Derivatives can be made “with respect to” any kind of variable. In this section, we explore derivatives with respect to time! This is usually denoted by the letter t. This is part of the Prelim Maths Extension 1 Syllabus from the topic Calculus: Rates of Change. In this post, we will explore Rates of change with respect to time finding derivatives. Here we will learn to find and interpret the derivative \frac{dQ}{dt} given a function in the form Q = f(t) \ for the amount of a physical quantity present at the time.
Let's explore derivatives with time below!
