In the following first order competing reactions `A overset(k_(1))rarr B, C overset(k_(2)) rarr D`. If only 50% of A have been reacted whereas 94% of C has been reacted in the same time interval then find the ratio of `(k_(2))/(k_(1))`.

Mechanism of the reaction is: A overset(k_(1))rarrB, 2Aoverset(k_(2))rarr C + D What is (-d[A])/(dt) ?

Consider following two competing first ordr reactions, Poverset(k_(1))rarrA+B,Qoverset(k_(2))rarrC+D if 50% of the reaction oof P wascompleted when 96% of Q was complete ,then the ratio (k_(2)//k_(1)) will be :

Mechanism of the reaction is: A_(2) overset(k_(2))hArr 2A A + B overset(k_(2))rarr C A_(2) + C overset(k)rarr D + A What is (d[D])/(dt) ?

In the series reaction Aoverset(K_(2))(rarr)Boverset(K_(2))(rarr)Coverset(K_(2))(rarr)D , if K_(1)gtK_(2)gtK_(3) then the rate determing step of the reaction is

Conisder the following proposed mechanism A underset(k_(2))overset(k_(1))hArr B , B+C overset(k_(3))rarrD For the overall reaction A+CrarrD , assuming B to be an intermediate described by the steady state approximation, write the rate expresison for [A] .

For the following elementary first order reaction: If k_(2)=2k_(1) , then % of B in overall product is:

For a reaction scheme A overset ( k _ 1 ) to B overset ( k _ 2 ) to C , if the rate of formation of B is set to be zero then the concentration of B is given by :

For an elementary chemical reaction, A_(2) underset(k_(-1))overset(k_(1))(hArr) 2A , the expression for (d[A])/(dt) is

For an elementary chemical reaction, A_(2) underset(k_(-1))overset(k_(1))(hArr) 2A , the expression for (d[A])/(dt) is

Conisder the reaction mechanism: A_(2) overset(k_(eq))hArr 2A ("fast") (where A is the intermediate.) A+B underset(k_(1))rarr P (slow) The rate law for the reaction is