The higher and lower heating values of a coal.

Question

Want to see more full solutions like this?

Answer 1

Question

Chapter 15.7, Problem 45P

To determine

The higher and lower heating values of a coal.

Expert Solution & Answer

Answer to Problem 45P

The higher and lower heating values of a coal is 30,000 kJ/kg and 28,700 kJ/kg respectively.

Explanation of Solution

Express the total mass of the coal when the ash is substituted.

mtotal=100−mash (I)

Here, mass of ash is mash.

Express the mass fraction of carbon.

mfC=mCmtotal (II)

Here, mass of carbon is mC.

Express the mass fraction of hydrogen.

mfH2=mH2mtotal (III)

Here, mass of hydrogen is mH2.

Express the mass fraction of oxygen.

mfO2=mO2mtotal (IV)

Here, mass of oxygen is mO2.

Express the mass fraction of nitrogen.

mfN2=mN2mtotal (V)

Here, mass of nitrogen is mN2.

Express the mass fraction of sulphur.

mfS=mSmtotal (VI)

Here, mass of sulphur is mS.

Express the number of moles of carbon.

NC=mfCMC (VII)

Here, molar mass of carbon is MC.

Express the number of moles of hydrogen.

NH2=mfH2MH2 (VIII)

Here, molar mass of hydrogen is MH2.

Express the number of moles of oxygen.

NO2=mfO2MO2 (IX)

Here, molar mass of oxygen is MO2.

Express the number of moles of nitrogen.

NN2=mfN2MN2 (X)

Here, molar mass of nitrogen is MN2.

Express the number of moles of sulphur.

NS=mfSMS (XI)

Here, molar mass of sulphur is MS.

Express the total number of moles.

Nm=NC+NH2+NO2+NN2+NS (XII)

Express the mole fraction of carbon.

yC=NCNm (XIII)

Express the mole fraction of hydrogen.

yH2=NH2Nm (XIV)

Express the mole fraction of oxygen.

yO2=NO2Nm (XV)

Express the mole fraction of nitrogen.

yN2=NN2Nm (XVI)

Express the mole fraction of sulphur.

yS=NSNm (XVII)

Express the heat transfer from the combustion chamber.

q=hC=HP−HR=∑NPh¯f,Po−∑NRh¯f,Ro=(Nh¯fo)CO2+(Nh¯fo)H2O+(Nh¯fo)SO2 (XVIII)

Here, number of moles of products is NP, number of moles of reactants is NR, enthalpy of formation is h¯f, enthalpy of combustion is hC, enthalpy of products and reactants is HP and HR respectively.

Express apparent molecular weight of the coal.

Mm=mmNm=NCMC+NH2MH2+NO2MO2+NN2MN2+NSMSNC+NH2+NO2+NN2+NS (XIX)

Here, number of moles of carbon, hydrogen, oxygen, nitrogen and sulfur is NC,NH2,NO2,NN2 and NS respectively.

Express higher value of coal.

HHV=−hCmm=−hCNCMC+NH2MH2+NO2MO2+NN2MN2+NSMS (XX)

Express lower value of coal.

LHV=−hCmm=−hCNCMC+NH2MH2+NO2MO2+NN2MN2+NSMS (XXI)

Conclusion:

Refer Table A-1, “molar mass, gas constant, and the critical point properties”, and write the molar masses.

MC=12 kg/kmolMH2=2 kg/kmolMO2=32 kg/kmolMS=32 kg/kmol

Mair=29 kg/kmolMN2=28 kg/kmol

Here, molar mass of air is Mair.

Substitute 5 for mash in Equation (I).

mtotal=100−5=95 kg

Substitute 61.40 kg for mC and 95 kg for mtotal in Equation (II).

mfC=61.40 kg95 kg=0.6463=64.63 kg

Substitute 5.79 kg for mH2 and 95 kg for mtotal in Equation (III).

mfH2=5.79 kg95 kg=0.06095=6.095 kg

Substitute 25.31 kg for mO2 and 95 kg for mtotal in Equation (IV).

mfO2=25.31 kg95 kg=0.2664=26.64 kg

Substitute 1.09 kg for mN2 and 95 kg for mtotal in Equation (V).

mfN2=1.09 kg95 kg=0.01147=1.147 kg

Substitute 1.41 kg for mS and 95 kg for mtotal in Equation (VI).

mfS=1.41 kg95 kg=0.01484=1.484 kg

Substitute 64.63 kg for mC and 12 kg/kmol for MC in Equation (VII).

NC=64.63 kg12 kg/kmol=5.386 kmol

Substitute 6.095 kg for mH2 and 2 kg/kmol for MH2 in Equation (VIII).

NH2=6.095 kg2 kg/kmol=3.048 kmol

Substitute 26.64 kg for mO2 and 32 kg/kmol for MO2 in Equation (IX).

NO2=26.64 kg32 kg/kmol=0.8325 kmol

Substitute 1.147 kg for mN2 and 28 kg/kmol for MN2 in Equation (X).

NN2=1.147 kg28 kg/kmol=0.04096 kmol

Substitute 1.484 kg for mS and 32 kg/kmol for MS in Equation (XI).

NS=1.484 kg32 kg/kmol=0.04638 kmol

Substitute 5.386 kmol for NC, 3.048 kmol for NH2, 0.8325 kmol for NO2, 0.04096 kmol for NN2 and 0.04638 kmol for NS in Equation (XII).

Nm=5.386 kmol+3.048 kmol+0.8325 kmol+0.04096 kmol+0.04638 kmol=9.354 kmol

Substitute 5.386 kmol for NC and 9.354 kmol for Nm in Equation (XIII).

yC=5.386 kmol9.354 kmol=0.5758

Substitute 3.048 kmol for NH2 and 9.354 kmol for Nm in Equation (XIV).

yH2=3.048 kmol9.354 kmol=0.3258

Substitute 0.8325 kmol for NO2 and 9.354 kmol for Nm in Equation (XV).

yO2=0.8325 kmol9.354 kmol=0.0890

Substitute 0.04096 kmol for NN2 and 9.354 kmol for Nm in Equation (XVI).

yN2=0.04096 kmol9.354 kmol=0.00438

Substitute 0.04638 kmol for NS and 9.354 kmol for Nm in Equation (XVII).

yS=0.04638 kmol9.354 kmol=0.00496

Express the combustion equation.

[0.5758C+0.3258H2+0.0890O2+0.00438N2+0.00496S+ath(O2+3.76N2)→0.5758CO2+0.3258H2O+0.00496SO2+kN2] (XXII)

Perform the species balancing:

Oxygen balance:

0.0890+ath=0.5758+0.5(0.3258)+0.00496ath=0.6547

Nitrogen balance:

k=0.00438+3.76(0.6547)=2.466

Substitute 0.6547 for ath and 2.466 for k in Equation (XXII).

[0.5758C+0.3258H2+0.0890O2+0.00438N2+0.00496S+0.6547(O2+3.76N2)→{0.5758CO2+0.3258H2O+0.00496SO2+2.466N2}] (XXIII)

Refer Equation (XIII) and write the number of moles of carbon dioxide, water and sulfur oxide.

NCO2=0.5758 kmolNH2O=0.3258 kmolNSO2=0.00496 kmol

Refer Table A-26, “enthalpy of formation, Gibbs function of formation and entropy at 25°C,1 atm”, and write the enthalpy of formation of carbon dioxide, water and ethane.

h¯f,CO2o=−393,520 kJ/kmolh¯f,H2Oo(l)=−285,830 kJ/kmolh¯f,SO2o=−297,100 kJ/kmol

Substitute 0.5758 kmol for NCO2, −393,520 kJ/kmol for h¯f,CO2o, 0.3258 kmol for NH2O, −285,830 kJ/kmol for h¯f,H2Oo, 0.00496 kmol for NSO2 and −297,100 kJ/kmol for h¯f,SO2o in Equation (XVIII).

hC=[(0.5758 kmol)(−393,520 kJ/kmol)+(0.3258 kmol)(−285,830 kJ/kmol)+(0.00496 kmol)(−297,100 kJ/kmol)]=−321,200 kJ/kmol

Refer Equation (XXIII), and write the number of moles.

NC=0.5758 kmolNH2=0.3258 kmolNO2=0.0890 kmolNN2=0.00438 kmol

NS=0.00496 kmol

Substitute 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XIX).

Mm=[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]0.5758 kmol+0.3258 kmol+0.0890 kmol+0.00438 kmol+0.00496 kmol=10.69 kg1 kmol=10.69 kg/kmol

Substitute −321,200 kJ/kmol for hC, 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XX).

HHV=−(−321,200 kJ/kmol)[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]=321,200 kJ/kmol10.69 kg/kmol=30,000 kJ/kg

Hence, the higher heating value of a coal is 30,000 kJ/kg.

For the LHV (lower heating value), the water in the products is taken to be vapor.

