> Typesetting:-delayDotProduct(with, DEtools, true); -1
 

[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...
[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...
[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...
[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...
[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...
[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...
[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...
[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...
[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...
[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...
[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...
[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...
[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...
[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...
[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...
[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...
[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...
[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...
[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...
[AreSimilar, Closure, DEnormal, DEplot, DEplot3d, DEplot_polygon, DFactor, DFactorLCLM, DFactorsols, Dchangevar, Desingularize, FunctionDecomposition, GCRD, Gosper, Heunsols, Homomorphisms, IVPsol, Is...		 (1)
 

 

> DE1 := diff(N(t), t) = `*`(N(t), `*`(`+`(1, `-`(`*`(4, `*`(P(t))))))), diff(P(t), t) = `*`(P(t), `*`(`+`(`*`(2, `*`(N(t))), `-`(3)))); 1
 

diff(N(t), t) = `*`(N(t), `*`(`+`(1, `-`(`*`(4, `*`(P(t))))))), diff(P(t), t) = `*`(P(t), `*`(`+`(`*`(2, `*`(N(t))), `-`(3)))) (2)
 

> DEplot({DE1}, [N(t), P(t)], t = -2 .. 2, [[N(0) = 1.5, P(0) = .8], [N(0) = 1.5, P(0) = .6], [N(0) = 1.5, P(0) = .4], [N(0) = 1.5, P(0) = .31]], numsteps = 76, title =
DEplot({DE1}, [N(t), P(t)], t = -2 .. 2, [[N(0) = 1.5, P(0) = .8], [N(0) = 1.5, P(0) = .6], [N(0) = 1.5, P(0) = .4], [N(0) = 1.5, P(0) = .31]], numsteps = 76, title =
DEplot({DE1}, [N(t), P(t)], t = -2 .. 2, [[N(0) = 1.5, P(0) = .8], [N(0) = 1.5, P(0) = .6], [N(0) = 1.5, P(0) = .4], [N(0) = 1.5, P(0) = .31]], numsteps = 76, title =
DEplot({DE1}, [N(t), P(t)], t = -2 .. 2, [[N(0) = 1.5, P(0) = .8], [N(0) = 1.5, P(0) = .6], [N(0) = 1.5, P(0) = .4], [N(0) = 1.5, P(0) = .31]], numsteps = 76, title =
 

Plot_2d
 

> with(plots); -1
 

> DE2 := diff(N(t), t) = `*`(N(t), `*`(`+`(1, `-`(`*`(.5, `*`(P(t))))))), diff(P(t), t) = `*`(P(t), `*`(`+`(`*`(.25, `*`(N(t))), `-`(.75)))); 1
 

diff(N(t), t) = `*`(N(t), `*`(`+`(1, `-`(`*`(.5, `*`(P(t))))))), diff(P(t), t) = `*`(P(t), `*`(`+`(`*`(.25, `*`(N(t))), `-`(.75)))) (3)
 

> DEplot({DE2}, [N(t), P(t)], t = 0 .. 12, [[N(0) = 1.5, P(0) = 1.5], [N(0) = 1.5, P(0) = .6], [N(0) = 3, P(0) = 0.4e-1], [N(0) = 3, P(0) = 1.5]], numsteps = 76, title =
DEplot({DE2}, [N(t), P(t)], t = 0 .. 12, [[N(0) = 1.5, P(0) = 1.5], [N(0) = 1.5, P(0) = .6], [N(0) = 3, P(0) = 0.4e-1], [N(0) = 3, P(0) = 1.5]], numsteps = 76, title =
DEplot({DE2}, [N(t), P(t)], t = 0 .. 12, [[N(0) = 1.5, P(0) = 1.5], [N(0) = 1.5, P(0) = .6], [N(0) = 3, P(0) = 0.4e-1], [N(0) = 3, P(0) = 1.5]], numsteps = 76, title =
DEplot({DE2}, [N(t), P(t)], t = 0 .. 12, [[N(0) = 1.5, P(0) = 1.5], [N(0) = 1.5, P(0) = .6], [N(0) = 3, P(0) = 0.4e-1], [N(0) = 3, P(0) = 1.5]], numsteps = 76, title =
 

