A consecutive reaction, `A overset(K_(1))(rarr)B overset(K_(2))(rarr)C` is characterised by:

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

For the consecutive unimolecular first order reaction A overset(k_(1))rarr R overset(k_(2))rarr S , the concentration of component A , C_(A) at any time t is given by

In the sequence of reaction, L overset(k_(1))rarr M overset(k_(2))rarr N overset(k_(3))rarrO k_(3) gt k_(2) gt k_(1) The rate determining step of the reaction is :

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 -

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)) .

In the following first order reactions: A+ "Reagent" overset(K_(1))(rarr) Product B+ "Reagent" overset(K_(2))(rarr) Product The ratio of K_(1)//K_(2) when only 50% of B reacts in a given time when 94% of A has been reacted is:

Assertion: In A overset(k_(1))rarr B overset(k_(2))rarr C If half-life of A is very less as compared to B , so the net reaction is A rarr C with rate constant (k_(1) xx k_(2)) Reason: Slowest step is the rate determining step so B rarr C is rate determining step.

For the reactions (i) A overset(K_(I))rarr P and (ii) B overset(K_(II))rarr Q , following observation is made. Calculate (K_(I))/(K_(II)) where K_(I) and K_(II) are rate constants for the respective reaction.

The product D of the reaction CH_(3)Cl overset( KCN) ( rarr) ( A) overset( H_(2) O) ( rarr) (B) overset( NH_(3))(rarr) ( C ) overset( Delta)( rarr) ( D ) is