Answers to Selected Exercises5.r s E Possible Arms Race(s)(^0 0) + md
0 0 rar
- md
md, sar, rar
- sar
- rar
- md, sar
- md, sar, rar
Exercises 10 .2 Phase-Plane Portraits
l. >-1 = 1, >-2 = -1, unstable saddle point
3. >-1 = -1, >-2 = -1, asymptotically stable node
- ,;\ = -1 ± 2i , asymptotically stable spiral point
7. >-1 = -2, >-2 = -4, asymptotically stable node
- Asymptotically stable node at (0, O); unstable saddle point at (1, 1)
- Unstable saddle point at (0, O); neutrally stable center at (~, 1)
56513. Asymptotically stable spiral point at (1, 1); unstable saddle point at
(1, -1)- Unstable saddle point at (0, O); asymptotically stable node at (0, - 1) ;
unstable spiral point at (2, 1)
Exercises 10 .3 Modifie d Rich a rdson's Arms Race Models
l. a. (5, 4)
b. The associated linear systemx' = - lO(x - 5) + 5(y - 4)
y' = 4(x - 5) - 8(y - 4)
has an asymptotically stable node at (5, 4). Therefore, (5, 4) is an
asymptotically stable critical point of the nonlinear system (9).