Plot_2d
 

> fcns2 := {N(t), P(t)}; 1
 

{N(t), P(t)} (4)
 

> sol2 := dsolve({DE2, N(0) = 3, P(0) = 1.5}, fcns2, type = numeric, method = classical); 1
 

proc (x_classical) local _res, _dat, _vars, _solnproc, _xout, _ndsol, _pars, _n, _i; option `Copyright (c) 2000 by Waterloo Maple Inc. All rights reserved.`; if `<`(1, nargs) then error (5)
 

> odeplot(sol2, [[t, N(t)], [t, P(t)]], 0 .. 20, linestyle = [1, 3], color = [
odeplot(sol2, [[t, N(t)], [t, P(t)]], 0 .. 20, linestyle = [1, 3], color = [
 

Plot_2d
 

> fcns2a := {N(t), P(t)}; 1
 

{N(t), P(t)} (6)
 

> sol2a := dsolve({DE2, N(0) = 3, P(0) = 0.4e-1}, fcns2a, type = numeric, method = classical); 1
sol2a := dsolve({DE2, N(0) = 3, P(0) = 0.4e-1}, fcns2a, type = numeric, method = classical); 1
 

proc (x_classical) local _res, _dat, _vars, _solnproc, _xout, _ndsol, _pars, _n, _i; option `Copyright (c) 2000 by Waterloo Maple Inc. All rights reserved.`; if `<`(1, nargs) then error (7)
 

> odeplot(sol2a, [[t, N(t)], [t, P(t)]], 0 .. 20, linestyle = [1, 3], color = [
odeplot(sol2a, [[t, N(t)], [t, P(t)]], 0 .. 20, linestyle = [1, 3], color = [
 

Plot_2d
 

> DE3 := diff(x(t), t) = `+`(`*`(3, `*`(x(t), `*`(`+`(1, `-`(`*`(`/`(1, 10), `*`(x(t)))))))), `-`(`*`(2, `*`(x(t), `*`(y(t)))))), diff(y(t), t) = `+`(`*`(x(t), `*`(y(t))), `-`(`*`(4, `*`(y(t))))); 1
DE3 := diff(x(t), t) = `+`(`*`(3, `*`(x(t), `*`(`+`(1, `-`(`*`(`/`(1, 10), `*`(x(t)))))))), `-`(`*`(2, `*`(x(t), `*`(y(t)))))), diff(y(t), t) = `+`(`*`(x(t), `*`(y(t))), `-`(`*`(4, `*`(y(t))))); 1
 

diff(x(t), t) = `+`(`*`(3, `*`(x(t), `*`(`+`(1, `-`(`*`(`/`(1, 10), `*`(x(t)))))))), `-`(`*`(2, `*`(x(t), `*`(y(t)))))), diff(y(t), t) = `+`(`*`(x(t), `*`(y(t))), `-`(`*`(4, `*`(y(t))))) (8)
 

> DEplot({DE3}, [x(t), y(t)], t = 0 .. 3, [[x(0) = 2, y(0) = 2], [x(0) = 1.5, y(0) = .6], [x(0) = 2.2, y(0) = 1], [x(0) = 3, y(0) = 1]], numsteps = 76, title =
DEplot({DE3}, [x(t), y(t)], t = 0 .. 3, [[x(0) = 2, y(0) = 2], [x(0) = 1.5, y(0) = .6], [x(0) = 2.2, y(0) = 1], [x(0) = 3, y(0) = 1]], numsteps = 76, title =
DEplot({DE3}, [x(t), y(t)], t = 0 .. 3, [[x(0) = 2, y(0) = 2], [x(0) = 1.5, y(0) = .6], [x(0) = 2.2, y(0) = 1], [x(0) = 3, y(0) = 1]], numsteps = 76, title =
DEplot({DE3}, [x(t), y(t)], t = 0 .. 3, [[x(0) = 2, y(0) = 2], [x(0) = 1.5, y(0) = .6], [x(0) = 2.2, y(0) = 1], [x(0) = 3, y(0) = 1]], numsteps = 76, title =
 

