Answer:
Fraction-of-occurrences of 115In isotope [tex]= 0.957[/tex]
Explanation:
As we know weight of 113 In isotope is equal to the sum of product of fraction-of-occurrences of two constituents isotopes and their atomic weight
[tex]^{115}In_w = f_{113}*A_{113} + f_{115}*A_{115}[/tex] ------(1)
As we know sum of fraction-of-occurrences of two constituents isotopes is equal to one.
[tex]f_{113} + f_{115} = 1\\f_{113} = 1- f_{115}[/tex]---------(2)
Substituting the given values in equation 1, we get
[tex]^{115}In_w = f_{113}*A_{113} + f_{115}*A_{115}\\114.818 = (1 - f_{115}) * 112.904 + f_{115} * 114.904\\f_{115} = 0.957[/tex]
Substituting this value in equation 2 we get -
[tex]f_{113} = 1- f_{115}\\f_{113} = 1- 0.957 \\f_{113} = 0.043[/tex]
