Trigonometry Functions and Applications

Angles, Arc, and Their Measures

This section introduces the foundational concepts of angles, their measurement, and related applications in trigonometry. Understanding these concepts is essential for further study in trigonometry and its applications in geometry, physics, and engineering.

Angles and Arcs: Basic Terminology

• Line AB: Determined by two distinct points A and B, extending infinitely in both directions.

• Line Segment AB: The portion of the line between points A and B.

• Ray AB: Starts at point A and passes through B, extending infinitely in one direction.

• Angle: Formed by rotating a ray (the initial side) about its endpoint (the vertex) to a terminal side.

Degree Measure

• The degree divides the circumference of a circle into 360 equal parts.

• There are 360° in one full rotation.

• Acute angle:

• Right angle:

• Obtuse angle:

• Straight angle:

Complementary and Supplementary Angles

• Complementary angles: Two positive angles whose sum is .

• Supplementary angles: Two positive angles whose sum is .

Example: If , then ; angles are and .

Degrees, Minutes, and Seconds

• 1 minute () = of a degree.

• 1 second () = of a minute = of a degree.

Example: (since ).

Converting Between Decimal Degrees and DMS (Degrees, Minutes, Seconds)

• To convert DMS to decimal degrees:

• To convert decimal degrees to DMS: Separate the integer part (degrees), multiply the decimal by 60 for minutes, and repeat for seconds.

Example:

Quadrantal Angles

• Angles in standard position with terminal sides along the x- or y-axis (e.g., , , , ).

Coterminal Angles

• Angles with the same initial and terminal sides but different rotations.

• Measures differ by multiples of .

Example: is coterminal with ().

Radian Measure

• 1 radian is the angle at the center of a circle that intercepts an arc equal in length to the radius.

• The circumference of a circle:

• radians, radians

Converting Between Degrees and Radians

• Degrees to radians: Multiply by

• Radians to degrees: Multiply by

Example: radians

Equivalent Angle Measures in Degrees and Radians

Arc Length

• The length of an arc of a circle of radius and central angle (in radians):

Example: For cm, radians, cm.

Applications: Using Latitudes to Find Distance

• Latitude difference gives the central angle between two locations on Earth.

• Distance formula: , with in radians.

Example: For a latitude difference of and Earth's radius km: radians, km.

Area of a Sector

• The area of a sector of a circle of radius and central angle (in radians):

Example: For m, radians, m2.

Linear and Angular Speed

• Angular speed (): (in radians per unit time)

• Linear speed ():

Example: For a point on a circle of radius 10 cm, angular speed rad/s, in 6 seconds:

• Angle generated: radians

• Distance traveled: cm

• Linear speed: cm/s or cm/s

Finding Angular and Linear Speed of a Pulley

• For a pulley of radius 6 cm at 80 revolutions per minute:

• Each revolution = radians, so radians/minute

• Angular speed: radians/second

• Linear speed: cm/s