# Solving system of coupled differential equations using scipy odeint

I am a bit confused with `odeint`.

I found one example below to solve `y"=ay + by'`. So it seems that `y[0]` is the function, `y[1]` is the first derivative.

So does the following expression mean `y[1] =y'` and `y'[1]= a*y[0]+b*y[1]` ?

If it were `y[2], a*y[0]+b*y[1]`, what would it mean?

I am a bit confused since the expression does not say the left hand side of the equation.

I also encountered expressions like `[a(y[0], y[1]), b(y[0], y[1])]` but have no clue of the differential equation.

Here is one example:

``````from scipy.integrate import odeint
from pylab import * # for plotting commands

def deriv(y,t): # return derivatives of the array y
a = -2.0
b = -0.1
return array([ y[1], a*y[0]+b*y[1] ])

time = linspace(0.0,10.0,1000)
yinit = array([0.0005,0.2]) # initial values
y = odeint(deriv,yinit,time)
figure()
plot(time,y[:,0])
xlabel('t')
ylabel('y')
show()
``````
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I found the answer, the equations should be represented in the following way: y1'= y2 , y2'=y3, .., yn'=F(x,..) and only right hand sides of the equations have to be given for solving the differential equation. –  pappu Feb 6 '12 at 21:30

Let's use `Y` in `deriv` instead of `y` for the rest of answer to be clear:

``````def deriv(Y,t): # return derivatives of the array Y
a = -2.0
b = -0.1
return array([ Y[1], a*Y[0]+b*Y[1] ])
``````

Function `deriv` takes `Y = [y, y']` as the input.

And it should output their derivatives (`[y', y'']`).

`y' = Y[1]`

`y'' = a*Y[0]+b*Y[1]`

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As far as I understand it, first element of `array([ y[1], a*y[0]+b*y[1] ])`, i.e. `y[1]` is put as `y` in `dy/dt` which gives `dy[1]/dt = y[2]`. The second element, i.e. `a*y[0]+b*y[1]` serves as `func(y,t0,...)`