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Integrate the rational function:
`1/(x(x^4 - 1))`
Concept: undefined >> undefined
Integrate the rational function:
`1/(e^x -1)`[Hint: Put ex = t]
Concept: undefined >> undefined
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`int (xdx)/((x - 1)(x - 2))` equals:
Concept: undefined >> undefined
Using properties of determinants, prove that
`|(a^2 + 2a,2a + 1,1),(2a+1,a+2, 1),(3, 3, 1)| = (a - 1)^3`
Concept: undefined >> undefined
Find `int(e^x dx)/((e^x - 1)^2 (e^x + 2))`
Concept: undefined >> undefined
Using properties of determinants, prove that `|(x,x+y,x+2y),(x+2y, x,x+y),(x+y, x+2y, x)| = 9y^2(x + y)`
Concept: undefined >> undefined
Using properties of determinants, prove that `|(1,1,1+3x),(1+3y, 1,1),(1,1+3z,1)| = 9(3xyz + xy + yz+ zx)`
Concept: undefined >> undefined
Find `int (2cos x)/((1-sinx)(1+sin^2 x)) dx`
Concept: undefined >> undefined
f(x) = 4x2 + 4 on R .
Concept: undefined >> undefined
f(x) = - (x-1)2+2 on R ?
Concept: undefined >> undefined
f(x)=| x+2 | on R .
Concept: undefined >> undefined
f(x)=sin 2x+5 on R .
Concept: undefined >> undefined
f(x) = | sin 4x+3 | on R ?
Concept: undefined >> undefined
f(x)=2x3 +5 on R .
Concept: undefined >> undefined
f (x) = \[-\] | x + 1 | + 3 on R .
Concept: undefined >> undefined
f(x) = 16x2 \[-\] 16x + 28 on R ?
Concept: undefined >> undefined
f(x) = x3 \[-\] 1 on R .
Concept: undefined >> undefined
f(x) = (x \[-\] 5)4.
Concept: undefined >> undefined
f(x) = x3 \[-\] 3x.
Concept: undefined >> undefined
