For consecutive first order reaction
`Aoverset(k_(1))(to)Boverset(k_(2))(to)C`, at 300 K
`k_(1)=2xx10^(-3)s^(-1)` and `k_(2)=5xx10^(-5)s^(-1)`
The time which [B] will be maximum is

For 2A overset(k_(1)) rarr B overset(k_(2)) rarr3C. K_(1) =2xx10^(-4) sec^(-1) and k_(2) =3xx10^(-4) /mol-sec. {d[B]/dt} equal to :

A substance undergoes first order decomposition. The decomposition follows two parallel first order reactions as : k_(1) =1.26xx10^(-4)s^(-1), k_(2) =3.8xx10^(-5) s^(-1) The percentage distribution of B and C are :

The substance undergoes first order decomposition. The decomposition follows two parallel first order reactions as : K_(1)=1.26xx10^(-4) sec^(-1) and K_(2) =3.8xx10^(-5) sec^(-1) The percentage distribution of B and C

A substance undergoes first order decomposition. The decomposition follows two parallel first order reactions as , k_(1)=1.26xx10^(-4)" sec"^(-1) and k_(2)=3.6xx10^(-5)" sec"^(-1) Calculate the % distribution of B & C.

Write a stoichiometric equation for the reaction between A_(2) and C whose mechanism is given below. Determine the value of equilibrium constant for the first step. Write a rate law equation for the over all reaction in terms of its initial reactants. ( i ) A_(2)overset(K_(1))underset(K_(2))hArr2A K_(1)=10^(10)s^(-1) and K_(2)=10^(10)M^(-1)s^(-1) ( ii ) A+CtoAC K=10^(-4)M^(-1)S^(-1)

For the consecutive unimolecular-type first-order reaction A overset(k_(1))rarr R overset(k_(2))rarr S , the concentration of component R, C_( R) at any time t is given by - C_(R ) = C_(OA)K_(1)[e^(-k_(1)t)/((k_(2)-k_(1))) +e^(-k_(2)t)/((k_(1)-k_(2)))] if C_(A) = C_(AO), C_(R ) = C_(RO) = 0 at t = 0 The time at which the maximum concentration of R occurs is -