2.3.163 Problems 16201 to 16300

Table 2.909: Main lookup table. Sorted by time used to solve.

#

ID

ODE

Solved?

Maple

Mma

Sympy

time(sec)

16201

23373

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }-y^{2}&=x \end {array} \]

3.291

16202

5749

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{3}-25 y+y^{\prime }&=0 \end {array} \]

3.292

16203

7563

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} \left (x -2\right ) y^{\prime }&=3+y \end {array} \]

3.293

16204

9052

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} \left (y-2\right ) y^{\prime }&=x -3 \end {array} \]

3.293

16205

1110

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }+2 y-y^{2}&=-2 \end {array} \]

3.294

16206

15157

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }+\left (8-x \right ) y-y^{2}&=-8 x \end {array} \]

3.294

16207

20720

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=2 \sqrt {y}\\ y \left (1\right )&=0\\ \end {array} \]

3.294

16208

9948

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=3 y^{2}-\sin \left (x \right ) y^{2} \end {array} \]

3.296

16209

18045

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=3 x -\sin \left (x \right ) y \end {array} \]

3.296

16210

10429

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime } x&=\left (x -y\right )^{2} \end {array} \]

3.297

16211

14334

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=\sqrt {x^{2}+1} \end {array} \]

3.297

16212

14490

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }+4 y&=8 \end {array} \]

3.298

16213

17655

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }+y x&=4 x \end {array} \]

3.298

16214

23378

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }+4 y&=x^{2} \end {array} \]

3.298

16215

6812

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=y x -3 x -2 y+6 \end {array} \]

3.299

16216

7393

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=\sin \left (x +y\right ) \end {array} \]

3.299

16217

26077

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y y^{\prime }&={\mathrm e}^{-3 y^{2}+x} \end {array} \]

3.299

16218

9963

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=\frac {x}{y} \end {array} \]

3.300

16219

19173

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=y^{2}+9 \end {array} \]

3.300

16220

20030

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y y^{\prime } x&=y^{2}+9 \end {array} \]

3.300

16221

17193

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=\frac {1+y^{2}}{x^{2}+1} \end {array} \]

3.301

16222

27428

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime } \cos \left (y\right )&=\sin \left (x \right ) \end {array} \]

3.301

16223

2482

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&={\mathrm e}^{2 x -3 y} \end {array} \]

3.302

16224

17356

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=\frac {x}{y}\\ y \left (1\right )&=3\\ \end {array} \]

3.302

16225

9961

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=2 x -1+2 y x -y\\ y \left (0\right )&=2\\ \end {array} \]

3.303

16226

2432

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y y^{\prime }&=x y^{2}+x\\ y \left (0\right )&=-2\\ \end {array} \]

3.304

16227

197

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y y^{\prime }&=3 \sqrt {x y^{2}+9 x}\\ y \left (1\right )&=4\\ \end {array} \]

3.305

16228

3054

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=y x -4 x \end {array} \]

3.306

16229

23375

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }-4 y&=2 \end {array} \]

3.306

16230

9278

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y y^{\prime }&=x y^{2}-9 x \end {array} \]

3.307

16231

17179

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=\sin \left (y\right ) \end {array} \]

3.307

16232

20131

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&={\mathrm e}^{x +y^{2}} \end {array} \]

3.307

16233

12938

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=200 y-2 y^{2} \end {array} \]

3.309

16234

183

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=y x -4 x \end {array} \]

3.310

16235

1254

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=y x -3 x -2 y+6 \end {array} \]

3.311

16236

13376

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=3 y^{2}-\sin \left (x \right ) y^{2} \end {array} \]

3.312

16237

13703

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=\tan \left (y\right ) \end {array} \]

3.312

16238

180

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=\frac {y}{x} \end {array} \]

3.313

16239

5389

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=\frac {6 x^{2}+4}{3 y^{2}-4 y} \end {array} \]

3.313

16240

27960

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} \left (x^{2}+1\right ) y^{\prime }&=1+y^{2} \end {array} \]

3.313

16241

43

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} \left (-1+y^{2}\right ) y^{\prime }&=4 x y^{2} \end {array} \]

3.314

16242

841

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&={\mathrm e}^{-y} \end {array} \]

3.314

16243

3220

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&={\mathrm e}^{-y}+1 \end {array} \]

3.314

16244

7530

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=3 x y^{3} \end {array} \]

3.314

16245

7510

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=\frac {2+\sqrt {x}}{2+\sqrt {y}} \end {array} \]

3.315

16246

2465

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }-3 y^{2} x^{2}&=-3 x^{2} \end {array} \]

3.318

16247

10044

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }-3 y^{2} x^{2}&=3 x^{2} \end {array} \]

3.318

16248

15723

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=200 y-2 y^{2} \end {array} \]

3.318

16249

4912

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }-2 y&=-10\\ y \left (0\right )&=8\\ \end {array} \]

3.319

16250

20768

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y y^{\prime }&=\sin \left (x \right )\\ y \left (0\right )&=-4\\ \end {array} \]

3.319

16251

6291

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=2 x -1+2 y x -y\\ y \left (0\right )&=-1\\ \end {array} \]

3.320

16252

7959

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime } x&=y^{2}-y\\ y \left (2\right )&=1\\ \end {array} \]

3.321

16253

24184

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime } x&=y^{2}-y\\ y \left (1\right )&=2\\ \end {array} \]

3.322

16254

81

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=\frac {-1+y^{2}}{y x}\\ y \left (1\right )&=-2\\ \end {array} \]

3.323

16255

22180

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} \left (-1+y^{2}\right ) y^{\prime }&=4 y x\\ y \left (0\right )&=1\\ \end {array} \]

