The half-life or a radioactive isotope is the time takes tor a quantity for the isotope to be reduced to half its initial mass. Starting with 150 grams ot a radioactive isotope, how much will be left atter 6 half-lives?

$N=BxxG^t$, where N=new value, B=start value, G=growth (or decay) factor, and t=number of periods (years in this case. We know that $G^58=1//2$, so $G=root 58 (1/2)=(1/2)^(1/58)$ After 30 years,...

Well, if you really stare at the word "radioactive", you may notice it contains the fragment "active". So, more radioactive means faster half-life. In five minutes, isotope A will fragment...

The answer is 20 years. A half life is the time taken for the radioactive particles in a sample to decay by half. It would, therefore, take another 20 years...

As you know, a radioactive isotope's tells you exactly how much time must pass in order for an initial sample of this isotope to be halved. The equation that...

After one half life 50 grams $100/2 = 50$ After two half lives 25 grams $ 50/2 =25$

$sf(N_t=N_0e^(-lambdat)$ $:.$$sf(lnN_t=lnN_0-lambdat)$ $sf(lambda=0.693/t_(1/2)=0.693/10=0.0693color(white)(x)d^(-1))$ $:.$$sf(lnN_t=ln(3.9)-0.0693xx1=1.361-0.0693=1.2916)$ $:.$$sf(N_t=3.638color(white)(x)g)$

The first thing to notice here is that the problem is giving you the half-life of titanium-44. As you know, the half-life of a radioactive nuclide, $t_"1/2"$, tells you...

this is a nice easy half-life calculation as no equation is required. if you see one over two the power of n $1/(2^n)$ then you know it is an...

We're asked to find how much uranium remains after a given time ($56 "hr"$), when given its initial amount ($7232 "g"$) and its half-life ($14 "hr"$). When solving half-life problems...

Given that radioactive element X has a half-life $30$ days Hence the number $(n)$ of half-lives in $90$ days $n=90/30$ $n=3$ The amount $N$ of radioactive element X left after...