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Ex 7.3, 14 - Chapter 7 Class 12 Integrals
Last updated at Dec. 16, 2024 by Teachoo
Integration using trigo identities - sin^2,cos^2 etc formulae
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
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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
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Transcript
Ex 7.3, 14 Integrate the function cosβ‘γπ₯ β sinβ‘π₯ γ/(1 + sinβ‘2π₯ ) β«1βcosβ‘γπ₯ β sinβ‘π₯ γ/(1 + sinβ‘2π₯ ) ππ₯ =β«1βcosβ‘γπ₯ βγ sinγβ‘π₯ γ/(π + 2 sinβ‘π₯ cosβ‘π₯ ) ππ₯ =β«1βcosβ‘γπ₯ βγ sinγβ‘π₯ γ/(γπ¬π’π§γ^πβ‘π + γππ¨π¬γ^πβ‘π + 2 sinβ‘cosβ‘π₯ ) ππ₯ =β«1βcosβ‘γπ₯ βγ sinγβ‘π₯ γ/(sinβ‘π₯ + cosβ‘π₯ )^2 ππ₯ Let sinβ‘π₯+cosβ‘π₯=π‘ Differentiating w.r.t.x (π ππβ‘2 π=2 π ππβ‘π πππ β‘π) (As γπ ππγ^2β‘π+γπππ γ^2β‘π=1) π(sinβ‘π₯ + cosβ‘π₯ )/ππ₯=ππ‘/ππ₯ cos π₯βsinβ‘π₯=ππ‘/ππ₯ ππ₯=ππ‘/(cos π₯ β sinβ‘π₯ ) Thus, our equation becomes β«1β((cosβ‘γπ₯ β sinβ‘π₯ γ ))/(sinβ‘π₯ + cosβ‘π₯ )^2 ππ₯ =β«1β((cosβ‘γπ₯ β sinβ‘π₯ γ ))/π‘^2 Γππ‘/cosβ‘γπ₯ β sinβ‘π₯ γ =β«1βππ‘/π‘^2 =β«1βπ‘^(β2) ππ‘ =π‘^(β2 +1)/(β2 + 1) +πΆ =π‘^(β1)/(β1) +πΆ =(β1)/π‘ +πΆ Putting value of π‘=π ππβ‘π₯+πππ π₯ =(βπ)/(π¬π’π§β‘π + πππβ‘π ) +πͺ
