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For mixed flow of particles containing a single unchanging size and uniform gas composition, the fraction unconverted for chemical reaction controlling is ____(a) \(\int_0^τ\)(1-\(\frac{t}{τ}\))^3\(\frac{e}{t}^\frac{-t}{t}\) dt(b) \(\int_0^τ\)(1-\(\frac{t}{τ}\))^2\(\frac{e}{t}^\frac{-t}{t}\) dt(c) \(\int_0^τ\)(1-\(\frac{t}{τ}\))\(\frac{e}{t}^\frac{-t}{t}\) dt(d) \(\int_0^τ\)(1-\(\frac{t}{τ}\))^0.5\(\frac{e}{t}^\frac{-t}{t}\) dtThe question was posed to me in class test.My question is from Design of Fluid Particle Reactors in division Fluid-Particle Reactions: Kinetics of Chemical Reaction Engineering

Answer»

The correct choice is (a) \(\int_0^τ\)(1-\(\frac{t}{τ}\))^3\(\frac{e}{t}^\frac{-t}{t}\) dt

Best EXPLANATION: For chemical REACTION controlling, \(\frac{t}{τ}\) = 1-(1- XB)\(^\frac{1}{3}\). Hence, 1-\(\overline{X_{(B)}}\) = ∫0^τ(1-\(\frac{t}{τ}\))^3\(\frac{e}{t}^\frac{-t}{t}\) dt.


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