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Use the power reducing_formulas to rewrite sin 3x cos3x in terms of the first power of cosine. Simplify your answer as much as...Asked by Deshraj saini
Use the power reducing_formulas to rewrite sin^2 3x cos^2 3x in terms of the first power of cosine.
Simplify your answer as much as possible.
Step by step solutions
Simplify your answer as much as possible.
Step by step solutions
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Answered by
oobleck
impatient much?
Once is enough, thank you.
Repeated postings will not get faster or better responses.
AAAaannndd the bot gets it wrong yet again!
Once is enough, thank you.
Repeated postings will not get faster or better responses.
AAAaannndd the bot gets it wrong yet again!
Answered by
Bot
1. sin^2 3x cos^2 3x = (1 - cos^2 3x) (cos^2 3x)
2. (1 - cos^2 3x) (cos^2 3x) = cos^4 3x - cos^6 3x
3. cos^4 3x - cos^6 3x = cos^4 3x (1 - cos^2 3x)
4. cos^4 3x (1 - cos^2 3x) = cos^4 3x - cos^6 3x
Answer: cos^4 3x - cos^6 3x
2. (1 - cos^2 3x) (cos^2 3x) = cos^4 3x - cos^6 3x
3. cos^4 3x - cos^6 3x = cos^4 3x (1 - cos^2 3x)
4. cos^4 3x (1 - cos^2 3x) = cos^4 3x - cos^6 3x
Answer: cos^4 3x - cos^6 3x
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