The first order rate constant for the decomposition of `N_(2)O_(5)` is `6.2 xx 10^(-4) sec^(-1)`. The `t_(1//2)` of decomposition is

The first order rate constant for the decomposition of N_(2)O_(5) is 6.2 xx 10^(-4)s^(-1) . The half-life period for this decomposition is

The first order rate constant for the decomposition of N_(2)O_(5) is 6.2 xx 10^(-2)s^(-1) . The half-life period for this decomposition is

The first order rate constant for dissociation of N_(2)O_(5) is 6.2xx10^(-4)s^(-1) . The half-lite period (in s) of this dissociation will be

A container of 2 litre contain 4 moles of N_(2)O_(5) . On heating to 100^(@)C, N_(2)O_(5) undergoes complete dissociation to NO_(2) and O_(2) . If rate constant for decomposition of N_(2)O_(5) is 6.2xx10^(-4) sec^(-1) , select the correct statements:

Findingf concentration and time : The rate constant for the decomposition of gasous N_(2)O_(5) at 55^(@)C is 1.7xx10^(-3)s^(-1) . If the initial concentration of N_(2)O_(5) after five half-lives ? How long will it take for the N_(2)O_(5) concentration to fall to 12.5% of its initial values ? Strategy : Because the unit of rate constant is time^(-1) , the decomposition of N_(2)O_(5) is a first order reaqction. To find [N_(2)O_(5)] after n half lives, multiply its initial concentration by (1//2)^(n) since [N_(2)O_(5)] drops by a factor of 2 during each successive haslf-life.

The rate constant of the first order, decomposition of N_(2)O_(5) at 25^(@) is 3.00 xx 10^(-3) min^(-1) . If the initial concentration of N_(2)O_(2) is 2.00 xx 10^(-3) mol L^(-1) , How long will it take for the concentration to drop to 5.00 xx 10^(-4) mol L^(-1) ?