Answer:
sqrt3 tan(x) + 1 / sqrt3 = tan(x)
Step-by-step explanation:
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The equation tan(x- pi/6) is equal to (tanx - 1/√3)/(1 + tanx/√3) .
The expansion formula for tangent are -
Given equation is tan(x- pi/6) .
⇒ tan(x - π/6) = {tanx - tan(π/6)}/{1 + tanxtan(π/6)}
⇒ tan(x - π/6) = (tanx - 1/√3)/(1 + tanx/√3)
Thus, The equation tan(x- pi/6) is equal to (tanx - 1/√3)/(1 + tanx/√3) .
To learn more about trigonometric identity, refer -
https://brainly.com/question/7331447
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