Refer Table A-26, “enthalpy of formation, Gibbs function of formation and entropy at 25°C,1 atm”, and write the enthalpy of gaseous water.

h¯f,H2Oo(g)=−241,820 kJ/kmol

Substitute 0.5758 kmol for NCO2, −393,520 kJ/kmol for h¯f,CO2o, 0.3258 kmol for NH2O, −241,820 kJ/kmol for h¯f,H2Oo, 0.00496 kmol for NSO2 and −297,100 kJ/kmol for h¯f,SO2o in Equation (XVIII).

hC=[(0.5758 kmol)(−393,520 kJ/kmol)+(0.3258 kmol)(−241,820 kJ/kmol)+(0.00496 kmol)(−297,100 kJ/kmol)]=−306,850 kJ/kmol

Substitute −306,850 kJ/kmol for hC, 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XXI).

LHV=−(−306,850 kJ/kmol)[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]=306,850 kJ/kmol10.69 kg/kmol=28,700 kJ/kg

Hence, the lower heating value of a coal is 28,700 kJ/kg.

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

100 As a spring is heated, its spring constant decreases. Suppose the spring is heated and then cooled so that the spring constant at time t is k(t) = t sin + N/m. If the mass-spring system has mass m = 2 kg and a damping constant b = 1 N-sec/m with initial conditions x(0) = 6 m and x'(0) = -5 m/sec and it is subjected to the harmonic external force f (t) = 100 cos 3t N. Find at least the first four nonzero terms in a power series expansion about t = 0, i.e. Maclaurin series expansion, for the displacement: • Analytically (hand calculations) Creating Simulink Model Plot solutions for first two, three and four non-zero terms as well as the Simulink solution on the same graph for the first 15 sec. The graph must be fully formatted by code.

Two springs and two masses are attached in a straight vertical line as shown in Figure Q3. The system is set in motion by holding the mass m₂ at its equilibrium position and pushing the mass m₁ downwards of its equilibrium position a distance 2 m and then releasing both masses. if m₁ = m² = 1 kg, k₁ = 3 N/m and k₂ = 2 N/m. (y₁ = 0) www k₁ = 3 Jm₁ = 1 k2=2 www (Net change in spring length =32-31) (y₂ = 0) m₂ = 1 32 32 System in static equilibrium System in motion Figure Q3 - Coupled mass-spring system Determine the equations of motion y₁ (t) and y₂(t) for the two masses m₁ and m₂ respectively: Analytically (hand calculations) Using MATLAB Numerical Functions (ode45) Creating Simulink Model Produce an animation of the system for all solutions for the first minute.

Two large tanks, each holding 100 L of liquid, are interconnected by pipes, with the liquid flowing from tank A into tank B at a rate of 3 L/min and from B into A at a rate of 1 L/min (see Figure Q1). The liquid inside each tank is kept well stirred. A brine solution with a concentration of 0.2 kg/L of salt flows into tank A at a rate of 6 L/min. The diluted solution flows out of the system from tank A at 4 L/min and from tank B at 2 L/min. If, initially, tank A contains pure water and tank B contains 20 kg of salt. A 6 L/min 0.2 kg/L x(t) 100 L 4 L/min x(0) = 0 kg 3 L/min 1 L/min B y(t) 100 L y(0) = 20 kg 2 L/min Figure Q1 - Mixing problem for interconnected tanks Determine the mass of salt in each tank at time t≥ 0: Analytically (hand calculations) Using MATLAB Numerical Functions (ode45) Creating Simulink Model Plot all solutions on the same graph for the first 15 min. The graph must be fully formatted by code.

Answer 2

Question

Chapter 15.7, Problem 45P

To determine

The higher and lower heating values of a coal.

Expert Solution & Answer

Answer to Problem 45P

The higher and lower heating values of a coal is 30,000 kJ/kg and 28,700 kJ/kg respectively.

Explanation of Solution

Express the total mass of the coal when the ash is substituted.

mtotal=100−mash (I)

Here, mass of ash is mash.

Express the mass fraction of carbon.

mfC=mCmtotal (II)

Here, mass of carbon is mC.

Express the mass fraction of hydrogen.

mfH2=mH2mtotal (III)

Here, mass of hydrogen is mH2.

Express the mass fraction of oxygen.

mfO2=mO2mtotal (IV)

Here, mass of oxygen is mO2.

Express the mass fraction of nitrogen.

mfN2=mN2mtotal (V)

Here, mass of nitrogen is mN2.

Express the mass fraction of sulphur.

mfS=mSmtotal (VI)

Here, mass of sulphur is mS.

Express the number of moles of carbon.

NC=mfCMC (VII)

Here, molar mass of carbon is MC.

Express the number of moles of hydrogen.

NH2=mfH2MH2 (VIII)

Here, molar mass of hydrogen is MH2.

Express the number of moles of oxygen.

NO2=mfO2MO2 (IX)

Here, molar mass of oxygen is MO2.

Express the number of moles of nitrogen.

NN2=mfN2MN2 (X)

Here, molar mass of nitrogen is MN2.

Express the number of moles of sulphur.

NS=mfSMS (XI)

Here, molar mass of sulphur is MS.

Express the total number of moles.

Nm=NC+NH2+NO2+NN2+NS (XII)

Express the mole fraction of carbon.

yC=NCNm (XIII)

Express the mole fraction of hydrogen.

yH2=NH2Nm (XIV)

Express the mole fraction of oxygen.

yO2=NO2Nm (XV)

Express the mole fraction of nitrogen.

yN2=NN2Nm (XVI)

Express the mole fraction of sulphur.

yS=NSNm (XVII)

Express the heat transfer from the combustion chamber.

q=hC=HP−HR=∑NPh¯f,Po−∑NRh¯f,Ro=(Nh¯fo)CO2+(Nh¯fo)H2O+(Nh¯fo)SO2 (XVIII)

Here, number of moles of products is NP, number of moles of reactants is NR, enthalpy of formation is h¯f, enthalpy of combustion is hC, enthalpy of products and reactants is HP and HR respectively.

Express apparent molecular weight of the coal.

Mm=mmNm=NCMC+NH2MH2+NO2MO2+NN2MN2+NSMSNC+NH2+NO2+NN2+NS (XIX)

Here, number of moles of carbon, hydrogen, oxygen, nitrogen and sulfur is NC,NH2,NO2,NN2 and NS respectively.

Express higher value of coal.

HHV=−hCmm=−hCNCMC+NH2MH2+NO2MO2+NN2MN2+NSMS (XX)

Express lower value of coal.

LHV=−hCmm=−hCNCMC+NH2MH2+NO2MO2+NN2MN2+NSMS (XXI)

Conclusion:

Refer Table A-1, “molar mass, gas constant, and the critical point properties”, and write the molar masses.

MC=12 kg/kmolMH2=2 kg/kmolMO2=32 kg/kmolMS=32 kg/kmol

Mair=29 kg/kmolMN2=28 kg/kmol

Here, molar mass of air is Mair.

Substitute 5 for mash in Equation (I).

mtotal=100−5=95 kg

Substitute 61.40 kg for mC and 95 kg for mtotal in Equation (II).

mfC=61.40 kg95 kg=0.6463=64.63 kg

Substitute 5.79 kg for mH2 and 95 kg for mtotal in Equation (III).

mfH2=5.79 kg95 kg=0.06095=6.095 kg

Substitute 25.31 kg for mO2 and 95 kg for mtotal in Equation (IV).

mfO2=25.31 kg95 kg=0.2664=26.64 kg

Substitute 1.09 kg for mN2 and 95 kg for mtotal in Equation (V).

mfN2=1.09 kg95 kg=0.01147=1.147 kg

Substitute 1.41 kg for mS and 95 kg for mtotal in Equation (VI).

mfS=1.41 kg95 kg=0.01484=1.484 kg

Substitute 64.63 kg for mC and 12 kg/kmol for MC in Equation (VII).

NC=64.63 kg12 kg/kmol=5.386 kmol

Substitute 6.095 kg for mH2 and 2 kg/kmol for MH2 in Equation (VIII).

NH2=6.095 kg2 kg/kmol=3.048 kmol

Substitute 26.64 kg for mO2 and 32 kg/kmol for MO2 in Equation (IX).

NO2=26.64 kg32 kg/kmol=0.8325 kmol

Substitute 1.147 kg for mN2 and 28 kg/kmol for MN2 in Equation (X).

NN2=1.147 kg28 kg/kmol=0.04096 kmol

Substitute 1.484 kg for mS and 32 kg/kmol for MS in Equation (XI).

NS=1.484 kg32 kg/kmol=0.04638 kmol

Substitute 5.386 kmol for NC, 3.048 kmol for NH2, 0.8325 kmol for NO2, 0.04096 kmol for NN2 and 0.04638 kmol for NS in Equation (XII).

