Chapter 11 - Section 11.5 - Lines and Planes in Space - Exercises - Page 630: 18

$\left\{\begin{array}{l} x=3t\\ y=2-2t\\ z=0 \end{array}\right., \quad 0\leq t \leq 1$

Given a point on the line $P(x_{0},y_{0},z_{0})$ and if the line is parallel to ${\bf v}=\langle v_{1},v_{2},v_{3}\rangle$, the standard parametrization is given by $\left\{\begin{array}{l} x=x_{0}+v_{1}t\\ y=y_{0}+v_{2}t\\ z=z_{0}+v_{3}t \end{array}\right., \quad -\infty \lt t \lt \infty$ --- $\overrightarrow{PQ}=\langle 3-0,0-2, 0-0 \rangle=\langle 3,-2,0\rangle={\bf v}$. A point on the line is $P(0,2,0)$, so a parametrization can be $\left\{\begin{array}{l} x=0+3t\\ y=2-2t\\ z=0 \end{array}\right., \quad -\infty \lt t \lt \infty$ when $t=0$, the point defined is $(0,2,0)$ when $t=1$, the point defined is $(3,0,0)$ so, the line segemnt is parametrized with $\left\{\begin{array}{l} x=3t\\ y=2-2t\\ z=0 \end{array}\right., \quad 0\leq t \leq 1$