Asked by Rabin
Solve: (1-√3tanθ)+1+√3 = √3sec^2θ Where (0≤θ≤360)
Answers
Answered by
Reiny
recall that sec^2 Ø = tan^2 Ø + 1
(1-√3tanθ)+1+√3 = √3sec^2θ
1 - √3tanØ + 1 + √3 = √3(tan^2 Ø + 1)
- √3tanØ + √3 = √3tan^2 Ø + √3
tan^2 Ø + tanØ = 0
tanØ(tanØ + 1) = 0
tanØ = 0 or tanØ = -1
Ø = 0 or Ø = 135° or Ø = 315°
(1-√3tanθ)+1+√3 = √3sec^2θ
1 - √3tanØ + 1 + √3 = √3(tan^2 Ø + 1)
- √3tanØ + √3 = √3tan^2 Ø + √3
tan^2 Ø + tanØ = 0
tanØ(tanØ + 1) = 0
tanØ = 0 or tanØ = -1
Ø = 0 or Ø = 135° or Ø = 315°
Answered by
Reiny
in the solution of tanØ = 0
I should have included Ø = 180°
so Ø = 0°, 135°, 180°, 315°
I should have included Ø = 180°
so Ø = 0°, 135°, 180°, 315°
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