HYDROSTATICS 243From equation (21.1),
GM=Px
Wcotθ=490 .5N×10 m× 57. 29
981 × 103 Ni.e. metacentric height,GM= 0 .286 m
NowKM=KB+BM= 1 .2m+ 2 .4m= 3 .6mKG=KM−GM= 3. 6 − 0. 286 = 3 .314 mi.e. centre of gravity above the keel,KG= 3 .314 m,
(where ‘K’ is a point on the keel).
Problem 14. A barge of length 30 m and
width8mfloatsonanevenkeelatadepth
of 3 m. What is the value of its buoyancy?
Take density of water,ρ, as 1000 kg/m^3 and
gas 9.81 m/s^2.The displaced volume of the barge,V=30 m×8m×3m=720 m^3.From Section 21.4,
buoyancy=Vρg=720 m^3 × 1000kg
m^3× 9. 81m
s^2
= 7 .063 MNProblem 15. If the vertical centre of gravity
of the barge in Problem 14 is 2 m above the
keel, (i.e.KG=2 m), what is the
metacentric height of the barge?NowKB=the distance of the centre of buoyancy
of the barge from the keel=
3m
2i.e.KB= 1 .5m.From page 242,BM=I
Vand for a rectangle,I=Lb^3
12from Table 7.1, page 91, whereL=length of the waterplane=30 m, andb=width of the waterplane=8m.Hence, moment of inertia,I=30 × 83
12=1280 m^4From Problem 14, volume,V=720 m^3 ,hence,BM=I
V=1280
720= 1 .778 mNow,KM=KB+BM= 1 .5m+ 1 .778 m= 3 .278 mi.e. the centre of gravity above the keel,KM= 3 .278 m.SinceKG=2 m (given), thenGM=KM−KG= 3. 278 − 2 = 1 .278 m,i.e. the metacentric height of the barge,
GM= 1 .278 m.Now try the following exerciseExercise 111 Further problems on hydro-
staticsIn the following problems, where necessary,
take g = 9 .81 m/s^2 and density of water
ρ=1020 kg/m^3.- A ship is of mass 10000 kg. If the ship
floats in the water, what is the value of
its buoyancy? [98.1 kN] - A submarine may be assumed to be in
the form of a circular cylinder of 10 m
external diameter and of length 100 m.
If the submarine floats just below the