Plot_2d
 

> fcns3 := {x(t), y(t)}; 1
 

{x(t), y(t)} (9)
 

> sol3 := dsolve({DE3, x(0) = 2, y(0) = 2}, fcns3, type = numeric, method = classical); 1
 

proc (x_classical) local _res, _dat, _vars, _solnproc, _xout, _ndsol, _pars, _n, _i; option `Copyright (c) 2000 by Waterloo Maple Inc. All rights reserved.`; if `<`(1, nargs) then error (10)
 

> odeplot(sol3, [[t, x(t)], [t, y(t)]], 0 .. 10, linestyle = [1, 3], color = [
odeplot(sol3, [[t, x(t)], [t, y(t)]], 0 .. 10, linestyle = [1, 3], color = [
 

Plot_2d
 

> DE4 := diff(x(t), t) = `*`(x(t), `*`(`+`(1, `-`(x(t)), `-`(y(t))))), diff(y(t), t) = `*`(y(t), `*`(`+`(.75, `-`(y(t)), `-`(`*`(.5, `*`(x(t))))))); 1
DE4 := diff(x(t), t) = `*`(x(t), `*`(`+`(1, `-`(x(t)), `-`(y(t))))), diff(y(t), t) = `*`(y(t), `*`(`+`(.75, `-`(y(t)), `-`(`*`(.5, `*`(x(t))))))); 1
 

diff(x(t), t) = `*`(x(t), `*`(`+`(1, `-`(x(t)), `-`(y(t))))), diff(y(t), t) = `*`(y(t), `*`(`+`(.75, `-`(y(t)), `-`(`*`(.5, `*`(x(t))))))) (11)
 

> DEplot({DE4}, [x(t), y(t)], t = 0 .. 15, [[x(0) = .4, y(0) = .4], [x(0) = 1, y(0) = 1], [x(0) = 2, y(0) = .4], [x(0) = .1, y(0) = 1], [x(0) = 0.5e-1, y(0) = .5]], numsteps = 76, title =
DEplot({DE4}, [x(t), y(t)], t = 0 .. 15, [[x(0) = .4, y(0) = .4], [x(0) = 1, y(0) = 1], [x(0) = 2, y(0) = .4], [x(0) = .1, y(0) = 1], [x(0) = 0.5e-1, y(0) = .5]], numsteps = 76, title =
DEplot({DE4}, [x(t), y(t)], t = 0 .. 15, [[x(0) = .4, y(0) = .4], [x(0) = 1, y(0) = 1], [x(0) = 2, y(0) = .4], [x(0) = .1, y(0) = 1], [x(0) = 0.5e-1, y(0) = .5]], numsteps = 76, title =
DEplot({DE4}, [x(t), y(t)], t = 0 .. 15, [[x(0) = .4, y(0) = .4], [x(0) = 1, y(0) = 1], [x(0) = 2, y(0) = .4], [x(0) = .1, y(0) = 1], [x(0) = 0.5e-1, y(0) = .5]], numsteps = 76, title =
 

Plot_2d
 

 

> with(plots, implicitplot); 1
 

[implicitplot] (12)
 

 

> implicitplot([x=0, (1-x-y)=0, y=0, (0.75-y-0.5*x)=0], x=-0.5..2.5, y=-0.5..1.5, color=["Blue", "Blue", "Red","Red"], title="Nullclines, DE4");
 

Plot_2d
 

> fcns4 := {x(t), y(t)}; 1
 

{x(t), y(t)} (13)
 

> sol4 := dsolve({DE4, x(0) = .1, y(0) = .5}, fcns4, type = numeric, method = classical); 1
 

proc (x_classical) local _res, _dat, _vars, _solnproc, _xout, _ndsol, _pars, _n, _i; option `Copyright (c) 2000 by Waterloo Maple Inc. All rights reserved.`; if `<`(1, nargs) then error (14)
 

