Step 1: Define radioactive half-life (\(t_{1/2}\)).
Half-life is the time for a radioactive substance to decay to half its original amount.
Step 2: State the formula relating half-life and the decay constant.
For first-order radioactive decay, the half-life and decay constant (\(\lambda\)) are related by:\[ t_{1/2} = \frac{\ln(2)}{\lambda} \]
Step 3: Analyze the relationship.
The formula reveals:1. Half-life (\(t_{1/2}\)) is inversely proportional to the decay constant (\(\lambda\)).2. The formula doesn't involve initial or final substance amounts, indicating that half-life is independent of these amounts.Conclusion: Half-life doesn't depend on the initial concentration and is inversely proportional to the decay constant.