Physics for Scientists and Engineers With Modern Physics
Physics for Scientists and Engineers With Modern Physics
9th Edition
ISBN: 9781133953982
Author: SERWAY, Raymond A./
Publisher: Cengage Learning
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Chapter 21, Problem 51AP

(i)

To determine

Find the final pressure, final volume, final temperature, change in internal energy, energy added to the gas, and work done on the gas, if the gas is heated at constant pressure at 400K.

(i)

Expert Solution
Check Mark

Answer to Problem 51AP

  1. (a) The final pressure is 100kPa.
  2. (b) The final volume is 66.5L.
  3. (c) The final temperature is 400K.
  4. (d) The change in internal energy of the gas is 5.82kJ.
  5. (e) The energy added to the gas is 7.48kJ.
  6. (f) The work done on the gas is 1.66kJ.

Explanation of Solution

(a)

Since an isobaric process occurs at constant pressure. an isobaric expansion of a gas requires heat transfers to keep the pressure constant. So that the final pressure of the gas is equal to the initial pressure.

Find the final pressure of the gas.

  Pf=1.00×105Pa=100×103Pa(103kPa1Pa)=100kPa

(b)

Find the final volume of the gas, by using ideal gas equation.

  Vf=nRTfPf                                                                                              (I)

Here, Vf is the final volume of the gas, Pf is the final pressure of the gas, n is the number of moles, Tf is the final temperature, and R is the gas constant.

(c)

Since the final temperature of the gas heated at constant pressure is 400K.

(d)

Find the internal energy of the gas.

  ΔEint=72nR(TfTi)                                                                              (II)

Here, ΔEint is the internal energy of the gas and Ti is the initial temperature of the gas.

(e)

Find the energy added to the gas by heat.

  Q=nCP(TfTi)

Here, Q is the amount of heat added to the system and CP is the specific heat capacity at constant pressure.

Rearrange the above equation for constant pressure.

  Q=92nR(TfTi)                                                                                     (III)

(f)

Find the work done by the gas.

  W=PΔV

Here, ΔV is the change in volume.

Replace nRΔT for PΔV in the above equation.

  W=nRΔT=nR(TfTi)                                                                                      (IV)

Conclusion:

Substitute 2.00mol for n, 8.314J/molK for R, 400K for Tf, and 100×103Pa for Pf in equation (I) to find Vf.

  Vf=(2.00mol)(8.314J/molK)(400K)(100×103Pa)=66.5×103m3(103L1m3)=66.5L

Substitute 2.00mol for n, 8.314J/molK for R, 400K for Tf, and 300K for Ti in equation (II) to find ΔEint.

  ΔEint=72(2.00mol)(8.314J/molK)(400K300K)=5.82×103J(103kJ1J)=5.82kJ

Substitute 2.00mol for n, 8.314J/molK for R, 400K for Tf, and 300K for Ti in equation (III) to find Q.

  Q=92(2.00mol)(8.314J/molK)(400K300K)=7.48×103J(103kJ1J)=7.48kJ

Substitute 2.00mol for n, 8.314J/molK for R, 400K for Tf, and 300K for Ti in equation (IV) to find W.

  W=(2.00mol)(8.314J/molK)(400K300K)=1.66×103J(103kJ1J)=1.66kJ

Therefore,

  1. (a) The final pressure is 100kPa.
  2. (b) The final volume is 66.5L.
  3. (c) The final temperature is 400K.
  4. (d) The change in internal energy of the gas is 5.82kJ.
  5. (e) The energy added to the gas is 7.48kJ.
  6. (f) The work done on the gas is 1.66kJ.

(ii)

To determine

Find the final pressure, final volume, final temperature, change in internal energy, energy added to the gas, and work done on the gas, if the gas is heated at constant volume at 400K.

(ii)

Expert Solution
Check Mark

Answer to Problem 51AP

  1. (a) The final pressure is 133kPa.
  2. (b) The final volume is 49.9L.
  3. (c) The final temperature is 400K.
  4. (d) The change in internal energy of the gas is 5.82kJ.
  5. (e) The energy added to the gas is 5.82kJ.
  6. (f) The work done on the gas is 0.

Explanation of Solution

(a)

Find the final pressure of the gas for an iso-volumetric process.

  PfTf=PiTi

Rearrange the above equation for Pf.

  Pf=Pi(TfTi)                                                                                          (V)

(b)

Find the final volume of the gas, by using ideal gas equation.

  Vf=nRTiPi                                                                                             (VI)

(c)

Since the final temperature of the gas heated at constant pressure is 400K.

(d)

Find the internal energy of the gas.

  ΔEint=72nR(TfTi)                                                                            (VII)

(e)

Find the energy added to the gas by heat.

  Q=nCV(TfTi)

Here, CV is the specific heat capacity at constant volume.

Rearrange the above equation for constant volume.

  Q=72nR(TfTi)                                                                                    (VIII)

(f)

Find the work done by the gas.

  W=PΔV

Since, volume is constant so that work done on the gas is zero.

Conclusion:

Substitute 300K for Ti, 1.00×105Pa for Pi, and 400K for Tf in equation (V) to find Pf.

  Pf=(1.00×105Pa)(400K300K)=133×103Pa(103kPa1Pa)=133kPa

Substitute 300K for Ti, 1.00×105Pa for Pi, 2.00mol for n, and 8.314J/molK for R in equation (VI) to find Vf.

  Vf=(2.00mol)(8.314J/molK)(300K)(1.00×105Pa)=49.9×103m3(103L1m3)=49.9L

Substitute 2.00mol for n, 8.314J/molK for R, 400K for Tf, and 300K for Ti in equation (VII) to find ΔEint.

