Derivatives the Easy Way in Calculus

In calculus, a derivative measures the rate at which a function changes. It provides a formula for the slope of a curve at any given point, representing instantaneous rate of change. Calculated as the limit of the average rate of change as the interval approaches zero, derivatives offer insights into functions' behavior, critical points, and concavity. They play a pivotal role in optimization, physics, and understanding dynamic processes. The process of differentiation involves finding the derivative, crucial for solving problems related to motion, growth, and optimization, making it a foundational concept in calculus with widespread applications in various fields. More Lessons: http://www.MathAndScience.com Twitter: https://twitter.com/JasonGibsonMath