Chemical Reactor Design Principles
Explore the fundamentals of chemical reactor design, including stoichiometry, reaction rates, and reactor scale-up. Learn to derive rate laws and design equations in terms of conversion for batch, CSTR, and PFR reactors. Discover the logic behind isothermal reactor design and calculation of required time or volume for a specific conversion. Slides courtesy of Prof. M. L. Kraft, Chemical & Biomolecular Engr. Dept, University of Illinois.
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L5-1 Review: Derive rA= f(XA) j stoichiometric coefficient for products, for reactants j r j = r A Relate all rjto Cj Batch: Flow: ( ) ( ) + + j A0 F N V N j A0 N V X F F X j j0 A j j0 A = = = = C C Relate all Cj(XA) to V( ) j j Batch: Flow: P P P P T T Z Z Z Z T T ( ) ( ) 0 0 = + = + V V 1 X 1 X Relate all V( ) to XA 0 A 0 A 0 0 0 0 Batch & Flow: + + C C X T T Z Z P P j0 A0 X j A 0 0 = C Put j 1 A 0 together Now that Cj is in terms of XA, we can write the rate law in terms of XA Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-2 Review: Stoichiometric Tables FA0 FB0 FC0 FD0 FI0 FA FB FC FD FI In Out b c d + + A B a C D a a Feed rate (mol/time) FA0 FB0 = FA0 FC0 = CFA0 FD0 = DFA0 FI0 = IFA0 FT0 Change in reactor (mol/time) -FA0XA BFA0XA CFA0XA DFA0XA --- FA0XA Effluent rate from reactor (mol/time) FA = FA0 (1 XA) FB = FA0 ( + BXA) FC = FA0 ( C+ CXA) FD = FA0 ( D+ DXA) FI=FI0 FT = FT0 + FA0XA Species A B C D I Total F F C C C C y y d a c a b a j0 j0 0 j0 j0 j stoichiometric coefficient for products, for reactants = = = = + = 1 J A0 A0 0 A0 A0 Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-3 L5: Reactor Design Recipe and Reactor Scale-Up (Sizing) Goal: Develop an algorithm that combines reactor design equations with reaction rates for the design of different reactors Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-4 The Logic of Isothermal Reactor Design In Out - 1. Set up mole balance for specific reactor +Generation =Accumulation dN dt V j + = F F rdV j0 j j Batch CSTR PFR 2. Derive design eq. in terms of XA for each reactor F X XA dXA 0 XA A0 -r A dX -r V V = A t =N V =FA0 0 A0 A -rA A + + C C X T T Z Z P P j0 A0 X j A 0 0 n j = C = r kC j A 1 3. Put Cj is in terms of XA and plug into rA (We will always look conditions where Z0=Z) A 0 n + + C C X T T Z Z P P j0 A0 X j A 0 0 = r k A 1 A 0 4. Plug rA into design eq and solve for the time (batch) or volume (flow) required for a specific XA Today and next week! Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-5 Batch Reactor Operation (1) A B -rA = kCA2 2nd order reaction rate Calculate the time required for a conversion of XA in a constant V batch reactor dX dt A = r N V Mole balance A0 A 2 = Rate law Ar kC A = (1 X ) Stoichiometry (put CA in terms of X) C C A A0 A ( )( d X 2 ) 2 A = N k C 1 X V Combine A0 A 0 A dt Batch Volume is constant, V=V0 ( A0 dt )( d X )2 2 A = N k C 1 X V A0 A 0 Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-6 Batch Reactor Operation (2) A B -rA = kCA2 2nd order reaction rate Calculate the time required for a conversion of XA in a constant V batch reactor dX kC N t d 2 ( ) 2 A = 1 X V Evaluate A 0 A 0 A 0 dX dt 1 V dX d dX dt 2 ( ) 2 2 A ( ) 2 0 A t = kC 1 X = k C 1 X A0 A A0 A C N A 0 A0 )2 ( A Rearrange to get like variables together = 1 X kC A0 A dX dX 1 k is constant for an isothermal reaction A A = = kC dt dt A0 2 2 ( ) ( ) kC 1 X 1 X A0 A A Time required to achieve XA for 2nd order rxn Integrate X t X 1 dX A 1 A A = t = dt kC 1 X 2 ( ) kC 1 X A0 A A0 0 0 A Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-7 Batch Reactor Operation (3) A B -rA = kCA 1st order reaction rate Calculate the time required for a conversion of XA in a constant V batch reactor dX dt A = r N V Mole balance A0 A = r k C Rate law A A = (1 X ) Stoichiometry (put CA in terms of X) C C A A0 A dX dt ( ) A = N k C 1 X V Combine A0 A 0 A Batch Volume is constant, V=V0 dX N dt ( ) A = kC 1 X V Mole balance as a function of conversion A0 A 0 A 0 Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-8 Batch Reactor Operation (4) A B -rA = kCA 1st order reaction rate Calculate the time required for a conversion of XA in a constant V batch reactor dX kC N t d in