Find the average velocity of the water leaving the tank.

Question

Want to see more full solutions like this?

Answer 1

Question

Chapter 9, Problem 39P

To determine

Find the average velocity of the water leaving the tank.

Expert Solution & Answer

Answer to Problem 39P

The average velocity of the leaving water in ins, fts, and ms are 33.48 ins_, 2.79 fts and 0.85 ms respectively.

Explanation of Solution

Given data:

Refer to the given Figure Problem 9.38 in the textbook, which shows the tank is filled by water using pipes 1 and 2.

The water level increases in the rate of 0.1 in/s.

The diameter of the tank is (dtank) 6 in.

Formula used:

Write the expression for the volume flow rate.

Q=VaverageAc

Here,

Ac is cross-sectional area, and

Vaverage is average velocity.

Calculation:

Consider that the constant water density.

From the given figure, write the volume flow rate expression for inlet and outlet volumetric flow rate expressions.

Q1+Q2−Q3=Atankchange in the height of watertime

Re-arrange the equation,

Q1+Q2−Atankchange in the height of watertime=Q3V1A1+V2A2−Atankchange in the height of watertime=V3A3[V1(π4)(d1)2+V2(π4)(d2)2−(π4)(dtank)2(0.1 ins)=V3(π4)(d3)2=Q3] [∴A=π4d2, and[change in the height of water]time=0.1 ins]

Substitute 2 fts for V1, 1.5 fts for V2, 1 in. for d1, 1.75 in. for d2, 1.5 in. for d3, and 6 in. for dtank,

(2 fts)(π4)(1 in.)2+(1.5 fts)(π4)(1.75 in.)2−(π4)(6 in.)2(0.1 in.s)=(V3)(π4)(1.5 in.)2=Q3 {[(2 fts)(π4)(1 ft12 )2+(1.5 fts)(π4)(1.75 ft12 )2−(π4)(6 ft12 )2(0.1 12 fts)=(V3)(π4)(1.5ft12 )2=Q3]} [∴1 in.=112 ft]0.0109 ft3s+0.02505 ft3s−0.001636 ft3s=0.01227 ft2(V3)=Q3 0.0343 ft3s=0.01227 ft2(V3)=Q3

The values of Q3 and V3 are,

Q3=0.0343 ft3s,

And

V3=0.0343 ft3s0.01227 ft2

V3=2.79 fts (1)

Convert the unit of value in equation (1) from fts to ins.

V3=2.79×12 ins [∴1 ft=12 in.]=33.48 ins

Convert the unit of value in equation (1) from fts to ms.

V3=2.79×0.3048 ms [∴1 ft=0.3048 ms]=0.85 ms

Conclusion:

Hence, the average velocity of the leaving water in ins, fts, and ms are 33.48 ins_, 2.79 fts and 0.85 ms respectively.

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Students have asked these similar questions

Note: Please provide a clear, step-by-step, simplified handwritten working out (no explanations!), ensuring it is completed without any AI involvement. I require an expert-level answer and will assess and rate your work based on its quality and accuracy, refer to the provided image for additional clarity. Make sure to double-check everything for correctness before submitting. Thanks, appreciate your time and effort!.

Need help!! Add martin luther king jr day as a holiday so it won't be a work day

ضهقعفكضكشتبتلتيزذظظؤوروىووؤءظكصحبت٢٨٩٤٨٤ع٣خ٩@@@#&#)@)

Answer 2

Question

Chapter 9, Problem 39P

To determine

Find the average velocity of the water leaving the tank.

Expert Solution & Answer

Answer to Problem 39P

The average velocity of the leaving water in ins, fts, and ms are 33.48 ins_, 2.79 fts and 0.85 ms respectively.

Explanation of Solution

Given data:

Refer to the given Figure Problem 9.38 in the textbook, which shows the tank is filled by water using pipes 1 and 2.

The water level increases in the rate of 0.1 in/s.

The diameter of the tank is (dtank) 6 in.

Formula used:

Write the expression for the volume flow rate.

Q=VaverageAc

Here,

Ac is cross-sectional area, and

Vaverage is average velocity.

Calculation:

Consider that the constant water density.

From the given figure, write the volume flow rate expression for inlet and outlet volumetric flow rate expressions.

