thank you so much in advance..:)
Given:
(1)/(tan^2(θ)(x+1))
Rewrite as two fractions:
(1/tan^2(θ)) * (1/(x+1))
Apply cot = 1/tan
cot^2(θ) * (1/(x+1))
Combine fractions:
cot^2(θ) / (x+1))
To verify, compare to simplification produced by wolframalpha:
http://www.wolframalpha.com/input/?i=(1)/(tan^2(%C...
Copyright © 2024 1QUIZZ.COM - All rights reserved.
Answers & Comments
Verified answer
Given:
(1)/(tan^2(θ)(x+1))
Rewrite as two fractions:
(1/tan^2(θ)) * (1/(x+1))
Apply cot = 1/tan
cot^2(θ) * (1/(x+1))
Combine fractions:
cot^2(θ) / (x+1))
To verify, compare to simplification produced by wolframalpha:
http://www.wolframalpha.com/input/?i=(1)/(tan^2(%C...