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Find `int_2^8 sqrt(10 - x)/(sqrt(x) + sqrt(10 - x)) "d"x`
Concept: undefined >> undefined
Find `int_0^(pi/4) sqrt(1 + sin 2x) "d"x`
Concept: undefined >> undefined
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Show that `int_0^(pi/2) (sin^2x)/(sinx + cosx) = 1/sqrt(2) log (sqrt(2) + 1)`
Concept: undefined >> undefined
Evaluate `int_(-1)^2 "f"(x) "d"x`, where f(x) = |x + 1| + |x| + |x – 1|
Concept: undefined >> undefined
`int_("a" + "c")^("b" + "c") "f"(x) "d"x` is equal to ______.
Concept: undefined >> undefined
`int_(-1)^1 (x^3 + |x| + 1)/(x^2 + 2|x| + 1) "d"x` is equal to ______.
Concept: undefined >> undefined
If `int_0^1 "e"^"t"/(1 + "t") "dt"` = a, then `int_0^1 "e"^"t"/(1 + "t")^2 "dt"` is equal to ______.
Concept: undefined >> undefined
`int_(-2)^2 |x cos pix| "d"x` is equal to ______.
Concept: undefined >> undefined
`int_(-"a")^"a" "f"(x) "d"x` = 0 if f is an ______ function.
Concept: undefined >> undefined
`int_0^(2"a") "f"(x) "d"x = 2int_0^"a" "f"(x) "d"x`, if f(2a – x) = ______.
Concept: undefined >> undefined
`int_0^(pi/2) (sin^"n" x"d"x)/(sin^"n" x + cos^"n" x)` = ______.
Concept: undefined >> undefined
Evaluate the following:
`int_0^(pi/2) "dx"/(("a"^2 cos^2x + "b"^2 sin^2 x)^2` (Hint: Divide Numerator and Denominator by cos4x)
Concept: undefined >> undefined
Evaluate the following:
`int_(-pi/4)^(pi/4) log|sinx + cosx|"d"x`
Concept: undefined >> undefined
`int_((-pi)/4)^(pi/4) "dx"/(1 + cos2x)` is equal to ______.
Concept: undefined >> undefined
`int_0^(pi/2) sqrt(1 - sin2x) "d"x` is equal to ______.
Concept: undefined >> undefined
`int_0^(pi/2) cos x "e"^(sinx) "d"x` is equal to ______.
Concept: undefined >> undefined
If `int_0^"a" 1/(1 + 4x^2) "d"x = pi/8`, then a = ______.
Concept: undefined >> undefined
Evaluate: `int_(pi/6)^(pi/3) (dx)/(1 + sqrt(tanx)`
Concept: undefined >> undefined
Evaluate: `int_0^(π/2) 1/(1 + (tanx)^(2/3)) dx`
Concept: undefined >> undefined
Evaluate: `int_1^3 sqrt(x)/(sqrt(x) + sqrt(4) - x) dx`
Concept: undefined >> undefined
