Planes are drawn parallel to the coordinates planes through the points

1.	Planes are drawn parallel to the coordinates planes through the points (3, 0, -1) and (-2, 5, 4). Find the lengths of the edges of the parallelepiped so formed.
Answer» Given: Points are (3, 0, -1) and (-2, 5, 4) To find: lengths of the edges of the parallelepiped formed For point (3, 0, -1) x₁ = 3, y₁ = 0 and z₁ = -1 For point (-2, 5, 4) x₂ = -2, y₂ = 5 and z₂ = 4 Plane parallel to coordinate planes of x₁ and x₂ is y_z-plane Plane parallel to coordinate planes of y₁ and y₂ is x_z-plane Plane parallel to coordinate planes of z₁ and z₂ is x_y-plane Distance between planes x₁ = 3 and x₂ = -2 is 3 – (-2) = 3 + 2 = 5 Distance between planes x₁ = 0 and y₂ = 5 is 5 – 0 = 5 Distance between planes z₁ = -1 and z₂ = 4 is 4 – (-1) = 4 + 1 = 5 Hence, edges of parallelepiped is 5, 5, 5

Planes are drawn parallel to the coordinates planes through the points (3, 0, -1) and (-2, 5, 4). Find the lengths of the edges of the parallelepiped so formed.

Answer»

Given: Points are (3, 0, -1) and (-2, 5, 4)

To find: lengths of the edges of the parallelepiped formed

For point (3, 0, -1)

x₁ = 3, y₁ = 0 and z₁ = -1

For point (-2, 5, 4)

x₂ = -2, y₂ = 5 and z₂ = 4

Plane parallel to coordinate planes of x₁ and x₂ is y_z-plane

Plane parallel to coordinate planes of y₁ and y₂ is x_z-plane

Plane parallel to coordinate planes of z₁ and z₂ is x_y-plane

Distance between planes x₁ = 3 and x₂ = -2 is 3 – (-2) = 3 + 2 = 5

Distance between planes x₁ = 0 and y₂ = 5 is 5 – 0 = 5

Distance between planes z₁ = -1 and z₂ = 4 is 4 – (-1) = 4 + 1 = 5

Hence, edges of parallelepiped is 5, 5, 5