Category:Primitive of Reciprocal of a x squared + b by Root of c x squared + d
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This category contains pages concerning Primitive of Reciprocal of a x squared + b by Root of c x squared + d:
- $\ds \int \dfrac {\d x} {\paren {a x^2 + b} \sqrt {c x^2 + d} } = \begin {cases}
\dfrac 1 {\sqrt {b \paren {a d - b c} } } \arctan \dfrac {x \sqrt {a d - b c} } {\sqrt {b \paren {c x^2 + d} } } + C & : a d > b c \\ \dfrac 1 {2 \sqrt {b \paren {a d - b c} } } \ln \size {\dfrac {\sqrt {b \paren {c x^2 + d} } + x \sqrt {b c - a d} } {\sqrt {b \paren {c x^2 + d} } - x \sqrt {b c - a d} } } + C & : b c > a d \end {cases}$
Pages in category "Primitive of Reciprocal of a x squared + b by Root of c x squared + d"
The following 4 pages are in this category, out of 4 total.
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- Primitive of Reciprocal of a x squared + b by Root of c x squared + d
- Primitive of Reciprocal of a x squared + b by Root of c x squared + d/a d greater than b c
- Primitive of Reciprocal of a x squared + b by Root of c x squared + d/b c greater than a d
- Primitive of Reciprocal of a x squared + b by Root of c x squared + d/Lemma