3.323

16256

13289

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} x^{2} y^{\prime }+3 x^{2} y&=\sin \left (x \right ) \end {array} \]

3.324

16257

9719

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{2} y^{\prime }+3 x^{2} y&=\sin \left (x \right ) \end {array} \]

3.326

16258

17521

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }-x y^{2}&=\sqrt {x} \end {array} \]

3.326

16259

19130

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=1+\left (y x +3 y\right )^{2} \end {array} \]

3.326

16260

13704

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=1+y x +3 y \end {array} \]

3.327

16261

1614

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=4 y+8 \end {array} \]

3.333

16262

13697

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }-{\mathrm e}^{2 x}&=0 \end {array} \]

3.335

16263

9902

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=\sin \left (x \right ) y \end {array} \]

3.336

16264

5591

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }+4 y&=y^{3} \end {array} \]

3.337

16265

18019

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime } x +\cos \left (x^{2}\right )&=827 y \end {array} \]

3.337

16266

20442

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} 2 y+y^{\prime }&=6 \end {array} \]

3.339

16267

5911

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} 2 y+y^{\prime }&=20 \,{\mathrm e}^{3 x} \end {array} \]

3.340

16268

8288

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=4 y+16 x \end {array} \]

3.341

16269

903

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }-2 y x&=x \end {array} \]

3.342

16270

17839

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime } x +3 y-10 x^{2}&=0 \end {array} \]

3.343

16271

21512

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} x^{2} y^{\prime }+2 y x&=\sin \left (x \right ) \end {array} \]

3.343

16272

1329

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime } x&=\sqrt {x}+3 y \end {array} \]

3.345

16273

5010

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} \cos \left (x \right ) y^{\prime }+\sin \left (x \right ) y&=\cos \left (x \right )^{2} \end {array} \]

3.345

16274

26430

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime } x +\left (2+5 x \right ) y&=\frac {20}{x} \end {array} \]

3.346

16275

26176

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} 2 \sqrt {x}\, y^{\prime }+y&=2 x \,{\mathrm e}^{-\sqrt {x}} \end {array} \]

3.347

16276

989

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }-3 y&=6\\ y \left (0\right )&=5\\ \end {array} \]

3.349

16277

5785

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }-3 y&=6\\ y \left (0\right )&=-2\\ \end {array} \]

3.349

16278

26372

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }+5 y&={\mathrm e}^{-3 x}\\ y \left (0\right )&=0\\ \end {array} \]

3.349

16279

27425

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime } x +3 y&=20 x^{2}\\ y \left (1\right )&=10\\ \end {array} \]

3.349

16280

27885

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime } x&=y+x^{2} \cos \left (x \right )\\ y \left (\frac {\pi }{2}\right )&=0\\ \end {array} \]

3.349

16281

4077

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} \left (x^{2}+1\right ) y^{\prime }&=x \left (3+3 x^{2}-y\right )\\ y \left (2\right )&=8\\ \end {array} \]

3.350

16282

4896

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }+6 y x&=\sin \left (x \right )\\ y \left (0\right )&=4\\ \end {array} \]

3.351

16283

4909

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y x +x^{2} y^{\prime }&=\sqrt {x}\, \sin \left (x \right )\\ y \left (2\right )&=5\\ \end {array} \]

3.351

16284

124

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} -y+y^{\prime } x&=x^{2} {\mathrm e}^{-x^{2}}\\ y \left (3\right )&=8\\ \end {array} \]

3.352

16285

14905

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=\frac {1}{\left (3 x +3 y+2\right )^{2}} \end {array} \]

3.352

16286

16135

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=\frac {\left (3 x -2 y\right )^{2}+1}{3 x -2 y}+\frac {3}{2} \end {array} \]

3.352

16287

16559

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} \cos \left (-4 y+8 x -3\right ) y^{\prime }&=2+2 \cos \left (-4 y+8 x -3\right ) \end {array} \]

3.352

16288

21339

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=1+\left (y-x \right )^{2}\\ y \left (0\right )&={\frac {1}{4}}\\ \end {array} \]

3.352

16289

23540

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} x^{2} y^{\prime }-y x&=y^{2} \end {array} \]

3.353

16290

22469

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=\frac {x}{y}+\frac {y}{x} \end {array} \]

3.354

16291

184

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} \cos \left (\frac {y}{x}\right ) \left (y^{\prime }-\frac {y}{x}\right )&=1+\sin \left (\frac {y}{x}\right ) \end {array} \]

3.355

16292

3244

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=\frac {x -y}{x +y}\\ y \left (0\right )&=3\\ \end {array} \]

3.355

16293

9913

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }+3 y&=3 y^{3} \end {array} \]

3.355

16294

11892

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }-\frac {3 y}{x}&=\frac {y^{2}}{x^{2}} \end {array} \]

3.355

16295

7004

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }+3 \cot \left (x \right ) y&=6 \cos \left (x \right ) y^{{2}/{3}} \end {array} \]

3.356

16296

19198

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }-\frac {y}{x}&=\frac {1}{y}\\ y \left (1\right )&=3\\ \end {array} \]

3.356

16297

9909

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=\frac {y}{x}+\frac {x^{2}}{y^{2}} \end {array} \]

3.357

16298

20719

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} 3 y^{\prime }&=-2+\sqrt {2 x +3 y+4} \end {array} \]

3.357

16299

1348

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} 3 y^{\prime }+\frac {2 y}{x}&=4 \sqrt {y} \end {array} \]

3.359

16300

7352

\[ \begin {array}{>{\displaystyle }r @{\;} >{\displaystyle }l} y^{\prime }&=4+\frac {1}{\sin \left (4 x -y\right )} \end {array} \]

3.359