> odeplot(sol4, [[t, x(t)], [t, y(t)]], 0 .. 20, color = [
odeplot(sol4, [[t, x(t)], [t, y(t)]], 0 .. 20, color = [
 

Plot_2d
 

> DE5 := diff(x(t), t) = `*`(x(t), `*`(`+`(1, `-`(x(t)), `-`(y(t))))), diff(y(t), t) = `*`(y(t), `*`(`+`(.5, `-`(`*`(.25, `*`(y(t)))), `-`(`*`(.75, `*`(x(t))))))); 1
DE5 := diff(x(t), t) = `*`(x(t), `*`(`+`(1, `-`(x(t)), `-`(y(t))))), diff(y(t), t) = `*`(y(t), `*`(`+`(.5, `-`(`*`(.25, `*`(y(t)))), `-`(`*`(.75, `*`(x(t))))))); 1
 

diff(x(t), t) = `*`(x(t), `*`(`+`(1, `-`(x(t)), `-`(y(t))))), diff(y(t), t) = `*`(y(t), `*`(`+`(.5, `-`(`*`(.25, `*`(y(t)))), `-`(`*`(.75, `*`(x(t))))))) (15)
 

> DEplot({DE5}, [x(t), y(t)], t = 0 .. 15, [[x(0) = .4, y(0) = .4], [x(0) = 1, y(0) = 1], [x(0) = 2, y(0) = .4], [x(0) = .1, y(0) = 1], [x(0) = 0.5e-1, y(0) = .5]], numsteps = 76, title =
DEplot({DE5}, [x(t), y(t)], t = 0 .. 15, [[x(0) = .4, y(0) = .4], [x(0) = 1, y(0) = 1], [x(0) = 2, y(0) = .4], [x(0) = .1, y(0) = 1], [x(0) = 0.5e-1, y(0) = .5]], numsteps = 76, title =
DEplot({DE5}, [x(t), y(t)], t = 0 .. 15, [[x(0) = .4, y(0) = .4], [x(0) = 1, y(0) = 1], [x(0) = 2, y(0) = .4], [x(0) = .1, y(0) = 1], [x(0) = 0.5e-1, y(0) = .5]], numsteps = 76, title =
DEplot({DE5}, [x(t), y(t)], t = 0 .. 15, [[x(0) = .4, y(0) = .4], [x(0) = 1, y(0) = 1], [x(0) = 2, y(0) = .4], [x(0) = .1, y(0) = 1], [x(0) = 0.5e-1, y(0) = .5]], numsteps = 76, title =
 

Plot_2d
 

> with(plots, implicitplot); 1
 

[implicitplot] (16)
 

 

> implicitplot([x=0, (1-x-y)=0, y=0, (0.5-0.25*y-0.75*x)=0], x=-0.5..2.5, y=-0.5..2.5, color=["Blue", "Blue", "Red","Red"], title="Nullclines, DE5");
 

Plot_2d
 

> fcns5 := {x(t), y(t)}; 1
 

{x(t), y(t)} (17)
 

> sol5 := dsolve({DE5, x(0) = 1, y(0) = 1}, fcns5, type = numeric, method = classical); 1
 

proc (x_classical) local _res, _dat, _vars, _solnproc, _xout, _ndsol, _pars, _n, _i; option `Copyright (c) 2000 by Waterloo Maple Inc. All rights reserved.`; if `<`(1, nargs) then error (18)
 

> odeplot(sol5, [[t, x(t)], [t, y(t)]], 0 .. 30, color = [
odeplot(sol5, [[t, x(t)], [t, y(t)]], 0 .. 30, color = [
 

Plot_2d
 

> fcns5e := {x(t), y(t)}; 1
 

{x(t), y(t)} (19)
 

