Angle Between Lines and Planes

Pearson Malaysia Sdn Bhd

Form 4 Chapter 11: Lines and Planes in 3-Dimensions

DefinitionA plane is a flat surface.

H ABCD

Examples:

Identify

The line AC lies on the plane ABCD.

Identify

The line AH lies on the plane ADHE.

Identify

The line AG intersects with the plane EFCD.

A line which is perpendicular to any line on the plane that passes through the point of intersection of the line with the plane

Definition

Normal

It is the angle between the line and its orthogonal projection on the plane.

Definition

AOB is the angle between the line OA and the plane PQRS.

Name the angle between the line BH and the plane BCGF.

Example 1

Name the angle between the line BH and the plane BCGF.

Example 1

Solution:

The line HG is the normal to the plane BCGF.

BG is the orthogonal projection of the line BH on the plane BCGF.

HBG is the angle between the BH and the plane BCGF.

Name the angle between the line BH and the plane EFGH.

Example 2

Solution:

The line BF is the normal to the plane EFGH.

FH is the orthogonal projection of the line BH on the plane EFGH.

BHF is the angle between the BH and the plane EFGH.

Name the angle between the line BH and the plane EFGH.

Example 2

Name the angle between the line BH and the plane ABFE.

Example 3

Solution:

The line EH is the normal to the plane ABFE.

BE is the orthogonal projection of the line BH on the plane ABFE.

HBE is the angle between the BH and the plane ABFE.

Name the angle between the line BH and the plane ABFE.

Example 3

The diagram below shows a model of a cuboid which is made of iron rods. Calculate

Example 4

(a) the length CE,

(b) the angle between the line CE and the plane BCGF.

Example 4

Solution:

8 cmB C

In ∆BCF,

CF2 = BC2 + BF2

= 122 + 102

Pythagoras’ theorem

In ∆FCE,

CE2 = CF2 + FE2

= 122 + 102 + 82

Pythagoras’ theorem

= 308 CE = 17.55 cm

Example 4Solution:

The angle between the line CE and the plane BCGF is ECF.

In ∆FCE,

sin ECF =

ECF = 27° 7'

Angle Between Lines and Planes

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