Exponential Growth occurs when a quantity increases by a fixed percentage over a period of time, resulting in a rapid increase. For example, if a population grows by 20% each year, it will grow faster each subsequent year.

Exponential Decay is the process where a quantity decreases by a fixed percentage over time. For example, if a substance decays at a rate of 10% per year, it will lose 10% of its remaining amount each year.

The formula for Exponential Growth is y = a(1 + r)^t, where 'a' is the initial amount, 'r' is the growth rate (as a decimal), and 't' is the time period.

The formula for Exponential Decay is y = a(1 - r)^t, where 'a' is the initial amount, 'r' is the decay rate (as a decimal), and 't' is the time period.

To calculate the future value in Exponential Growth, use the formula: Future Value = Initial Amount * (1 + Growth Rate)^Number of Periods.

To calculate the future value in Exponential Decay, use the formula: Future Value = Initial Amount * (1 - Decay Rate)^Number of Periods.

After 2 years, the population will be 100 * (1 + 0.5)^2 = 225.