Nm=5.386 kmol+3.048 kmol+0.8325 kmol+0.04096 kmol+0.04638 kmol=9.354 kmol

Substitute 5.386 kmol for NC and 9.354 kmol for Nm in Equation (XIII).

yC=5.386 kmol9.354 kmol=0.5758

Substitute 3.048 kmol for NH2 and 9.354 kmol for Nm in Equation (XIV).

yH2=3.048 kmol9.354 kmol=0.3258

Substitute 0.8325 kmol for NO2 and 9.354 kmol for Nm in Equation (XV).

yO2=0.8325 kmol9.354 kmol=0.0890

Substitute 0.04096 kmol for NN2 and 9.354 kmol for Nm in Equation (XVI).

yN2=0.04096 kmol9.354 kmol=0.00438

Substitute 0.04638 kmol for NS and 9.354 kmol for Nm in Equation (XVII).

yS=0.04638 kmol9.354 kmol=0.00496

Express the combustion equation.

[0.5758C+0.3258H2+0.0890O2+0.00438N2+0.00496S+ath(O2+3.76N2)→0.5758CO2+0.3258H2O+0.00496SO2+kN2] (XXII)

Perform the species balancing:

Oxygen balance:

0.0890+ath=0.5758+0.5(0.3258)+0.00496ath=0.6547

Nitrogen balance:

k=0.00438+3.76(0.6547)=2.466

Substitute 0.6547 for ath and 2.466 for k in Equation (XXII).

[0.5758C+0.3258H2+0.0890O2+0.00438N2+0.00496S+0.6547(O2+3.76N2)→{0.5758CO2+0.3258H2O+0.00496SO2+2.466N2}] (XXIII)

Refer Equation (XIII) and write the number of moles of carbon dioxide, water and sulfur oxide.

NCO2=0.5758 kmolNH2O=0.3258 kmolNSO2=0.00496 kmol

Refer Table A-26, “enthalpy of formation, Gibbs function of formation and entropy at 25°C,1 atm”, and write the enthalpy of formation of carbon dioxide, water and ethane.

h¯f,CO2o=−393,520 kJ/kmolh¯f,H2Oo(l)=−285,830 kJ/kmolh¯f,SO2o=−297,100 kJ/kmol

Substitute 0.5758 kmol for NCO2, −393,520 kJ/kmol for h¯f,CO2o, 0.3258 kmol for NH2O, −285,830 kJ/kmol for h¯f,H2Oo, 0.00496 kmol for NSO2 and −297,100 kJ/kmol for h¯f,SO2o in Equation (XVIII).

hC=[(0.5758 kmol)(−393,520 kJ/kmol)+(0.3258 kmol)(−285,830 kJ/kmol)+(0.00496 kmol)(−297,100 kJ/kmol)]=−321,200 kJ/kmol

Refer Equation (XXIII), and write the number of moles.

NC=0.5758 kmolNH2=0.3258 kmolNO2=0.0890 kmolNN2=0.00438 kmol

NS=0.00496 kmol

Substitute 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XIX).

Mm=[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]0.5758 kmol+0.3258 kmol+0.0890 kmol+0.00438 kmol+0.00496 kmol=10.69 kg1 kmol=10.69 kg/kmol

Substitute −321,200 kJ/kmol for hC, 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XX).

HHV=−(−321,200 kJ/kmol)[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]=321,200 kJ/kmol10.69 kg/kmol=30,000 kJ/kg

Hence, the higher heating value of a coal is 30,000 kJ/kg.

For the LHV (lower heating value), the water in the products is taken to be vapor.

Refer Table A-26, “enthalpy of formation, Gibbs function of formation and entropy at 25°C,1 atm”, and write the enthalpy of gaseous water.

h¯f,H2Oo(g)=−241,820 kJ/kmol

Substitute 0.5758 kmol for NCO2, −393,520 kJ/kmol for h¯f,CO2o, 0.3258 kmol for NH2O, −241,820 kJ/kmol for h¯f,H2Oo, 0.00496 kmol for NSO2 and −297,100 kJ/kmol for h¯f,SO2o in Equation (XVIII).

hC=[(0.5758 kmol)(−393,520 kJ/kmol)+(0.3258 kmol)(−241,820 kJ/kmol)+(0.00496 kmol)(−297,100 kJ/kmol)]=−306,850 kJ/kmol

Substitute −306,850 kJ/kmol for hC, 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XXI).

LHV=−(−306,850 kJ/kmol)[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]=306,850 kJ/kmol10.69 kg/kmol=28,700 kJ/kg

Hence, the lower heating value of a coal is 28,700 kJ/kg.

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 15.7, Problem 45P

To determine

The higher and lower heating values of a coal.

Expert Solution & Answer

Answer to Problem 45P

The higher and lower heating values of a coal is 30,000 kJ/kg and 28,700 kJ/kg respectively.

Explanation of Solution

Express the total mass of the coal when the ash is substituted.

mtotal=100−mash (I)

Here, mass of ash is mash.

Express the mass fraction of carbon.

mfC=mCmtotal (II)

Here, mass of carbon is mC.

Express the mass fraction of hydrogen.

mfH2=mH2mtotal (III)

Here, mass of hydrogen is mH2.

Express the mass fraction of oxygen.

mfO2=mO2mtotal (IV)

Here, mass of oxygen is mO2.

Express the mass fraction of nitrogen.

mfN2=mN2mtotal (V)

Here, mass of nitrogen is mN2.

Express the mass fraction of sulphur.

mfS=mSmtotal (VI)

Here, mass of sulphur is mS.

Express the number of moles of carbon.

NC=mfCMC (VII)

Here, molar mass of carbon is MC.

Express the number of moles of hydrogen.

NH2=mfH2MH2 (VIII)

Here, molar mass of hydrogen is MH2.

Express the number of moles of oxygen.

NO2=mfO2MO2 (IX)

Here, molar mass of oxygen is MO2.

Express the number of moles of nitrogen.

NN2=mfN2MN2 (X)

Here, molar mass of nitrogen is MN2.

Express the number of moles of sulphur.

NS=mfSMS (XI)

Here, molar mass of sulphur is MS.

Express the total number of moles.

Nm=NC+NH2+NO2+NN2+NS (XII)

Express the mole fraction of carbon.

yC=NCNm (XIII)

Express the mole fraction of hydrogen.

yH2=NH2Nm (XIV)

Express the mole fraction of oxygen.

yO2=NO2Nm (XV)

Express the mole fraction of nitrogen.

yN2=NN2Nm (XVI)

Express the mole fraction of sulphur.

yS=NSNm (XVII)

Express the heat transfer from the combustion chamber.

q=hC=HP−HR=∑NPh¯f,Po−∑NRh¯f,Ro=(Nh¯fo)CO2+(Nh¯fo)H2O+(Nh¯fo)SO2 (XVIII)

Here, number of moles of products is NP, number of moles of reactants is NR, enthalpy of formation is h¯f, enthalpy of combustion is hC, enthalpy of products and reactants is HP and HR respectively.

Express apparent molecular weight of the coal.

Mm=mmNm=NCMC+NH2MH2+NO2MO2+NN2MN2+NSMSNC+NH2+NO2+NN2+NS (XIX)

Here, number of moles of carbon, hydrogen, oxygen, nitrogen and sulfur is NC,NH2,NO2,NN2 and NS respectively.

Express higher value of coal.

HHV=−hCmm=−hCNCMC+NH2MH2+NO2MO2+NN2MN2+NSMS (XX)

Express lower value of coal.

LHV=−hCmm=−hCNCMC+NH2MH2+NO2MO2+NN2MN2+NSMS (XXI)

Conclusion:

Refer Table A-1, “molar mass, gas constant, and the critical point properties”, and write the molar masses.

MC=12 kg/kmolMH2=2 kg/kmolMO2=32 kg/kmolMS=32 kg/kmol

Mair=29 kg/kmolMN2=28 kg/kmol

Here, molar mass of air is Mair.

Substitute 5 for mash in Equation (I).

mtotal=100−5=95 kg

Substitute 61.40 kg for mC and 95 kg for mtotal in Equation (II).

mfC=61.40 kg95 kg=0.6463=64.63 kg

Substitute 5.79 kg for mH2 and 95 kg for mtotal in Equation (III).

mfH2=5.79 kg95 kg=0.06095=6.095 kg

Substitute 25.31 kg for mO2 and 95 kg for mtotal in Equation (IV).

mfO2=25.31 kg95 kg=0.2664=26.64 kg

Substitute 1.09 kg for mN2 and 95 kg for mtotal in Equation (V).

mfN2=1.09 kg95 kg=0.01147=1.147 kg

Substitute 1.41 kg for mS and 95 kg for mtotal in Equation (VI).

mfS=1.41 kg95 kg=0.01484=1.484 kg

Substitute 64.63 kg for mC and 12 kg/kmol for MC in Equation (VII).

NC=64.63 kg12 kg/kmol=5.386 kmol

Substitute 6.095 kg for mH2 and 2 kg/kmol for MH2 in Equation (VIII).

NH2=6.095 kg2 kg/kmol=3.048 kmol

Substitute 26.64 kg for mO2 and 32 kg/kmol for MO2 in Equation (IX).

