Convert cos^2 (2t) into Laplace Table Form

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SUMMARY

The discussion focuses on converting the expression cos²(2t) into a form suitable for the Laplace transform using trigonometric identities. The identity used is cos²(2x) = (1 + cos(4x))/2, which simplifies the expression for application in Laplace tables. Participants referenced the sum formula for cosine, specifically cos(a + b) = cos(a)cos(b) - sin(a)sin(b), and derived the necessary identities to arrive at the solution. This conversion is essential for those working with Laplace transforms in engineering and mathematics.

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  • Understanding of trigonometric identities
  • Familiarity with Laplace transforms
  • Basic knowledge of calculus
  • Ability to manipulate algebraic expressions
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  • Learn about the application of Laplace transforms in solving differential equations
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Students of mathematics, engineers applying Laplace transforms, and anyone interested in mastering trigonometric identities for analytical purposes.

TSN79
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Does anyone know how to convert

cos^2 (2t)

into a form that I can use the Laplace-table on...?
 
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How about using some trig identities:

\cos^2 2x = \frac {1 + \cos 4x}{2}
 
Hey thanks Tide! Just one thing, I wasn't really able to find this identity anywhere in my books, and I'm not really at a level where I can come up with such identities on my own if it goes beyond turning equations around. This identity is not one of the most used is it?
 
TSN,

It's just a variant of the sum formula which is very commonly used:

\cos a + b = \cos a \cos b - \sin a \sin b

so that when a = b

\cos 2a = \cos^2 a - \sin^2 a

and since

\sin^2 a + \cos^2 a = 1

the identity becomes

\cos 2a = 2 \cos^2 a - 1

from which

\cos^2 a = \frac {1 + \cos 2a}{2}

Finally, just set a = 2x for your problem.
 

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