Q1+Q2−Q3=Atankchange in the height of watertime

Re-arrange the equation,

Q1+Q2−Atankchange in the height of watertime=Q3V1A1+V2A2−Atankchange in the height of watertime=V3A3[V1(π4)(d1)2+V2(π4)(d2)2−(π4)(dtank)2(0.1 ins)=V3(π4)(d3)2=Q3] [∴A=π4d2, and[change in the height of water]time=0.1 ins]

Substitute 2 fts for V1, 1.5 fts for V2, 1 in. for d1, 1.75 in. for d2, 1.5 in. for d3, and 6 in. for dtank,

(2 fts)(π4)(1 in.)2+(1.5 fts)(π4)(1.75 in.)2−(π4)(6 in.)2(0.1 in.s)=(V3)(π4)(1.5 in.)2=Q3 {[(2 fts)(π4)(1 ft12 )2+(1.5 fts)(π4)(1.75 ft12 )2−(π4)(6 ft12 )2(0.1 12 fts)=(V3)(π4)(1.5ft12 )2=Q3]} [∴1 in.=112 ft]0.0109 ft3s+0.02505 ft3s−0.001636 ft3s=0.01227 ft2(V3)=Q3 0.0343 ft3s=0.01227 ft2(V3)=Q3

The values of Q3 and V3 are,

Q3=0.0343 ft3s,

And

V3=0.0343 ft3s0.01227 ft2

V3=2.79 fts (1)

Convert the unit of value in equation (1) from fts to ins.

V3=2.79×12 ins [∴1 ft=12 in.]=33.48 ins

Convert the unit of value in equation (1) from fts to ms.

V3=2.79×0.3048 ms [∴1 ft=0.3048 ms]=0.85 ms

Conclusion:

Hence, the average velocity of the leaving water in ins, fts, and ms are 33.48 ins_, 2.79 fts and 0.85 ms respectively.

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 3

Question

Chapter 9, Problem 39P

To determine

Find the average velocity of the water leaving the tank.

Expert Solution & Answer

Answer to Problem 39P

The average velocity of the leaving water in ins, fts, and ms are 33.48 ins_, 2.79 fts and 0.85 ms respectively.

Explanation of Solution

Given data:

Refer to the given Figure Problem 9.38 in the textbook, which shows the tank is filled by water using pipes 1 and 2.

The water level increases in the rate of 0.1 in/s.

The diameter of the tank is (dtank) 6 in.

Formula used:

Write the expression for the volume flow rate.

Q=VaverageAc

Here,

Ac is cross-sectional area, and

Vaverage is average velocity.

Calculation:

Consider that the constant water density.

From the given figure, write the volume flow rate expression for inlet and outlet volumetric flow rate expressions.

Q1+Q2−Q3=Atankchange in the height of watertime

Re-arrange the equation,

Q1+Q2−Atankchange in the height of watertime=Q3V1A1+V2A2−Atankchange in the height of watertime=V3A3[V1(π4)(d1)2+V2(π4)(d2)2−(π4)(dtank)2(0.1 ins)=V3(π4)(d3)2=Q3] [∴A=π4d2, and[change in the height of water]time=0.1 ins]

Substitute 2 fts for V1, 1.5 fts for V2, 1 in. for d1, 1.75 in. for d2, 1.5 in. for d3, and 6 in. for dtank,

(2 fts)(π4)(1 in.)2+(1.5 fts)(π4)(1.75 in.)2−(π4)(6 in.)2(0.1 in.s)=(V3)(π4)(1.5 in.)2=Q3 {[(2 fts)(π4)(1 ft12 )2+(1.5 fts)(π4)(1.75 ft12 )2−(π4)(6 ft12 )2(0.1 12 fts)=(V3)(π4)(1.5ft12 )2=Q3]} [∴1 in.=112 ft]0.0109 ft3s+0.02505 ft3s−0.001636 ft3s=0.01227 ft2(V3)=Q3 0.0343 ft3s=0.01227 ft2(V3)=Q3

The values of Q3 and V3 are,

Q3=0.0343 ft3s,

And

V3=0.0343 ft3s0.01227 ft2

V3=2.79 fts (1)

Convert the unit of value in equation (1) from fts to ins.

V3=2.79×12 ins [∴1 ft=12 in.]=33.48 ins

Convert the unit of value in equation (1) from fts to ms.

V3=2.79×0.3048 ms [∴1 ft=0.3048 ms]=0.85 ms

Conclusion:

Hence, the average velocity of the leaving water in ins, fts, and ms are 33.48 ins_, 2.79 fts and 0.85 ms respectively.

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 4

Question

Chapter 9, Problem 39P

To determine

Find the average velocity of the water leaving the tank.

Expert Solution & Answer

Answer to Problem 39P

The average velocity of the leaving water in ins, fts, and ms are 33.48 ins_, 2.79 fts and 0.85 ms respectively.

Explanation of Solution

Given data:

Refer to the given Figure Problem 9.38 in the textbook, which shows the tank is filled by water using pipes 1 and 2.

The water level increases in the rate of 0.1 in/s.

The diameter of the tank is (dtank) 6 in.

Formula used:

Write the expression for the volume flow rate.

Q=VaverageAc

Here,

Ac is cross-sectional area, and

Vaverage is average velocity.