NO2=26.64 kg32 kg/kmol=0.8325 kmol

Substitute 1.147 kg for mN2 and 28 kg/kmol for MN2 in Equation (X).

NN2=1.147 kg28 kg/kmol=0.04096 kmol

Substitute 1.484 kg for mS and 32 kg/kmol for MS in Equation (XI).

NS=1.484 kg32 kg/kmol=0.04638 kmol

Substitute 5.386 kmol for NC, 3.048 kmol for NH2, 0.8325 kmol for NO2, 0.04096 kmol for NN2 and 0.04638 kmol for NS in Equation (XII).

Nm=5.386 kmol+3.048 kmol+0.8325 kmol+0.04096 kmol+0.04638 kmol=9.354 kmol

Substitute 5.386 kmol for NC and 9.354 kmol for Nm in Equation (XIII).

yC=5.386 kmol9.354 kmol=0.5758

Substitute 3.048 kmol for NH2 and 9.354 kmol for Nm in Equation (XIV).

yH2=3.048 kmol9.354 kmol=0.3258

Substitute 0.8325 kmol for NO2 and 9.354 kmol for Nm in Equation (XV).

yO2=0.8325 kmol9.354 kmol=0.0890

Substitute 0.04096 kmol for NN2 and 9.354 kmol for Nm in Equation (XVI).

yN2=0.04096 kmol9.354 kmol=0.00438

Substitute 0.04638 kmol for NS and 9.354 kmol for Nm in Equation (XVII).

yS=0.04638 kmol9.354 kmol=0.00496

Express the combustion equation.

[0.5758C+0.3258H2+0.0890O2+0.00438N2+0.00496S+ath(O2+3.76N2)→0.5758CO2+0.3258H2O+0.00496SO2+kN2] (XXII)

Perform the species balancing:

Oxygen balance:

0.0890+ath=0.5758+0.5(0.3258)+0.00496ath=0.6547

Nitrogen balance:

k=0.00438+3.76(0.6547)=2.466

Substitute 0.6547 for ath and 2.466 for k in Equation (XXII).

[0.5758C+0.3258H2+0.0890O2+0.00438N2+0.00496S+0.6547(O2+3.76N2)→{0.5758CO2+0.3258H2O+0.00496SO2+2.466N2}] (XXIII)

Refer Equation (XIII) and write the number of moles of carbon dioxide, water and sulfur oxide.

NCO2=0.5758 kmolNH2O=0.3258 kmolNSO2=0.00496 kmol

Refer Table A-26, “enthalpy of formation, Gibbs function of formation and entropy at 25°C,1 atm”, and write the enthalpy of formation of carbon dioxide, water and ethane.

h¯f,CO2o=−393,520 kJ/kmolh¯f,H2Oo(l)=−285,830 kJ/kmolh¯f,SO2o=−297,100 kJ/kmol

Substitute 0.5758 kmol for NCO2, −393,520 kJ/kmol for h¯f,CO2o, 0.3258 kmol for NH2O, −285,830 kJ/kmol for h¯f,H2Oo, 0.00496 kmol for NSO2 and −297,100 kJ/kmol for h¯f,SO2o in Equation (XVIII).

hC=[(0.5758 kmol)(−393,520 kJ/kmol)+(0.3258 kmol)(−285,830 kJ/kmol)+(0.00496 kmol)(−297,100 kJ/kmol)]=−321,200 kJ/kmol

Refer Equation (XXIII), and write the number of moles.

NC=0.5758 kmolNH2=0.3258 kmolNO2=0.0890 kmolNN2=0.00438 kmol

NS=0.00496 kmol

Substitute 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XIX).

Mm=[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]0.5758 kmol+0.3258 kmol+0.0890 kmol+0.00438 kmol+0.00496 kmol=10.69 kg1 kmol=10.69 kg/kmol

Substitute −321,200 kJ/kmol for hC, 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XX).

HHV=−(−321,200 kJ/kmol)[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]=321,200 kJ/kmol10.69 kg/kmol=30,000 kJ/kg

Hence, the higher heating value of a coal is 30,000 kJ/kg.

For the LHV (lower heating value), the water in the products is taken to be vapor.

Refer Table A-26, “enthalpy of formation, Gibbs function of formation and entropy at 25°C,1 atm”, and write the enthalpy of gaseous water.

h¯f,H2Oo(g)=−241,820 kJ/kmol

Substitute 0.5758 kmol for NCO2, −393,520 kJ/kmol for h¯f,CO2o, 0.3258 kmol for NH2O, −241,820 kJ/kmol for h¯f,H2Oo, 0.00496 kmol for NSO2 and −297,100 kJ/kmol for h¯f,SO2o in Equation (XVIII).

hC=[(0.5758 kmol)(−393,520 kJ/kmol)+(0.3258 kmol)(−241,820 kJ/kmol)+(0.00496 kmol)(−297,100 kJ/kmol)]=−306,850 kJ/kmol

Substitute −306,850 kJ/kmol for hC, 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XXI).

LHV=−(−306,850 kJ/kmol)[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]=306,850 kJ/kmol10.69 kg/kmol=28,700 kJ/kg

Hence, the lower heating value of a coal is 28,700 kJ/kg.

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 15.7, Problem 45P

To determine

The higher and lower heating values of a coal.

Expert Solution & Answer

Answer to Problem 45P

The higher and lower heating values of a coal is 30,000 kJ/kg and 28,700 kJ/kg respectively.

Explanation of Solution

Express the total mass of the coal when the ash is substituted.

mtotal=100−mash (I)

Here, mass of ash is mash.

Express the mass fraction of carbon.

mfC=mCmtotal (II)

Here, mass of carbon is mC.

Express the mass fraction of hydrogen.

mfH2=mH2mtotal (III)

Here, mass of hydrogen is mH2.

Express the mass fraction of oxygen.

mfO2=mO2mtotal (IV)

Here, mass of oxygen is mO2.

Express the mass fraction of nitrogen.

mfN2=mN2mtotal (V)

Here, mass of nitrogen is mN2.

Express the mass fraction of sulphur.

mfS=mSmtotal (VI)

Here, mass of sulphur is mS.

Express the number of moles of carbon.

NC=mfCMC (VII)

Here, molar mass of carbon is MC.

Express the number of moles of hydrogen.

NH2=mfH2MH2 (VIII)

Here, molar mass of hydrogen is MH2.

Express the number of moles of oxygen.

NO2=mfO2MO2 (IX)

Here, molar mass of oxygen is MO2.

Express the number of moles of nitrogen.

NN2=mfN2MN2 (X)

Here, molar mass of nitrogen is MN2.

Express the number of moles of sulphur.

NS=mfSMS (XI)

Here, molar mass of sulphur is MS.

Express the total number of moles.

Nm=NC+NH2+NO2+NN2+NS (XII)

Express the mole fraction of carbon.

yC=NCNm (XIII)

Express the mole fraction of hydrogen.

yH2=NH2Nm (XIV)

Express the mole fraction of oxygen.

yO2=NO2Nm (XV)

Express the mole fraction of nitrogen.

yN2=NN2Nm (XVI)

Express the mole fraction of sulphur.

yS=NSNm (XVII)

Express the heat transfer from the combustion chamber.

q=hC=HP−HR=∑NPh¯f,Po−∑NRh¯f,Ro=(Nh¯fo)CO2+(Nh¯fo)H2O+(Nh¯fo)SO2 (XVIII)

Here, number of moles of products is NP, number of moles of reactants is NR, enthalpy of formation is h¯f, enthalpy of combustion is hC, enthalpy of products and reactants is HP and HR respectively.

Express apparent molecular weight of the coal.

Mm=mmNm=NCMC+NH2MH2+NO2MO2+NN2MN2+NSMSNC+NH2+NO2+NN2+NS (XIX)

Here, number of moles of carbon, hydrogen, oxygen, nitrogen and sulfur is NC,NH2,NO2,NN2 and NS respectively.

Express higher value of coal.

HHV=−hCmm=−hCNCMC+NH2MH2+NO2MO2+NN2MN2+NSMS (XX)

Express lower value of coal.

LHV=−hCmm=−hCNCMC+NH2MH2+NO2MO2+NN2MN2+NSMS (XXI)

Conclusion:

Refer Table A-1, “molar mass, gas constant, and the critical point properties”, and write the molar masses.

MC=12 kg/kmolMH2=2 kg/kmolMO2=32 kg/kmolMS=32 kg/kmol

Mair=29 kg/kmolMN2=28 kg/kmol

Here, molar mass of air is Mair.

Substitute 5 for mash in Equation (I).

mtotal=100−5=95 kg

Substitute 61.40 kg for mC and 95 kg for mtotal in Equation (II).

mfC=61.40 kg95 kg=0.6463=64.63 kg

Substitute 5.79 kg for mH2 and 95 kg for mtotal in Equation (III).

mfH2=5.79 kg95 kg=0.06095=6.095 kg

Substitute 25.31 kg for mO2 and 95 kg for mtotal in Equation (IV).

mfO2=25.31 kg95 kg=0.2664=26.64 kg

Substitute 1.09 kg for mN2 and 95 kg for mtotal in Equation (V).

mfN2=1.09 kg95 kg=0.01147=1.147 kg

Substitute 1.41 kg for mS and 95 kg for mtotal in Equation (VI).

mfS=1.41 kg95 kg=0.01484=1.484 kg

Substitute 64.63 kg for mC and 12 kg/kmol for MC in Equation (VII).

