Suppose that \(h\) is a function such that \(h^\prime(x)=x^2+2e^x+3\) and \(h(3)=0\text{.}\) What is \(h(1)\text{?}\) Give an expression of the most general function ...
Antidifferentiation: The exam includes two antiderivative problems that involve finding the antiderivatives of trigonometric, exponential and polynomial functions and the antiderivative of 1/x.
The premise is that most people think of performing an integral as finding the area under a curve or as the “antiderivative.” However, fewer people think of integration as adding up many small ...