> sol5e := dsolve({DE5, x(0) = .2, y(0) = .2}, fcns5e, type = numeric, method = classical); 1
 

proc (x_classical) local _res, _dat, _vars, _solnproc, _xout, _ndsol, _pars, _n, _i; option `Copyright (c) 2000 by Waterloo Maple Inc. All rights reserved.`; if `<`(1, nargs) then error (20)
 

> odeplot(sol5e, [[t, x(t)], [t, y(t)]], 0 .. 30, color = [
odeplot(sol5e, [[t, x(t)], [t, y(t)]], 0 .. 30, color = [
 

Plot_2d
 

> DE6 := diff(x(t), t) = `*`(x(t), `*`(`+`(1, `-`(x(t)), `-`(y(t))))), diff(y(t), t) = `*`(y(t), `*`(`+`(2, `-`(y(t)), `-`(x(t))))); 1
 

diff(x(t), t) = `*`(x(t), `*`(`+`(1, `-`(x(t)), `-`(y(t))))), diff(y(t), t) = `*`(y(t), `*`(`+`(2, `-`(y(t)), `-`(x(t))))) (21)
 

> DEplot({DE6}, [x(t), y(t)], t = 0 .. 15, [[x(0) = .4, y(0) = .4], [x(0) = 1, y(0) = 1], [x(0) = 2, y(0) = .4], [x(0) = .1, y(0) = 1], [x(0) = 0.5e-1, y(0) = .5]], numsteps = 76, title =
DEplot({DE6}, [x(t), y(t)], t = 0 .. 15, [[x(0) = .4, y(0) = .4], [x(0) = 1, y(0) = 1], [x(0) = 2, y(0) = .4], [x(0) = .1, y(0) = 1], [x(0) = 0.5e-1, y(0) = .5]], numsteps = 76, title =
DEplot({DE6}, [x(t), y(t)], t = 0 .. 15, [[x(0) = .4, y(0) = .4], [x(0) = 1, y(0) = 1], [x(0) = 2, y(0) = .4], [x(0) = .1, y(0) = 1], [x(0) = 0.5e-1, y(0) = .5]], numsteps = 76, title =
DEplot({DE6}, [x(t), y(t)], t = 0 .. 15, [[x(0) = .4, y(0) = .4], [x(0) = 1, y(0) = 1], [x(0) = 2, y(0) = .4], [x(0) = .1, y(0) = 1], [x(0) = 0.5e-1, y(0) = .5]], numsteps = 76, title =
 

Plot_2d
 

> with(plots, implicitplot); 1
 

[implicitplot] (22)
 

 

> implicitplot([x=0, (1-x-y)=0, y=0, (2-y-x)=0], x=-0.5..2.5, y=-0.5..2.5, color=["Blue", "Blue", "Red","Red"], title="Nullclines, DE6");
 

Plot_2d
 

> fcns6 := {x(t), y(t)}; 1
 

{x(t), y(t)} (23)
 

> sol6 := dsolve({DE6, x(0) = 5, y(0) = 0.1e-1}, fcns5, type = numeric, method = classical); 1
 

proc (x_classical) local _res, _dat, _vars, _solnproc, _xout, _ndsol, _pars, _n, _i; option `Copyright (c) 2000 by Waterloo Maple Inc. All rights reserved.`; if `<`(1, nargs) then error (24)
 

> odeplot(sol6, [[t, x(t)], [t, y(t)]], 0 .. 30, color = [
odeplot(sol6, [[t, x(t)], [t, y(t)]], 0 .. 30, color = [
 

Plot_2d
 

> DE7 := diff(v(t), t) = `+`(`-`(`*`(v(t), `*`(`+`(v(t), `-`(.3)), `*`(`+`(v(t), `-`(1)))))), `-`(w(t))), diff(w(t), t) = `*`(0.1e-1, `+`(v(t), `-`(`*`(.4, `*`(w(t)))))); 1
DE7 := diff(v(t), t) = `+`(`-`(`*`(v(t), `*`(`+`(v(t), `-`(.3)), `*`(`+`(v(t), `-`(1)))))), `-`(w(t))), diff(w(t), t) = `*`(0.1e-1, `+`(v(t), `-`(`*`(.4, `*`(w(t)))))); 1
 

