proving a trig
- Thread starter oded244
- Start date
It's called proving a trig identity.
\(\displaystyle \L\\cos^{4}(x)-sin^{4}(x)=cos(2x)\)
You can use the identity: \(\displaystyle \L\\cos^{2}(x)=\frac{1+cos(2x)}{2}, \;\ sin^{2}(x)=\frac{1-cos(2x)}{2}\)
Then you have:
\(\displaystyle \L\\\left(\frac{1+cos(2x)}{2}\right)^{2}-\left(\frac{1-cos(2x)}{2}\right)^{2}\)
=\(\displaystyle \L\\\frac{1+2cos(2x)+cos^{2}(2x)-1+2cos(2x)-cos^{2}(2x)}{4}\)
=\(\displaystyle \L\\\frac{1}{2}cos(2x)+\frac{1}{2}cos(2x)=cos(2x)\)
Expand and simplify. It should fall into place.
\(\displaystyle \L\\cos^{4}(x)-sin^{4}(x)=cos(2x)\)
You can use the identity: \(\displaystyle \L\\cos^{2}(x)=\frac{1+cos(2x)}{2}, \;\ sin^{2}(x)=\frac{1-cos(2x)}{2}\)
Then you have:
\(\displaystyle \L\\\left(\frac{1+cos(2x)}{2}\right)^{2}-\left(\frac{1-cos(2x)}{2}\right)^{2}\)
=\(\displaystyle \L\\\frac{1+2cos(2x)+cos^{2}(2x)-1+2cos(2x)-cos^{2}(2x)}{4}\)
=\(\displaystyle \L\\\frac{1}{2}cos(2x)+\frac{1}{2}cos(2x)=cos(2x)\)
Expand and simplify. It should fall into place.
oded244 said:the early algebra i understood, but way he divided the left side in cos(2r) and the right in 1 ?
ohh, now i get it. its not division
i thought that you used division. i understood. can you check if you can solve the seconded identity ?
ilaggoodly
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- Oct 4, 2007
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the second one is a false identity, i suppose you mean cos^2...it involves the same identity as the former one if thats the case
D
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Yes - there is a typo.oded244 said:i don't think we learned those identities. i understood galactus way but not pkas.
Here's another one that took a couple of hours from my life (im pretty sure that there's a typo in the book but i'll ask you guys to be 100% sure)
It should be:
\(\displaystyle cos^2(3x) - sin^2(3x) = cos(6x)\)
The exponent of Cosine has to be changed to 2 (from 3).