Calculation:

Consider that the constant water density.

From the given figure, write the volume flow rate expression for inlet and outlet volumetric flow rate expressions.

Q1+Q2−Q3=Atankchange in the height of watertime

Re-arrange the equation,

Q1+Q2−Atankchange in the height of watertime=Q3V1A1+V2A2−Atankchange in the height of watertime=V3A3[V1(π4)(d1)2+V2(π4)(d2)2−(π4)(dtank)2(0.1 ins)=V3(π4)(d3)2=Q3] [∴A=π4d2, and[change in the height of water]time=0.1 ins]

Substitute 2 fts for V1, 1.5 fts for V2, 1 in. for d1, 1.75 in. for d2, 1.5 in. for d3, and 6 in. for dtank,

(2 fts)(π4)(1 in.)2+(1.5 fts)(π4)(1.75 in.)2−(π4)(6 in.)2(0.1 in.s)=(V3)(π4)(1.5 in.)2=Q3 {[(2 fts)(π4)(1 ft12 )2+(1.5 fts)(π4)(1.75 ft12 )2−(π4)(6 ft12 )2(0.1 12 fts)=(V3)(π4)(1.5ft12 )2=Q3]} [∴1 in.=112 ft]0.0109 ft3s+0.02505 ft3s−0.001636 ft3s=0.01227 ft2(V3)=Q3 0.0343 ft3s=0.01227 ft2(V3)=Q3

The values of Q3 and V3 are,

Q3=0.0343 ft3s,

And

V3=0.0343 ft3s0.01227 ft2

V3=2.79 fts (1)

Convert the unit of value in equation (1) from fts to ins.

V3=2.79×12 ins [∴1 ft=12 in.]=33.48 ins

Convert the unit of value in equation (1) from fts to ms.

V3=2.79×0.3048 ms [∴1 ft=0.3048 ms]=0.85 ms

Conclusion:

Hence, the average velocity of the leaving water in ins, fts, and ms are 33.48 ins_, 2.79 fts and 0.85 ms respectively.

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 5

Chapter 9, Problem 39P

To determine

Find the average velocity of the water leaving the tank.

Expert Solution & Answer

Answer to Problem 39P

The average velocity of the leaving water in ins, fts, and ms are 33.48 ins_, 2.79 fts and 0.85 ms respectively.

Explanation of Solution

Given data:

Refer to the given Figure Problem 9.38 in the textbook, which shows the tank is filled by water using pipes 1 and 2.

The water level increases in the rate of 0.1 in/s.

The diameter of the tank is (dtank) 6 in.

Formula used:

Write the expression for the volume flow rate.

Q=VaverageAc

Here,

Ac is cross-sectional area, and

Vaverage is average velocity.

Calculation:

Consider that the constant water density.

From the given figure, write the volume flow rate expression for inlet and outlet volumetric flow rate expressions.

Q1+Q2−Q3=Atankchange in the height of watertime

Re-arrange the equation,

Q1+Q2−Atankchange in the height of watertime=Q3V1A1+V2A2−Atankchange in the height of watertime=V3A3[V1(π4)(d1)2+V2(π4)(d2)2−(π4)(dtank)2(0.1 ins)=V3(π4)(d3)2=Q3] [∴A=π4d2, and[change in the height of water]time=0.1 ins]

Substitute 2 fts for V1, 1.5 fts for V2, 1 in. for d1, 1.75 in. for d2, 1.5 in. for d3, and 6 in. for dtank,

(2 fts)(π4)(1 in.)2+(1.5 fts)(π4)(1.75 in.)2−(π4)(6 in.)2(0.1 in.s)=(V3)(π4)(1.5 in.)2=Q3 {[(2 fts)(π4)(1 ft12 )2+(1.5 fts)(π4)(1.75 ft12 )2−(π4)(6 ft12 )2(0.1 12 fts)=(V3)(π4)(1.5ft12 )2=Q3]} [∴1 in.=112 ft]0.0109 ft3s+0.02505 ft3s−0.001636 ft3s=0.01227 ft2(V3)=Q3 0.0343 ft3s=0.01227 ft2(V3)=Q3

The values of Q3 and V3 are,

Q3=0.0343 ft3s,

And

V3=0.0343 ft3s0.01227 ft2

V3=2.79 fts (1)

Convert the unit of value in equation (1) from fts to ins.

V3=2.79×12 ins [∴1 ft=12 in.]=33.48 ins

Convert the unit of value in equation (1) from fts to ms.

V3=2.79×0.3048 ms [∴1 ft=0.3048 ms]=0.85 ms

Conclusion:

Hence, the average velocity of the leaving water in ins, fts, and ms are 33.48 ins_, 2.79 fts and 0.85 ms respectively.

Answer 6

Chapter 9, Problem 39P

To determine

Find the average velocity of the water leaving the tank.

