Greek astronomer Ptolemy' | ||
| + | ===== - Enuma Anu Enlil ===== | ||
| + | To begin the story of the ' | ||
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| + | It was because the authors of ' | ||
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| + | The practice of creating ephemerides—tables listing the past and future positions of the Moon, Sun, and planets—began in Babylon. For this, they not only measured angular positions but also began calculating velocities. For example, above is a graph showing the change in the **Sun’s angular velocity** over a year, based on data from a Babylonian tablet dated to 132 BCE. Relative to the background of “fixed” stars, the Sun moves 360 degrees in a year. The graph shows how much distance it covers each month as velocity. We see that in the second month, the Sun's angular velocity decreases to a minimum (around 28 degrees/ | ||
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| + | They had two methods to explain exactly how the velocity changed. In one method, it was assumed that the Sun's velocity remained constant for half the year, then shifted once, remaining constant again for the other half. In the other method, it was proposed that the Sun’s velocity steadily increased over half the year and steadily decreased over the other half. Humans first applied calculations of displacement, | ||
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| + | ===== - From Arithmetic to Geometry ===== | ||
| + | Babylonian astronomers emphasized arithmetic, while the Greeks emphasized geometry. Since the moon, sun, and planets actually follow geometric paths, Greek predictions were easier. Analyzing all the data, the Greeks created a geocentric model of the universe. The first major contribution to this model was made by the Greek philosopher Anaximander from the city of Miletus in Turkey. According to him, the Earth is a cylinder fixed at the center of the universe, with humans living on one flat surface; everything in the sky revolves around it; the sun is the farthest, followed by the moon, then all the stars, and the five planets closest to the Earth. | ||
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| + | Pythagoras' | ||
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| + | By the time of Plato and Aristotle, it was established that there are seven wandering planets around the spherical Earth (moon, sun, Mercury, Venus, Mars, Jupiter, Saturn), and all these are enclosed by a vast sphere in which all the stars are fixed; we can call this the star sphere. The star sphere and all the planets revolve around the Earth once every 24 hours. The star sphere has no other motion; the position of one star relative to another never changes. But the planets revolve at different speeds relative to the star sphere throughout the year. The five planets sometimes stop in their paths, move backward for a few days, and then start moving forward again. | ||
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| + | Plato could not accept the motion of the seven planets, especially the strange retrograde motion of the five planets. He tasked his students with proving that the motion of the planets is uniform (constant speed) and circular. The first attempt to prove this was made by Eudoxus from the city of Cnidus in Turkey. His model is shown in the animation above. The planet revolves along the equator of the red sphere, and two rods extending from the poles of this sphere are attached to the outer green sphere. Both spheres rotate, their centers are the same, but their speeds and axes of rotation are different. As a result, the planet moves in a path like the English number ' | ||
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| + | The realist Aristotle could not accept this mathematical model. He first considered the eight spheres shown above, excluding all other spheres. The outermost star sphere (number 8) transmits its 24-hour diurnal motion to all the inner spheres, so no other sphere is needed for diurnal motion. Eight spheres (seven planetary spheres and one star sphere) are sufficient for position and diurnal motion, but additional spheres were needed inside each planetary sphere for annual motion and retrograde motion. Therefore, Aristotle added many more spheres, but unlike Plato and Eudoxus, he was not willing to add anything just for the sake of mathematics; | ||
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| + | For astronomers, | ||
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| + | ===== - From Geometry to Arithmetic ===== | ||
| + | Due to these problems, Hellenistic Greek astronomers (after Aristotle) began to focus on Babylonian arithmetic calculations rather than geometric systems. Practicality and predictability are paramount in astronomy. Data obtained from observations is more useful than geometry-based models. This is why Aristarchus' | ||
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| + | Although Eudoxus' | ||
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| + | If the speed of the planet is significantly higher than that of the epicycle, then when the planet moves inside the deferent, it will appear to move backward from Earth for some time. Although Apollonius created the model, we do not know if he actually used it to calculate the motion of all the planets, as none of his writings have survived. However, in the next generation, Hipparchus did exactly this. Through Hipparchus, the Greeks' | ||
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| + | The careful integration of Apollonius' | ||
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| + | Around 150 AD, Ptolemy published a book called ' | ||
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| + | This book also first mentioned the order of distances from the Earth to the moon, sun, planets, and stars. Aristotle and Eudoxus had said five hundred years before Ptolemy that the star sphere is the farthest, and Ptolemy did not change this. He determined the positions of the seven planets based on their periods. The longer it takes for a planet to orbit the Earth, the closer it is to the star sphere. According to this, Saturn comes right after the star sphere (period 21 years), followed by Jupiter (12 years) and Mars (2 years). The moon is placed closest because its period is only 29 days. Three more planets remain: the sun, Mercury, and Venus. Determining their order was difficult because they always stay close to each other and seem to orbit the Earth in about one year. Ptolemy decided to place the sun in the middle, with Mars, Jupiter, and Saturn above it, and Venus, Mercury, and the moon below. There was no logic for why Venus was placed before Mercury. | ||
