How is the distance between stars and the earth calculated?

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How is the distance between stars and the earth calculated?

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Answer 1 · 2016-03-18T17:23:41

Using stellar parallax.

Explanation:

Stellar parallax is the apparent angular displacement of a star when observed from two sufficiently-spaced known locations

A convenient choice is the same observatory, with time spacing that is (sufficiently large integer) N days.

If N is the exact number of 24-hour days and $α$ $alpha$ is the parallax angle, the distance of the star is
$\frac{sin (N \frac{θ}{2})}{sin (\frac{α}{2})}$ $sin(Ntheta/2)/sin(alpha/2)$ AU,
where $θ = \frac{360}{356.256363}$ $theta=360/356.256363$ deg = 0.985609113 deg.

For conversion to light years (ly), use 1 AU = $\frac{1}{62900}$ $1/62900$ ly, nearly.

The arc of the Earth's orbit for N days subtends N $θ$ $theta$ deg at the Sun.

Sample Data: N = 7, $α$ $alpha$ = 0.003" = 8.333 E-07 deg.

The approximation to the distance of the star
= $\frac{sin (7 X 0.9856)}{sin (8.333 E - 07)}$ $sin(7X0.9856)/sin(8.333 E-07)$ AU

= 8.259 E+06 AU

= 131.3 light years.

(It is assumed that the precision in the Radio Telescope for parallax is as good as 0.001".)

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How is the distance between stars and the earth calculated?

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