Question

How do you find the exact value of `tan(pi/6)`?

Answer 1

`tan(pi/6)=1/sqrt(3)=sqrt(3)/3`

Explanation:

(see image below)

This is one of the standard trigonometric triangles.

`sqrt(3)` has been determined using Pythagorean Theorem.

Sum of interior angles of a triangle is always `pi` radians.

Answer 2

`tan(pi/6) = sqrt3/3 approx 0.577`

Explanation:

Using the identity

`tan = sin/cos`,

and

`sin(pi/6) = sin(30) = 1/2`
`cos(pi/6) = cos(30) = sqrt3/2`

then

`tan(pi/6) = (1/2)/(sqrt3/2)`.

You should know that dividing by one number is the same as multiplying by its reciprocal, so

`(1/2)/(sqrt3/2) = 1/2 * 2/sqrt3`

Cancelling the `2`'s and rationalising the denominator,

`1/2 * 2/sqrt3 = 1/sqrt3`
`1/sqrt3 * sqrt3/sqrt3 = sqrt3/3`

Therefore,

`tan(pi/6) = sqrt3/3`

Using a calculator,

`tan(pi/6) approx 0.577`