| # | ODE | Mathematica | Maple | Sympy |
| \[
{} y^{\prime }-2 y = x^{2}
\]
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| \[
{} y^{\prime } = y+x \,{\mathrm e}^{y}
\]
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| \[
{} -y+y^{\prime } = 1
\]
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| \[
{} y+2 y^{\prime } = 0
\]
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| \[
{} y^{\prime }+6 y = {\mathrm e}^{4 t}
\]
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| \[
{} -y+y^{\prime } = 2 \cos \left (5 t \right )
\]
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| \[
{} y+y^{\prime } = {\mathrm e}^{-3 t} \cos \left (2 t \right )
\]
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| \[
{} y^{\prime }+4 y = {\mathrm e}^{-4 t}
\]
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| \[
{} -y+y^{\prime } = 1+t \,{\mathrm e}^{t}
\]
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| \[
{} y+y^{\prime } = \left \{\begin {array}{cc} 0 & 0\le t <1 \\ 5 & 1\le t \end {array}\right .
\]
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| \[
{} y+y^{\prime } = \left \{\begin {array}{cc} 1 & 0\le t <1 \\ -1 & 1\le t \end {array}\right .
\]
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| \[
{} y+y^{\prime } = \left \{\begin {array}{cc} t & 0\le t <1 \\ 0 & 1\le t \end {array}\right .
\]
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| \[
{} y+y^{\prime } = t \sin \left (t \right )
\]
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| \[
{} -y+y^{\prime } = t \,{\mathrm e}^{t} \sin \left (t \right )
\]
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| \[
{} y^{\prime }-3 y = \delta \left (t -2\right )
\]
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| \[
{} y+y^{\prime } = \delta \left (t -1\right )
\]
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| \[
{} y^{\prime } = \frac {y}{x \ln \left (x \right )}
\]
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| \[
{} \left (x^{2}+1\right ) y^{\prime }+y^{2} = -1
\]
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| \[
{} y^{\prime }+\frac {2 y}{x} = 5 x^{2}
\]
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| \[
{} t x^{\prime }+2 x = 4 \,{\mathrm e}^{t}
\]
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| \[
{} y^{\prime } = \frac {2 x -y}{x +4 y}
\]
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| \[
{} y^{\prime }+\frac {2 y}{x} = 6 x^{4} y^{2}
\]
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| \[
{} y^{2}+\cos \left (x \right )+\left (2 x y+\sin \left (y\right )\right ) y^{\prime } = 0
\]
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| \[
{} x y-1+x^{2} y^{\prime } = 0
\]
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| \[
{} y^{\prime } = \frac {\cos \left (y\right ) \sec \left (x \right )}{x}
\]
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| \[
{} y^{\prime } = x \left (\cos \left (y\right )+y\right )
\]
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| \[
{} y^{\prime } = \frac {\sec \left (x \right ) \left (\sin \left (y\right )+y\right )}{x}
\]
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| \[
{} y^{\prime } = \left (5+\frac {\sec \left (x \right )}{x}\right ) \left (\sin \left (y\right )+y\right )
\]
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| \[
{} y^{\prime } = 1+y
\]
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| \[
{} y^{\prime } = 1+x
\]
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| \[
{} y^{\prime } = x
\]
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| \[
{} y^{\prime } = y
\]
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| \[
{} y^{\prime } = 0
\]
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| \[
{} y^{\prime } = 1+\frac {\sec \left (x \right )}{x}
\]
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| \[
{} y^{\prime } = x +\frac {\sec \left (x \right ) y}{x}
\]
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| \[
{} y^{\prime } = \frac {2 y}{x}
\]
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| \[
{} y^{\prime } = \frac {2 y}{x}
\]
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| \[
{} y^{\prime } = \frac {\ln \left (1+y^{2}\right )}{\ln \left (x^{2}+1\right )}
\]
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| \[
{} y^{\prime } = \frac {1}{x}
\]
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| \[
{} y^{\prime } = \frac {-x y-1}{4 x^{3} y-2 x^{2}}
\]
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| \[
{} y^{\prime } = \sqrt {\frac {1+y}{y^{2}}}
\]
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| \[
{} y^{\prime } = \sqrt {-y^{2}-x^{2}+1}
\]
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| \[
{} y^{\prime }+\frac {y}{3} = \frac {\left (1-2 x \right ) y^{4}}{3}
\]
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| \[
{} y^{\prime } = \sqrt {y}+x
\]
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| \[
{} x^{2} y^{\prime }+y^{2} = y y^{\prime } x
\]
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| \[
{} \left (x +y\right ) y^{\prime } = 0
\]
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| \[
{} x y^{\prime } = 0
\]
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| \[