terms of XA: Mole balance as ( ) A = 1 X V Evaluate to solve for time A 0 A0 A 0 dX d 1 V dX dt ( ) A t ( ) 0 A = kC 1 X = kC 1 X A0 A A0 A C N A0 A0 dX dt ( ) A Rearrange to get like variables together = k 1 X A dX 1 X 1 k dX 1 X k is constant for an isothermal reaction A A = dt = kdt ( ) ( ) A A Time required to achieve XA for 1st order rxn 1 ln 1 x X Integrate t 1 k 1 dX 1 X A 1 k A = = ln t dt ( ) 1 X A A 0 0 = ( ) Remember: ln 1 x Confused about the integration? See the next slide Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-9 Batch Reactor Operation (4) A B -rA = kCA 1st order reaction rate Calculate the time required for a conversion of XA in a constant V batch reactor X Integrate t dX 1 X A 1 k A = dt ( ) A 0 0 1 k 1 k 1 k X 0 ( ) ( ) ( ) t 0 ( ) ( ) ( ) A = = - ln 1 X t ln 1 X ln 1 0 t 0 A A 0=ln(1) 1 k 1 k 1 ( ) ( ) = = ln 1 X t ln t A 1 X A 1 a = ( ) ln ln a Remember: Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-10 Typical Cycle Time for a Batch Polymerization Total Cycle Time tt for a batch process is much longer than the reaction time because it takes time to set up, heat, and clean the reactor each time it is used Activity 1. Charge feed to the reactor and agitate (tf) 2. Heat to reaction temperature (te) 3. Carry out reaction (tR) 4. Empty and clean reactor (tc) Total time excluding reaction Time (h) 1.5 - 3.0 0.2 2.0 (varies) 0.5 1.0 3.0 6.0 Total Cycle Time tt = tf + te + tR + tc Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-11 CSTR Operation (1) A B -rA = kCA Liquid-phase 1st order reaction rate Calculate the CSTR volume required to get a conversion of XA F X A0 r A = V Mole balance A = r k C Rate law A A = (1 X ) Stoichiometry (put CA in terms of X) C C A A0 A F X Put FA0 in terms of CA0 A0 1 X = V ( ) Combine k C A0 A Volume required to achieve XA for 1st order rxn ( = ) A0 0 C X X A 0 A = = V V ( ) ( ) kC 1 X k 1 X A0 A A Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-12 Scaling CSTRs Chemical engineers are involved in scaling up a laboratory scale reaction to the pilot plant scale or full-scale reactor If one knows the volume of the pilot-scale reactor required to achieve XA, how is this information used to achieve XA in a larger reactor? Suppose for a 1st order irreversible liquid-phase reaction: X X 0 A 0 A = = known: V want: V small bigger ( ) ( ) k 1 X k 1 X A A Want XA in the small reactor to be the same as XA in the bigger reactor k in the small reactor is the same as k in the bigger reactor 0 in the small reactor must be different from 0 in the bigger reactor So the reactor volume V must be proportional to the volumetric flow rate 0 How? X V X X Separate variables we will vary from those held constant A 0 A A 0 = = = V V ( ) ( ( ) ) X k 1 X k 1 X k 1 X 0 A A A Space time (residence time) required to achieve XA for 1st order irreversible rxn A = = V ( ) 0 k 1 X A Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-13 Scaling CSTRs with Spacetime X Space time (residence time) required to achieve XA for 1st order irreversible rxn A = ( ) k 1 X A A B -rA = kCA 1st order reaction rate So if you know the spacetime required to get a conversion of XA in a CSTR, you can use that to achieve the same XA in a different size CSTR What is required to achieve a specific XA? X X Rearrange to get XA in terms of A = A k = ( ) ( ) 1 X k 1 X A A ( ) = + = = + k X kX k kX X k X 1 k A A A A A CSTR relationship between and XA for 1st order liquid-phase rxn (isothermal and V = V0) + k = X A 1 k Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-14 Damk hler Number, Da = = A0 F enterin g flow rate of A A0 r V rate of reacti on at entrance reaction rate convectio = Da n rate Estimates the degree of conversion that can be obtained in a flow reactor First order irreversible reaction: r Da F 1st order irreversible reaction V k C C V k V A0 A0 = = = Da = k Da A0 0 0 A0 = V Substitute 0 Second order irreversible reaction: 2nd order irreversible reaction 2 kC V A0 r F V kC C V A 0 A 0 = = = = D a D a Da kC A0 A0 0 0 A 0 How is XA related to Da in a first order irreversible reaction in a flow reactor? From previous slide: + k Da + = = X X A A 1 k 1 Da Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-15 Damk hler Number, Da