| # |
ODE |
Mathematica result |
Maple result |
| \[ {}x y^{\prime } = 1+x +a y \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = a x +b y \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = a \,x^{2}+b y \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = a +b \,x^{n}+c y \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+2+\left (3-x \right ) y = 0 \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+x +\left (a x +2\right ) y = 0 \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+\left (b x +a \right ) y = 0 \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = x^{3}+\left (-2 x^{2}+1\right ) y \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = a x -\left (-b \,x^{2}+1\right ) y \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+x +\left (-a \,x^{2}+2\right ) y = 0 \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+x^{2}+y^{2} = 0 \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = x^{2}+y \left (y+1\right ) \] |
✓ |
✓ |
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| \[ {}x y^{\prime }-y+y^{2} = x^{\frac {2}{3}} \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = a +b y^{2} \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = a \,x^{2}+y+b y^{2} \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = a \,x^{2 n}+\left (n +b y\right ) y \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = a \,x^{n}+b y+c y^{2} \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = k +a \,x^{n}+b y+c y^{2} \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+a +x y^{2} = 0 \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+\left (1-x y\right ) y = 0 \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = \left (1-x y\right ) y \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = \left (1+x y\right ) y \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = a \,x^{3} \left (1-x y\right ) y \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = x^{3}+\left (2 x^{2}+1\right ) y+x y^{2} \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = y \left (2 x y+1\right ) \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+b x +\left (2+y a x \right ) y = 0 \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+\mathit {a0} +\mathit {a1} x +\left (\mathit {a2} +\mathit {a3} x y\right ) y = 0 \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+a \,x^{2} y^{2}+2 y = b \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+x^{m}+\frac {\left (n -m \right ) y}{2}+x^{n} y^{2} = 0 \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+\left (a +b \,x^{n} y\right ) y = 0 \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = a \,x^{m}-b y-c \,x^{n} y^{2} \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = 2 x -y+a \,x^{n} \left (x -y\right )^{2} \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+\left (1-a y \ln \relax (x )\right ) y = 0 \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = y+\left (x^{2}-y^{2}\right ) f \relax (x ) \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = y \left (1+y^{2}\right ) \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+y \left (1-x y^{2}\right ) = 0 \] |
✓ |
✓ |
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| \[ {}y+x y^{\prime } = a \left (x^{2}+1\right ) y^{3} \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = a y+b \left (x^{2}+1\right ) y^{3} \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+2 y = a \,x^{2 k} y^{k} \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = 4 y-4 \sqrt {y} \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+2 y = \sqrt {1+y^{2}} \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = y+\sqrt {x^{2}+y^{2}} \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = y+\sqrt {x^{2}-y^{2}} \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = y+x \sqrt {x^{2}+y^{2}} \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = y-x \left (x -y\right ) \sqrt {x^{2}+y^{2}} \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = y+a \sqrt {y^{2}+b^{2} x^{2}} \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+\left (\sin \relax (y)-3 x^{2} \cos \relax (y)\right ) \cos \relax (y) = 0 \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+x -y+x \cos \left (\frac {y}{x}\right ) = 0 \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = y-x \left (\cos ^{2}\left (\frac {y}{x}\right )\right ) \] | ✓ | ✓ |
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| \[ {}x y^{\prime } = \left (-2 x^{2}+1\right ) \left (\cot ^{2}\relax (y)\right ) \] | ✓ | ✓ |
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| \[ {}x y^{\prime } = y-\left (\cot ^{2}\relax (y)\right ) \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+y+2 x \sec \left (x y\right ) = 0 \] |
✓ |
✓ |
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| \[ {}x y^{\prime }-y+x \sec \left (\frac {y}{x}\right ) = 0 \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = y+x \left (\sec ^{2}\left (\frac {y}{x}\right )\right ) \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = \sin \left (x -y\right ) \] |
✗ |
✗ |