NC=64.63 kg12 kg/kmol=5.386 kmol

Substitute 6.095 kg for mH2 and 2 kg/kmol for MH2 in Equation (VIII).

NH2=6.095 kg2 kg/kmol=3.048 kmol

Substitute 26.64 kg for mO2 and 32 kg/kmol for MO2 in Equation (IX).

NO2=26.64 kg32 kg/kmol=0.8325 kmol

Substitute 1.147 kg for mN2 and 28 kg/kmol for MN2 in Equation (X).

NN2=1.147 kg28 kg/kmol=0.04096 kmol

Substitute 1.484 kg for mS and 32 kg/kmol for MS in Equation (XI).

NS=1.484 kg32 kg/kmol=0.04638 kmol

Substitute 5.386 kmol for NC, 3.048 kmol for NH2, 0.8325 kmol for NO2, 0.04096 kmol for NN2 and 0.04638 kmol for NS in Equation (XII).

Nm=5.386 kmol+3.048 kmol+0.8325 kmol+0.04096 kmol+0.04638 kmol=9.354 kmol

Substitute 5.386 kmol for NC and 9.354 kmol for Nm in Equation (XIII).

yC=5.386 kmol9.354 kmol=0.5758

Substitute 3.048 kmol for NH2 and 9.354 kmol for Nm in Equation (XIV).

yH2=3.048 kmol9.354 kmol=0.3258

Substitute 0.8325 kmol for NO2 and 9.354 kmol for Nm in Equation (XV).

yO2=0.8325 kmol9.354 kmol=0.0890

Substitute 0.04096 kmol for NN2 and 9.354 kmol for Nm in Equation (XVI).

yN2=0.04096 kmol9.354 kmol=0.00438

Substitute 0.04638 kmol for NS and 9.354 kmol for Nm in Equation (XVII).

yS=0.04638 kmol9.354 kmol=0.00496

Express the combustion equation.

[0.5758C+0.3258H2+0.0890O2+0.00438N2+0.00496S+ath(O2+3.76N2)→0.5758CO2+0.3258H2O+0.00496SO2+kN2] (XXII)

Perform the species balancing:

Oxygen balance:

0.0890+ath=0.5758+0.5(0.3258)+0.00496ath=0.6547

Nitrogen balance:

k=0.00438+3.76(0.6547)=2.466

Substitute 0.6547 for ath and 2.466 for k in Equation (XXII).

[0.5758C+0.3258H2+0.0890O2+0.00438N2+0.00496S+0.6547(O2+3.76N2)→{0.5758CO2+0.3258H2O+0.00496SO2+2.466N2}] (XXIII)

Refer Equation (XIII) and write the number of moles of carbon dioxide, water and sulfur oxide.

NCO2=0.5758 kmolNH2O=0.3258 kmolNSO2=0.00496 kmol

Refer Table A-26, “enthalpy of formation, Gibbs function of formation and entropy at 25°C,1 atm”, and write the enthalpy of formation of carbon dioxide, water and ethane.

h¯f,CO2o=−393,520 kJ/kmolh¯f,H2Oo(l)=−285,830 kJ/kmolh¯f,SO2o=−297,100 kJ/kmol

Substitute 0.5758 kmol for NCO2, −393,520 kJ/kmol for h¯f,CO2o, 0.3258 kmol for NH2O, −285,830 kJ/kmol for h¯f,H2Oo, 0.00496 kmol for NSO2 and −297,100 kJ/kmol for h¯f,SO2o in Equation (XVIII).

hC=[(0.5758 kmol)(−393,520 kJ/kmol)+(0.3258 kmol)(−285,830 kJ/kmol)+(0.00496 kmol)(−297,100 kJ/kmol)]=−321,200 kJ/kmol

Refer Equation (XXIII), and write the number of moles.

NC=0.5758 kmolNH2=0.3258 kmolNO2=0.0890 kmolNN2=0.00438 kmol

NS=0.00496 kmol

Substitute 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XIX).

Mm=[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]0.5758 kmol+0.3258 kmol+0.0890 kmol+0.00438 kmol+0.00496 kmol=10.69 kg1 kmol=10.69 kg/kmol

Substitute −321,200 kJ/kmol for hC, 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XX).

HHV=−(−321,200 kJ/kmol)[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]=321,200 kJ/kmol10.69 kg/kmol=30,000 kJ/kg

Hence, the higher heating value of a coal is 30,000 kJ/kg.

For the LHV (lower heating value), the water in the products is taken to be vapor.

Refer Table A-26, “enthalpy of formation, Gibbs function of formation and entropy at 25°C,1 atm”, and write the enthalpy of gaseous water.

h¯f,H2Oo(g)=−241,820 kJ/kmol

Substitute 0.5758 kmol for NCO2, −393,520 kJ/kmol for h¯f,CO2o, 0.3258 kmol for NH2O, −241,820 kJ/kmol for h¯f,H2Oo, 0.00496 kmol for NSO2 and −297,100 kJ/kmol for h¯f,SO2o in Equation (XVIII).

hC=[(0.5758 kmol)(−393,520 kJ/kmol)+(0.3258 kmol)(−241,820 kJ/kmol)+(0.00496 kmol)(−297,100 kJ/kmol)]=−306,850 kJ/kmol

Substitute −306,850 kJ/kmol for hC, 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XXI).

LHV=−(−306,850 kJ/kmol)[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]=306,850 kJ/kmol10.69 kg/kmol=28,700 kJ/kg

Hence, the lower heating value of a coal is 28,700 kJ/kg.

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 15.7, Problem 45P

To determine

The higher and lower heating values of a coal.

Expert Solution & Answer

Answer to Problem 45P

The higher and lower heating values of a coal is 30,000 kJ/kg and 28,700 kJ/kg respectively.

Explanation of Solution

Express the total mass of the coal when the ash is substituted.

mtotal=100−mash (I)

Here, mass of ash is mash.

Express the mass fraction of carbon.

mfC=mCmtotal (II)

Here, mass of carbon is mC.

Express the mass fraction of hydrogen.

mfH2=mH2mtotal (III)

Here, mass of hydrogen is mH2.

Express the mass fraction of oxygen.

mfO2=mO2mtotal (IV)

Here, mass of oxygen is mO2.

Express the mass fraction of nitrogen.

mfN2=mN2mtotal (V)

Here, mass of nitrogen is mN2.

Express the mass fraction of sulphur.

mfS=mSmtotal (VI)

Here, mass of sulphur is mS.

Express the number of moles of carbon.

NC=mfCMC (VII)

Here, molar mass of carbon is MC.

Express the number of moles of hydrogen.

NH2=mfH2MH2 (VIII)

Here, molar mass of hydrogen is MH2.

Express the number of moles of oxygen.

NO2=mfO2MO2 (IX)

Here, molar mass of oxygen is MO2.

Express the number of moles of nitrogen.

NN2=mfN2MN2 (X)

Here, molar mass of nitrogen is MN2.

Express the number of moles of sulphur.

NS=mfSMS (XI)

Here, molar mass of sulphur is MS.

Express the total number of moles.

Nm=NC+NH2+NO2+NN2+NS (XII)

Express the mole fraction of carbon.

yC=NCNm (XIII)

Express the mole fraction of hydrogen.

yH2=NH2Nm (XIV)

Express the mole fraction of oxygen.

yO2=NO2Nm (XV)

Express the mole fraction of nitrogen.

yN2=NN2Nm (XVI)

Express the mole fraction of sulphur.

yS=NSNm (XVII)

Express the heat transfer from the combustion chamber.

q=hC=HP−HR=∑NPh¯f,Po−∑NRh¯f,Ro=(Nh¯fo)CO2+(Nh¯fo)H2O+(Nh¯fo)SO2 (XVIII)

Here, number of moles of products is NP, number of moles of reactants is NR, enthalpy of formation is h¯f, enthalpy of combustion is hC, enthalpy of products and reactants is HP and HR respectively.

Express apparent molecular weight of the coal.

Mm=mmNm=NCMC+NH2MH2+NO2MO2+NN2MN2+NSMSNC+NH2+NO2+NN2+NS (XIX)

Here, number of moles of carbon, hydrogen, oxygen, nitrogen and sulfur is NC,NH2,NO2,NN2 and NS respectively.

Express higher value of coal.

HHV=−hCmm=−hCNCMC+NH2MH2+NO2MO2+NN2MN2+NSMS (XX)

Express lower value of coal.

LHV=−hCmm=−hCNCMC+NH2MH2+NO2MO2+NN2MN2+NSMS (XXI)

Conclusion:

Refer Table A-1, “molar mass, gas constant, and the critical point properties”, and write the molar masses.

