Question

An angle Ɵ in standard position for which terminal side passes through the point (-1, 2), how do you find the six trig functions for Ɵ?

Answer 1

Please see the explanation for the "How to".

Explanation:

Cartesian points can be specified using a radius, `r`, and an angle, `theta`, as follows:

`x = (r)cos(theta) and y = (r)sin(theta))`

`r = sqrt(x^2 + y^2)`

For the point `(-1, 2)`:

`r = sqrt((-1)^2 + 2^2)`

`r = sqrt(5)`

Substitute this information into the equations for x and y:

`-1 = (sqrt(5))cos(theta) and 2 = (sqrt(5))sin(theta))`

`cos(theta) = -1/sqrt(5) and sin(theta) = 2/sqrt(5)`

Move the radicals to the numerators:

`cos(theta) = -sqrt(5)/5 and sin(theta) = 2sqrt(5)/5`

`sec(theta) = 1/cos(theta)`

`sec(theta) = -sqrt(5)`

`csc(theta) = 1/sin(theta)`

`csc(theta) = sqrt(5)/2`

`tan(theta) = y/x`

`tan(theta) = 2/-1`

`tan(theta) = -2`

`cot(theta) = 1/tan(theta)`

`cot(theta) = -1/2`