B9 Q2 In a star with mass M, assume that the density decreases from the center to thesurface as a function of radial distance r, according top = P. 1-RWhere po is constant and R is the radius of the star.1. Find m(r).2. Derive the relation between M and R.

Density of any object is the mass of that object in per unit volume. If density is of object is…

Q2 In a star with mass M, assume that the density decreases from the center to the surface as a function of radial distance r, according to p = Po R Where po is constant and R is the radius of the star. 1. Find m(r). 2. Derive the relation between M and R.

Q2 In a star with mass M, assume that the density decreases from the center to the surface as a function of radial distance r, according to p = Po R Where po is constant and R is the radius of the star. 1. Find m(r). 2. Derive the relation between M and R.

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Question

Q2 In a star with mass M, assume that the density decreases from the center to the
surface as a function of radial distance r, according to
p = P. 1-
R
Where po is constant and R is the radius of the star.
1. Find m(r).
2. Derive the relation between M and R.

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Step 1: Relation of Mass with density

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