MC=12 kg/kmolMH2=2 kg/kmolMO2=32 kg/kmolMS=32 kg/kmol

Mair=29 kg/kmolMN2=28 kg/kmol

Here, molar mass of air is Mair.

Substitute 5 for mash in Equation (I).

mtotal=100−5=95 kg

Substitute 61.40 kg for mC and 95 kg for mtotal in Equation (II).

mfC=61.40 kg95 kg=0.6463=64.63 kg

Substitute 5.79 kg for mH2 and 95 kg for mtotal in Equation (III).

mfH2=5.79 kg95 kg=0.06095=6.095 kg

Substitute 25.31 kg for mO2 and 95 kg for mtotal in Equation (IV).

mfO2=25.31 kg95 kg=0.2664=26.64 kg

Substitute 1.09 kg for mN2 and 95 kg for mtotal in Equation (V).

mfN2=1.09 kg95 kg=0.01147=1.147 kg

Substitute 1.41 kg for mS and 95 kg for mtotal in Equation (VI).

mfS=1.41 kg95 kg=0.01484=1.484 kg

Substitute 64.63 kg for mC and 12 kg/kmol for MC in Equation (VII).

NC=64.63 kg12 kg/kmol=5.386 kmol

Substitute 6.095 kg for mH2 and 2 kg/kmol for MH2 in Equation (VIII).

NH2=6.095 kg2 kg/kmol=3.048 kmol

Substitute 26.64 kg for mO2 and 32 kg/kmol for MO2 in Equation (IX).

NO2=26.64 kg32 kg/kmol=0.8325 kmol

Substitute 1.147 kg for mN2 and 28 kg/kmol for MN2 in Equation (X).

NN2=1.147 kg28 kg/kmol=0.04096 kmol

Substitute 1.484 kg for mS and 32 kg/kmol for MS in Equation (XI).

NS=1.484 kg32 kg/kmol=0.04638 kmol

Substitute 5.386 kmol for NC, 3.048 kmol for NH2, 0.8325 kmol for NO2, 0.04096 kmol for NN2 and 0.04638 kmol for NS in Equation (XII).

Nm=5.386 kmol+3.048 kmol+0.8325 kmol+0.04096 kmol+0.04638 kmol=9.354 kmol

Substitute 5.386 kmol for NC and 9.354 kmol for Nm in Equation (XIII).

yC=5.386 kmol9.354 kmol=0.5758

Substitute 3.048 kmol for NH2 and 9.354 kmol for Nm in Equation (XIV).

yH2=3.048 kmol9.354 kmol=0.3258

Substitute 0.8325 kmol for NO2 and 9.354 kmol for Nm in Equation (XV).

yO2=0.8325 kmol9.354 kmol=0.0890

Substitute 0.04096 kmol for NN2 and 9.354 kmol for Nm in Equation (XVI).

yN2=0.04096 kmol9.354 kmol=0.00438

Substitute 0.04638 kmol for NS and 9.354 kmol for Nm in Equation (XVII).

yS=0.04638 kmol9.354 kmol=0.00496

Express the combustion equation.

[0.5758C+0.3258H2+0.0890O2+0.00438N2+0.00496S+ath(O2+3.76N2)→0.5758CO2+0.3258H2O+0.00496SO2+kN2] (XXII)

Perform the species balancing:

Oxygen balance:

0.0890+ath=0.5758+0.5(0.3258)+0.00496ath=0.6547

Nitrogen balance:

k=0.00438+3.76(0.6547)=2.466

Substitute 0.6547 for ath and 2.466 for k in Equation (XXII).

[0.5758C+0.3258H2+0.0890O2+0.00438N2+0.00496S+0.6547(O2+3.76N2)→{0.5758CO2+0.3258H2O+0.00496SO2+2.466N2}] (XXIII)

Refer Equation (XIII) and write the number of moles of carbon dioxide, water and sulfur oxide.

NCO2=0.5758 kmolNH2O=0.3258 kmolNSO2=0.00496 kmol

Refer Table A-26, “enthalpy of formation, Gibbs function of formation and entropy at 25°C,1 atm”, and write the enthalpy of formation of carbon dioxide, water and ethane.

h¯f,CO2o=−393,520 kJ/kmolh¯f,H2Oo(l)=−285,830 kJ/kmolh¯f,SO2o=−297,100 kJ/kmol

Substitute 0.5758 kmol for NCO2, −393,520 kJ/kmol for h¯f,CO2o, 0.3258 kmol for NH2O, −285,830 kJ/kmol for h¯f,H2Oo, 0.00496 kmol for NSO2 and −297,100 kJ/kmol for h¯f,SO2o in Equation (XVIII).

hC=[(0.5758 kmol)(−393,520 kJ/kmol)+(0.3258 kmol)(−285,830 kJ/kmol)+(0.00496 kmol)(−297,100 kJ/kmol)]=−321,200 kJ/kmol

Refer Equation (XXIII), and write the number of moles.

NC=0.5758 kmolNH2=0.3258 kmolNO2=0.0890 kmolNN2=0.00438 kmol

NS=0.00496 kmol

Substitute 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XIX).

Mm=[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]0.5758 kmol+0.3258 kmol+0.0890 kmol+0.00438 kmol+0.00496 kmol=10.69 kg1 kmol=10.69 kg/kmol

Substitute −321,200 kJ/kmol for hC, 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XX).

HHV=−(−321,200 kJ/kmol)[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]=321,200 kJ/kmol10.69 kg/kmol=30,000 kJ/kg

Hence, the higher heating value of a coal is 30,000 kJ/kg.

For the LHV (lower heating value), the water in the products is taken to be vapor.

Refer Table A-26, “enthalpy of formation, Gibbs function of formation and entropy at 25°C,1 atm”, and write the enthalpy of gaseous water.

h¯f,H2Oo(g)=−241,820 kJ/kmol

Substitute 0.5758 kmol for NCO2, −393,520 kJ/kmol for h¯f,CO2o, 0.3258 kmol for NH2O, −241,820 kJ/kmol for h¯f,H2Oo, 0.00496 kmol for NSO2 and −297,100 kJ/kmol for h¯f,SO2o in Equation (XVIII).

hC=[(0.5758 kmol)(−393,520 kJ/kmol)+(0.3258 kmol)(−241,820 kJ/kmol)+(0.00496 kmol)(−297,100 kJ/kmol)]=−306,850 kJ/kmol

Substitute −306,850 kJ/kmol for hC, 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XXI).

LHV=−(−306,850 kJ/kmol)[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]=306,850 kJ/kmol10.69 kg/kmol=28,700 kJ/kg

Hence, the lower heating value of a coal is 28,700 kJ/kg.

Answer 6

Chapter 15.7, Problem 45P

To determine

The higher and lower heating values of a coal.

Expert Solution & Answer

Answer to Problem 45P

The higher and lower heating values of a coal is 30,000 kJ/kg and 28,700 kJ/kg respectively.

Explanation of Solution

Express the total mass of the coal when the ash is substituted.

mtotal=100−mash (I)

Here, mass of ash is mash.

Express the mass fraction of carbon.

mfC=mCmtotal (II)

Here, mass of carbon is mC.

Express the mass fraction of hydrogen.

mfH2=mH2mtotal (III)

Here, mass of hydrogen is mH2.

Express the mass fraction of oxygen.

mfO2=mO2mtotal (IV)

Here, mass of oxygen is mO2.

Express the mass fraction of nitrogen.

mfN2=mN2mtotal (V)

Here, mass of nitrogen is mN2.

Express the mass fraction of sulphur.

mfS=mSmtotal (VI)

Here, mass of sulphur is mS.

Express the number of moles of carbon.

NC=mfCMC (VII)

Here, molar mass of carbon is MC.

Express the number of moles of hydrogen.

NH2=mfH2MH2 (VIII)

Here, molar mass of hydrogen is MH2.

Express the number of moles of oxygen.

NO2=mfO2MO2 (IX)

Here, molar mass of oxygen is MO2.

Express the number of moles of nitrogen.

NN2=mfN2MN2 (X)

Here, molar mass of nitrogen is MN2.

Express the number of moles of sulphur.

NS=mfSMS (XI)

Here, molar mass of sulphur is MS.

Express the total number of moles.

Nm=NC+NH2+NO2+NN2+NS (XII)

Express the mole fraction of carbon.

yC=NCNm (XIII)

Express the mole fraction of hydrogen.

yH2=NH2Nm (XIV)

Express the mole fraction of oxygen.

yO2=NO2Nm (XV)

Express the mole fraction of nitrogen.

yN2=NN2Nm (XVI)

Express the mole fraction of sulphur.

yS=NSNm (XVII)

Express the heat transfer from the combustion chamber.

q=hC=HP−HR=∑NPh¯f,Po−∑NRh¯f,Ro=(Nh¯fo)CO2+(Nh¯fo)H2O+(Nh¯fo)SO2 (XVIII)

Here, number of moles of products is NP, number of moles of reactants is NR, enthalpy of formation is h¯f, enthalpy of combustion is hC, enthalpy of products and reactants is HP and HR respectively.