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| \[ {}x y^{\prime } = y+x \sin \left (\frac {y}{x}\right ) \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+\tan \relax (y) = 0 \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+x +\tan \left (x +y\right ) = 0 \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = y-x \tan \left (\frac {y}{x}\right ) \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = \left (1+y^{2}\right ) \left (x^{2}+\arctan \relax (y)\right ) \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = y+x \,{\mathrm e}^{\frac {y}{x}} \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = x +y+x \,{\mathrm e}^{\frac {y}{x}} \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = y \ln \relax (y) \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = \left (1+\ln \relax (x )-\ln \relax (y)\right ) y \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+\left (1-\ln \relax (x )-\ln \relax (y)\right ) y = 0 \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = y-2 x \tanh \left (\frac {y}{x}\right ) \] |
✓ |
✓ |
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| \[ {}x y^{\prime }+n y = f \relax (x ) g \left (x^{n} y\right ) \] |
✓ |
✓ |
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| \[ {}x y^{\prime } = y f \left (x^{m} y^{n}\right ) \] |
✓ |
✓ |
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| \[ {}\left (x +1\right ) y^{\prime } = x^{3} \left (4+3 x \right )+y \] |
✓ |
✓ |
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| \[ {}\left (x +1\right ) y^{\prime } = \left (x +1\right )^{4}+2 y \] |
✓ |
✓ |
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| \[ {}\left (x +1\right ) y^{\prime } = {\mathrm e}^{x} \left (x +1\right )^{n +1}+n y \] |
✓ |
✓ |
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| \[ {}\left (x +1\right ) y^{\prime } = a y+b x y^{2} \] |
✓ |
✓ |
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| \[ {}\left (x +1\right ) y^{\prime }+y+\left (x +1\right )^{4} y^{3} = 0 \] |
✓ |
✓ |
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| \[ {}\left (x +1\right ) y^{\prime } = \left (1-x y^{3}\right ) y \] |
✓ |
✓ |
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| \[ {}\left (x +1\right ) y^{\prime } = 1+y+\left (x +1\right ) \sqrt {y+1} \] |
✓ |
✓ |
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| \[ {}\left (x +a \right ) y^{\prime } = b x \] |
✓ |
✓ |
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| \[ {}\left (x +a \right ) y^{\prime } = b x +y \] |
✓ |
✓ |
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| \[ {}\left (x +a \right ) y^{\prime }+b \,x^{2}+y = 0 \] |
✓ |
✓ |
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| \[ {}\left (x +a \right ) y^{\prime } = 2 \left (x +a \right )^{5}+3 y \] |
✓ |
✓ |
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| \[ {}\left (x +a \right ) y^{\prime } = b +c y \] |
✓ |
✓ |
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| \[ {}\left (x +a \right ) y^{\prime } = b x +c y \] |
✓ |
✓ |
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| \[ {}\left (x +a \right ) y^{\prime } = y \left (1-a y\right ) \] |
✓ |
✓ |
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| \[ {}\left (-x +a \right ) y^{\prime } = y+\left (c x +b \right ) y^{3} \] |
✓ |
✓ |
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| \[ {}2 x y^{\prime } = 2 x^{3}-y \] |
✓ |
✓ |
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| \[ {}2 x y^{\prime }+1 = 4 i x y+y^{2} \] |
✓ |
✓ |
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| \[ {}2 x y^{\prime } = y \left (1+y^{2}\right ) \] |
✓ |
✓ |
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| \[ {}2 x y^{\prime }+y \left (1+y^{2}\right ) = 0 \] |
✓ |
✓ |
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| \[ {}2 x y^{\prime } = \left (1+x -6 y^{2}\right ) y \] |
✓ |
✓ |
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| \[ {}2 x y^{\prime }+4 y+a +\sqrt {a^{2}-4 b -4 c y} = 0 \] |
✓ |
✓ |
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| \[ {}\left (-2 x +1\right ) y^{\prime } = 16+32 x -6 y \] |
✓ |
✓ |
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| \[ {}\left (1+2 x \right ) y^{\prime } = 4 \,{\mathrm e}^{-y}-2 \] |
✓ |
✓ |
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| \[ {}2 \left (1-x \right ) y^{\prime } = 4 x \sqrt {1-x}+y \] |
✓ |
✓ |
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| \[ {}2 \left (x +1\right ) y^{\prime }+2 y+\left (x +1\right )^{4} y^{3} = 0 \] |
✓ |
✓ |
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| \[ {}3 x y^{\prime } = 3 x^{\frac {2}{3}}+\left (1-3 y\right ) y \] |
✓ |
✓ |
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| \[ {}3 x y^{\prime } = \left (2+x y^{3}\right ) y \] |
✓ |
✓ |
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| \[ {}3 x y^{\prime } = \left (1+3 x y^{3} \ln \relax (x )\right ) y \] |
✓ |
✓ |
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| \[ {}x^{2} y^{\prime } = -y+a \] |
✓ |
✓ |
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| \[ {}x^{2} y^{\prime } = a +b x +c \,x^{2}+x y \] |
✓ |
✓ |
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| \[ {}x^{2} y^{\prime } = a +b x +c \,x^{2}-x y \] |
✓ |
✓ |
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| \[ {}x^{2} y^{\prime }+\left (-2 x +1\right ) y = x^{2} \] |
✓ |
✓ |
|