Example 26 - Chapter 7 Class 12 Integrals
Last updated at April 16, 2024 by Teachoo
Definite Integration - By Substitution
Chapter 7 Class 12 Integrals
Concept wise
- Using Formulaes
- Using Trignometric Formulaes
- Integration by substitution - x^n
- Integration by substitution - lnx
- Integration by substitution - e^x
- Integration by substitution - Trignometric - Normal
- Integration by substitution - Trignometric - Inverse
- Integration using trigo identities - sin^2,cos^2 etc formulae
- Integration using trigo identities - a-b formulae
- Integration using trigo identities - 2x formulae
- Integration using trigo identities - 3x formulae
- Integration using trigo identities - CD and CD inv formulae
- Integration using trigo identities - Inv Trigo formulae
- Integration by parts
- Integration by parts - e^x integration
- Integration by specific formulaes - Formula 1
- Integration by specific formulaes - Formula 2
- Integration by specific formulaes - Formula 3
- Integration by specific formulaes - Formula 4
- Integration by specific formulaes - Formula 5
- Integration by specific formulaes - Formula 6
- Integration by specific formulaes - Formula 7
- Integration by specific formulaes - Formula 8
- Integration by specific formulaes - Method 9
- Integration by specific formulaes - Method 10
- Integration by partial fraction - Type 1
- Integration by partial fraction - Type 2
- Integration by partial fraction - Type 3
- Integration by partial fraction - Type 4
- Integration by partial fraction - Type 5
- Definite Integral as a limit of a sum
- Definite Integration - By Formulae
- Definite Integration - By Partial Fraction
- Definite Integration - By e formula
-
Definite Integration - By Substitution
- Definite Integration by properties - P2
- Definite Integration by properties - P3
- Definite Integration by properties - P4
- Definite Integration by properties - P6
- Definite Integration by properties - P7
Transcript
Example 26 (Method 1) Evaluate ∫_(−1)^1▒〖5𝑥^4 √(𝑥^5+1)〗 𝑑𝑥 Step 1 :- Let F(𝑥)=∫1▒〖5𝑥^4 √(𝑥^5+1)〗 𝑑𝑥 Putting 𝑡=𝑥^5+1 Differentiating w.r.t.𝑥 𝑑𝑡/𝑑𝑥=5𝑥^4 𝑑𝑡/(5𝑥^4 )=𝑑𝑥 Therefore we can write ∫1▒〖5𝑥^4 √(𝑥^5+1) 𝑑𝑥=∫1▒〖5𝑥^4 √𝑡 . 𝑑𝑡/(5𝑥^4 )〗〗 =∫1▒√𝑡 𝑑𝑡 =∫1▒〖𝑡^(1/2) 𝑑𝑡〗 =〖𝑡 〗^(1/2 +1)/(1/2 +1) =2/3 𝑡^(3/2) Putting back 𝑡=𝑥^5+1 =2/3 (𝑥^5+1)^(3/2) Hence , F(𝑥)=2/3 (𝑥^5+1)^(3/2) Step 2 :- ∫_(−1)^1▒〖5𝑥^4 〗 √(𝑥^5+1) 𝑑𝑥=𝐹(1)−𝐹(−1) =2/3 (1^5+1)^(3/2)−2/3 ((−1)^5+1)^(3/2) =2/3 (1+1)^(3/2)−2/3 (−1+1)^(3/2) =2/3 (2)^(3/2)−0 =2/3 2√2 =(𝟒√𝟐)/𝟑 Example 26 (Method 2) Evaluate ∫_(−1)^1▒〖5𝑥^4 √(𝑥^5+1)〗 𝑑𝑥 Put 𝑡=𝑥^5+1 Differentiating w.r.t. 𝑥 𝑑𝑡/𝑑𝑥=𝑑/𝑑𝑥 (𝑥^5+1) 𝑑𝑡/𝑑𝑥=5𝑥^4 𝑑𝑡/(5𝑥^4 )=𝑑𝑥 Hence when 𝑥 varies from 𝑥=−1 to 1, 𝑡 varies from 0 to 2 Therefore, ∫_(−1)^1▒〖5𝑥^4 √(1+𝑥^5 ) 𝑑𝑥=∫_0^2▒〖5𝑥^4 √𝑡 𝑑𝑡/(5𝑥^4 )〗〗 =∫1_0^2▒〖√𝑡 𝑑𝑡〗 =[𝑡^(1/2 + 1)/(1/2 +1)]_0^2 =[𝑡^(3/2)/(3/2)]_0^2 =[2/3 𝑡^(3/2) ]_0^2 =2/3 (2^(3/2)−0^(3/2) ) =2/3 2^(3/2) =2/3 ×2√2 =𝟒/𝟑 √𝟐
