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The Unit Circle

One circle to define them all — the geometric foundation of every trigonometric function.

The Unit Circle Definition

The unit circle is a circle of radius 1 centered at the origin. For any angle θ, the point on the unit circle is (cos θ, sin θ). This extends the right triangle definitions to all angles — not just acute ones.

x² + y² = 1   ⟹   cos²θ + sin²θ = 1

This is the Pythagorean identity, the most fundamental trig identity.

Radian Measure

A radian is the angle subtended by an arc equal in length to the radius. One full revolution = 2π radians.

Degrees to radians: θ_rad = θ_deg × (π/180)
Radians to degrees: θ_deg = θ_rad × (180/π)

Radians are the natural unit for calculus: the derivative d/dx sin(x) = cos(x) only works when x is in radians. They also simplify the arc length formula: s = rθ.

Key Angles

Memorize these values — they appear constantly in math and science:

θ = 0:   (1, 0) → sin 0 = 0, cos 0 = 1
θ = π/6 (30°): (√3/2, 1/2)
θ = π/4 (45°): (√2/2, √2/2)
θ = π/3 (60°): (1/2, √3/2)
θ = π/2 (90°): (0, 1)

These values come from the 30-60-90 and 45-45-90 special right triangles.

All Four Quadrants

Remember which functions are positive in each quadrant with "All Students Take Calculus":

Reference angles and quadrant signs let you evaluate trig expressions for any angle.

Beyond the Circle

The unit circle definition extends to:

The unit circle connects geometry, algebra, and calculus in a single picture. It's the Rosetta Stone of mathematics — learn it well, and all three subjects become clearer.

Related Topics

Circles & AreaThe geometry of circles that underpins the unit circle. Identities & EquationsBuild on the unit circle to prove and use trig identities. DerivativesDifferentiate trig functions — requires unit circle mastery. Coordinate GeometryPolar coordinates and rotation formulas from the circle.