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Derivative of sec-1 x (Sec inverse x)
Last updated at Dec. 16, 2024 by Teachoo
Finding derivative of Inverse trigonometric functions
Derivative of cos-1 x (Cos inverse x)
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Chapter 5 Class 12 Continuity and Differentiability
Concept wise
- Checking continuity at a given point
- Checking continuity at any point
- Checking continuity using LHL and RHL
- Algebra of continous functions
- Continuity of composite functions
- Checking if funciton is differentiable
- Finding derivative of a function by chain rule
- Finding derivative of Implicit functions
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Finding derivative of Inverse trigonometric functions
- Finding derivative of Exponential & logarithm functions
- Logarithmic Differentiation - Type 1
- Logarithmic Differentiation - Type 2
- Derivatives in parametric form
- Finding second order derivatives - Normal form
- Finding second order derivatives- Implicit form
- Proofs
- Verify Rolles theorem
- Verify Mean Value Theorem
Transcript
Derivative of ใ๐๐๐ใ^(โ๐) ๐ ๐ (๐ฅ)=ใ๐ ๐๐ใ^(โ1) ๐ฅ Let ๐= ใ๐๐๐ใ^(โ๐) ๐ secโกใ๐ฆ=๐ฅใ ๐=๐ฌ๐๐โกใ๐ ใ Differentiating both sides ๐ค.๐.๐ก.๐ฅ ๐๐ฅ/๐๐ฅ = (๐ (secโก๐ฆ ))/๐๐ฅ 1 = (๐ (secโก๐ฆ ))/๐๐ฅ ร ๐๐ฆ/๐๐ฆ 1 = (๐ (secโก๐ฆ ))/๐๐ฆ ร ๐๐ฆ/๐๐ฅ 1 = ๐๐๐โก๐ .๐๐๐โก๐. ๐๐ฆ/๐๐ฅ ๐๐ฆ/๐๐ฅ = 1/(๐๐๐โก๐ .ใ secใโก๐ฆ ) ๐๐ฆ/๐๐ฅ = 1/((โ(ใ๐ฌ๐๐ใ^๐โก๐ โ ๐)) .ใ secใโก๐ฆ ) Putting value of ๐ ๐๐โก๐ฆ = ๐ฅ ๐๐ฆ/๐๐ฅ = 1/((โ(๐ฅ^2 โ 1 ) ) . ๐ฅ) ๐๐ฆ/๐๐ฅ = 1/(๐ฅ โ(๐ฅ^2 โ 1 ) ) Hence ๐ (ใ๐๐๐ใ^(โ๐) ๐)/๐ ๐ = ๐/(๐ โ(๐^๐ โ ๐ ) ) As tan2 ฮธ = sec2 ฮธ โ 1, tan ฮธ = โ("sec2 ฮธ โ 1" ) As ๐ฆ = ใ๐ ๐๐ใ^(โ1) ๐ฅ So, ๐๐๐โก๐ = ๐
