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Title: Trigonometric equation Post by wonderful on Jun 15th, 2008, 6:56pm Solve: (sinx)^2 + (siny)^2 +[sin(x+y)]^2 = 9/4 Have A Great Day! |
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Title: Re: Trigonometric equation Post by Barukh on Jun 16th, 2008, 11:07am I think [hide]calculus[/hide] may help here. |
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Title: Re: Trigonometric equation Post by Eigenray on Jun 16th, 2008, 11:27am I think [hide]triangles[/hide] should help too, but I suck at [hide]geometry[/hide]. |
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Title: Re: Trigonometric equation Post by Aryabhatta on Jun 16th, 2008, 3:13pm Pure algebraic manipulations will do too: [hide] Note that using 1 - 2sin2(x) = cos(2x), we can rewrite the equation as cos (2x) + cos(2y) + cos(2x+2y) = -3/2 i.e 2 cos(x+y)cos(x-y) + 2cos2(x+y) = -1/2 ie 1 + 4 cos(x+y)cos(x-y) + 4 cos2(x+y) = 0 i.e sin2(x-y) + (cos(x-y) + 2cos(x+y))2 = 0 Thus sin(x-y) = 0 and cos(x-y) +2 cos(x+y) = 0. The solution set should follow easily now. [/hide] |
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Title: Re: Trigonometric equation Post by wonderful on Jun 16th, 2008, 4:43pm Aryabhatta is correct. Have A Great Day! |
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Title: Re: Trigonometric equation Post by Sir Col on Jun 16th, 2008, 11:38pm Stunning, Aryabhatta! 8) |
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Title: Re: Trigonometric equation Post by Aryabhatta on Jun 18th, 2008, 7:20pm Thanks :) I guess we can also do something using complex numbers... |
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