diff(v(t), t) = `+`(`-`(`*`(v(t), `*`(`+`(v(t), `-`(.3)), `*`(`+`(v(t), `-`(1)))))), `-`(w(t))), diff(w(t), t) = `+`(`*`(0.1e-1, `*`(v(t))), `-`(`*`(0.4e-2, `*`(w(t)))))
diff(v(t), t) = `+`(`-`(`*`(v(t), `*`(`+`(v(t), `-`(.3)), `*`(`+`(v(t), `-`(1)))))), `-`(w(t))), diff(w(t), t) = `+`(`*`(0.1e-1, `*`(v(t))), `-`(`*`(0.4e-2, `*`(w(t)))))		 (25)
 

> DEplot({DE7}, [v(t), w(t)], t = 0 .. 70, [[v(0) = .4, w(0) = 0], [v(0) = .2, w(0) = 0], [v(0) = .1, w(0) = -0.5e-1], [v(0) = 1.5, w(0) = 0]], numsteps = 76, title =
DEplot({DE7}, [v(t), w(t)], t = 0 .. 70, [[v(0) = .4, w(0) = 0], [v(0) = .2, w(0) = 0], [v(0) = .1, w(0) = -0.5e-1], [v(0) = 1.5, w(0) = 0]], numsteps = 76, title =
DEplot({DE7}, [v(t), w(t)], t = 0 .. 70, [[v(0) = .4, w(0) = 0], [v(0) = .2, w(0) = 0], [v(0) = .1, w(0) = -0.5e-1], [v(0) = 1.5, w(0) = 0]], numsteps = 76, title =
DEplot({DE7}, [v(t), w(t)], t = 0 .. 70, [[v(0) = .4, w(0) = 0], [v(0) = .2, w(0) = 0], [v(0) = .1, w(0) = -0.5e-1], [v(0) = 1.5, w(0) = 0]], numsteps = 76, title =
 

Plot_2d
 

> fcns7 := {v(t), w(t)}; 1
 

{v(t), w(t)} (26)
 

> sol7 := dsolve({DE7, v(0) = .4, w(0) = 0}, fcns7, type = numeric, method = classical); 1
 

proc (x_classical) local _res, _dat, _vars, _solnproc, _xout, _ndsol, _pars, _n, _i; option `Copyright (c) 2000 by Waterloo Maple Inc. All rights reserved.`; if `<`(1, nargs) then error (27)
 

> odeplot(sol7, [[t, v(t)], [t, w(t)]], 0 .. 50, color = [
odeplot(sol7, [[t, v(t)], [t, w(t)]], 0 .. 50, color = [
 

Plot_2d
 

> fcns7e := {v(t), w(t)}; 1
 

{v(t), w(t)} (28)
 

> sol7e := dsolve({DE7, v(0) = .2, w(0) = 0}, fcns7e, type = numeric, method = classical); 1
 

proc (x_classical) local _res, _dat, _vars, _solnproc, _xout, _ndsol, _pars, _n, _i; option `Copyright (c) 2000 by Waterloo Maple Inc. All rights reserved.`; if `<`(1, nargs) then error (29)
 

> odeplot(sol7e, [[t, v(t)], [t, w(t)]], 0 .. 50, color = [
odeplot(sol7e, [[t, v(t)], [t, w(t)]], 0 .. 50, color = [
 

Plot_2d
 

> fcns7f := {v(t), w(t)}; 1
 

{v(t), w(t)} (30)
 

> sol7f := dsolve({DE7, v(0) = .1, w(0) = -0.5e-1}, fcns7f, type = numeric, method = classical); 1
sol7f := dsolve({DE7, v(0) = .1, w(0) = -0.5e-1}, fcns7f, type = numeric, method = classical); 1
 

proc (x_classical) local _res, _dat, _vars, _solnproc, _xout, _ndsol, _pars, _n, _i; option `Copyright (c) 2000 by Waterloo Maple Inc. All rights reserved.`; if `<`(1, nargs) then error (31)
 

