Solving Trig Equation: 6cosx + cos2x = 2sin^2(x) - 5 for 0<=x<=pi
- Thread starter Vulcan
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Convert everything to sin(x) or cos(x) and continue.
What are your thoughts?
Please share your work with us ...even if you know it is wrong
If you are stuck at the beginning tell us and we'll start with the definitions.
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Am I correct so far, if so what next, if not where am i going wrong.
6cosx+cos2x+5-2sin2x =0
6cosx+cos2x+4+1-2sin2x =0
6cosx+cos2x+4+cos2x =0
6cosx+2cos2x+4=0
Divide by 2
3cosx+cos2x+2 =0
3cosx+2cos2x+1=0
Any help much appreciated
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- Feb 4, 2004
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Good work! Now solve the quadratic equation:
. . . . .\(\displaystyle 2\, \left[ \cos(x)\right]^2\, +\, 3\, \left[\cos(x)\right]\, +\, 1\, =\, 0\)
Applying the Quadratic Equation:
. . . . .\(\displaystyle \cos(x)\, =\, \dfrac{-(3)\, \pm\, \sqrt{\strut (3)^2\, -\, 4(2)(1)\,}}{2(2)}\)
...or simply factoring (which happens to be possible for this particular equation):
. . . . .\(\displaystyle \bigg(2\, \cos(x)\, +\, 1 \bigg)\, \bigg(\cos(x)\, +\, 1 \bigg)\, =\, 0\)
...and so forth. Then solve the two resulting trig equations.
Good work! Now solve the quadratic equation:
. . . . .\(\displaystyle 2\, \left[ \cos(x)\right]^2\, +\, 3\, \left[\cos(x)\right]\, +\, 1\, =\, 0\)
Applying the Quadratic Equation:
. . . . .\(\displaystyle \cos(x)\, =\, \dfrac{-(3)\, \pm\, \sqrt{\strut (3)^2\, -\, 4(2)(1)\,}}{2(2)}\)
...or simply factoring (which happens to be possible for this particular equation):
. . . . .\(\displaystyle \bigg(2\, \cos(x)\, +\, 1 \bigg)\, \bigg(\cos(x)\, +\, 1 \bigg)\, =\, 0\)
...and so forth. Then solve the two resulting trig equations.
Thanks for your help!