Finding the Ratio of r/R for a Submerged Hollow Sphere

momu
Messages
5
Reaction score
0
An empty hollow sphere of inner radius r, outer radius R and density p floats so that exactly one half is submerged in a fluid of density pf.
a.) if p/pf is =3 what is the ration of r/R.

ok well
mg=pVg
m=pV/2

V=4/3pi(R^3-r^3)

m=p(4/3pi(R^3-r^3)

I don't know where to go from here any help is appreciated thanks.
 
Physics news on Phys.org
momu said:
mg=pVg
m=pV/2

Are you talking about the same V in the two eqns? First decide upon the symbols properly.

Then directly apply Archimedes' Principle.
 
no its the same equation just canceled out the g. but you Its the same V
 
So, the 2nd eqn follows from the 1st? This is a matter of elementary algebra! Think again and write eqns properly.
 
F=0
mg-fB=0
m=p * Vs (volume of sphere)/2

Know for the volume i have 4/3pi(R^3-r^3)
 
First clear the matter of the two eqns in post #2. What do the two different V's represent? And how can eqn 2 follow from eqn 1?
 

Thread 'Direction of the magnetic field of an oscillating charge'

Hello everyone, I’m considering a point charge q that oscillates harmonically about the origin along the z-axis, e.g. $$z_{q}(t)= A\sin(wt)$$ In a strongly simplified / quasi-instantaneous approximation I ignore retardation and take the electric field at the position ##r=(x,y,z)## simply to be the “Coulomb field at the charge’s instantaneous position”: $$E(r,t)=\frac{q}{4\pi\varepsilon_{0}}\frac{r-r_{q}(t)}{||r-r_{q}(t)||^{3}}$$ with $$r_{q}(t)=(0,0,z_{q}(t))$$ (I’m aware this isn’t...
View full post »

Thread 'Initial conditions for orbits around a wormhole'

Hi, I had an exam and I completely messed up a problem. Especially one part which was necessary for the rest of the problem. Basically, I have a wormhole metric: $$(ds)^2 = -(dt)^2 + (dr)^2 + (r^2 + b^2)( (d\theta)^2 + sin^2 \theta (d\phi)^2 )$$ Where ##b=1## with an orbit only in the equatorial plane. We also know from the question that the orbit must satisfy this relationship: $$\varepsilon = \frac{1}{2} (\frac{dr}{d\tau})^2 + V_{eff}(r)$$ Ultimately, I was tasked to find the initial...
View full post »

Similar threads

Conductor sphere floating on a dielectric fluid
Replies
1
Views
3K
Find Time to Reach Top of Beaker (10 cm)
Replies
16
Views
2K
Calculations using the Standard Solar Model & Solar Equations of State
Replies
1
Views
2K
Hollow sphere half submerged in a liquid, find density
Replies
13
Views
8K
I A "continous" gravitational field formula r=0 to infinity
Replies
16
Views
673
Sphere-with-non-uniform-charge-density ρ= k/r
Replies
8
Views
10K
Potential Energy of 2 Spherical Shells
Replies
1
Views
2K
Electric field of a spherical conductor with a dipole in the center
Replies
4
Views
4K
Pressure versus stress in uniformly charged sphere
Replies
11
Views
1K
Understanding the electric field of a sphere with a hole
Replies
12
Views
7K

Hot Threads

Recent Insights

Back
Top