trig equation

mp3qz · 2009-07-22 02:01:29

juriguen · 2009-07-22 03:24:09

Hi

I would do the following:

Using sin(x) = z

If I did the calculations correctly, reordering and solving first for z and then for x, you should obtain the answer directly given by the quickmath website:

Jose

(Edited, since I didn't write the last equation correctly!)

Last edited by juriguen (2009-07-23 18:52:29)

bobbym · 2009-07-22 04:50:21

Hi mp3qz;

There are an infinite number of roots. For the real roots the solution set is.

Last edited by bobbym (2009-07-22 04:54:17)

mp3qz · 2009-07-23 16:18:56

juriguen, z=?? or an exact result for x

Last edited by mp3qz (2009-07-23 16:19:32)

juriguen · 2009-07-23 18:58:09

Hi again!

The exact solutions are really long to type, but you can easily find them using:
http://www.quickmath.com/webMathematica3/quickmath/page.jsp?s1=equations&s2=solve&s3=advanced

Just type
1/4 + 4*z + 17*z^2 + 8*z^3 + z^4 = 3*z^2 *(1-z^2)
in the equations box

and z in the variables box. Then click solve!

If you want the result for x, use the original equation directly.

By the way, bobbym is right extending the real solutions + 2 pi n. What about the complex solutions?

Jose

Last edited by juriguen (2009-07-23 19:00:44)

bobbym · 2009-07-24 02:02:33

Hi

Complex roots achieved by iteration with newtons method to the complex plane.

The values 2.69...,1.278...,2.89...,.0888..., could not be expressed in simple terms.

Last edited by bobbym (2009-07-24 02:05:45)

Math Is Fun Forum

#1 2009-07-22 02:01:29

trig equation

#2 2009-07-22 03:24:09

Re: trig equation

#3 2009-07-22 04:50:21

Re: trig equation

#4 2009-07-23 16:18:56

Re: trig equation

#5 2009-07-23 18:58:09

Re: trig equation

#6 2009-07-24 02:02:33

Re: trig equation

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