Engineering Mechanics

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Chapter 35 : Hydrostatics „„„„„ 731


Total pressure on one face of the plate
Let θ = Inclination of the plate with the water surface


∴ sin θ =

2–1 1
33

=

We know that area of the circular plate,

A = ()^22 (3) 2.25 m^2
44

d

ππ
==π

and depth of centre of gravity from the water surface,


x =

12
1.5 m
2

+
=

∴ Total pressure on one face of the plate,
P =wA x=× π×9.8 2.25 1.5 kN
= 103.9 kN Ans.

Position of the centre of pressure


We know that moment of inertia of a circular plate, about its centre of gravity,

IG=
()44 4(3)^81 m
64 64 64

d

ππ π
==

∴ Depth of centre of pressure from the water surface,

h =

2
2

81 1
sin 64 3
1.5
2.25 1.5

IG x
Ax

π ⎛⎞
×⎜⎟
θ ⎝⎠
+= +
π×

= 1.54 m Ans.

Example 35.11. A triangular plate of 1 m base and 1.5 m altitude is immersed in water. The
plane of the plate is inclined at 30º with water surface, while the base is parallel to and at a depth of
2 m from the water surface as shown in the figure given below.


Fig. 35.14.
Find the total pressure on the plate and the centre of pressure.
Solution. Given: Base of the plate (b) = 1 m; Altitude of the plate (h) = 1.5 m and inclination
of the plate with the water surface (θ) = 30º.


Total pressure on the plate


We know that area of the triangular plate,

A=

11.50.75 m 2
22

bh ×
==

Fig. 35.13.
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