空间直线方程的两点式（B009）

问题

若空间直线方程过点

(x_{1}, y_{1}, z_{1})

和

(x_{2}, y_{2}, z_{2})

, 则如何使用 [两点式方程] 表示该直线？

[A].

\frac{x - x_{1}}{x - x_{2}}

=

\frac{y - y_{1}}{y - y_{2}}

=

\frac{z - z_{1}}{z - z_{2}}

[B].

\frac{x + x_{1}}{x_{2} + x_{1}}

=

\frac{y + y_{1}}{y_{2} + y_{1}}

=

\frac{z + z_{1}}{z_{2} + z_{1}}

[C].

\frac{x - x_{1}}{x_{2} - x_{1}}

=

\frac{y - y_{1}}{y_{2} - y_{1}}

=

\frac{z - z_{1}}{z_{2} - z_{1}}

[D].

\frac{x - x_{2}}{x_{2} - x_{1}}

=

\frac{y - y_{2}}{y_{2} - y_{1}}

=

\frac{z - z_{2}}{z_{2} - z_{1}}

$\frac{x - x_{1}}{x_{2} - x_{1}}$ $=$ $\frac{y - y_{1}}{y_{2} - y_{1}}$ $=$ $\frac{z - z_{1}}{z_{2} - z_{1}}$