tan ( 2 x ) = 2 ∙ tan x / ( 1 - tan² x )
tan x = sin x / cos x
cos x = ± √ ( 1 - sin² x )
In quadrant III cosine is positive so:
cos x = √ ( 1 - sin² x )
cos x = √ [ 1 - ( - 1 / 2 )² ]
cos x = √ ( 1 - 1 / 4 )
cos x = √ ( 4 / 4 - 1 / 4 )
cos x = √ ( 3 / 4 )
cos x = √3 / √4
cos x = √3 / 2
tan x = sin x / cos x
tan x = ( - 1 / 2 ) / ( √3 / 2 ) = ( - 1 ∙ 2 ) / ( √3 ∙ 2 ) = - 1 / √3
tan x = - 1 / √3
tan ( 2 x ) = 2 ∙ tan x / ( 1 - tan² x )
tan ( 2 x ) = 2 ∙ ( - 1 / √3 ) / [ 1 - ( - 1 / √3 )² ] =
- 2 √3 ) / [ 1 - ( 1 / 3 ) ] =
- 2 √3 ) / ( 3 / 3 - 1 / 3 ) =
( - 2 / √3 ) / ( 2 / 3 ) =
( - 2 ∙ 3 ) / ( 2 ∙ √3 ) =
- 3 / √3 =
- √3 ∙ √3 / √3 = - √3
tan ( 2 x ) = - √3
By the way:
x = 11 π / 6 = 330°
2 x = 11 π / 3 = 660°
If sinx=-1/2 and x terminates in the third quadrant, find the exact value of tan2x.
2 answers
sin π/6 = 1/2, so that is your reference angle
In QIII, x = π+π/6 = 7π/6
so, 2x = 7π/3 = 2π+π/3, in QI
So, tan2x = √3
In QIII, x = π+π/6 = 7π/6
so, 2x = 7π/3 = 2π+π/3, in QI
So, tan2x = √3
1 answer