Chapter 11, Problem 62RE

a.

To determine

ToFind:A set of parametric equations of the line passing through the points $\left(0,-10,3\right)$ and $\left(5,10,0\right)$

Answer to Problem 62RE

The set of parametric equations of the line passing through the given points is

  $x=0+5t$ ,   $y=-10+20t$ and   $z=3-3t$

Explanation of Solution

Given:

A line passing through the points $\left(0,-10,3\right)$ and $\left(5,10,0\right)$

Concept Used:

A line $L$ passing through the point $P=\left(x_1,y_1,z_1\right)$ and parallel to the vector $v=\langle a,b,c\rangle$ is represented by the parametric equations

  $x=x_1+at$ , $y=y_1+bt$ and $z=z_1+ct$

Calculation:

Forthe line passing through the points $\left(0,-10,3\right)$ and $\left(5,10,0\right)$

Let $P=\left(0,-10,3\right)$ and $Q=\left(5,10,0\right)$

Then the direction vector for the line passing through $P$ and $Q$ is

  $\begin{array}{c}v=\overrightarrow{PQ}\\ =\langle 5-0,10+10,0-3\rangle \\ =\langle 5,20,-3\rangle \end{array}$

Using the coordinates of the initial point $P=\left(0,-10,3\right)$

  $x_1=0$ , $y_1=-10$ and $z_1=3$

And the direction numbers as

  $a=5$ , $b=20$ and $c=-3$

The set of parametric equations of the line is

  $x=0+5t$ ,   $y=-10+20t$ and   $z=3-3t$

Conclusion:

The set of parametric equations of the line passing through the given points is

  $x=0+5t$ ,   $y=-10+20t$ and   $z=3-3t$

b.

To determine

ToFind: A set of symmetric equations of the line passing through the points $\left(0,-10,3\right)$ and $\left(5,10,0\right)$

Answer to Problem 62RE

The set of symmetric equations of the line passing through the given points is

  $\frac{x-0}{5}=\frac{y+10}{20}=\frac{z-3}{-3}$

Explanation of Solution

Given:

A line passing through the points $\left(0,-10,3\right)$ and $\left(5,10,0\right)$

Concept Used:

A line $L$ passing through the point $P=\left(x_1,y_1,z_1\right)$ and parallel to the vector $v=\langle a,b,c\rangle$ is represented by the parametric equations

  $x=x_1+at$ , $y=y_1+bt$ and $z=z_1+ct$

When the direction numbers $a$ , $b$ and $c$ are all nonzero, then symmetric equations of the line is given by

  $\frac{x-x_1}{a}=\frac{y-y_1}{b}=\frac{z-z_1}{c}$

Calculation:

For the line passing through the points $\left(0,-10,3\right)$ and $\left(5,10,0\right)$

Let $P=\left(0,-10,3\right)$ and $Q=\left(5,10,0\right)$

Then the direction vector for the line passing through $P$ and $Q$ is

  $\begin{array}{c}v=\overrightarrow{PQ}\\ =\langle 5-0,10+10,0-3\rangle \\ =\langle 5,20,-3\rangle \end{array}$

Using the coordinates of the initial point $P=\left(0,-10,3\right)$

  $x_1=0$ , $y_1=-10$ and $z_1=3$

And the direction numbers as

  $a=5$ , $b=20$ and $c=-3$

Since, the direction numbers $a$ , $b$ and $c$ are all nonzero, the symmetric equations of the line is given by

  $\frac{x-0}{5}=\frac{y+10}{20}=\frac{z-3}{-3}$

That is

  $\frac{x-0}{5}=\frac{y+10}{20}=\frac{z-3}{-3}$

Conclusion:

The set of symmetric equations of the line passing through the given points is

  $\frac{x-0}{5}=\frac{y+10}{20}=\frac{z-3}{-3}$