A parametrized curve $\gamma_[0,L]\to\mathbb{R}^3$ is called parametrized by arclength provided thatà$\gamma(t)$ moves with unit speed if we interpret $t$ as time: $\left|\gamma'(t)\right|=1$ àfor all à$t\in [0,L]$. Sampling an arclength-parametrization $\gamma$ at evenly spaced points $t=\frac{mL}{n}$ for integer values of $m$ ⦠Continue reading Arclength-Parametrized Curves
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