# MATLAB: Debugging Newton Raphson Method

I am trying to model a liquid level control and I am trying to solve an implicit equation using newton raphson method

``````t=(0:1:10);
x=[14 -4.32E-4 5.28E-4]; y=[14 7];
[t,x]=ode45(@PHandLiquidlevelmain,t,x) % returns x

% For this time period t ,I have x as a 11X3 double array.
% And I am trying to access that array to calculate y

y=zeros(max(size(t)),2);

cv=8.75;
pk1=6.35;
pk2=10.25;

for l=1:1:1% For output Y(1)
for k=1:1:11
if l<2
y(k,l)=y(k,l)+x(k,l);% Equation governed to calculate y(1)
end
end
end

for l=2:1:2
for k=1:1:11

if l<3

syms z;
format long;

Equa_0=((x(k,l))+(10^(z-14))+((x(k,l+1))*((1+2*(10^(z-pk2)))/(1+(10^(pk1-z))+
(10^(z-pk2)))))-(10^(-z)))
% using looping to get values of x(1,2)to x(t,2) and x(1,3) up to x(t,3)
% and using it in Equa_0 to create t equations which are need to be
% solved using Newton Raphson method

%Newton  Raphson method

e = 1e-5;    % setting the tolerance value
dx = e + 1;
guess = 7;   % initially assumed value of z

count = 0;   % setting counter to know the
% no of iterations taken
p = zeros(1,1);
while (abs(dx) > e) % initialising the iteration and
% continue until the error is less than tolerance

dx = (eval(Equa_0/(diff(Equa_0)))); % calculating dx, diff is used for
% finding the differentiation of the
% function
guess = guess - dx;  % updating the value of x
count = count + 1;   % incrementing the counter
p(count) =guess;
drawnow();
plot(abs(p),'r','linewidth',3);
grid;
if (count > 300)

fprintf('Error...! Solution not converging !!! \n');  % printing the
% error message
break;
end
end
if (count < 300)
fprintf('The solution = ');  %printing the result
y(k,l)=y(k,l)+guess;% y(1,1) to y(t,1) is calculated
fprintf('\nNumber of iteration taken = %d\n',count);
end
end
end
end
y
``````

The outputs are:

`````` t =

0
1
2
3
4
5
6
7
8
9
10

x =

14.0000   -0.0004    0.0005
14.0001   -0.0004    0.0005
14.0001   -0.0004    0.0005
14.0002   -0.0004    0.0005
14.0002   -0.0004    0.0005
14.0003   -0.0004    0.0005
14.0003   -0.0004    0.0005
14.0003   -0.0004    0.0005
14.0004   -0.0004    0.0005
14.0004   -0.0004    0.0005
14.0005   -0.0004    0.0005

Equa_0 =

10^(z - 14) - 1/10^z + (33*(2*10^(z - 41/4) + 1))/(62500*(10^(z - 41/4) + 10^(127/20 -
z) + 1)) - 27/62500
``````

And the following error occured:

``````The following error occurred converting from sym to double:
Error in MuPAD command: DOUBLE cannot convert the input expression into a double array.

If the input expression contains a symbolic variable, use the VPA function instead.

Error in PHmain (line 55)
p(count) =guess;
``````

I tried `vpa` function but to no avail. The `Equa_0` accepts the `x` values but seem to create a different sort of expression.

-
MATLAB is useful for numerical analysis (obviously). Define the equation you're operating on as a function - either in its own function file or in an anonymous function. Do the same for the derivative function (either find the analytical solution yourself or differentiate numerically). Avoid using the Symbolic Math toolbox for your operation. It looks like you're only using it to find the derivative of `Equa_0`, but it should be easy to do yourself. –  Dang Khoa May 31 '13 at 16:32

One, you specify `guess` and manipulate it, but don't push it into Equa_0. You need to explicitly say `z = guess;` during each iteration before you calculate `dx` in the loop.
``````Equa_0=@(z) ((x(k,l))+(10^(z-14))+((x(k,l+1))*((1+2*(10^(z-pk2)))/(1+(10^(pk1-z))+ (10^(z-pk2)))))-(10^(-z)));