Answer:
A, D
Step-by-step explanation:
[tex](\frac{2tanx}{1-tan^{2}x}) =\sqrt{3}[/tex] (1)
Assume that tan x = y. Replace this into the equation (1), we have:
+) [tex]\frac{2y}{1-y^{2} } =\sqrt{3}[/tex]
=> 2y = [tex]\sqrt{3} . (1 -y^{2} ) =- \sqrt{3} .y^{2} + \sqrt{3}[/tex]
=> [tex]\sqrt{3} .y^{2} + 2y - \sqrt{3} = 0[/tex]
=> [tex]\sqrt{3} . y^{2} - 1.y + 3.y - \sqrt{3} =0[/tex]
=> [tex](\sqrt{3} . y.y - 1.y) + (\sqrt{3}.\sqrt{3} .y - \sqrt{3}) =0[/tex]
=> [tex]y.(\sqrt{3} y - 1) + \sqrt{3} (\sqrt{3} y - 1) = 0[/tex]
=> [tex](y + \sqrt{3} ).(\sqrt{3} .y -1)=0[/tex]
=> [tex]y + \sqrt{3} = 0[/tex] or [tex]\sqrt{3} y -1 =0[/tex]
If [tex]y + \sqrt{3} = 0[/tex]
=> y = - √3
=> tan x = - √3
=> x = [tex]\frac{2\pi }{3}[/tex] + n.[tex]\pi[/tex] with n is an integral
If [tex]\sqrt{3} y -1 =0[/tex]
=> y = 1/√3
=> tan x = 1/√3
=> x = [tex]\frac{\pi }{6} + n.\pi[/tex] n is an integral
So that A, D are answers.