  ΔEint=72(2.00mol)(8.314J/molK)(400K300K)=5.82×103J(103kJ1J)=5.82kJ

Substitute 2.00mol for n, 8.314J/molK for R, 400K for Tf, and 300K for Ti in equation (VIII) to find Q.

  Q=72(2.00mol)(8.314J/molK)(400K300K)=5.82×103J(103kJ1J)=5.82kJ

Therefore,

  1. (a) The final pressure is 133kPa.
  2. (b) The final volume is 49.9L.
  3. (c) The final temperature is 400K.
  4. (d) The change in internal energy of the gas is 5.82kJ.
  5. (e) The energy added to the gas is 5.82kJ.
  6. (f) The work done on the gas is 0.

(iii)

To determine

Find the final pressure, final volume, final temperature, change in internal energy, energy added to the gas, and work done on the gas, if the gas is compressed at constant temperature to 1.20×105Pa.

(iii)

Expert Solution
Check Mark

Answer to Problem 51AP

  1. (a) The final pressure is 120kPa.
  2. (b) The final volume is 41.6L.
  3. (c) The final temperature is 300K.
  4. (d) The change in internal energy of the gas is 0.
  5. (e) The energy added to the gas is 909J.
  6. (f) The work done on the gas is 909J.

Explanation of Solution

(a)

Since an isobaric process occurs at constant pressure. An isobaric expansion of a gas requires heat transfers to keep the pressure constant. So that the final pressure of the gas is equal to the initial pressure.

Find the final pressure of the gas.

  Pf=1.20×105Pa=120×103Pa(103kPa1Pa)=120kPa

(b)

Find the final volume of the gas, by using ideal gas equation.

  Vf=Vi(PiPf)                                                                                              (IX)

(c)

Since the final temperature of the gas heated at constant temperature is 300K.

(d)

Find the internal energy of the gas.

  ΔEint=72nR(TfTi)

Since the temperature is constant for the compressed gas, so that internal energy of the gas is zero.

(e)

Find the energy added to the gas by heat.

  Q=ΔEintW                                                                                              (X)

(f)

Find the work done by the gas.

  W=PΔV

Integrate the above equation.

  W=nRTiViVfdVV=nRTiln(VfVi)=nRTiln(PiPf)                                                                                      (XI)

Conclusion:

Substitute 120kPa for Pf, 100kPa for Pi, and 49.9L for Vi in equation (IX) to find Vf.

  Vf=(49.9L)(100kPa120kPa)=41.6L

Substitute 0 for ΔEint and 909J for W in equation (X) to find Q.

  Q=0909J=909J

Substitute 120kPa for Pf, 100kPa for Pi, 2.00mol for n, 8.314J/molK for R, and 300K for Ti in equation (XI) to find W.

  W=(2.00mol)(8.314J/molK)(300K)ln(100kPa120kPa)=909J

Therefore,

  1. (a) The final pressure is 120kPa.
  2. (b) The final volume is 41.6L.
  3. (c) The final temperature is 300K.
  4. (d) The change in internal energy of the gas is 0.
  5. (e) The energy added to the gas is 909J.
  6. (f) The work done on the gas is 909J.

(iv)

To determine

Find the final pressure, final volume, final temperature, change in internal energy, energy added to the gas, and work done on the gas, if the gas is compressed adiabatically to 1.20×105Pa.

(iv)

Expert Solution
Check Mark

Answer to Problem 51AP

  1. (a) The final pressure is 120kPa.
  2. (b) The final volume is 43.3L.
  3. (c) The final temperature is 312K.
  4. (d) The change in internal energy of the gas is 722J.
  5. (e) The energy added to the gas is 0.
  6. (f) The work done on the gas is 722J.

Explanation of Solution

(a)

Since an isobaric process occurs without transfer of heat between a thermodynamic system.

Find the final pressure of the gas.

  Pf=1.20×105Pa=120×103Pa(103kPa1Pa)=120kPa

(b)

From the adiabatic compression ratio.

  γ=CPCV

Rewrite the above expression.

  γ=CV+RCV=72R+R72R=97

Find the final volume of the gas, by using ideal gas equation.

  PfVfγ=PiViγVf=Vi(PiPf)1γ                                                                                     (XII)

(c)

Find the final temperature of the gas, by using ideal gas equation.

  TiPiVi=TfPfVfTf=Ti(PfVfPiVi)                                                                                        (XIII)

(d)

Find the internal energy of the gas.

  ΔEint=72nR(TfTi)                                                                                      (XIV)

(e)

Since the energy added to the gas by heat is zero.

(f)

Find the work done by the gas.

  W=Q+ΔEint                                                                                                 (XV)

Conclusion:

Substitute 120kPa for Pf, 100kPa for Pi, and 49.9L for Vi in equation (XII) to find Vf.

  Vf=(49.9L)(100kPa120kPa)79=43.3L

Substitute 120kPa for Pf, 100kPa for Pi, 300K for Ti, 43.3L for Vf, and 49.9L for Vi in equation (XIII) to find Tf.

  Tf=(300K)[(120kPa)(43.3L)(100kPa)(49.9L)]=312.4K312K

Substitute 312.4K for Tf, 300K for Ti, 2.00mol for n, and 8.314J/molK for R in equation (XIV) to find ΔEint.

  ΔEint=72(2.00mol)(8.314J/molK)(312.4K300K)=722J

Substitute 0 for Q and 722J for ΔEint in equation (XV) to find W.

  W=0+722J=722J

Therefore,

  1. (a) The final pressure is 120kPa.
  2. (b) The final volume is 43.3L.
  3. (c) The final temperature is 312K.
  4. (d) The change in internal energy of the gas is 722J.
  5. (e) The energy added to the gas is 0.
  6. (f) The work done on the gas is 722J.

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Chapter 21 Solutions

Physics for Scientists and Engineers With Modern Physics

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