For the reaction `2AtoB+3C`, if `-(d[A])/(dt)=k_(1)[A]^(2),-(d[B])/(dt)=k_(2)[A]^(2),-(d[C])/(dt)=k_(3)[A]^(2)` the correct reaction between `k_(1),k_(2)` and `k_(3)` is :

For the reaction N_(2)O_(5)to2NO_(2)+1/2O_(2) , Given (-d[N_(2)O_(5)])/(dt)=K_(1)[N_(2)O_(5)], (d[NO_(2)])/(dt)=K_(2)[N_(2)O_(5)] and (d[O_(2)])/(dt)=K_(3)[N_(2)O_(4)] . The relation in between K_(1),K_(2) and K_(3) is

Taking the reaction x+2yto producsts to be second order, which fo the following is/are the rate law expression/for the reaction I. (dx)/(dt)=K[x][y] II. (dx)/(dt)=K[x][y]^(2) III. (dx)/(dt)=K[x]^(2) IV. (dx)/(dt)=K[x]+K[y]^(2) Then the correct answers can b

For the reaction CO_((g)) + (1)/(2) O_(2(g)), K_(1)//K_(c) is

The decomposition of nitrogen pentoxide is given as 2N_(2)O_(5) to 4NO_(2) + O_(2) . The rates of reaction are ([N_(2)O_(5)])/(Delta t ) =k_(1)[N_(2)O_(5)],(Delta[NO_(2)])/(Deltat) = k_(2) [N_(2)O_(5)] and (Delta [O_(2)])/(Delta t) = k_(3) [N_(2)O_(5)] Relate the rate constants k_(1) , k_(2) and k_(3) .

In the reaction H_(2)(g) + Cl_(2) (g) rarr 2HCI(g) , relation between K_(p) and K_(c) is

For the reaction in equilibrium A harr B ([B])/([A])=4.0 xx 10^(8)" "(-d[A])/(dt)=2.3 xx 10^(6)S^(-1)[A]" "(-d)/(dt)[B]=K[B] Thus, K is

The rate of reaction A+2Bto Products is given by -(d[A])/(dt)=k[A][B]^(2) .If B is present in large excess, the order of reaction is

If A=[(5,4),(1,2)] and if (A+2I)^(-1)=k_(1)A+k_(2)I then find (k_(1),k_(2)) .