Radioactivity is a phenomenon in which a few substances spontaneously release energy and subatomic particles. The nuclear instability of an atom causes radioactivity.

The activity is performed by,

\(\begin{array}{c}R = \frac{{0.693N}}{{{t_{1/2}}}}\\N = \frac{{R{t_{1/2}}}}{{0.693}}\end{array}\)

Substitute all the value in the above equation

\(\begin{array}{c}N = \frac{{\left( {4410\,{\rm{Bq}}} \right)\left( {4.027 \times {{10}^{16}}\,{\rm{s}}} \right)}}{{0.693}}\\N = 2.405828 \times {10^{20}}\,{\rm{atoms}}\end{array}\)

\(M = 40\,{\rm{g}}\) is the molar mass of \({}^{{\rm{40}}}{\rm{K}}\). As a result, the mass that will produce the activity is,

\(m = \frac{N}{{{N_A}}}M\)

Substitute all the value in the above equation

\(\begin{array}{c}m = \frac{{2.405828 \times {{10}^{20}}\,{\rm{atoms}}}}{{6.02 \times {{10}^{23}}\,{\rm{atoms}}}}\left( {40\,{\rm{g}}} \right)\\ = 1.598 \times {10^{ - 2}}\,{\rm{g}}\\m \approx 16.0\,{\rm{mg}}\end{array}\)

Therefore, the mass is \(16.0\,{\rm{mg}}\).

(b)  As a result, the natural potassium fraction is, \(\begin{array}{c}f = \frac{{1.5985 \times {{10}^{ - 2}}\,{\rm{g}}}}{{140\,{\rm{g}}}}\\ = 1.14 \times {10^{ - 4}}\end{array}\)

Therefore, the fraction is \(1.14 \times {10^{ - 4}}\).