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| + | Another significant contribution of Ptolemy was measuring the size of the universe for the first time. He thought there was no gap between the spheres of one planet and the next. Therefore, by calculating the thickness of each sphere, he found the total distance from the Earth to the star sphere to be 19,865 times the Earth' | ||
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| + | ===== - Chimera and Copernicus ===== | ||
| + | The Polish priest Copernicus studied in Renaissance Italy and lectured on astronomy in Rome in 1500. He grew up studying ancient Greek and modern (in his time) Islamic knowledge. His main issue with the precise predictive system of the Almagest was that it was like a chimera. A chimera is a mythical creature made by combining parts from different animals. According to Copernicus, Ptolemy' | ||
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| + | Copernicus was inspired by ancient Greek and modern Muslim scholars to destroy this chimera and create a " | ||
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| + | In the ' | ||
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| + | Copernicus' | ||
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| + | Only the first 5% of ' | ||
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| + | ===== - From Geometry to Physics ===== | ||
| + | We had to wait until the eighteenth century for definitive proof. However, in the meantime, most astronomers began to believe in a heliocentric world without definitive proof because this model was more elegant. The greatest observational astronomer of that time, Tycho Brahe, could not believe it. With royal patronage, Brahe built the largest observatory in history on the island of Ven in Denmark (now Sweden), first Uraniborg in 1576, then Stjerneborg in 1584. Using large sextants and mural quadrants, Brahe measured the positions of over 700 stars with a precision of about 0.5 arcminutes. This rendered the data from the Almagest obsolete for the first time in history. | ||
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| + | Every astronomer has a cosmologist within them. Brahe also created a cosmological model with the Earth at the center, the moon and sun revolving around it, and the five planets revolving around the sun. After losing royal favor in Denmark, Tycho moved to Prague and took a job at another royal court. His assistant was Kepler. After Tycho' | ||
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| + | The second law states that a planet sweeps out equal areas ($A$) in equal times ($t$) in its elliptical orbit. When the planet is farther away, the area is narrower; when it is closer, the area is wider, but the value of the area does not change if it takes the same time to traverse the arc of the area. In the animation above, the purple area is always equal. In the language of calculus: | ||
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| + | $$ \frac{dA}{dt} = \frac{J}{2m}$$ | ||
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| + | where $J$ is the angular momentum of the planet, and $m$ is its mass. This means the right side is always constant. The third law states that the square of a planet' | ||
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| + | $$ T^2 \propto r^3 \Rightarrow \left(\frac{r}{v}\right)^2 \propto r^3 \Rightarrow \frac{v^2}{r} \propto \frac{1}{r^2} \Rightarrow a_c \propto \frac{1}{r^2} $$ | ||
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| + | where $v$ is the velocity of the planet and $a_c$ is its centripetal acceleration. When a stone tied to one end of a rope is swung around the head for a long time and then released, the stone flies away like a slingshot. This centripetal acceleration was first mathematically understood by Huygens of the Netherlands. This centripetal acceleration can thus be called Huygens' | ||
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| + | $$ F_c = m a_c = GMm \frac{1}{r^2} $$ | ||
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| + | where $G$ is Newton' | ||
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| + | Although Copernicus was revolutionary, | ||
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| + | In the work of transforming astronomy from mathematics to physics through cosmology, Galileo' | ||
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| + | By the time Newton published [[wp> | ||
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| + | ===== - Proof of Revolutions ===== | ||
| + | ==== - Aberration: 1720s ==== | ||
| + | To understand the first observational proof of the ' | ||
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| + | [[aberration|Aberration of light]] occurs due to the change in Earth' | ||
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| + | $$ \alpha = \theta-\phi = \frac{v}{c} $$ | ||
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| + | where $\alpha$ is the aberration, $\theta$ is the star's declination in the rest frame, $\phi$ is the star's declination in the moving frame, $v$ is Earth' | ||
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| + | One of the greatest astronomers of the eighteenth century, England' | ||
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| + | ==== - Parallax: 1830s ==== | ||
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| + | Interestingly, | ||
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| + | From geometric calculations, | ||
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| + | He also understood why the maximum of aberration would be three months before or after the maximum of parallax. Parallax depends on Earth' | ||
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| + | Since no parallax was detected in any of Bradley' | ||
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| + | $$ \tan p \approx p = \frac{a}{r} $$ | ||
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| + | where $a$ is the distance from Earth to the sun, i.e., 1 astronomical unit, and $r$ is the distance to a star at point $S$. Substituting the distance of the nearest star, Proxima Centauri, which is 4.2 light-years, | ||
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| + | In Germany, Friedrich Bessel began trying to measure the parallax of the star 61 Cygni in 1834. Encouraged by Struve' | ||
un/almagest-revolutions.1740472310.txt.gz · Last modified: 2025/02/25 01:31 by asad