Derivative of sec-1 x (Sec inverse x)

Last updated at April 16, 2024 by

Derivative of sec-1 x (Sec inverse x) - Teachoo [with Video]

Derivative of sec-1 x (Sec inverse x) - Part 2

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Derivative of ใ€–๐’”๐’†๐’„ใ€—^(โˆ’๐Ÿ) ๐’™ ๐‘“ (๐‘ฅ)=ใ€–๐‘ ๐‘’๐‘ใ€—^(โˆ’1) ๐‘ฅ Let ๐’š= ใ€–๐’”๐’†๐’„ใ€—^(โˆ’๐Ÿ) ๐’™ secโกใ€–๐‘ฆ=๐‘ฅใ€— ๐’™=๐ฌ๐ž๐œโกใ€–๐’š ใ€— Differentiating both sides ๐‘ค.๐‘Ÿ.๐‘ก.๐‘ฅ ๐‘‘๐‘ฅ/๐‘‘๐‘ฅ = (๐‘‘ (secโก๐‘ฆ ))/๐‘‘๐‘ฅ 1 = (๐‘‘ (secโก๐‘ฆ ))/๐‘‘๐‘ฅ ร— ๐‘‘๐‘ฆ/๐‘‘๐‘ฆ 1 = (๐‘‘ (secโก๐‘ฆ ))/๐‘‘๐‘ฆ ร— ๐‘‘๐‘ฆ/๐‘‘๐‘ฅ 1 = ๐’•๐’‚๐’โก๐’š .๐’”๐’†๐’„โก๐’š. ๐‘‘๐‘ฆ/๐‘‘๐‘ฅ ๐‘‘๐‘ฆ/๐‘‘๐‘ฅ = 1/(๐’•๐’‚๐’โก๐’š .ใ€– secใ€—โก๐‘ฆ ) ๐‘‘๐‘ฆ/๐‘‘๐‘ฅ = 1/((โˆš(ใ€–๐ฌ๐ž๐œใ€—^๐Ÿโก๐’š โˆ’ ๐Ÿ)) .ใ€– secใ€—โก๐‘ฆ ) Putting value of ๐‘ ๐‘’๐‘โก๐‘ฆ = ๐‘ฅ ๐‘‘๐‘ฆ/๐‘‘๐‘ฅ = 1/((โˆš(๐‘ฅ^2 โˆ’ 1 ) ) . ๐‘ฅ) ๐‘‘๐‘ฆ/๐‘‘๐‘ฅ = 1/(๐‘ฅ โˆš(๐‘ฅ^2 โˆ’ 1 ) ) Hence ๐’…(ใ€–๐’”๐’†๐’„ใ€—^(โ€“๐Ÿ) ๐’™)/๐’…๐’™ = ๐Ÿ/(๐’™ โˆš(๐’™^๐Ÿ โˆ’ ๐Ÿ ) ) As tan2 ฮธ = sec2 ฮธ โ€“ 1, tan ฮธ = โˆš("sec2 ฮธ โ€“ 1" ) As ๐‘ฆ = ใ€–๐‘ ๐‘’๐‘ใ€—^(โˆ’1) ๐‘ฅ So, ๐’”๐’†๐’„โก๐’š = ๐’™

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Davneet Singh

Davneet Singh has done his B.Tech from Indian Institute of Technology, Kanpur. He has been teaching from the past 14 years. He provides courses for Maths, Science, Social Science, Physics, Chemistry, Computer Science at Teachoo.