Angle Sum/Difference
sin(75) =
sin(75) =
(sqrt(6) + sqrt(2)) / 4
tan(75) =
tan(75) = 2 + sqrt(3)
What is the formula for converting polar coordinates to rectangular coordinates?
What is the formula for converting polar coordinates to rectangular coordinates?
x = rcos(theta)
y = rsin(theta)
sin(255) =
sin(255) =
(-sqrt(2) - sqrt(6)) / 4
sin(345) =
sin(345) =
(sqrt(2) - sqrt(6)) / 4
What is the formula for converting rectangular coordinates to polar coordinates?
What is the formula for converting rectangular coordinates to polar coordinates?
r2 = x2 + y2
theta = tan-1(y/x)
sin(-105) =
sin(-105) =
(-sqrt(3) - sqrt(2)) / 4
sec(75) =
sec(75) =
sqrt(6) + sqrt(2)
Write (3, Pi/2) as rectangular coordinates
Write (3, Pi/2) as rectangular coordinates
(0, 3)
cos(-15) =
cos(-15) =
(sqrt(6) + sqrt(2)) / 4
cot(105) =
cot(105) =
-2 + sqrt(3)
Write (3, 3) as polar coordinates
Write (3, 3) as polar coordinates
(3*sqrt(2), Pi/4)
csc(285) =
csc(285) =
-sqrt(6) + sqrt(2)
sin(375) =
sin(375) =
(sqrt(6) - sqrt(2)) / 4
Write as rectangular coordinates: (5, 3pi/2)
Write as rectangular coordinates: (5, 3pi/2)
(0, -5)