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Find :
`∫ sin(x-a)/sin(x+a)dx`
Concept: Methods of Integration: Integration Using Partial Fractions
Find :
`∫(log x)^2 dx`
Concept: Methods of Integration: Integration by Parts
Prove that `int _a^b f(x) dx = int_a^b f (a + b -x ) dx` and hence evaluate `int_(pi/6)^(pi/3) (dx)/(1 + sqrt(tan x))` .
Concept: Properties of Definite Integrals
Evaluate `int_1^4 ( 1+ x +e^(2x)) dx` as limit of sums.
Concept: Definite Integral as the Limit of a Sum
Find `int_ (sin "x" - cos "x" )/sqrt(1 + sin 2"x") d"x", 0 < "x" < π / 2 `
Concept: Integration Using Trigonometric Identities
Find `int_ sin ("x" - a)/(sin ("x" + a )) d"x"`
Concept: Integration Using Trigonometric Identities
Find `int_ (log "x")^2 d"x"`
Concept: Integration Using Trigonometric Identities
Prove that `int_a^b ƒ ("x") d"x" = int_a^bƒ(a + b - "x") d"x" and "hence evaluate" int_(π/6)^(π/3) (d"x")/(1+sqrt(tan "x")`
Concept: Definite Integrals
Find the area of the triangle whose vertices are (-1, 1), (0, 5) and (3, 2), using integration.
Concept: Integration Using Trigonometric Identities
Evaluate: `int_-π^π (1 - "x"^2) sin "x" cos^2 "x" d"x"`.
Concept: Evaluation of Definite Integrals by Substitution
Evaluate: `int_-1^2 (|"x"|)/"x"d"x"`.
Concept: Evaluation of Definite Integrals by Substitution
Find: `int_ (cos"x")/((1 + sin "x") (2+ sin"x")) "dx"`
Concept: Integration Using Trigonometric Identities
Evaluate: `int_1^5{|"x"-1|+|"x"-2|+|"x"-3|}d"x"`.
Concept: Evaluation of Definite Integrals by Substitution
Evaluate: `int_0^pi ("x"sin "x")/(1+ 3cos^2 "x") d"x"`.
Concept: Properties of Definite Integrals
Find : `int_ (2"x"+1)/(("x"^2+1)("x"^2+4))d"x"`.
Concept: Properties of Definite Integrals
Find: `int_ (3"x"+ 5)sqrt(5 + 4"x"-2"x"^2)d"x"`.
Concept: Evaluation of Definite Integrals by Substitution
Find: `int sec^2 x /sqrt(tan^2 x+4) dx.`
Concept: Integration Using Trigonometric Identities
Find: `intsqrt(1 - sin 2x) dx, pi/4 < x < pi/2`
Concept: Integration Using Trigonometric Identities
Find: `int sin^-1 (2x) dx.`
Concept: Integration Using Trigonometric Identities
