(^754) A Textbook of Engineering Mechanics
We know that distance of centre of buoyancy from the bottom of the buoy,
OB=
1
(0.5 20) 0.25 10 cm
2
ll+= +
and volume of water displaced,
V= (20) (0.5^2 20) 100 (0.5 20)
4
ll
π
+=π +
∴ BM=
2500 25 50
100 (0.5 20) 0.5 20 40
I
Vlll
π
π+ + +
Now OM=OB + BM = (0.25l + 10) +
50
l+ 40
For stable equilibrium, the metacentre (M) should be above centre of gravity (G) or may
coincide with G.
i.e., OMñOG
50
(0.25 10)
40
l
l
++
- ñ
(^25100)
280
ll
l
++
( 40) (0.25 10) 50
40
ll
l
+++
- ñ
(^25100)
280
ll
l
++
2 (0.25^21010400 50)
2( 40)
lll
l
+++ +
ñ
(^25100)
280
ll
l
++
...(Multiplying and dividing the L.H.S. of the equation by 2)
0.5l^2 + 40l + 800 + 100ñl^2 + 5l + 100
or l^2 – 70l – 1600ñ 0
...[Multiplying both sides by (2l + 80)]
Solving this quadratic equation for l,
lñ
70 (70)^2 4 1600
cm
2
++ +×
ñ88.15 cm
∴ Maximum permissible length of the cylinder including the metal portion
= 88.15 + 2.5 = 90.65 cm Ans.
36.13.CONICAL BUOYS FLOATING IN A LIQUID
A conical buoy, as the name indicates, is a buoy which is shaped
like a cone or a solid body that tapers uniformly from a circular base to a
point. Now consider a conical buoy floating in same liquid as shown in
Fig. 36.10.
Let D= Diameter of the cone,
d= Diameter of the cone at the liquid
level,
2 α= Apex angle of the cone,
L= Length of the cone,
l= Length of the cone immersed in
liquid. Fig. 36.10. Conical buoy