The half-life period of `U^(234)` is `2.5 xx 10^(5)` years. In how much time is the quantity of the isotope reduce to 25% of the original amount?

The half-life period of U^(234) is 2.5 xx 10^(5) years. In how much is the quantity of the isotope reduce to 25% of the original amount?

Radioactive disintegration is a first order reaction and its rate depends only upon the nature of nucleus and does not depend upon external factors like temperature and pressure. The rate of radioactive disintegration (Activity) is represented as -(dN)/(dt)=lambdaN Where lambda= decay constant, N= number of nuclei at time t, N_(0) =intial no. of nuclei. The above equation after integration can be represented as lambda=(2.303)/(t)log((N_(0))/(N)) Half-life period of U^(2.5xx10^(5) years. In how much thime will the amount of U^(237) remaining be only 25% of the original amount ?

The half life period of a first order reaction, A to Product is 10 minutes. In how much time is the concentration of A reduced to 10% of its original concentration?

The half -life period of ._(84)Po^(210) is 140 days. In how many days 1 g of this isotope is reduced to 0.25 g ?

In how much time will a sum of money triple itself at 25% per annum ?

For a first order reactions, the half -life is 10 mins. How much time in minutes will it take to reduce the concentration of reactant to 25% of its original concentration ?

For an elementary reaction , X(g)toY(g)+Z(g) the half life period is 10 min. In what period of time would the concentration of X be reduced to 10% of original concentration?

The half life of ._92U^(238) against alpha -decay is 4.5xx10^9 years. What is the activity of 1g sample of ._92U^(238) ?

The half life of radium is 1600 years. After how much time will 1 g radium be reduced to 125 mg ?

Half-life of a substance is 10 years. In what time, it becomes (1)/(4) th part of the initial amount ?