If we are given with an array of non-linear equation coefficients and some range, how can we find that equation's root within the range given?

E.g.: the equation is

So coefficient array will be the array of *a*'s. Let's say the equation is

Then the coefficient array is `{ 1, -5, -9, 16 }`

.

As Google says, first we need to morph function given (the equation actually) to some other function. E.g. if the given equation is `y = f(x)`

, we should define other function, `x = g(x)`

and then do the algorithm:

```
while (fabs(f(x)) > etha)
x = g(x);
```

To find out the root.

The question is: how to define that `g(x)`

using coefficient array and the range given only?

The problem is: when i define `g(x)`

like this

or

for the equation given, any start value for `x`

will lead me to the second equation's root. And no one of 'em would give me the other two (roots are `{ -2.5, 1.18, 6.05 }`

and my code gives `1.18`

only).

My code is something like this:

```
float a[] = { 1.f, -5.f, -9.f, 16.f }, etha = 0.001f;
float f(float x)
{
return (a[0] * x * x * x) + (a[1] * x * x) + (a[2] * x) + a[3];
}
float phi(float x)
{
return (a[3] * -1.f) / ((a[0] * x * x) + (a[1] * x) + a[2]);
}
float iterationMethod(float a, float b)
{
float x = (a + b) / 2.f;
while (fabs(f(x)) > etha)
{
x = phi(x);
}
return x;
}
```

So, calling the `iterationMethod()`

passing ranges `{ -3, 0 }`

, `{ 0, 3 }`

and `{ 3, 10 }`

will provide `1.18`

number three times along.

Where am i wrong and how should i act to get it work right?

**UPD1**: i do not need any third-party libraries.

**UPD2**: i need "Simple Iteration" algorithm exactly.