> odeplot(sol7f, [[t, v(t)], [t, w(t)]], 0 .. 100, color = [
odeplot(sol7f, [[t, v(t)], [t, w(t)]], 0 .. 100, color = [
 

Plot_2d
 

> DE8 := diff(x(t), t) = y(t), diff(y(t), t) = `+`(`-`(`*`(9, `*`(sin(x(t))))), `-`(`*`(`/`(1, 5), `*`(y(t))))); 1
 

diff(x(t), t) = y(t), diff(y(t), t) = `+`(`-`(`*`(9, `*`(sin(x(t))))), `-`(`*`(`/`(1, 5), `*`(y(t))))) (32)
 

> DEplot({DE8}, [x(t), y(t)], t = 0 .. 10, [[x(0) = 2, y(0) = 0], [x(0) = 8, y(0) = .6], [x(0) = 3.2, y(0) = .1], [x(0) = 3.1, y(0) = .1], [x(0) = 0, y(0) = 7.5]], numsteps = 76, title =
DEplot({DE8}, [x(t), y(t)], t = 0 .. 10, [[x(0) = 2, y(0) = 0], [x(0) = 8, y(0) = .6], [x(0) = 3.2, y(0) = .1], [x(0) = 3.1, y(0) = .1], [x(0) = 0, y(0) = 7.5]], numsteps = 76, title =
DEplot({DE8}, [x(t), y(t)], t = 0 .. 10, [[x(0) = 2, y(0) = 0], [x(0) = 8, y(0) = .6], [x(0) = 3.2, y(0) = .1], [x(0) = 3.1, y(0) = .1], [x(0) = 0, y(0) = 7.5]], numsteps = 76, title =
DEplot({DE8}, [x(t), y(t)], t = 0 .. 10, [[x(0) = 2, y(0) = 0], [x(0) = 8, y(0) = .6], [x(0) = 3.2, y(0) = .1], [x(0) = 3.1, y(0) = .1], [x(0) = 0, y(0) = 7.5]], numsteps = 76, title =
DEplot({DE8}, [x(t), y(t)], t = 0 .. 10, [[x(0) = 2, y(0) = 0], [x(0) = 8, y(0) = .6], [x(0) = 3.2, y(0) = .1], [x(0) = 3.1, y(0) = .1], [x(0) = 0, y(0) = 7.5]], numsteps = 76, title =
 

Plot_2d
 

> fcns8 := {x(t), y(t)}; 1
 

{x(t), y(t)} (33)
 

> sol8 := dsolve({DE8, x(0) = 0, y(0) = 6}, fcns8, type = numeric, method = classical); 1
 

proc (x_classical) local _res, _dat, _vars, _solnproc, _xout, _ndsol, _pars, _n, _i; option `Copyright (c) 2000 by Waterloo Maple Inc. All rights reserved.`; if `<`(1, nargs) then error (34)
 

> odeplot(sol8, [[t, x(t)], [t, y(t)]], 0 .. 30, color = [
odeplot(sol8, [[t, x(t)], [t, y(t)]], 0 .. 30, color = [
 

Plot_2d
 

>
 

> DE9 := diff(x(t), t) = `+`(`-`(y(t)), `*`(x(t), `*`(`+`(`*`(`^`(x(t), 2)), `*`(`^`(y(t), 2)))))), diff(y(t), t) = `+`(x(t), `*`(y(t), `*`(`+`(`*`(`^`(x(t), 2)), `*`(`^`(y(t), 2)))))); 1
DE9 := diff(x(t), t) = `+`(`-`(y(t)), `*`(x(t), `*`(`+`(`*`(`^`(x(t), 2)), `*`(`^`(y(t), 2)))))), diff(y(t), t) = `+`(x(t), `*`(y(t), `*`(`+`(`*`(`^`(x(t), 2)), `*`(`^`(y(t), 2)))))); 1
 

diff(x(t), t) = `+`(`-`(y(t)), `*`(x(t), `*`(`+`(`*`(`^`(x(t), 2)), `*`(`^`(y(t), 2)))))), diff(y(t), t) = `+`(x(t), `*`(y(t), `*`(`+`(`*`(`^`(x(t), 2)), `*`(`^`(y(t), 2)))))) (35)
 

