Trigonometric equations

Abdul Quadeer

1. The problem statement, all variables and given/known data

The general solution of sinx.siny=1 is

1.x=n(pi)+(pi/2)(-1)^n+1 y=m(pi)+(pi/2)(-1)^m+1
2.x=(4n+1)(pi/2) y=(4m+1)(pi/2)
3.x=(4n-1)(pi/2) y=(4m-1)(pi/2)

where n,m belong to I
2. Relevant equations
Answer- 2 and 3

3. The attempt at a solution

This is possible only if sinx=siny=1 or sinx=siny= -1

Substituting arbitrary values of n,m in 1st choice.....we get correct answer
but 1st choice is not included in correct answers
WHY?

Mentallic

Frankly, I don't see the point of having y=f(n) since y=x.
The first doesn't work because you can choose n and m such that sin(x)=-sin(y) so sin(x)sin(y)=-1

The general solutions are [tex]x= \pi/2 +2\pi n[/tex] such that sin(x)=1, and [tex]y=-\pi /2 +2\pi n[/tex] such that sin(y)=-1. These are equivalent to your second and third equation.

[tex]z=\pi/2+\pi n[/tex] gives sin(z)=[itex]\pm[/itex]1

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Mentallic Recognitions: Homework Help	Frankly, I don't see the point of having y=f(n) since y=x. The first doesn't work because you can choose n and m such that sin(x)=-sin(y) so sin(x)sin(y)=-1 The general solutions are [tex]x= \pi/2 +2\pi n[/tex] such that sin(x)=1, and [tex]y=-\pi /2 +2\pi n[/tex] such that sin(y)=-1. These are equivalent to your second and third equation. [tex]z=\pi/2+\pi n[/tex] gives sin(z)=[itex]\pm[/itex]1