Integrand size = 16, antiderivative size = 410 \[ \int e^{-\frac {1}{2} i \arctan (a+b x)} x \, dx=\frac {(1+4 i a) \sqrt [4]{1-i a-i b x} (1+i a+i b x)^{3/4}}{4 b^2}+\frac {(1-i a-i b x)^{5/4} (1+i a+i b x)^{3/4}}{2 b^2}+\frac {(1+4 i a) \arctan \left (1-\frac {\sqrt {2} \sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}}\right )}{4 \sqrt {2} b^2}-\frac {(1+4 i a) \arctan \left (1+\frac {\sqrt {2} \sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}}\right )}{4 \sqrt {2} b^2}+\frac {(1+4 i a) \log \left (1+\frac {\sqrt {1-i a-i b x}}{\sqrt {1+i a+i b x}}-\frac {\sqrt {2} \sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}}\right )}{8 \sqrt {2} b^2}-\frac {(1+4 i a) \log \left (1+\frac {\sqrt {1-i a-i b x}}{\sqrt {1+i a+i b x}}+\frac {\sqrt {2} \sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}}\right )}{8 \sqrt {2} b^2} \]
[Out]
Time = 0.21 (sec) , antiderivative size = 410, normalized size of antiderivative = 1.00, number of steps used = 14, number of rules used = 11, \(\frac {\text {number of rules}}{\text {integrand size}}\) = 0.688, Rules used = {5203, 81, 52, 65, 246, 217, 1179, 642, 1176, 631, 210} \[ \int e^{-\frac {1}{2} i \arctan (a+b x)} x \, dx=\frac {(1+4 i a) \arctan \left (1-\frac {\sqrt {2} \sqrt [4]{-i a-i b x+1}}{\sqrt [4]{i a+i b x+1}}\right )}{4 \sqrt {2} b^2}-\frac {(1+4 i a) \arctan \left (1+\frac {\sqrt {2} \sqrt [4]{-i a-i b x+1}}{\sqrt [4]{i a+i b x+1}}\right )}{4 \sqrt {2} b^2}+\frac {(i a+i b x+1)^{3/4} (-i a-i b x+1)^{5/4}}{2 b^2}+\frac {(1+4 i a) (i a+i b x+1)^{3/4} \sqrt [4]{-i a-i b x+1}}{4 b^2}+\frac {(1+4 i a) \log \left (\frac {\sqrt {-i a-i b x+1}}{\sqrt {i a+i b x+1}}-\frac {\sqrt {2} \sqrt [4]{-i a-i b x+1}}{\sqrt [4]{i a+i b x+1}}+1\right )}{8 \sqrt {2} b^2}-\frac {(1+4 i a) \log \left (\frac {\sqrt {-i a-i b x+1}}{\sqrt {i a+i b x+1}}+\frac {\sqrt {2} \sqrt [4]{-i a-i b x+1}}{\sqrt [4]{i a+i b x+1}}+1\right )}{8 \sqrt {2} b^2} \]
[In]
[Out]
Rule 52
Rule 65
Rule 81
Rule 210
Rule 217
Rule 246
Rule 631
Rule 642
Rule 1176
Rule 1179
Rule 5203
Rubi steps \begin{align*} \text {integral}& = \int \frac {x \sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}} \, dx \\ & = \frac {(1-i a-i b x)^{5/4} (1+i a+i b x)^{3/4}}{2 b^2}+\frac {(i-4 a) \int \frac {\sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}} \, dx}{4 b} \\ & = \frac {(1+4 i a) \sqrt [4]{1-i a-i b x} (1+i a+i b x)^{3/4}}{4 b^2}+\frac {(1-i a-i b x)^{5/4} (1+i a+i b x)^{3/4}}{2 b^2}+\frac {(i-4 a) \int \frac {1}{(1-i a-i b x)^{3/4} \sqrt [4]{1+i a+i b x}} \, dx}{8 b} \\ & = \frac {(1+4 i a) \sqrt [4]{1-i a-i b x} (1+i a+i b x)^{3/4}}{4 b^2}+\frac {(1-i a-i b x)^{5/4} (1+i a+i b x)^{3/4}}{2 b^2}-\frac {(1+4 i a) \text {Subst}\left (\int \frac {1}{\sqrt [4]{2-x^4}} \, dx,x,\sqrt [4]{1-i a-i b x}\right )}{2 b^2} \\ & = \frac {(1+4 i a) \sqrt [4]{1-i a-i b x} (1+i a+i b x)^{3/4}}{4 b^2}+\frac {(1-i a-i b x)^{5/4} (1+i a+i b x)^{3/4}}{2 b^2}-\frac {(1+4 i a) \text {Subst}\left (\int \frac {1}{1+x^4} \, dx,x,\frac {\sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}}\right )}{2 b^2} \\ & = \frac {(1+4 i a) \sqrt [4]{1-i a-i b x} (1+i a+i b x)^{3/4}}{4 b^2}+\frac {(1-i a-i b x)^{5/4} (1+i a+i b x)^{3/4}}{2 b^2}-\frac {(1+4 i a) \text {Subst}\left (\int \frac {1-x^2}{1+x^4} \, dx,x,\frac {\sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}}\right )}{4 b^2}-\frac {(1+4 i a) \text {Subst}\left (\int \frac {1+x^2}{1+x^4} \, dx,x,\frac {\sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}}\right )}{4 b^2} \\ & = \frac {(1+4 i a) \sqrt [4]{1-i a-i b x} (1+i a+i b x)^{3/4}}{4 b^2}+\frac {(1-i a-i b x)^{5/4} (1+i a+i b x)^{3/4}}{2 b^2}-\frac {(1+4 i a) \text {Subst}\left (\int \frac {1}{1-\sqrt {2} x+x^2} \, dx,x,\frac {\sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}}\right )}{8 b^2}-\frac {(1+4 i a) \text {Subst}\left (\int \frac {1}{1+\sqrt {2} x+x^2} \, dx,x,\frac {\sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}}\right )}{8 b^2}+\frac {(1+4 i a) \text {Subst}\left (\int \frac {\sqrt {2}+2 x}{-1-\sqrt {2} x-x^2} \, dx,x,\frac {\sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}}\right )}{8 \sqrt {2} b^2}+\frac {(1+4 i a) \text {Subst}\left (\int \frac {\sqrt {2}-2 x}{-1+\sqrt {2} x-x^2} \, dx,x,\frac {\sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}}\right )}{8 \sqrt {2} b^2} \\ & = \frac {(1+4 i a) \sqrt [4]{1-i a-i b x} (1+i a+i b x)^{3/4}}{4 b^2}+\frac {(1-i a-i b x)^{5/4} (1+i a+i b x)^{3/4}}{2 b^2}+\frac {(1+4 i a) \log \left (1+\frac {\sqrt {1-i a-i b x}}{\sqrt {1+i a+i b x}}-\frac {\sqrt {2} \sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}}\right )}{8 \sqrt {2} b^2}-\frac {(1+4 i a) \log \left (1+\frac {\sqrt {1-i a-i b x}}{\sqrt {1+i a+i b x}}+\frac {\sqrt {2} \sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}}\right )}{8 \sqrt {2} b^2}-\frac {(1+4 i a) \text {Subst}\left (\int \frac {1}{-1-x^2} \, dx,x,1-\frac {\sqrt {2} \sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}}\right )}{4 \sqrt {2} b^2}+\frac {(1+4 i a) \text {Subst}\left (\int \frac {1}{-1-x^2} \, dx,x,1+\frac {\sqrt {2} \sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}}\right )}{4 \sqrt {2} b^2} \\ & = \frac {(1+4 i a) \sqrt [4]{1-i a-i b x} (1+i a+i b x)^{3/4}}{4 b^2}+\frac {(1-i a-i b x)^{5/4} (1+i a+i b x)^{3/4}}{2 b^2}+\frac {(1+4 i a) \arctan \left (1-\frac {\sqrt {2} \sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}}\right )}{4 \sqrt {2} b^2}-\frac {(1+4 i a) \arctan \left (1+\frac {\sqrt {2} \sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}}\right )}{4 \sqrt {2} b^2}+\frac {(1+4 i a) \log \left (1+\frac {\sqrt {1-i a-i b x}}{\sqrt {1+i a+i b x}}-\frac {\sqrt {2} \sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}}\right )}{8 \sqrt {2} b^2}-\frac {(1+4 i a) \log \left (1+\frac {\sqrt {1-i a-i b x}}{\sqrt {1+i a+i b x}}+\frac {\sqrt {2} \sqrt [4]{1-i a-i b x}}{\sqrt [4]{1+i a+i b x}}\right )}{8 \sqrt {2} b^2} \\ \end{align*}
Result contains higher order function than in optimal. Order 5 vs. order 3 in optimal.
