Hyperbolic Trig Functions - Identities

89 Views Asked by Bumbble Comm At 27 Mar 2026 - 11:12

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I don't understand how the 3rd step (the 4 divisions) happens? Can someone explain how they arrived at that.

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Bumbble Comm On 03 Mar 2015 - 2:44

$$1=\frac{\frac1{\cosh x \cosh y}}{\frac1{\cosh x \cosh y}}$$

$$\frac{\sinh x\cosh y+\cosh x\sinh y}{\cosh x\cosh y+\sinh x\sinh y}=\left(\frac{\sinh x\cosh y+\cosh x\sinh y}{\cosh x\cosh y+\sinh x\sinh y}\right)\left(1\right)=\left(\frac{\sinh x\cosh y+\cosh x\sinh y}{\cosh x\cosh y+\sinh x\sinh y}\right)\left(\frac{\frac1{\cosh x \cosh y}}{\frac1{\cosh x \cosh y}}\right)=\frac{\frac{\sinh x\cosh y}{\cosh x \cosh y}+\frac{\cosh x\sinh y}{\cosh x \cosh y}}{\frac{\cosh x\cosh y}{\cosh x \cosh y}+\frac{\sinh x\sinh y}{\cosh x \cosh y}}$$

Hyperbolic Trig Functions - Identities

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