Expert Solution & Answer

Answer to Problem 39P

The average velocity of the leaving water in ins, fts, and ms are 33.48 ins_, 2.79 fts and 0.85 ms respectively.

Explanation of Solution

Given data:

Refer to the given Figure Problem 9.38 in the textbook, which shows the tank is filled by water using pipes 1 and 2.

The water level increases in the rate of 0.1 in/s.

The diameter of the tank is (dtank) 6 in.

Formula used:

Write the expression for the volume flow rate.

Q=VaverageAc

Here,

Ac is cross-sectional area, and

Vaverage is average velocity.

Calculation:

Consider that the constant water density.

From the given figure, write the volume flow rate expression for inlet and outlet volumetric flow rate expressions.

Q1+Q2−Q3=Atankchange in the height of watertime

Re-arrange the equation,

Q1+Q2−Atankchange in the height of watertime=Q3V1A1+V2A2−Atankchange in the height of watertime=V3A3[V1(π4)(d1)2+V2(π4)(d2)2−(π4)(dtank)2(0.1 ins)=V3(π4)(d3)2=Q3] [∴A=π4d2, and[change in the height of water]time=0.1 ins]

Substitute 2 fts for V1, 1.5 fts for V2, 1 in. for d1, 1.75 in. for d2, 1.5 in. for d3, and 6 in. for dtank,

(2 fts)(π4)(1 in.)2+(1.5 fts)(π4)(1.75 in.)2−(π4)(6 in.)2(0.1 in.s)=(V3)(π4)(1.5 in.)2=Q3 {[(2 fts)(π4)(1 ft12 )2+(1.5 fts)(π4)(1.75 ft12 )2−(π4)(6 ft12 )2(0.1 12 fts)=(V3)(π4)(1.5ft12 )2=Q3]} [∴1 in.=112 ft]0.0109 ft3s+0.02505 ft3s−0.001636 ft3s=0.01227 ft2(V3)=Q3 0.0343 ft3s=0.01227 ft2(V3)=Q3

The values of Q3 and V3 are,

Q3=0.0343 ft3s,

And

V3=0.0343 ft3s0.01227 ft2

V3=2.79 fts (1)

Convert the unit of value in equation (1) from fts to ins.

V3=2.79×12 ins [∴1 ft=12 in.]=33.48 ins

Convert the unit of value in equation (1) from fts to ms.

V3=2.79×0.3048 ms [∴1 ft=0.3048 ms]=0.85 ms

Conclusion:

Hence, the average velocity of the leaving water in ins, fts, and ms are 33.48 ins_, 2.79 fts and 0.85 ms respectively.

Answer 7

Chapter 9, Problem 39P

To determine

Find the average velocity of the water leaving the tank.

Answer 8

Expert Solution & Answer

Answer to Problem 39P

The average velocity of the leaving water in ins, fts, and ms are 33.48 ins_, 2.79 fts and 0.85 ms respectively.

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

Explanation of Solution

Given data:

Refer to the given Figure Problem 9.38 in the textbook, which shows the tank is filled by water using pipes 1 and 2.

The water level increases in the rate of 0.1 in/s.

The diameter of the tank is (dtank) 6 in.

Formula used:

Write the expression for the volume flow rate.

Q=VaverageAc

Here,

Ac is cross-sectional area, and

Vaverage is average velocity.

Calculation:

Consider that the constant water density.

From the given figure, write the volume flow rate expression for inlet and outlet volumetric flow rate expressions.

Q1+Q2−Q3=Atankchange in the height of watertime

Re-arrange the equation,

Q1+Q2−Atankchange in the height of watertime=Q3V1A1+V2A2−Atankchange in the height of watertime=V3A3[V1(π4)(d1)2+V2(π4)(d2)2−(π4)(dtank)2(0.1 ins)=V3(π4)(d3)2=Q3] [∴A=π4d2, and[change in the height of water]time=0.1 ins]

Substitute 2 fts for V1, 1.5 fts for V2, 1 in. for d1, 1.75 in. for d2, 1.5 in. for d3, and 6 in. for dtank,

(2 fts)(π4)(1 in.)2+(1.5 fts)(π4)(1.75 in.)2−(π4)(6 in.)2(0.1 in.s)=(V3)(π4)(1.5 in.)2=Q3 {[(2 fts)(π4)(1 ft12 )2+(1.5 fts)(π4)(1.75 ft12 )2−(π4)(6 ft12 )2(0.1 12 fts)=(V3)(π4)(1.5ft12 )2=Q3]} [∴1 in.=112 ft]0.0109 ft3s+0.02505 ft3s−0.001636 ft3s=0.01227 ft2(V3)=Q3 0.0343 ft3s=0.01227 ft2(V3)=Q3