Question #6aa96
1 Answer
Explanation:
The problem tells you that indium has two stable isotopes, so right from the start, you know that their percent abundances must add up to give
This means that the percent abundance of the indium-115 isotope is equal to
100% - 4.305% = 95.695%100%−4.305%=95.695%
Before moving forward, convert the two percent abundances to decimal abundances by dividing them by
You will have
""^113"In: " (4.305 color(red)(cancel(color(black)(%))))/(100color(red)(cancel(color(black)(%)))) = 0.04305
""^115"In: " (95.695 color(red)(cancel(color(black)(%))))/(100color(red)(cancel(color(black)(%)))) = 0.95695
Now, the average atomic mass of indium is given by the weighted average of the isotopic masses of its stable isotopes.
If you take
overbrace(114.8 color(red)(cancel(color(black)("u"))))^(color(blue)("avg. atomic mass")) = overbrace(112.90 color(red)(cancel(color(black)("u"))) * 0.04305)^(color(blue)("contribution from"""^113"In")) + overbrace(xcolor(red)(cancel(color(black)("u"))) * 0.95695)^(color(blue)("contribution from"""^115"In"))
Rearrange to solve for
x = (114.8 - 112.90 * 0.04305)/0.95695 = 114.9
You can thus say that indium-115 has an isotopic mass equal to
color(darkgreen)(ul(color(black)("isotopic mass"color(white)(.)""^115"In = 114.9 u")))
The answer is rounded to four sig figs, the number of sig figs you have for the average atomic mass of the element.
