Pre-Calculus 11 Notes

By: Gen L.

In partnership with Hyperion University, 2023




Lesson 4: Angles & Special Triangles





4.1: Angles in Standard Position


Angles in Standard Position

When dealing with angles, special cases emerge. To investigate, we need to use a Cartesian Plane ( graph).

Terminology:

  • Initial Arm
    • Start position; always lays along the -axis
  • Terminal Arm
    • Final position; location after rotation around the origin.
  • Angle in Standard Position
    • Initial arm must be positive
    • Origin is vertex.
    • Measured between initial & terminal arms
    • Always positive when drawn anti-clockwise

Angular Range

Since any angle in standard position must always be positive, we know the range of possible answers per quadrant.

Reference Angle:

  • An acute angle ()
  • Vertex is origin
  • Formed between terminal arm & -axis
  • Identified by

Reference Angle Formulae

Based on the quadrant, the formula changes. It's a challenge when you have a reference angle (i.e. ), you can actually have 4 different angles that satisfy the reference angle: ,

4.2: Special Triangles

Special Right Triangles

Certan angles we encounter allow us to determine the exact value of Trigonometric ratios.
These triangles have angles:
Let's look at specific cases.

45-45-90 Triangle, defined

If there is a right triangle with an angle of , the other (non-right) angle is also .
If the side lengths of the legs equal unit, the hypotenuse will be equal to .

45-45-90 Triangle, part 2

Ratios: 45-45-90

Using this special triangle, we can determine exact trigonometric ratios for each case:

  • Sine
  • Cosine
  • Tangent

Application 1: Exact Values

  • Find exact values for
  • Since
    • We can define
  • We have a proportion:
    • By cross multiplying & dividing:

30-60-90 Triangle, defined

If we draw a triangle with an angle of , the other (non-right) angle must be . This triangle is half of an equilateral triangle with side length .
If we use Pythagoras to find the height, we get an exact value of , which is always opposite the angle.

30-60-90 Triangle, part 2

Ratios: 30-60-90

  • Sine
  • Cosine
  • Tangent

Applications 2: Exact Values

  • Find exact values for
  • /
    • Each can be rewritten as proportions:
  • /
    • Cross multiplying & dividing gives

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