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`int (sinx)/(1 + sin x) "d"x`
Concept: undefined >> undefined
`int 1/(4x + 5x^(-11)) "d"x`
Concept: undefined >> undefined
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`int (sin(x - "a"))/(cos (x + "b")) "d"x`
Concept: undefined >> undefined
`int 1/sqrt(2x^2 - 5) "d"x`
Concept: undefined >> undefined
`int ["cosec"(logx)][1 - cot(logx)] "d"x`
Concept: undefined >> undefined
`int (cos2x)/(sin^2x cos^2x) "d"x`
Concept: undefined >> undefined
`int sin4x cos3x "d"x`
Concept: undefined >> undefined
`int ("e"^xlog(sin"e"^x))/(tan"e"^x) "d"x`
Concept: undefined >> undefined
`int sqrt(tanx) + sqrt(cotx) "d"x`
Concept: undefined >> undefined
`int_0^(x/4) sqrt(1 + sin 2x) "d"x` =
Concept: undefined >> undefined
If `int_0^1 ("d"x)/(sqrt(1 + x) - sqrt(x)) = "k"/3`, then k is equal to ______.
Concept: undefined >> undefined
`int_(pi/5)^((3pi)/10) sinx/(sinx + cosx) "d"x` =
Concept: undefined >> undefined
`int_0^1 (x^2 - 2)/(x^2 + 1) "d"x` =
Concept: undefined >> undefined
Let I1 = `int_"e"^("e"^2) 1/logx "d"x` and I2 = `int_1^2 ("e"^x)/x "d"x` then
Concept: undefined >> undefined
`int_0^4 1/sqrt(4x - x^2) "d"x` =
Concept: undefined >> undefined
`int_0^(pi/2) log(tanx) "d"x` =
Concept: undefined >> undefined
Evaluate: `int_(pi/6)^(pi/3) cosx "d"x`
Concept: undefined >> undefined
Evaluate: `int_(- pi/4)^(pi/4) x^3 sin^4x "d"x`
Concept: undefined >> undefined
Evaluate: `int_0^1 1/(1 + x^2) "d"x`
Concept: undefined >> undefined
Evaluate: `int_0^(pi/4) sec^2 x "d"x`
Concept: undefined >> undefined