A0 r F V rate of reaction enterin at en trance reaction rate convection rat = = = Da g flow rate of A e A0 Estimates the degree of conversion that can be obtained in a flow reactor = k Da 1st order irreversible rxn Relate XA to Da for a 1st order irreversible rxn in a flow reactor: Da k = X = X A A + 1 Da + 1 k If Da<0.1 for this 1st order irreversible rxn in a flow reactor, then Da 0.1 = = = X X 0.091 A A + + 1 Da 1 0.1 If Da>10 for this 1st order irreversible rxn in a flow reactor, then Da 10 = = = X X 0.91 A A + + 1 Da 1 10 Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-16 Sizing CSTRs for 2nd Order Rxns A B -rA = kCA2 Liquid-phase 2nd order reaction rate Calculate the CSTR volume required to get a conversion of XA F X C X A0 r 0 A0 r = = V Mole balance A A 2 = Ar kC Rate laws A = (1 X) C C Stoichiometry A A0 In terms of space time? C X V X 0 A0 1 = = = V Combine or 2 2 ( ) 2 ( ) kC X kC 1 X 0 A 0 A 0 ( ) 1 2 kC + 1 4 kC + A0 2 kC A0 = X In terms of conversion? A0 2nd order liquid irreversible reaction ( ) 2Da In terms of XA as a function of Da? 1 2Da + 1 4Da + = X = Da kC A0 Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-17 CSTRs in Series = CA0 0 Effluent of reactor 1 is input for reactor 2, no change in CA1 CA2 A first order reaction is carried out isothermally using 2 CSTRs that are the same size, and and k are the same in both reactors ( = = & k1 = k2 = k) Determine V1 for 1st CSTR using our standard procedure. For 2nd CSTR: F A2 F A1 = V 1. Mole balance CSTR2 A2 r kC = A2 r 2. Rate law CSTR2 A2 Skip this step for now. 3. Stoichiometry CSTR2 ( ) ( ) C C C C 0 A1 kC C = A2 A1 kC A2 4. Combine for CSTR2 = V or = A2 A2 C ( ) C C A1 kC A2 Relate CA2 to CA1, k, & = kC kC + = C C A2 A1 A2 A2 A2 A1 A2 C k ( ) A1 + + = = C k 1 C C A2 A1 A2 1 Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-18 CSTRs in Series, CA1 CA1 CA2 CA0 0 = Effluent of reactor 1 is input for reactor 2, no change in A first order reaction is carried out isothermally using 2 CSTRs that are the same size, and and k are the same in both reactors ( = = & k1 = k2 = k) What is CA1 in terms of and k? We know for a single CSTR: Put XA for 1st CSTR in terms of CA1: k 1 k C C C C k A1 A1 = = = C C (1 X ) 1 X X 1 = X A1 A0 A1 A1 A1 A + 1 k A0 A0 C C C C k Solve for CA1: ( ) A1 A1 = + = = 1 k 1 1 k X Substitute: A1 + + 1 k A0 A0 C C C C C C C C C C ( ) A1 A1 A1 A1 A1 = + + = k 1 k k + C 1 + = 1 k 1 k 1 A0 A0 A0 A0 A0 C C 1 + A1 A0 = = C A1 1 k k A0 Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-19 CSTRs in Series, CA2 CA0 0 Effluent of reactor 1 is input for reactor 2 CA1 = CA2 A first order reaction is carried out isothermally using 2 CSTRs that are the same size, and and k are the same in both reactors ( = = & k1 = k2 = k) C 1 C A0 A1 = = C & C Relate CA2 to k & A2 A 1 + + k 1 k C 1 Substitute A 0 = C A 2 + + 1 k k 1 1st order irreversible rxn with V1 = V2, = and k1 = k2 C + A0 = C A2 2 ( ) 1 k Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-20 n CSTRs in Series CA0 0 CA1 = CA2 1st order irreversible liquid-phase rxn run in n CSTRs with identical V, and k C + A0 = C For n identical CSTRs, then: An n ( ) 1 k Rate of disappearance of A in the nth reactor: C + A0 An r = = kC k An n ( ) 1 k How is conversion related to the # of CSTRs in series? C Put CAn in terms of XAn (XA at the last CSTR): 1 ( ) A0 1 X = = C 1 X An A0 An n n ( ) ( ) + + 1 k 1 k 1 1st order irreversible liquid phase rxn run in n CSTRs with identical V, and k 1 1 = = X or 1 X An An n n ( ) ( ) + + 1 k 1 Da Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
L5-21 Isothermal CSTRs in Parallel FA01 V Mole Balance X Subscript i denotes reactor i Ai r = A0i F FA0 i Ai FA02 same T, V, FA01 = FA02= FA0n X A r = V F X = X =...= X = X r r = A0 1 2 n A = = = ... An r r A1 A2 A total volume of all CSTRs # of CSTRs Volume of each CSTR V n = = V i A0 F n X V n Ai r = Ai F total molar flow rate # of CSTRs A0 n = = A0i F X A r = V F Molar flow rate of each CSTR A0 A Conversion achieved by any one of the reactors in parallel is the same as if all the reactant were fed into one big reactor of volume V Slides courtesy of Prof M L Kraft, Chemical & Biomolecular Engr Dept, University of Illinois at Urbana-Champaign.
