Determine whether the following planes are parallel, orthogonal, or neither. If they are neither parallel nor orthogonal, find the angle of intersection. $\begin{array} { l }
- 2 x - 31 y + 5 z + 3 = 0 \
- 3 x + y + 5 z - 4 = 0
\end{array}$
A) The planes are neither parallel nor orthogonal, the angle of intersection is $15 ^ { \circ }$.
B) The planes are parallel.
C) The planes are neither parallel nor orthogonal, the angle of intersection is $30 ^ { \circ }$.
D) The planes are orthogonal.

Question

Determine whether the following planes are parallel, orthogonal, or neither. If they are neither parallel nor orthogonal, find the angle of intersection. $\begin{array} { l } 
- 2 x - 31 y + 5 z + 3 = 0 \
- 3 x + y + 5 z - 4 = 0
\end{array}$
A) The planes are neither parallel nor orthogonal, the angle of intersection is $15 ^ { \circ }$.
B) The planes are parallel.
C) The planes are neither parallel nor orthogonal, the angle of intersection is $30 ^ { \circ }$.
D) The planes are orthogonal.

Quizplus · Accepted Answer

The Answer of Determine whether the following planes are parallel, orthogonal, or neither. If they are neither parallel nor orthogonal, find the angle of intersection. $\begin{array} { l } 
- 2 x - 31 y + 5 z + 3 = 0 \
- 3 x + y + 5 z - 4 = 0
\end{array}$
A) The planes are neither parallel nor orthogonal, the angle of intersection is $15 ^ { \circ }$.
B) The planes are parallel.
C) The planes are neither parallel nor orthogonal, the angle of intersection is $30 ^ { \circ }$.
D) The planes are orthogonal.

Determine Whether the Following Planes Are Parallel, Orthogonal, or Neither −2x−31y+5z+3=0−3x+y+5z−4=0\begin{array} { l } - 2 x - 31 y + 5 z + 3 = 0 \\- 3 x + y + 5 z - 4 = 0\end{array}−2x−31y+5z+3=0−3x+y+5z−4=0​

Determine Whether the Following Planes Are Parallel, Orthogonal, or Neither $\begin{array} { l } - 2 x - 31 y + 5 z + 3 = 0 \\- 3 x + y + 5 z - 4 = 0\end{array}$