4. Uninhibited Growth At any time \( t \) in hours, the rate of increase in the area, in millimeters squared \( \left(\mathrm{mm}^{2}\right) \), of a culture of bacteria is twice the area \( A \) of the culture.

The scenario describes a classic case of exponential growth, which is often used to model populations in biology. The rate of increase in area \( \frac{dA}{dt} = 2A \) suggests that not only are the bacteria thriving, but they are doing so at an accelerating pace! This relationship can be solved using differential equations, leading us to the conclusion that the area of the culture \( A(t) \) grows in proportion to itself, typically resulting in \( A(t) = A_0 e^{2t} \), where \( A_0 \) is the initial area. In real-world applications, this kind of growth pattern is not just limited to bacteria! It can be seen in various fields, such as economics when discussing market size, ecology regarding invasive species, or even in technology with user adoption rates. Understanding exponential growth is crucial for predicting the outcomes over time and preparing for resource management or replication strategies, as uncontrolled growth can lead to rapid changes in any system!