Acceleration of Gravity inside a planet

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JoeT21
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Homework Statement


Find the acceleration of gravity within the mantle (at some radius R) of a planet that has a core and a mantle, each with different constant density.

Rp= radius of planet
Rc= radius of core
Pm= density of the mantle
Pc= density of the core
P= density

I know what the answer is but I cannot get there!
ANSWER=
a= (-4/3)G(Pi)[((Pc-Pm)*Rc^3/R^2) + Pm*R]


Homework Equations

.
Gravitational Potential Equations



The Attempt at a Solution



I have made 3 potential equations:

(R>Rc):
V= (-4(pi)GP/3R)*(R^3-Rc^3)

(Rp>R>Rc):
V= [(-4(Pi)GP/3R)*(R^3-Rc^3) + (-2(Pi)GP)*(Rp^3-R^3)]

(Rp>R):
V= -2(Pi)GP*(Rp^3-R^3)

I cannot get to the correct answer any help would be great!
 
on Phys.org
You should use Gauss' law. Perhaps you know that law from electrostatics, where the law refers to electric fields and the total charge inside a volume. The gravitational equivalent refers to g and the total mass inside a volume.