Smooth - (Calculus II) - Vocab, Definition, Explanations | Fiveable

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Definition

A smooth curve is one that is continuously differentiable, meaning it has a continuous first derivative. Such curves have no sharp corners or cusps.

A curve is considered smooth if it has a continuous first derivative over its entire length.
Smooth curves are essential for calculating arc lengths because they ensure the integrals involved are well-defined.
The parametric equations of a smooth curve must be continuously differentiable.
If a function $f(x)$ is smooth, then both $f'(x)$ and $f''(x)$ exist and are continuous.
In surface area calculations involving rotation, the curve being rotated must be smooth to apply standard formulas.

The distance measured along the path of a curve.

Equations that express the coordinates of the points on a curve as functions of a variable, typically denoted as $t$.

$f'(x)$: The first derivative of a function $f$, representing the rate at which $f$ changes with respect to its variable.