Solve the initival value problem: y′=7 cos (5x) / (8-3y) y′=7 cos⁡ (5x) / (8-3y), y (0) = 3y (0) = 3. y=y = When solving an ODE, the solution is only valid in some interval. Furthermore, if an initial condition is given, the solution will only be valid in the largest interval in the domain of the solution that is around the xx-value given in the initial condition. In this case, since y (0) = 3y (0) = 3, then the solution is only valid in the largest interval in the domain of yy around x=0x=0.

Question

Mathematics

Damion Velazquez

14 January, 11:07

Solve the initival value problem: y′=7 cos (5x) / (8-3y) y′=7 cos⁡ (5x) / (8-3y), y (0) = 3y (0) = 3. y=y = When solving an ODE, the solution is only valid in some interval. Furthermore, if an initial condition is given, the solution will only be valid in the largest interval in the domain of the solution that is around the xx-value given in the initial condition. In this case, since y (0) = 3y (0) = 3, then the solution is only valid in the largest interval in the domain of yy around x=0x=0.

+1

Answers (1)

Know the Answer?

Jase Dougherty · Answer 1

The solution to the differential equation

y' = (7cos5x) / (8 - 3y); y (0) = 3

is

16y - 3y² = 70sin5x + 21

Step-by-step explanation:

y' = (7cos5x) / (8 - 3y)

This can be written as

dy/dx = (7cos5x) / (8 - 3y)

Separate the variables

(8 - 3y) dy = (7cos5x) dx

Integrate both sides

8y - (3/2) y² = 35sin5x + C

Applying the initial condition y (0) = 3

8 (3) - (3/2) (3) ² = 35sin (5 (0)) + C

24 - (27/2) = 0 + C

C = 21/2

Therefore,

8y - (3/2) y² = 35sin5x + 21/2

Or

16y - 3y² = 70sin5x + 21