Engineering Questions with Answers - Multiple Choice Questions

# MCQs on Continuity Equation

1 - Question

If a liquid enters a pipe of diameter d with a velocity v, what will it’s velocity at the exit if the diameter reduces to 0.5d?
a) v
b) 0.5v
c) 2v
d) 4v

d
Explanation: According to the Continuity Equation,

where a represents flow area, v represents flow velocity, i is for inlet conditions and o is for outlet conditions.

2 - Question

The continuity equation is based on the principle of
a) conservation of mass
b) conservation of momentum
c) conservation of energy
d) conservation of force

a
Explanation: According to the Continuity Equation, if no fluid is added or removed from the pipe in any length then the mass passing across different sections shall be the same. This is in accordance with the principle of conservation of mass which states that matter can neither be created nor be destroyed.

3 - Question

Two pipes of diameters d1 and d2 converge to form a pipe of diameter d. If the liquid flows with a velocity of v1 and v2 in the two pipes, what will be the flow velocity in the third pipe?

d
Explanation: According to the Continuity Equation,

where a represents flow area, v represents flow velocity, i is for inlet conditions and o is for outlet conditions. Thus,

4 - Question

Two pipes of diameters d1 and d2 converge to form a pipe of diameter 2d. If the liquid flows with a velocity of v1 and v2 in the two pipes, what will be the flow velocity in the third pipe?
a) v1 + v2
b) v1 + v2/2
c) v1 + v2/4
d) 2(v1 + v2)

c
Explanation: According to the Continuity Equation,

where a represents flow area, v represents flow velocity, i is for inlet conditions and o is for outlet conditions. Thus,

5 - Question

Two pipes, each of diameter d, converge to form a pipe of diameter D. What should be the relation between d and D such that the flow velocity in the third pipe becomes double of that in each of the two pipes?
a) D = d
b) D = 2d
c) D = 3d
d) D = 4d

a
Explanation: According to the Continuity Equation,
where a represents flow area, v represents flow velocity, i is for inlet conditions and o is for outlet conditions. Thus,
A1v1 + A2v2 = Av
d2v + d2v = D2v
D = d.

6 - Question

Two pipes, each of diameter d, converge to form a pipe of diameter D. What should be the
relation between d and D such that the
ow velocity in the third pipe becomes half of that in each
of the two pipes?
a) D = d/2
b) D = d/3
c) D = d/4
d) D = d/5

a
Explanation: According to the Continuity Equation,
where a represents flow area, v represents flow velocity, i is for inlet conditions and o is for outlet conditions. Thus,
A1v1 + A2v2 = Av
d2v + d2v = Dv/2
d = D ⁄ 4.

7 - Question

In a two dimensional flow, the component of the velocity along the X-axis is u = ax2 + bxy + cy2.
If v = 0 at y = 0, what will be the velocity component in the Y-direction?
a) v = 2axy + by2
b) v = 2axy + b ⁄ 2 y2
c) v = -2axy – b ⁄ 2 y2
d) v = -axy – b ⁄ 2 y2

Explanation: According to the condition for continuity,

8 - Question

In a two dimensional flow, the component of the velocity along the X-axis and the Y-axis are u = ax2 + bxy + cy2 and v = cxy. What should be the condition for the flow field to be continuous?
a) a + c = 0
b) b + c = 0
c) 2a + c = 0
d) 2b + c = 0

c Explanation: According to the condition for continuity, 2ax + cx = 0 2a + c = 0.

c
Explanation: According to the condition for continuity,

2ax + cx = 0
2a + c = 0.

9 - Question

In a two dimensional flow, the component of the velocity along the X-axis and the Y-axis are u = axy and v = bx2 + cy2. What should be the condition for the flow field to be continuous?
a) a + b = 0
b) a + c = 0
c) a + 2b = 0
d) a + 2c = 0

d
Explanation: The condition for the flow field to be continuous is:

ay + 2cy = 0
a + 2c = 0.

10 - Question

In a two dimensional flow, the component of the velocity along the X-axis and the Y-axis are u = ax2 + bxy and v = cxy +dy2. What should be the condition for the flow field to be continuous?
a) (a + b)x + (c + d)y = 0
b) (a + c)x + (b + d)y = 0
c) (2a + b)x + (c + 2d)y = 0
d) (2a + c)x + (b + 2d)y = 0

d
Explanation: The condition for the flow field to be continuous is:

2ax + cx + by + 2dy = 0
(2a + c)x + (b + 2d)y = 0.

11 - Question

In a two dimensional flow, the component of the velocity along the X-axis and the Y-axis are u = ax2 + bxy and v = bxy + ay2. The condition for the flow field to be continuous is
a) independent of the constants (a; b) but dependent on the variables (x; y)
b) independent of the variables (x; y) but dependent on the constants (a; b)
c) independent of both the constants (a; b) and the variables (x; y)
d) dependent on both the constants (a; b) and the variables (x; y)

a
Explanation: The condition for the flow field to be continuous is:

2ax + by + 2ay + bx = 0
x + y = 0
Hence, the condition for the flow field to be continuous is independent of the constants (a; b) and dependent only on the variables (x; y).

12 - Question

In a two dimensional flow, the component of the velocity along the X-axis and the Y-axis are u = ax + by and v = ax – by. For what condition will the flow field be continuous?
a) impossible
b) possible if a = b
c) possible if a = 2b
d) possible for all values of a and b

d
Explanation: The condition for the flow field to be continuous is:
Thus, the condition will be satisfied for any and every value of a and b.

13 - Question

In a two dimensional flow, the component of the velocity along the X-axis and the Y-axis are u = ay2 + bxy and v = ax2 + bxy. The flow will be continuous if
a) a + b = 0
b) a – b = 0
c) x + y = 0
d) x – y = 0

c
Explanation: The condition for the flow field to be continuous is:

by + bx = 0
x + y = 0.

14 - Question

In a two dimensional flow, the component of the velocity along the X-axis and the Y-axis are u = ax2 + bxy and v = bxy + ay2. The condition for the flow field to be continuous is
a) independent of a and b
b) independent of a and c
c) independent of b and c
d) independent of a, b and c

d
Explanation: The condition for the flow field to be continuous is:

2ax + by + 2ay + bx = 0
x + y = 0
Hence, the condition for the flow field to be continuous is independent of a, b and c.

15 - Question

In a water supply system, water flows in from pipes 1 and 2 and goes out from pipes 3 and 4 as shown. If all the pipes have the same diameter, which of the following must be correct?
a) the sum of the flow velocities in 1 and 2 is equal to that in 3 and 4
b) the sum of the flow velocities in 1 and 3 is equal to that in 2 and 4
c) the sum of the flow velocities in 1 and 4 is equal to that in 2 and 3
d) the flow velocities in 1 and 2 is equal to that in 3 and 4