>
 

> DEplot({DE9}, [x(t), y(t)], t = 0 .. 3, [[x(0) = .5, y(0) = .1], [x(0) = 0, y(0) = .3], [x(0) = .2, y(0) = -.2], [x(0) = -.2, y(0) = .2]], numsteps = 76, title =
DEplot({DE9}, [x(t), y(t)], t = 0 .. 3, [[x(0) = .5, y(0) = .1], [x(0) = 0, y(0) = .3], [x(0) = .2, y(0) = -.2], [x(0) = -.2, y(0) = .2]], numsteps = 76, title =
DEplot({DE9}, [x(t), y(t)], t = 0 .. 3, [[x(0) = .5, y(0) = .1], [x(0) = 0, y(0) = .3], [x(0) = .2, y(0) = -.2], [x(0) = -.2, y(0) = .2]], numsteps = 76, title =
DEplot({DE9}, [x(t), y(t)], t = 0 .. 3, [[x(0) = .5, y(0) = .1], [x(0) = 0, y(0) = .3], [x(0) = .2, y(0) = -.2], [x(0) = -.2, y(0) = .2]], numsteps = 76, title =
 

 

Warning, plot may be incomplete, the following errors(s) were issued:
 

  cannot evaluate the solution further right of 1.9230790, probably a singularity
Plot_2d
 

> DE10 := diff(x(t), t) = `+`(`-`(y(t)), `-`(`*`(x(t), `*`(`+`(`*`(`^`(x(t), 2)), `*`(`^`(y(t), 2))))))), diff(y(t), t) = `+`(x(t), `-`(`*`(y(t), `*`(`+`(`*`(`^`(x(t), 2)), `*`(`^`(y(t), 2))))))); 1
DE10 := diff(x(t), t) = `+`(`-`(y(t)), `-`(`*`(x(t), `*`(`+`(`*`(`^`(x(t), 2)), `*`(`^`(y(t), 2))))))), diff(y(t), t) = `+`(x(t), `-`(`*`(y(t), `*`(`+`(`*`(`^`(x(t), 2)), `*`(`^`(y(t), 2))))))); 1
 

diff(x(t), t) = `+`(`-`(y(t)), `-`(`*`(x(t), `*`(`+`(`*`(`^`(x(t), 2)), `*`(`^`(y(t), 2))))))), diff(y(t), t) = `+`(x(t), `-`(`*`(y(t), `*`(`+`(`*`(`^`(x(t), 2)), `*`(`^`(y(t), 2))))))) (36)
 

> DEplot({DE10}, [x(t), y(t)], t = 0 .. 5, [[x(0) = 0, y(0) = 2], [x(0) = 0, y(0) = -2], [x(0) = 1, y(0) = 0], [x(0) = -1, y(0) = 1]], numsteps = 76, title =
DEplot({DE10}, [x(t), y(t)], t = 0 .. 5, [[x(0) = 0, y(0) = 2], [x(0) = 0, y(0) = -2], [x(0) = 1, y(0) = 0], [x(0) = -1, y(0) = 1]], numsteps = 76, title =
DEplot({DE10}, [x(t), y(t)], t = 0 .. 5, [[x(0) = 0, y(0) = 2], [x(0) = 0, y(0) = -2], [x(0) = 1, y(0) = 0], [x(0) = -1, y(0) = 1]], numsteps = 76, title =
DEplot({DE10}, [x(t), y(t)], t = 0 .. 5, [[x(0) = 0, y(0) = 2], [x(0) = 0, y(0) = -2], [x(0) = 1, y(0) = 0], [x(0) = -1, y(0) = 1]], numsteps = 76, title =
 

Plot_2d
 

>