ELi5: If the “rate of change” of a function is a tangible way to understand derivatives, what is a similar way to understand integrals?

2.71K views
0 Comments

I know it’s the “area under the curve”, but what does that mean exactly? Is there a physical or tangible way to explain it?

I understand that a derivative is rate of change at a specific point, and something like acceleration is rate of change of speed. But how can I visualize that speed is the “integral” of acceleration? What does that mean, and how does it relate to the area underneath?

In: 172

43 Answers

Anonymous 0 Comments

An ever increasing addition to the action that will reduce the error.

When your car continues to move towards the ditch, you add more and more corrective action (steer towards the center of the road).
You are viewing 1 out of 43 answers, click here to view all answers.