[College Maths] - Roots of a complex hyperbolic function

**PaperclipGames** · 09-7-2013, 01:09 PM

Re: [College Maths] - Roots of a complex hyperbolic function

Simply take the inverse hyperbolic sine from both sides. Since sinh-1(i) = i*pi/2 we have that z = i*pi/2. Add a factor 2i*n*pi (n a whole number) for all solutions, since sinh is periodic with period 2i*pi.

**Artic_counter** · 09-7-2013, 01:25 PM

Re: [College Maths] - Roots of a complex hyperbolic function

Thanks!

But how do you determine that sinh-1(i) = i*pi/2 ?
What if it was sinh-1(1)?

**smartdude1212** · 09-7-2013, 03:12 PM

Re: [College Maths] - Roots of a complex hyperbolic function

Without getting into details about prinicpal values, it's worth knowing that:

arcsinh(z) = iarcsin(-iz)

**Zapmeister** · 09-7-2013, 04:02 PM

Re: [College Maths] - Roots of a complex hyperbolic function

just expand out the sinh and solve as a quadratic for e^z

**Arkuski** · 09-7-2013, 07:24 PM

Re: [College Maths] - Roots of a complex hyperbolic function

Originally posted by Zapmeister

just expand out the sinh and solve as a quadratic for e^z

gg Zap I did it your way

**___________** · 09-7-2013, 08:40 PM

Re: [College Maths] - Roots of a complex hyperbolic function

Expand the sinh(), and then divide by i. The LHS should remind you of the formula for the imaginary part of a complex number.

[College Maths] - Roots of a complex hyperbolic function

[College Maths] - Roots of a complex hyperbolic function

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