On the unit circle, an angle terminating at the coordinates (x, y) corresponds to the trigonometric functions sine (sin) and cosine (cos).
The relationships between the signs of x, y, sin(θ), and cos(θ) based on the quadrant help predict the signs of trigonometric functions for a given angle.
Relationship between the x and y and trig function
On the unit circle, an angle terminating at the coordinates (x, y) corresponds to the trigonometric functions sine (sin) and cosine (cos).
For any angle θ measured counterclockwise from the positive x-axis to the terminal side of the angle, the coordinates (x, y) on the unit circle are x=cos(θ) and y=sin(θ).
Here's how these relationships help predict the sign (+/-) of the trigonometric functions in each quadrant:
First Quadrant (0 to 90 degrees or 0 to π/2 radians):
Both x and y are positive.
sin(θ) and cos(θ) are both positive.
Second Quadrant (90 to 180 degrees or π/2 to π radians):
x is negative, y is positive.
sin(θ) is positive, cos(θ) is negative.
Third Quadrant (180 to 270 degrees or π to 3π/2 radians):
Both x and y are negative.
sin(θ) and cos(θ) are both negative.
Fourth Quadrant (270 to 360 degrees or 3π/2 to 2π radians):
x is positive, y is negative.
sin(θ) is negative, cos(θ) is positive.
These relationships between the signs of x, y, sin(θ), and cos(θ) based on the quadrant help predict the signs of trigonometric functions for a given angle.
They are particularly useful when determining whether the functions are positive or negative, which aids in calculating values without directly using the unit circle or a calculator.