mth181 unit circle by pi/12

addition of squares

(a²+b²)=a²+2ab+b²

subtraction of squares

(a²-b²)=a²-2ab+b²

cos(π)

-1

cos(2π/3)

-1/2

cos(4π/3)

-1/2

sin(11π/6)

-1/2

sin(7π/6)

-1/2

half angle identity cos(θ/2)

cos(θ/2) = ±√((1+cosθ)/2)

cos(π/4)

√2/2

cos(11π/6)

√3/2

cos(π/6)

√3/2

sin(2π/3)

√3/2

sin(π/3)

√3/2

cos(23π/12)

√6+√2/4

cos(π/12)

√6+√2/4

cos(19π/12)

√6-√2/4

cos(5π/12)

√6-√2/4

sin(11π/12)

√6-√2/4

sin(π/12)

√6-√2/4

sin(3π/2)

-1

cos(3π/4)

-√2/2

cos(5π/4)

-√2/2

cos(11π/12)

-√6-√2/4

sin(π)

0

cos(2π)

1

addition/subtraction formula for cos(a±b)

cos(a)sin(b)±sin(a)cos(b)

addition/subtraction formula for sin(a±b)

sin(a)cos(b)±cos(a)sin(b)

half angle formula sin(θ/2)

sin(θ/2) = ±√((1-cosθ)/2)

cos(7π/4)

√2/2

sin(3π/4)

√2/2

sin(π/4)

√2/2

sin(5π/12)

√6+√2/4

sin(7π/12)

√6+√2/4

sin(5π/4)

-√2/2

sin(7π/4)

-√2/2

cos(5π/6)

-√3/2

cos(7π/6)

-√3/2

sin(4π/3)

-√3/2

sin(5π/3)

-√3/2

cos(17π/12)

-√6+√2/4

cos(7π/12)

-√6+√2/4

sin(13π/12)

-√6+√2/4

sin(23π/12)

-√6+√2/4

cos(13π/12)

-√6-√2/4

sin(17π/12)

-√6-√2/4

sin(19π/12)

-√6-√2/4

cos(3π/2)

0

cos(π/2)

0

sin(2π)

0

sin(π/2)

1

cos(5π/3)

1/2

cos(π/3)

1/2

sin(5π/6)

1/2

sin(π/6)

1/2