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# C++. Could anyone help me find error in my code for solving equation with simple iterations method? i getting solution like -1.#IND00

I am trying to solve the next equation with C++ help: 3sin(sqrt(x)) + 0.35x - 3.8 = 0
The area with solution is [2, 3]

I wrote next code:

``````float f(float x)
{
return (3 * sin(sqrt(x))) + (0.35 * x) - 3.8; //this is equation i am trying to solve
}

float g(float x, float(*f_ptr)(float))
{
const float CONST = 0.1f; //const used to solve equation

return CONST * f_ptr(x) + x;
}

{
float x0, //starting aproximation
xk, //current aproximation
a = 2, //left barrier
b = 3, //right barrier
epsilon = 0.001; //allowed error

const float REAL_SOLUTION = 2.2985; //real solution of selected equation

printf("Setup starting aproximation: ");
scanf("%f", &x0);

do
{
xk = g(x0, f); //calc current aproximation

if (fabs(xk - x0) < epsilon) //if Xn - Xn-1 fits the allowed error, the solution must be found
break; //then we exit
else
x0 = xk; //else reset x values
}
while (fabs(a - x0) > epsilon && fabs(b - x0) > epsilon);

printf("Found solution: %f\nReal solution: %f\n", xk, REAL_SOLUTION);
}
``````

But it gives me weird results like -1.#IND00 which i don't even know what is it.
And i can't find any error there...

-
What is `g` all about? As for `-1.#IND00`, that's just a NaN. – David Heffernan May 20 '12 at 18:54
let me find some english description of simple iterations method, so i will try to explain you. the things i read was in russian – Kosmos May 20 '12 at 18:57
Is `x` negative? – Kerrek SB May 20 '12 at 19:00
@KerrekSB Yes, x is negative – David Heffernan May 20 '12 at 19:01
@DavidHeffernan: problem solved then, non? – Kerrek SB May 20 '12 at 19:02

Try using another algorithm like this:

1. Write the derivative of the function: der=1.5*cos(sqrt((x))/sqrt(x)+.35
2. next value is xk=x0-mysinc(x0)/der(x0)

in few steps will fall into the solution... or make your variable CONST have a dynamic value of -1/der(x).

-
thank you very much! But can you tell me where did that magic values come from? and what mean +.35 in first step? – Kosmos May 21 '12 at 6:22
@Kosmos: Newton's Method to solve F(x)=0 link Derivative function of: 3sin(sqrt(x)) + 0.35x - 3.8 is 1.5*cos(sqrt((x))/sqrt(x)+.35 (derivative function of 0,35*x is 0.35). The derivative function in one point calculates the slope of the curve. If you take the line that crosses that point and has the same slope, cuts the horizontal axe near the zero of the original function. – chasques May 21 '12 at 8:32
thanks for explaining me this all, i think i will choose the second method you suggested about dynamic CONST. also, i forgot to ask, what is mysinc in second step? – Kosmos May 21 '12 at 9:07
@Kosmos: sorry, mysinc is a typing error :D I meant your real function "f". So xk=x0-f(x0)/der(x0) – chasques May 21 '12 at 10:23
got it all. you are great to help me solve this things after much time passed :D – Kosmos May 21 '12 at 10:59

At a high level, what is happening is that:

1. Your algorithm doesn't work correctly.
2. At a certain iteration, `xk` becomes negative.
3. When that is passed to `sqrt`, a NaN is returned.
4. The iteration terminates.
5. The call to `printf` displays the `NaN` as `-1.#IND00`.

You can discern all this with a debugger, or even with the old fashioned technique of throwing in some debug `printf` output. For example, add some code to print `xk` on each iteration of the loop.

Since you have knowledge that the solution lies in [2,3], I would personally use a bracketing root finder. For example, bisection.

-
+1 for being helpful and not Spoonfeeding – nikhil May 20 '12 at 19:01
ouch... nothing else to say, aside of thanks. – Kosmos May 20 '12 at 19:02
@Kosmos It's easy to get code wrong. The big thing to learn is how to diagnose it. If you had seen various intermediate values then you would have immediately seen what was going on yourself. Don't try to program with a blindfold on! Good luck! ;-) – David Heffernan May 20 '12 at 19:04