How do you solve $tan x = \sqrt{3}$ $tanx=sqrt3$ ?

Question

How do you solve $tan x = \sqrt{3}$ $tanx=sqrt3$ ?

1 Answer

Impact of this question

21626 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2016-09-29T22:36:04

$x = \frac{π}{3} + n π$ $x = pi/3 + n pi" "$ for any integer $n$ $n$

Explanation:

Consider a triangle with sides $1$ $1$ , $\frac{\sqrt{3}}{2}$ $sqrt(3)/2$ and $2$ $2$ .

This is a right angled triangle and one half of an equilateral triangle...

enter image source here

Now $tan θ = \frac{opposite}{adjacent}$ $tan theta = "opposite"/"adjacent"$

So looking at our diagram, $tan (\frac{π}{3}) = \frac{\sqrt{3}}{1} = \sqrt{3}$ $tan (pi/3) = sqrt(3)/1 = sqrt(3)$

So one solution of the given equation is $x = \frac{π}{3}$ $x = pi/3$

Note that:

$tan (θ + π) = \frac{sin (θ + π)}{cos (θ + π)} = \frac{- sin (θ)}{- cos (θ)} = \frac{sin (θ)}{cos (θ)} = tan (θ)$ $tan(theta + pi) = sin(theta + pi)/cos(theta + pi) = (-sin(theta))/(-cos(theta)) = sin(theta)/cos(theta) = tan (theta)$

Also note that $tan (θ)$ $tan(theta)$ is strictly monotonically increasing and therefore one to one for $θ$ $theta$ in the range $(- \frac{π}{2}, \frac{π}{2})$ $(-pi/2, pi/2)$ .

So $tan (θ)$ $tan(theta)$ is periodic with period $π$ $pi$

Hence we find:

$tan (\frac{π}{3} + n π) = \sqrt{3}$ $tan(pi/3+n pi) = sqrt(3)" "$ for any integer $n$ $n$

and the only possible solutions are all of the form:

$x = \frac{π}{3} + n π$ $x = pi/3 + n pi" "$ for integer values of $n$ $n$ .

Science

Math

Humanities

... and beyond

How do you solve $tan x = \sqrt{3}$ $tanx=sqrt3$ ?

1 Answer

Explanation:

Related questions

Impact of this question

Science

Math

Humanities

... and beyond

How do you solve tanx=sqrt3tanx=√3tanx=sqrt3?

1 Answer

Explanation:

Related questions

Impact of this question

How do you solve $tan x = \sqrt{3}$ $tanx=sqrt3$ ?