Express apparent molecular weight of the coal.

Mm=mmNm=NCMC+NH2MH2+NO2MO2+NN2MN2+NSMSNC+NH2+NO2+NN2+NS (XIX)

Here, number of moles of carbon, hydrogen, oxygen, nitrogen and sulfur is NC,NH2,NO2,NN2 and NS respectively.

Express higher value of coal.

HHV=−hCmm=−hCNCMC+NH2MH2+NO2MO2+NN2MN2+NSMS (XX)

Express lower value of coal.

LHV=−hCmm=−hCNCMC+NH2MH2+NO2MO2+NN2MN2+NSMS (XXI)

Conclusion:

Refer Table A-1, “molar mass, gas constant, and the critical point properties”, and write the molar masses.

MC=12 kg/kmolMH2=2 kg/kmolMO2=32 kg/kmolMS=32 kg/kmol

Mair=29 kg/kmolMN2=28 kg/kmol

Here, molar mass of air is Mair.

Substitute 5 for mash in Equation (I).

mtotal=100−5=95 kg

Substitute 61.40 kg for mC and 95 kg for mtotal in Equation (II).

mfC=61.40 kg95 kg=0.6463=64.63 kg

Substitute 5.79 kg for mH2 and 95 kg for mtotal in Equation (III).

mfH2=5.79 kg95 kg=0.06095=6.095 kg

Substitute 25.31 kg for mO2 and 95 kg for mtotal in Equation (IV).

mfO2=25.31 kg95 kg=0.2664=26.64 kg

Substitute 1.09 kg for mN2 and 95 kg for mtotal in Equation (V).

mfN2=1.09 kg95 kg=0.01147=1.147 kg

Substitute 1.41 kg for mS and 95 kg for mtotal in Equation (VI).

mfS=1.41 kg95 kg=0.01484=1.484 kg

Substitute 64.63 kg for mC and 12 kg/kmol for MC in Equation (VII).

NC=64.63 kg12 kg/kmol=5.386 kmol

Substitute 6.095 kg for mH2 and 2 kg/kmol for MH2 in Equation (VIII).

NH2=6.095 kg2 kg/kmol=3.048 kmol

Substitute 26.64 kg for mO2 and 32 kg/kmol for MO2 in Equation (IX).

NO2=26.64 kg32 kg/kmol=0.8325 kmol

Substitute 1.147 kg for mN2 and 28 kg/kmol for MN2 in Equation (X).

NN2=1.147 kg28 kg/kmol=0.04096 kmol

Substitute 1.484 kg for mS and 32 kg/kmol for MS in Equation (XI).

NS=1.484 kg32 kg/kmol=0.04638 kmol

Substitute 5.386 kmol for NC, 3.048 kmol for NH2, 0.8325 kmol for NO2, 0.04096 kmol for NN2 and 0.04638 kmol for NS in Equation (XII).

Nm=5.386 kmol+3.048 kmol+0.8325 kmol+0.04096 kmol+0.04638 kmol=9.354 kmol

Substitute 5.386 kmol for NC and 9.354 kmol for Nm in Equation (XIII).

yC=5.386 kmol9.354 kmol=0.5758

Substitute 3.048 kmol for NH2 and 9.354 kmol for Nm in Equation (XIV).

yH2=3.048 kmol9.354 kmol=0.3258

Substitute 0.8325 kmol for NO2 and 9.354 kmol for Nm in Equation (XV).

yO2=0.8325 kmol9.354 kmol=0.0890

Substitute 0.04096 kmol for NN2 and 9.354 kmol for Nm in Equation (XVI).

yN2=0.04096 kmol9.354 kmol=0.00438

Substitute 0.04638 kmol for NS and 9.354 kmol for Nm in Equation (XVII).

yS=0.04638 kmol9.354 kmol=0.00496

Express the combustion equation.

[0.5758C+0.3258H2+0.0890O2+0.00438N2+0.00496S+ath(O2+3.76N2)→0.5758CO2+0.3258H2O+0.00496SO2+kN2] (XXII)

Perform the species balancing:

Oxygen balance:

0.0890+ath=0.5758+0.5(0.3258)+0.00496ath=0.6547

Nitrogen balance:

k=0.00438+3.76(0.6547)=2.466

Substitute 0.6547 for ath and 2.466 for k in Equation (XXII).

[0.5758C+0.3258H2+0.0890O2+0.00438N2+0.00496S+0.6547(O2+3.76N2)→{0.5758CO2+0.3258H2O+0.00496SO2+2.466N2}] (XXIII)

Refer Equation (XIII) and write the number of moles of carbon dioxide, water and sulfur oxide.

NCO2=0.5758 kmolNH2O=0.3258 kmolNSO2=0.00496 kmol

Refer Table A-26, “enthalpy of formation, Gibbs function of formation and entropy at 25°C,1 atm”, and write the enthalpy of formation of carbon dioxide, water and ethane.

h¯f,CO2o=−393,520 kJ/kmolh¯f,H2Oo(l)=−285,830 kJ/kmolh¯f,SO2o=−297,100 kJ/kmol

Substitute 0.5758 kmol for NCO2, −393,520 kJ/kmol for h¯f,CO2o, 0.3258 kmol for NH2O, −285,830 kJ/kmol for h¯f,H2Oo, 0.00496 kmol for NSO2 and −297,100 kJ/kmol for h¯f,SO2o in Equation (XVIII).

hC=[(0.5758 kmol)(−393,520 kJ/kmol)+(0.3258 kmol)(−285,830 kJ/kmol)+(0.00496 kmol)(−297,100 kJ/kmol)]=−321,200 kJ/kmol

Refer Equation (XXIII), and write the number of moles.

NC=0.5758 kmolNH2=0.3258 kmolNO2=0.0890 kmolNN2=0.00438 kmol

NS=0.00496 kmol

Substitute 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XIX).

Mm=[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]0.5758 kmol+0.3258 kmol+0.0890 kmol+0.00438 kmol+0.00496 kmol=10.69 kg1 kmol=10.69 kg/kmol

Substitute −321,200 kJ/kmol for hC, 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XX).

HHV=−(−321,200 kJ/kmol)[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]=321,200 kJ/kmol10.69 kg/kmol=30,000 kJ/kg

Hence, the higher heating value of a coal is 30,000 kJ/kg.

For the LHV (lower heating value), the water in the products is taken to be vapor.

Refer Table A-26, “enthalpy of formation, Gibbs function of formation and entropy at 25°C,1 atm”, and write the enthalpy of gaseous water.

h¯f,H2Oo(g)=−241,820 kJ/kmol

Substitute 0.5758 kmol for NCO2, −393,520 kJ/kmol for h¯f,CO2o, 0.3258 kmol for NH2O, −241,820 kJ/kmol for h¯f,H2Oo, 0.00496 kmol for NSO2 and −297,100 kJ/kmol for h¯f,SO2o in Equation (XVIII).

hC=[(0.5758 kmol)(−393,520 kJ/kmol)+(0.3258 kmol)(−241,820 kJ/kmol)+(0.00496 kmol)(−297,100 kJ/kmol)]=−306,850 kJ/kmol

Substitute −306,850 kJ/kmol for hC, 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XXI).

LHV=−(−306,850 kJ/kmol)[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]=306,850 kJ/kmol10.69 kg/kmol=28,700 kJ/kg

Hence, the lower heating value of a coal is 28,700 kJ/kg.

Answer 7

Chapter 15.7, Problem 45P

To determine

The higher and lower heating values of a coal.

Answer 8

Expert Solution & Answer

Answer to Problem 45P

The higher and lower heating values of a coal is 30,000 kJ/kg and 28,700 kJ/kg respectively.

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

Explanation of Solution

Express the total mass of the coal when the ash is substituted.

mtotal=100−mash (I)

Here, mass of ash is mash.

Express the mass fraction of carbon.

mfC=mCmtotal (II)

Here, mass of carbon is mC.

Express the mass fraction of hydrogen.

mfH2=mH2mtotal (III)

Here, mass of hydrogen is mH2.

Express the mass fraction of oxygen.

mfO2=mO2mtotal (IV)

Here, mass of oxygen is mO2.

Express the mass fraction of nitrogen.

mfN2=mN2mtotal (V)

Here, mass of nitrogen is mN2.

Express the mass fraction of sulphur.

mfS=mSmtotal (VI)

Here, mass of sulphur is mS.

Express the number of moles of carbon.

NC=mfCMC (VII)

Here, molar mass of carbon is MC.

Express the number of moles of hydrogen.

NH2=mfH2MH2 (VIII)

Here, molar mass of hydrogen is MH2.

Express the number of moles of oxygen.

NO2=mfO2MO2 (IX)

Here, molar mass of oxygen is MO2.

Express the number of moles of nitrogen.

