We know that the formula for the distance between two parallel planes ax + by + cz + d1 = 0 and ax + by + cz + d2 = 0 is Rewrite the second equation as x + 2y – 2z + 5/2 = 0.

A: The standard for vertical separation is now 1,000 feet. You were right about it being 2,000 feet until January 20, 2005, when the U.S. implemented Reduced Vertical Separation Minima (RVSM). The pilots were aware of the opposite-direction traffic.

500 feet

To say whether the planes are parallel, we’ll set up our ratio inequality using the direction numbers from their normal vectors. Since the ratios are not equal, the planes are not parallel. To say whether the planes are perpendicular, we’ll take the dot product of their normal vectors.

Two planes perpendicular to a given line will have the same 3-D angle in space therefore will be parallel planes.

Definition: Two planes are parallel if they have the same normal vector (i.e. their normal vectors are parallel). Note: If two planes are not parallel, then they intersect in a line. The angle between the two planes is the angle between their normal vectors.

If two vectors are perpendicular, then their dot-product is equal to zero. The cross-product of two vectors is defined to be A×B = (a2_b3 – a3_b2, a3_b1 – a1_b3, a1_b2 – a2*b1). The cross product of two non-parallel vectors is a vector that is perpendicular to both of them.

If two vectors are perpendicular to each other, then their dot product is equal to zero.

The cross-vector product of the vector always equals the vector. Perpendicular is the line and that will make the angle of 900with one another line. Therefore, when two given vectors are perpendicular then their cross product is not zero but the dot product is zero.

If the cross product comes out to be zero. Then the given vectors are parallel, since the angle between the two parallel vectors is 0∘ and sin0∘=0. If the cross product is not equal to zero then the vectors are not parallel. If u=ku,k is a constant and k≠0, then the vectors u and v will be parallel.