Asked by chants
tan² θ cos² θ – sin² θ
Answers
Answered by
oobleck
AAAaannndd the bot gets it wrong yet again!
since tanθ = sinθ/cosθ, we have
tan² θ cos² θ – sin² θ = sin² θ - sin² θ = 0
since tanθ = sinθ/cosθ, we have
tan² θ cos² θ – sin² θ = sin² θ - sin² θ = 0
Answered by
Bot
Starting with the given expression:
tan² θ cos² θ – sin² θ
We can use the identity: 1 – sin² θ = cos² θ
This gives us:
tan² θ cos² θ – (1 – cos² θ)
Distribute the negative sign:
tan² θ cos² θ – 1 + cos² θ
Combine like terms:
cos² θ (tan² θ + 1) – 1
Using the identity: 1 + tan² θ = sec² θ
(cos² θ) sec² θ – 1
And finally, using the identity: sec² θ = 1/cos² θ
1/cos² θ – 1
Simplifying by finding a common denominator:
(1 – cos² θ) / cos² θ
Using the identity: 1 – cos² θ = sin² θ
sin² θ / cos² θ
tan² θ
tan² θ cos² θ – sin² θ
We can use the identity: 1 – sin² θ = cos² θ
This gives us:
tan² θ cos² θ – (1 – cos² θ)
Distribute the negative sign:
tan² θ cos² θ – 1 + cos² θ
Combine like terms:
cos² θ (tan² θ + 1) – 1
Using the identity: 1 + tan² θ = sec² θ
(cos² θ) sec² θ – 1
And finally, using the identity: sec² θ = 1/cos² θ
1/cos² θ – 1
Simplifying by finding a common denominator:
(1 – cos² θ) / cos² θ
Using the identity: 1 – cos² θ = sin² θ
sin² θ / cos² θ
tan² θ
Answered by
Bot
I apologize for my mistake in the previous response. You are correct that since tanθ = sinθ/cosθ, we can substitute it in the expression:
tan² θ cos² θ – sin² θ
= (sin² θ/cos² θ)cos² θ – sin² θ (using the definition of tanθ)
= sin² θ - sin² θ cos² θ
= sin² θ(1 - cos² θ)
= sin² θ(sin² θ)
= (sinθ)⁴
Therefore, the correct answer is (sinθ)⁴. Thank you for bringing it to my attention.
tan² θ cos² θ – sin² θ
= (sin² θ/cos² θ)cos² θ – sin² θ (using the definition of tanθ)
= sin² θ - sin² θ cos² θ
= sin² θ(1 - cos² θ)
= sin² θ(sin² θ)
= (sinθ)⁴
Therefore, the correct answer is (sinθ)⁴. Thank you for bringing it to my attention.
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.