Time = 0.03 (sec) , antiderivative size = 84, normalized size of antiderivative = 0.20 \[ \int e^{-\frac {1}{2} i \arctan (a+b x)} x \, dx=-\frac {i (-i (i+a+b x))^{5/4} \left (5 i (1+i a+i b x)^{3/4}+2^{3/4} (-i+4 a) \operatorname {Hypergeometric2F1}\left (\frac {1}{4},\frac {5}{4},\frac {9}{4},-\frac {1}{2} i (i+a+b x)\right )\right )}{10 b^2} \]
[In]
[Out]
\[\int \frac {x}{\sqrt {\frac {1+i \left (b x +a \right )}{\sqrt {1+\left (b x +a \right )^{2}}}}}d x\]
[In]
[Out]
none
Time = 0.28 (sec) , antiderivative size = 421, normalized size of antiderivative = 1.03 \[ \int e^{-\frac {1}{2} i \arctan (a+b x)} x \, dx=-\frac {b^{2} \sqrt {\frac {16 i \, a^{2} + 8 \, a - i}{b^{4}}} \log \left (\frac {b^{2} \sqrt {\frac {16 i \, a^{2} + 8 \, a - i}{b^{4}}} + {\left (4 \, a - i\right )} \sqrt {\frac {i \, \sqrt {b^{2} x^{2} + 2 \, a b x + a^{2} + 1}}{b x + a + i}}}{4 \, a - i}\right ) - b^{2} \sqrt {\frac {16 i \, a^{2} + 8 \, a - i}{b^{4}}} \log \left (-\frac {b^{2} \sqrt {\frac {16 i \, a^{2} + 8 \, a - i}{b^{4}}} - {\left (4 \, a - i\right )} \sqrt {\frac {i \, \sqrt {b^{2} x^{2} + 2 \, a b x + a^{2} + 1}}{b x + a + i}}}{4 \, a - i}\right ) - b^{2} \sqrt {\frac {-16 i \, a^{2} - 8 \, a + i}{b^{4}}} \log \left (\frac {b^{2} \sqrt {\frac {-16 i \, a^{2} - 8 \, a + i}{b^{4}}} + {\left (4 \, a - i\right )} \sqrt {\frac {i \, \sqrt {b^{2} x^{2} + 2 \, a b x + a^{2} + 1}}{b x + a + i}}}{4 \, a - i}\right ) + b^{2} \sqrt {\frac {-16 i \, a^{2} - 8 \, a + i}{b^{4}}} \log \left (-\frac {b^{2} \sqrt {\frac {-16 i \, a^{2} - 8 \, a + i}{b^{4}}} - {\left (4 \, a - i\right )} \sqrt {\frac {i \, \sqrt {b^{2} x^{2} + 2 \, a b x + a^{2} + 1}}{b x + a + i}}}{4 \, a - i}\right ) - 2 \, \sqrt {b^{2} x^{2} + 2 \, a b x + a^{2} + 1} {\left (-2 i \, b x + 2 i \, a + 3\right )} \sqrt {\frac {i \, \sqrt {b^{2} x^{2} + 2 \, a b x + a^{2} + 1}}{b x + a + i}}}{8 \, b^{2}} \]
[In]
[Out]
\[ \int e^{-\frac {1}{2} i \arctan (a+b x)} x \, dx=\int \frac {x}{\sqrt {\frac {i \left (a + b x - i\right )}{\sqrt {a^{2} + 2 a b x + b^{2} x^{2} + 1}}}}\, dx \]
[In]
[Out]
\[ \int e^{-\frac {1}{2} i \arctan (a+b x)} x \, dx=\int { \frac {x}{\sqrt {\frac {i \, b x + i \, a + 1}{\sqrt {{\left (b x + a\right )}^{2} + 1}}}} \,d x } \]
[In]
[Out]
Exception generated. \[ \int e^{-\frac {1}{2} i \arctan (a+b x)} x \, dx=\text {Exception raised: TypeError} \]
[In]
[Out]
Timed out. \[ \int e^{-\frac {1}{2} i \arctan (a+b x)} x \, dx=\int \frac {x}{\sqrt {\frac {1+a\,1{}\mathrm {i}+b\,x\,1{}\mathrm {i}}{\sqrt {{\left (a+b\,x\right )}^2+1}}}} \,d x \]
[In]
[Out]