Chapter 10.4, Problem 33E

To determine

To find: The general form of the equation of the plane passes through $\left(2,5,3\right)$ and parallel to the $xz$ -plane.

Answer to Problem 33E

The general form of the equation of the plane passes through $\left(2,5,3\right)$ and parallel to the $xz$ -plane is $y-5=0$ .

Explanation of Solution

Given information:

The plane passes through $\left(2,5,3\right)$ and it is parallel to the $xz$ -plane.

Calculation:

To get the normal vector on the $xz$ -plane find the cross product of vectors $i$ and $k$ as shown below.

  $\begin{array}{c}n=\left|\begin{array}{ccc}\text{i}& \text{j}& \text{k}\\ 1& 0& 0\\ 0& 0& 1\end{array}\right|\\ =\text{i}\left(0-0\right)-\text{j}\left(1-0\right)+\text{k}\left(0-0\right)\\ =-\text{j}\\ \text{=}\langle 0,-1,0\rangle \end{array}$

Substitute 0 for $a$ , $-1$ for $b$ , 0 for $c$ , 2 for $x_1$ , 5 for $y_1$ and 3 for $z_1$ in the equation $a\left(x-x_1\right)+b\left(y-y_1\right)+c\left(z-z_1\right)=0$ to find the general form of the equation of the plane passes through $\left(2,5,3\right)$ and is parallel to the $xz$ -plane.

  $\begin{array}{c}0\left(x-2\right)-1\left(y-5\right)+0\left(z-3\right)=0\\ -y+5=0\\ y-5=0\end{array}$

Therefore, the general form of the equation of the plane passes through $\left(2,5,3\right)$ and is parallel to the $xz$ -plane is $y-5=0$ .