Explaining Sin(x+h) = sinxcosh + cosxsinh

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Discussion Overview

The discussion revolves around the trigonometric identity sin(x+h) = sin(x)cos(h) + cos(x)sin(h). Participants explore various methods of explanation, including graphical proofs, differential equations, and complex number identities.

Discussion Character

  • Exploratory
  • Technical explanation
  • Mathematical reasoning

Main Points Raised

  • One participant suggests that a graphical proof can illustrate the identity, referencing a specific online resource for visual aid.
  • Another participant provides a detailed explanation using differential equations, stating that sin(x) and cos(x) are solutions to the equation y" = -y and demonstrating how this leads to the identity.
  • A different approach is mentioned involving the use of complex numbers, where identities for sinh and sin are presented as a means to derive the formula.

Areas of Agreement / Disagreement

Participants present multiple methods of explanation without reaching a consensus on a single preferred approach. The discussion remains open with various perspectives on how to understand the identity.

Contextual Notes

Some explanations depend on familiarity with differential equations or complex numbers, which may limit accessibility for all participants. The discussion does not resolve the best method for explaining the identity.

dabouncerx24
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Can somebody please explain to me why

sin(x+h) = sinxcosh + cosxsinh

in detail.
 
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That's one way.

It can also be done this way (but this is much more "mathematically sophisticated")

sin(x) and cos(x) are solutions to the differential equation y"= - y with the properties that cos(0)= 1, cos'(0)= 0, sin(0)= 1, sin'(0)= 1 so it can be shown that any solution to y"= -y with y(0)= A, y'(0)= B must be of the form y= Acos(x)+ Bsin(x).

Let y(x)= sin(x+ h) where h is a constant. Then y'(x)= cos(x+ h) and y"= -sin(x+h)= -y. This function y satisfies the differential equation. Also y(0)= sin(0+h)= sin(h) and y'(0)= cos(x+ h)= cos(x). Therefore, y(x)= sin(x+h)= sin(h)cos(x)+ cos(h)sin(x).

You can also let y(x)= cos(x+h). Then y'(x)= -sin(x+h) and y"(x)= -cos(x+h)= -y.
y(0)= cos(h) and y'(0)= -sin(h). Therefore y(x)= cos(x+h)= cos(h)cos(x)- sin(h)sin(x).
 
Or use the identities

sinh(y) = {e^y - e^{-y}}/2

sin(y) = {e^{iy}-e^{-iy}}/2

etc,

if you know about complex numbers
 

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