Question: d C e / d t = k 1 C p ( k 2 + k 3 ) C e + k 4 C m

dCe/dt=k1Cp(k2+k3)Ce+k4Cm

dCm/dt=k3Cek4Cm

Ci=Ce+Cm

Solve for C_i using the method of Laplace transforms starting with the coupled differential equations given above. Show every detail of the calculation and reproduce the formula ci(t)=Aint/(0,t)e(a1(tt))Cp(t)dt+Bint/(0,t)e(a2(tt))Cp(t)dt [this should show e^(-a_1(t-t')) and e^(-a_2(t-t')). And integral from 0 to t]. However, instead of presenting this in this form, present it in terms of convolutions.

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