Misc 23 - Chapter 7 Class 12 Integrals
Last updated at Dec. 16, 2024 by Teachoo
Last updated at Dec. 16, 2024 by Teachoo
Misc 23 Integrate the function (โ(๐ฅ^2 + 1) [logโกใ(๐ฅ^2+ 1) โ 2 logโก๐ฅ ใ ] )/๐ฅ^4 โซ1โ(โ(๐ฅ^2 + 1) [logโกใ(๐ฅ^2+ 1) โ 2 logโก๐ฅ ใ ] )/๐ฅ^4 ๐๐ฅ Taking ๐ฅ^2common from โ(๐ฅ^2+1) = โซ1โ(ใใ(๐ฅใ^2) ใ^(1/2) (1 + 1/๐ฅ^2 )^(1/2) (logโกใ(๐ฅ^2+1)ใ โ logโกใ๐ฅ^2 ใ ))/๐ฅ^4 ๐๐ฅ = โซ1โ(๐ฅ (1+ 1/๐ฅ^2 )^(1/2) (logโกใ ((๐ฅ^(2 )+ 1))/๐ฅ^2 ใ ))/๐ฅ^4 ๐๐ฅ = โซ1โ( (1+ 1/๐ฅ^2 )^(1/2) (logโก(1 + 1/๐ฅ^2 ) ))/๐ฅ^3 Let t = 1 + 1/๐ฅ^2 ๐๐ก/๐๐ฅ=(โ2)/๐ฅ^3 (โ1)/2 ๐๐ก=๐๐ฅ/๐ฅ^3 Substituting, = โ1/2 โซ1โ๐ก^(1/2) ใ log ๐กใโกใ ๐๐กใ = โซ1โ( (1+ 1/๐ฅ^2 )^(1/2) (logโก(1 + 1/๐ฅ^2 ) ))/๐ฅ^3 Let t = 1 + 1/๐ฅ^2 ๐๐ก/๐๐ฅ=(โ2)/๐ฅ^3 (โ1)/2 ๐๐ก=๐๐ฅ/๐ฅ^3 Substituting value of t and dt = (โ1)/2 โซ1โ๐ก^(1/2) ใ log ๐กใโกใ ๐๐กใ Hence, (โ1)/2 โซ1โใ๐ก^(1/2) logโกใ๐ก ๐๐ก=(โ1)/2 (logโกใ๐ก โซ1โใ๐ก^(1/2) ๐๐กใโโซ1โ((๐(logโกใ๐ก)ใ)/๐๐ก โซ1โ๐ก^(1/2) ๐๐ก) ๐๐กใ )ใ ใ = (โ1)/2 (logโกใ๐ก (๐ก^(3/2)/(3/2))โโซ1โใ1/๐กร(๐ก^(3/2)/(3/2)) ใใ ๐๐ก) = (โ1)/2 (2/3 ๐ก^(3/2) logโกใ๐กโ2/3ใ โซ1โใ๐ก^(1/2) ๐๐กใ) = (โ1)/2 (2/3 ๐ก^(3/2) logโกใ๐กโ2/3ใ ( ใ2๐กใ^(3/2))/3) = (โ1)/3 ๐ก^(3/2) logโก๐ก + 2/9 ๐ก^(3/2) Putting value of t = 1 + 1/๐ฅ^2 = (โ1)/3 (1+1/๐ฅ^2 )^(3/2) logโกใ(1+1/๐ฅ^2 )+2/9 " " (1+1/๐ฅ^2 )^(3/2)+ใ C = (โ๐)/๐ (๐+๐/๐^(๐ ) )^(๐/๐) (๐ฅ๐จ๐ โก(๐+๐/๐^๐ )โ๐/๐)+ C
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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 and Computer Science at Teachoo