The term 'e^t' represents Euler's number raised to the power of t, where Euler's number is an irrational constant approximately equal to 2.71828. In calculus, it often appears as part of exponential growth or decay functions.
Related terms
Exponential Growth: A type of growth where a quantity increases by a fixed percent over equal intervals of time.
Exponential Decay: A type of decay where a quantity decreases by a fixed percent over equal intervals of time.
Natural Logarithm (ln): The inverse operation of exponentiation with base e, often used for solving equations involving exponential functions.