For the first order reaction `A(g) rarr 2B(g) + C(g)`, the initial pressure is `P_(A) = 90 m Hg`, the pressure after `10` minutes is found to be `180 mm Hg`. The rate constant of the reaction is

For the gaseous reaction A(g) rarr 4 B(g) + 3C( g) is found to be first order with respect to A. If at the starting the total pressure was 100mm Hg and after 20 minutes it is found to be 40 mm Hg. The rate constant of the reaction is :

For the first order reaction 2N_(2)O_(5)(g) rarr 4NO_(2)(g) + O_(2)(g)

For the reaction AB_(2)(g) rarr AB(g) + B(g) , the initial pressure of AB_(2)(g) was 6 atm and at equilibrium, total pressure was found to be 8 atm at 300 K. The equilibrium constant of the reaction at 300 K is……

For the reaction 2HgO(s) rarr 2Hg(l) + O_(2)(g)

For the reaction 2HgO(s) rarr 2Hg(l) + O_(2)(g)

The decomposition reaction 2N_(2)O_(5) (g) rarr 2N_(2) O_(4) (g) +O_(2) (g) is started in a closed cylinder under isothermal isochoric condition at an initial pressure of 1 atm. After Yxx10^(3) s, the pressure inside the cylinder is found to be 1.45 atm. If the rate constant of the reaction is 5xx10^(-4) s^(-1) , assuming ideal gas behavior, the value of Y is

For a gaseous reaction: A(g) rarr B(g) , the rate expresison may be given as

For a first order gas phase reaction : A_((g)) to 2B_((g)) +C_((g)) P_(0) be initial pressure of A and P_(t) the total pressure at time 't'. Integrated rate equation is :

For a homogeneous gaseous reaction A rarr B + C + D , the initial pressure was P_0 white pressure after time 't' was P. if (P gt P_0) The expression for the constant K is

AB_(2) dissociates as AB_(2)(g) hArr AB(g)+B(g) . If the initial pressure is 500 mm of Hg and the total pressure at equilibrium is 700 mm of Hg. Calculate K_(p) for the reaction.