6.6 KiB
Angles consist of two rays with the same endpoint and are typically measured in standard position. Standard position is when one of the rays, referred to as the initial side starts at the origin and extend outwards along the x
axis, with a second ray referred to as the terminal side.
If an angle is measured counterclockwise, it's a positive angle, and if an angle is measured clockwise, it's a negative angle.
Degrees and Radians
To convert from radians to degrees, multiply the radian value by \frac{180\degree}{\pi}
.
x * \frac{180\degree}{\pi}
To convert from degrees to radians, multiply the degree measure by \frac{\pi}{180\degree}
.
x * \frac{\pi}{180\degree}
Complementary and Supplementary Angles
A complimentary angle is formed when two positive angles add up to 90\degree
or \frac{\pi}{2}
. One mnemonic device that you can use to remember this is:
Complementary starts with C, and C stands for corner.
90\degree
makes a corner.
A supplementary angle is formed when two positive angles add up to 180\degree
or \pi
. One mnemonic device that you can use to remember this is:
Supplementary starts with S and S stands for straight.
180\degree
makes a straight line.
Angles greater than 90\degree
have no complement and angles greater than 180\degree
have no supplement.
Right Angle Triangle Trigonometry
SohCahToa | Inverse |
---|---|
sin\theta = \frac{opposite}{hypotenuse}
|
csc\theta = \frac{hypotenuse}{opposite}
|
cos\theta = \frac{adjacent}{hypotenuse}
|
sec\theta = \frac{hypotenuse}{adjacent}
|
tan\theta = \frac{opposite}{adjacent}
|
cot\theta = \frac{adjacent}{opposite}
|
These rules apply regardless of the orientation of the triangle. |
Cosecant, secant, and tangent are inverses of sine, cosine, and tangent respectively, and so they can be found by taking \frac{1}{x}
, where x
is the function you'd like to find the inverse of.
Definitions
Term | Description |
---|---|
Ray | Directed line segment consisting of an endpoint and a direction. Notated as \overrightarrow{EF} , where E denotes the endpoint and F denotes a point along the ray. |
Angle | Union of two rays with a common endpoint. Notated as \angle DEF or \angle FED , where D and F are along the points of each ray, and E is the vertex. \angle EFD is not valid notation, because the vertex must be the middle. |
\theta |
A lowercase theta is used to represent a (non right) angle in a triangle |
\phi |
A lowercase phi is used to represent another unknown angle in a triangle. As an example, in an algebraic equation, x might be used to represent the first unknown and y the second. In trig, \theta would be used to represent the first unknown angle, and \phi the second. |
Initial side | In standard position, the initial side is the ray that extends from the origin along the x axis. |
Terminal side | In standard position, the terminal side is the ray that's being measured relative to the initial side. |
s |
The length of a curve along the radius. |
Radian | Denoted with rad , one radian is equal to the radius, but it's measured along the arc in a curve instead of from the center. |
Complementary Angles | Two positive angles that add up to 90\degree or \frac{\pi}{2} . One mnemonic device that you can use to remember this is: Complementary starts with C, and C stands for corner. 90\degree makes a corner. |
Supplementary Angles | Two positive angles that add up to 180\degree or \pi . One mnemonic device that you can use to remember this is:Supplementary starts with S and S stands for straight. 180\degree makes a straight line. |
Hypotenuse | The side opposite the right angle in a triangle. |
Opposite | |
Adjacent | For a given angle \theta in a right triangle, this side makes up the side of the intersection opposite the hypotenuse. |