{} \frac {y^{\prime }}{x +y} = 0
\]
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| \[
{} \frac {y^{\prime }}{x} = 0
\]
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| \[
{} y^{\prime } = 0
\]
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| \[
{} y^{\prime } = \frac {5 x^{2}-x y+y^{2}}{x^{2}}
\]
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| \[
{} 2 t +3 x+\left (x+2\right ) x^{\prime } = 0
\]
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| \[
{} y^{\prime } = \frac {1}{1-y}
\]
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| \[
{} p^{\prime } = a p-b p^{2}
\]
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| \[
{} y^{2}+\frac {2}{x}+2 y y^{\prime } x = 0
\]
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| \[
{} x y^{\prime }-2 y+b y^{2} = c \,x^{4}
\]
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| \[
{} x y^{\prime }-y+y^{2} = x^{{2}/{3}}
\]
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| \[
{} u^{\prime }+u^{2} = \frac {1}{x^{{4}/{5}}}
\]
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| \[
{} y y^{\prime }-y = x
\]
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| \[
{} f^{\prime } = \frac {1}{f}
\]
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| \[
{} y^{\prime } = -4 \sin \left (x -y\right )-4
\]
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| \[
{} y^{\prime }+\sin \left (x -y\right ) = 0
\]
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| \[
{} x^{\prime } = 4 A k \left (\frac {x}{A}\right )^{{3}/{4}}-3 k x
\]
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| \[
{} y^{\prime } = \frac {y \left (1+\frac {a^{2} x}{\sqrt {a^{2} \left (x^{2}+1\right )}}\right )}{\sqrt {a^{2} \left (x^{2}+1\right )}}
\]
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| \[
{} y^{\prime } = x^{2}+y^{2}
\]
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| \[
{} y^{\prime } = 2 \sqrt {y}
\]
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| \[
{} y^{\prime } = \sqrt {1-y^{2}}
\]
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| \[
{} y^{\prime } = y^{2}+x^{2}-1
\]
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| \[
{} y^{\prime } = 2 y \left (x \sqrt {y}-1\right )
\]
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| \[
{} y^{\prime }-y^{2}-x -x^{2} = 0
\]
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| \[
{} w^{\prime } = -\frac {1}{2}-\frac {\sqrt {1-12 w}}{2}
\]
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| \[
{} y^{\prime } = {\mathrm e}^{-\frac {y}{x}}
\]
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| \[
{} y^{\prime } = 2 x^{2} \sin \left (\frac {y}{x}\right )^{2}+\frac {y}{x}
\]
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| \[
{} v v^{\prime } = \frac {2 v^{2}}{r^{3}}+\frac {\lambda r}{3}
\]
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| \[
{} y^{\prime } = y \left (1-y^{2}\right )
\]
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| \[
{} y^{\prime } = \frac {y}{2 y \ln \left (y\right )+y-x}
\]
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| \[
{} x^{2} y^{\prime }+{\mathrm e}^{-y} = 0
\]
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| \[
{} y^{\prime } = \frac {x y+3 x -2 y+6}{x y-3 x -2 y+6}
\]
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| \[
{} y^{\prime } = 0
\]
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| \[
{} y^{\prime } = a
\]
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| \[
{} y^{\prime } = x
\]
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| \[
{} y^{\prime } = 1
\]
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| \[
{} y^{\prime } = a x
\]
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| \[
{} y^{\prime } = a x y
\]
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| \[
{} y^{\prime } = a x +y
\]
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| \[
{} y^{\prime } = a x +b y
\]
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| \[
{} y^{\prime } = y
\]
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| \[
{} y^{\prime } = b y
\]
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| \[
{} y^{\prime } = a x +b y^{2}
\]
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| \[
{} c y^{\prime } = 0
\]
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| \[
{} c y^{\prime } = a
\]
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| \[
{} c y^{\prime } = a x
\]
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| \[
{} c y^{\prime } = a x +y
\]
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| \[
{} c y^{\prime } = a x +b y
\]
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| \[
{} c y^{\prime } = y
\]
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| \[
{} c y^{\prime } = b y
\]
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| \[
{} c y^{\prime } = a x +b y^{2}
\]
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| \[
{} c y^{\prime } = \frac {a x +b y^{2}}{r}
\]
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| \[
{} c y^{\prime } = \frac {a x +b y^{2}}{r x}
\]
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| \[
{} c y^{\prime } = \frac {a x +b y^{2}}{r \,x^{2}}
\]
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