For a gaseous reaction, following data is given:
`ArarrB, k_(1)= 10^(15)e-^(2000//T)`
`C rarrD, k_(2) = 10^(14)e^(-1000//T)`
The temperature at which `k_(1) = k_(2)` is

The rate of reaction increases isgnificantly with increase in temperature. Generally, rate of reactions are doubled for every 10^(@)C rise in temperature. Temperature coefficient gives us an idea about the change in the rate of a reaction for every 10^(@)C change in temperature. "Temperature coefficient" (mu) = ("Rate constant of" (T + 10)^(@)C)/("Rate constant at" T^(@)C) Arrhenius gave an equation which describes aret constant k as a function of temperature k = Ae^(-E_(a)//RT) where k is the rate constant, A is the frequency factor or pre-exponential factor, E_(a) is the activation energy, T is the temperature in kelvin, R is the universal gas constant. Equation when expressed in logarithmic form becomes log k = log A - (E_(a))/(2.303 RT) For the given reactions, following data is given {:(PrarrQ,,,,k_(1) =10^(15)exp((-2000)/(T))),(CrarrD,,,,k_(2) = 10^(14)exp((-1000)/(T))):} Temperature at which k_(1) = k_(2) is

The rate constant k_(1) and k_(2) for two different reactions are 10^(16) e^(-2000//T) and 10^(15) e^(-1000//T) , respectively. The temperature at which k_(1) = k_(2) is

A reaction rate constant is given by k = 1.2 xx 10^(14) e^((-2500)/(RT))s^(-1) . It means

For two firstorder reactions having same concentration of A and B at t = 0 , use the given data to calculate the tempretature at which both occur with same rate. Reaction I: ArarrZ , k_(1) = 10^(16)e^((-(3000)/(T))) Reaction II: BrarrY , k_(2) = 10^(15) e^((-(2000)/(T)))

For reaction ArarrB, the rate constant k_(1)=A_(1)^(-Ea_(1//(RT))) and for the reactio XrarrY, the rate constant k_(2)=A_(2)^(-Ea_(1//(RT))) . If A_(1)=10^(8),A_(2)=10^(10) and E_(a_(1))=600 cal /mol, E_(a_(2))=1800 cal/mol then the temperature at which k_(1)=k_(2) is (Given :R=2 cal/K-mol)

The rate constant for a second order reaction is given by k=(5 times 10^11)e^(-29000k//T) . The value of E_a will be:

For a reversible reaction A underset(K_(2))overset(K_(1))(hArr) B rate constant K_(1) (forward) = 10^(15)e^(-(200)/(T)) and K_(2) (backward) = 10^(12)e^(-(200)/(T)) . What is the value of (-Delta G^(@))/(2.303 RT) ?

Two reaction : X rarr Products and Y rarr Products have rate constants k_(1) and k_(2) at temperature T and activation energies E_(1) and E_(2) , respectively. If k_(1) gt k_(2) and E_(1) lt E_(2) (assuming that the Arrhenius factor is same for both the Products), then (I) On increaisng the temperature, increase in k_(2) will be greater than increaisng in k_(1) . (II) On increaisng the temperature, increase in k_(1) will be greater than increase in k_(2) . (III) At higher temperature, k_(1) will be closer to k_(2) . (IV) At lower temperature, k_(1) lt k_(2)

For the following reaction in gaseous phase CO(g)+1/2O_(2) rarr CO_(2) K_(P)/K_(c) is

The decomposition of hydrocarbon follows the equation k=(4.5xx10^(11)s^(-1))e^(-28000K//T) Calculate E_(a) .