The half-life for such a substance is the time [tex]t[/tex] required to have the amount (in grams [tex]\mathrm g[/tex]) at time [tex]t[/tex] (in seconds [tex]\mathrm s[/tex]), [tex]y(t)[/tex], decay to half the starting amount [tex]y_0[/tex]. In other words, for krypton-91, after 10 seconds we would have [tex]y(10\,\mathrm s)=\dfrac{y_0}2[/tex]. We can use this information to solve for [tex]k[/tex], then plug in various values of [tex]t[/tex] to find the amount of krypton-91 that's left...
But we don't need to! We already know it takes 10 seconds for half of the substance to decay. So if we start with 16 grams, then after 10 seconds, 8 grams will remain.
10s later (after a total of 20 seconds), 4g will remain.
10s later (30s), 2g will remain.
10s later (40s), 1g will remain.
10s later (50s), 1/2 g will remain.
