Expressing the arctan function in a different form? arctan &#x2061;<!-- ⁡ --> (

Scolfaro2y

Scolfaro2y

Answered question

2022-05-26

Expressing the arctan function in a different form?
arctan ( 1 ω ) = π 2 arctan ( ω )

Answer & Explanation

morssiden5g

morssiden5g

Beginner2022-05-27Added 9 answers

ω = t a n θ for some θ. Then 1 / ω = cot θ . Cotangent is called Cotangent because it's the tangent of the Complementary angle. So arctan 1 / ω and arctan ω are complementary angles. So they add to π / 2

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