In a binary star system, a small white dwarf orbits a companion with a period of 52 years at a distance of 20 A.U. What is the mass of the white dwarf assuming the companion star has mass of 1.5 solar masses? Many thanks if anyone can help!?

1 Answer
Miguel F.
Jul 30, 2015

Using the third Kepler law (simplified for this particular case), which establishes a relation between distance between stars and their orbital period, we shall determine the answer.

Explanation:

Third Kepler law establishes that:

T^2 propto a^3T2a3

where TT represents orbital period and aa represents the semi-major axis of star orbit.
Assuming that stars are orbiting on the same plane (i.e., the inclination of the axis of rotation relative to the orbital plane is 90º), we can affirm that proportionality factor between T^2T2 and a^3a3 is given by:

frac{G (M_1 + M_2)}{4 pi^2} = frac{a^3}{T^2}G(M1+M2)4π2=a3T2

or, giving M_1M1 and M_2M2 on solar masses, aa on A.U. and TT on years:

M_1 + M_2 = frac{a^3}{T^2}M1+M2=a3T2

Introducing our data:

M_2 = frac{a^3}{T^2} - M_1 = frac{20^3}{52^2} - 1.5 = 1.46 M_{odot}M2=a3T2M1=2035221.5=1.46M

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