Solving a Basic Trigonometry Doubt: Where to Learn?

AI Thread Summary
The discussion revolves around solving a trigonometry problem involving the transformation of the expression 3cos(2t) + 4sin(2t) into the form 5cos(2t - 53.13°). The solution involves using the cosine angle subtraction formula and defining a relationship between the coefficients of sine and cosine. The user is also seeking resources for learning basic trigonometry, and a helpful link is provided for further study. The interaction highlights the importance of understanding trigonometric identities in simplifying expressions. Overall, the thread effectively addresses both the mathematical query and educational resources.
skan
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I have basic trignometry doubt

how to u get 5cos(2t-53.13degrees) from 3cos2t + 4 sin2t.

Can someone suggest a site from where I can lean basic trinometry

thanks.
skan
 
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well, nice question...
use cos(x-y)=cos(x)cos(y) + sin(x)sin(y).

3cos2t + 4sin2t = 3(cos2t + (4/3)sin2t). The trick is to define 4/3 = tan(y)=siny/cosy where y = 53,13°. Now you have 3(cos2t + (siny/cosy)sin2t). or this becomes following expression : (3/cosy)(cosy * cos2t + siny * sin2t) =
(3/cosy)cos(2t - 53.13°) and cosy = cos(53.13°) = 0.6

3/cosy = 3/0.6 = 5

problem solved

regards
marlon
 
Check out this site...


http://www.ping.be/~ping1339/index.html#Main-Purpose-=-MATH-

marlon
 
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Thanks a lot for the answer and the great link!
 

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