NN2=mfN2MN2 (X)

Here, molar mass of nitrogen is MN2.

Express the number of moles of sulphur.

NS=mfSMS (XI)

Here, molar mass of sulphur is MS.

Express the total number of moles.

Nm=NC+NH2+NO2+NN2+NS (XII)

Express the mole fraction of carbon.

yC=NCNm (XIII)

Express the mole fraction of hydrogen.

yH2=NH2Nm (XIV)

Express the mole fraction of oxygen.

yO2=NO2Nm (XV)

Express the mole fraction of nitrogen.

yN2=NN2Nm (XVI)

Express the mole fraction of sulphur.

yS=NSNm (XVII)

Express the heat transfer from the combustion chamber.

q=hC=HP−HR=∑NPh¯f,Po−∑NRh¯f,Ro=(Nh¯fo)CO2+(Nh¯fo)H2O+(Nh¯fo)SO2 (XVIII)

Here, number of moles of products is NP, number of moles of reactants is NR, enthalpy of formation is h¯f, enthalpy of combustion is hC, enthalpy of products and reactants is HP and HR respectively.

Express apparent molecular weight of the coal.

Mm=mmNm=NCMC+NH2MH2+NO2MO2+NN2MN2+NSMSNC+NH2+NO2+NN2+NS (XIX)

Here, number of moles of carbon, hydrogen, oxygen, nitrogen and sulfur is NC,NH2,NO2,NN2 and NS respectively.

Express higher value of coal.

HHV=−hCmm=−hCNCMC+NH2MH2+NO2MO2+NN2MN2+NSMS (XX)

Express lower value of coal.

LHV=−hCmm=−hCNCMC+NH2MH2+NO2MO2+NN2MN2+NSMS (XXI)

Conclusion:

Refer Table A-1, “molar mass, gas constant, and the critical point properties”, and write the molar masses.

MC=12 kg/kmolMH2=2 kg/kmolMO2=32 kg/kmolMS=32 kg/kmol

Mair=29 kg/kmolMN2=28 kg/kmol

Here, molar mass of air is Mair.

Substitute 5 for mash in Equation (I).

mtotal=100−5=95 kg

Substitute 61.40 kg for mC and 95 kg for mtotal in Equation (II).

mfC=61.40 kg95 kg=0.6463=64.63 kg

Substitute 5.79 kg for mH2 and 95 kg for mtotal in Equation (III).

mfH2=5.79 kg95 kg=0.06095=6.095 kg

Substitute 25.31 kg for mO2 and 95 kg for mtotal in Equation (IV).

mfO2=25.31 kg95 kg=0.2664=26.64 kg

Substitute 1.09 kg for mN2 and 95 kg for mtotal in Equation (V).

mfN2=1.09 kg95 kg=0.01147=1.147 kg

Substitute 1.41 kg for mS and 95 kg for mtotal in Equation (VI).

mfS=1.41 kg95 kg=0.01484=1.484 kg

Substitute 64.63 kg for mC and 12 kg/kmol for MC in Equation (VII).

NC=64.63 kg12 kg/kmol=5.386 kmol

Substitute 6.095 kg for mH2 and 2 kg/kmol for MH2 in Equation (VIII).

NH2=6.095 kg2 kg/kmol=3.048 kmol

Substitute 26.64 kg for mO2 and 32 kg/kmol for MO2 in Equation (IX).

NO2=26.64 kg32 kg/kmol=0.8325 kmol

Substitute 1.147 kg for mN2 and 28 kg/kmol for MN2 in Equation (X).

NN2=1.147 kg28 kg/kmol=0.04096 kmol

Substitute 1.484 kg for mS and 32 kg/kmol for MS in Equation (XI).

NS=1.484 kg32 kg/kmol=0.04638 kmol

Substitute 5.386 kmol for NC, 3.048 kmol for NH2, 0.8325 kmol for NO2, 0.04096 kmol for NN2 and 0.04638 kmol for NS in Equation (XII).

Nm=5.386 kmol+3.048 kmol+0.8325 kmol+0.04096 kmol+0.04638 kmol=9.354 kmol

Substitute 5.386 kmol for NC and 9.354 kmol for Nm in Equation (XIII).

yC=5.386 kmol9.354 kmol=0.5758

Substitute 3.048 kmol for NH2 and 9.354 kmol for Nm in Equation (XIV).

yH2=3.048 kmol9.354 kmol=0.3258

Substitute 0.8325 kmol for NO2 and 9.354 kmol for Nm in Equation (XV).

yO2=0.8325 kmol9.354 kmol=0.0890

Substitute 0.04096 kmol for NN2 and 9.354 kmol for Nm in Equation (XVI).

yN2=0.04096 kmol9.354 kmol=0.00438

Substitute 0.04638 kmol for NS and 9.354 kmol for Nm in Equation (XVII).

yS=0.04638 kmol9.354 kmol=0.00496

Express the combustion equation.

[0.5758C+0.3258H2+0.0890O2+0.00438N2+0.00496S+ath(O2+3.76N2)→0.5758CO2+0.3258H2O+0.00496SO2+kN2] (XXII)

Perform the species balancing:

Oxygen balance:

0.0890+ath=0.5758+0.5(0.3258)+0.00496ath=0.6547

Nitrogen balance:

k=0.00438+3.76(0.6547)=2.466

Substitute 0.6547 for ath and 2.466 for k in Equation (XXII).

[0.5758C+0.3258H2+0.0890O2+0.00438N2+0.00496S+0.6547(O2+3.76N2)→{0.5758CO2+0.3258H2O+0.00496SO2+2.466N2}] (XXIII)

Refer Equation (XIII) and write the number of moles of carbon dioxide, water and sulfur oxide.

NCO2=0.5758 kmolNH2O=0.3258 kmolNSO2=0.00496 kmol

Refer Table A-26, “enthalpy of formation, Gibbs function of formation and entropy at 25°C,1 atm”, and write the enthalpy of formation of carbon dioxide, water and ethane.

h¯f,CO2o=−393,520 kJ/kmolh¯f,H2Oo(l)=−285,830 kJ/kmolh¯f,SO2o=−297,100 kJ/kmol

Substitute 0.5758 kmol for NCO2, −393,520 kJ/kmol for h¯f,CO2o, 0.3258 kmol for NH2O, −285,830 kJ/kmol for h¯f,H2Oo, 0.00496 kmol for NSO2 and −297,100 kJ/kmol for h¯f,SO2o in Equation (XVIII).

hC=[(0.5758 kmol)(−393,520 kJ/kmol)+(0.3258 kmol)(−285,830 kJ/kmol)+(0.00496 kmol)(−297,100 kJ/kmol)]=−321,200 kJ/kmol

Refer Equation (XXIII), and write the number of moles.

NC=0.5758 kmolNH2=0.3258 kmolNO2=0.0890 kmolNN2=0.00438 kmol

NS=0.00496 kmol

Substitute 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XIX).

Mm=[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]0.5758 kmol+0.3258 kmol+0.0890 kmol+0.00438 kmol+0.00496 kmol=10.69 kg1 kmol=10.69 kg/kmol

Substitute −321,200 kJ/kmol for hC, 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XX).

HHV=−(−321,200 kJ/kmol)[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]=321,200 kJ/kmol10.69 kg/kmol=30,000 kJ/kg

Hence, the higher heating value of a coal is 30,000 kJ/kg.

For the LHV (lower heating value), the water in the products is taken to be vapor.

Refer Table A-26, “enthalpy of formation, Gibbs function of formation and entropy at 25°C,1 atm”, and write the enthalpy of gaseous water.

h¯f,H2Oo(g)=−241,820 kJ/kmol

Substitute 0.5758 kmol for NCO2, −393,520 kJ/kmol for h¯f,CO2o, 0.3258 kmol for NH2O, −241,820 kJ/kmol for h¯f,H2Oo, 0.00496 kmol for NSO2 and −297,100 kJ/kmol for h¯f,SO2o in Equation (XVIII).

hC=[(0.5758 kmol)(−393,520 kJ/kmol)+(0.3258 kmol)(−241,820 kJ/kmol)+(0.00496 kmol)(−297,100 kJ/kmol)]=−306,850 kJ/kmol

Substitute −306,850 kJ/kmol for hC, 0.5758 kmol for NC, 0.3258 kmol for NH2, 0.0890 kmol for NO2, 0.00438 kmol for NN2, 0.00496 kmol for NS, 12 kg/kmol for MC, 2 kg/kmol for MH2, 32 kg/kmol for MO2, 32 kg/kmol for MS and 28 kg/kmol for MN2 in Equation (XXI).

LHV=−(−306,850 kJ/kmol)[(0.5758 kmol)(12 kg/kmol)+(0.3258 kmol)(2 kg/kmol)+(0.0890 kmol)(32 kg/kmol)+(0.00438 kmol)(28 kg/kmol)+(0.00496 kmol)(32 kg/kmol)]=306,850 kJ/kmol10.69 kg/kmol=28,700 kJ/kg