Download VTU BE 2020 Jan ECE Question Paper 15 Scheme 3rd Sem 15CV33 Fluid Mechanics

Download Visvesvaraya Technological University (VTU) BE ( Bachelor of Engineering) ECE (Electronic engineering) 2015 Scheme 2020 January Previous Question Paper 3rd Sem 15CV33 Fluid Mechanics

LIBRARY
CHIKOD1
USN
Third Semester B.E. Degree Examination, Dec. an.2020
Fluid Mechanics
Time: 3 hrs. Max. Marks: 80
Note: Answer FIVE full questions, choosing ONE full question from each module.
7:3
Module-1.
7t
I a. Define the following terms. Mention their units and dimensiOns.?
(i) Mass density (ii) Weight density (iii) Specific Volume (iv) Specific gravity
b.
(08 Marks)
A U tube manometer is used to measure the pressure:of oil of specific gravity 0.85 flowing
in a pipe line. Its left end is connected to the pipe and right limb is open to atmosphere. The
to
C4.7.
=
center of the pipe is 100 mm below the level of mercury (Sp.Gr = 13.6). In the right limb. If
the difference ofmercury levels in the right limb and left limb is 160 mm, determine the
absolute pressure of oil in the pipe.
to
(08 Marks)
OR
2 a. State and prove Pascal's law. (08 Marks)
b. A 400 mm shaft is rotating at 200 rpm in a bearing of length 100 mm. If the thickness of the
oil film is 1.4 mm and the dynamic viscosity of the oil is 0.7 N-S/nit Determine
?
(i) Torque required to overcome friction in bearing.
(ii) Power utilized.in overcoming viscous
.
resistance.
Assume a linear velocity profile. (08 Marks)
Module-2
3 a. Derive an expression for total pressure on one side of an inclined plane and show that the cc,
center of pressure lies lower than its Centro id. (08 Marks)
8 ,2
b.
If for a two dimensional potential flow, the velocity potential is given by 4
=
x(2y ? 1) .
d ?
)

Determine. the velocity at the point P(4, 5). Determine also the value of stream function
tf
at
the point P . (08 Marks)
?:
J
6
- a
OR
!
4 a. Obtain an expression for continuity equation in three dimensional form. (08 Marks)
b. A vertical Gate closes a horizontal tunnel 5 in high and 3 m wide running full with water.
0
C'd
0
The pressure at the .bottom of the gate is 196.20 kN/m
-
. Determine the total pressure on the
t
gate and position of the centre of pressure. (08 Marks)
71..
c: Module-3
o <
5 a. Obtain Euler's equation of motion along a stream tube and hence derive Bernoulli's
equation. List out the assumptions made. (08 Marks)
b. A horizontal venutrimeter with inlet diameter of 25 cm and throat diameter of 15 cm is used
to measure. The flow of water. The pressure at the throat is 30 cm of mercury (vaccum) and
that at the inlet is.-200 KN/m
2
(gauge). Find the discharge of water through the meter. Take
Cd = 0.98. (08 Marks).
15CV33
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LIBRARY
CHIKOD1
USN
Third Semester B.E. Degree Examination, Dec. an.2020
Fluid Mechanics
Time: 3 hrs. Max. Marks: 80
Note: Answer FIVE full questions, choosing ONE full question from each module.
7:3
Module-1.
7t
I a. Define the following terms. Mention their units and dimensiOns.?
(i) Mass density (ii) Weight density (iii) Specific Volume (iv) Specific gravity
b.
(08 Marks)
A U tube manometer is used to measure the pressure:of oil of specific gravity 0.85 flowing
in a pipe line. Its left end is connected to the pipe and right limb is open to atmosphere. The
to
C4.7.
=
center of the pipe is 100 mm below the level of mercury (Sp.Gr = 13.6). In the right limb. If
the difference ofmercury levels in the right limb and left limb is 160 mm, determine the
absolute pressure of oil in the pipe.
to
(08 Marks)
OR
2 a. State and prove Pascal's law. (08 Marks)
b. A 400 mm shaft is rotating at 200 rpm in a bearing of length 100 mm. If the thickness of the
oil film is 1.4 mm and the dynamic viscosity of the oil is 0.7 N-S/nit Determine
?
(i) Torque required to overcome friction in bearing.
(ii) Power utilized.in overcoming viscous
.
resistance.
Assume a linear velocity profile. (08 Marks)
Module-2
3 a. Derive an expression for total pressure on one side of an inclined plane and show that the cc,
center of pressure lies lower than its Centro id. (08 Marks)
8 ,2
b.
If for a two dimensional potential flow, the velocity potential is given by 4
=
x(2y ? 1) .
d ?
)

Determine. the velocity at the point P(4, 5). Determine also the value of stream function
tf
at
the point P . (08 Marks)
?:
J
6
- a
OR
!
4 a. Obtain an expression for continuity equation in three dimensional form. (08 Marks)
b. A vertical Gate closes a horizontal tunnel 5 in high and 3 m wide running full with water.
0
C'd
0
The pressure at the .bottom of the gate is 196.20 kN/m
-
. Determine the total pressure on the
t
gate and position of the centre of pressure. (08 Marks)
71..
c: Module-3
o <
5 a. Obtain Euler's equation of motion along a stream tube and hence derive Bernoulli's
equation. List out the assumptions made. (08 Marks)
b. A horizontal venutrimeter with inlet diameter of 25 cm and throat diameter of 15 cm is used
to measure. The flow of water. The pressure at the throat is 30 cm of mercury (vaccum) and
that at the inlet is.-200 KN/m
2
(gauge). Find the discharge of water through the meter. Take
Cd = 0.98. (08 Marks).
15CV33
OR
6 a. Derive the equation for the discharge through venturimeter. List out the assumptions m,
(08 Man
b
.
A 306 mm diameter pipe carries water under a head of 20 m, with a velocity of 3.5 m/s. i
the axis of the pipe turns through 45?, find the magnitude and direction of the resultant force
at the bend. (08 Marks)
Module-4
7 a. Define various hydraulic coefficients of an orifice and derive the relation for discharge
through an orifice. (08 Marks)
b. A rectangular notch 40 cm long is used for measuring a discharge of 30 1ps. An error cf
1.5 mm was made while measuring the head over the notch. Calculate the percent error in
the discharge C
d
= 0.6 (08 Marks)
OR
8 a. Derive an expression for discharge over a triangular notch. (08 Marks)
b. A rectangular orifice 1.5 m wide and 1.0 m deep is discharging water form a tank. if the
water level in the tank is 3 m above the top edge of the orifice, find the discharge througN.?
the orifice. Take Cd = 0.6 (08 Marks)
Module-5
9 a. Derive the Darcy-Weisbach equation for head loss due to friction in a pipe. (08 Marks)
b. A compound piping system consists of 1800 m of 0.5 m, 1200 m of 0.4 m and 600 m of
0.3 m new cast iron pipes connected in series. Convert the system to,
(i) An equivalent length of 0.4 m pipe.
(ii) Equivalent size pipe 3600 m long. (08 Marks )
OR
10 a. Water is flowing in a pipe of 150 mm diameter with a velocity of 2.5 m/s. When it is
suddenly brought to rest by closing the valve. Find the pressure rise assuming the pipe is
elastic, given E = 200 GN/m
2
, Poisson's ratio 0.25 and K for water = 2 GN/m
2
, pipe wall is
5 mm thick. (08 Marks)
b. Write short notes on: (i) Minor losses in pipe flow (ii) Hardy cross method
(iii) Water hammer in pipes. (08 Marks
2 of 2
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This post was last modified on 02 March 2020