# Program an iteration which will be stopped when the mentioned circumstance is met

Hi everyone I have encountered a problem in writing a programming code for the algorithm as shown below

This program is going to be terminated when the approximate error which is defined as (current approximation-previous approximation)/current approximation is less than 0.01. It can be simplified as (f(xr)i+1 - f(xr)i)/f(xr)i+1. Below are the code that I have written and I would really like to know how can I program an iteration which will be stopped when the mentioned circumstance is met.

``````xl = input('Enter lower limit : ');

xu = input('Enter upper limit : ');

xr = (xl+xu)/2;

R = 3; V = 30;

fl = (pi*R*xl^2)-(pi*(xl^3)/3)-V;    % between is there anyway can call these functions

fu = (pi*R*xu^2)-(pi*(xu^3)/3)-V;      other than typing 3 times

fh = (pi*R*xr^2)-(pi*(xr^3)/3)-V;

while relative error is less than 0.01 then display value of xr

if fl*fu<0

xu = xr;

elseif fl*fu>0

xl = xr;

end

end
``````
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You forgot to implement Step 3(c). You also didn't "return to step 2" in steps 3(a) and 3(b) as the instructions state. – Robert Harvey Mar 4 '13 at 16:19
hmm..that one I think it's just required to add a if statement after all..but the problem that I encounter now is about the iteration and loop condition..thank you for reminding yea..by the way could u help me out in solving this..I will be really really appreciate it.thanks!! – green Mar 4 '13 at 16:26

I updated the code now that I could run it. I tested it with f(x)=x^2-2. It converges to 1.4141 in 6 iterations. I suggest you compare that code with what you had to understand what was not working for you before. This will be a good learning experience.

``````>> example(1,2);
Crossing found after 6 iterations: 1.414062
``````

where example.m is the following:

``````function xr = root(xl,xu)

MAX_NUMBER_ITERATIONS = 1000;
MAX_DELTA=.01;

numberIterations=0;
xr_old=xu;
xr = (xl+xu)/2;

while ((numberIterations<MAX_NUMBER_ITERATIONS) & (abs(xr_old-xr)>=MAX_DELTA))
numberIterations=numberIterations+1;
xr_old = xr;;

product=f(xl)*f(xr);
if product<0
xu = xr;
xr = (xl+xu)/2;
continue;
elseif product>0
xl = xr;
xr = (xl+xu)/2;
continue;
else
break;
end
end
fprintf('Crossing found after %d iterations: %f\n',numberIterations,xr)

end

function y = f(x)
y=x^2-2;
end
``````
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Hmm but how about I am going to stop the program when the relative error is less than 0.01, which is when (current xr-previous xr)/current xr <0.01. This would be the main problem that troubling me. @user91208 – green Mar 4 '13 at 16:40
`while (relative error >= 0.01) ...` – Robert Harvey Mar 4 '13 at 16:43
hmm but the problem is I dono how to define the previous xr and the current xr in matlab – green Mar 4 '13 at 16:45
@RobertHarvey could you give me a help – green Mar 4 '13 at 17:47
@green: The condition in the `while` must keep it looping until your exit condition is met. – Robert Harvey Mar 4 '13 at 17:49

You forgot to implement Step 3(c).

You also didn't "return to step 2" in steps 3(a) and 3(b) as the instructions state. To do that, you will need to create a `while` loop as described here; put in your while loop the condition that will keep it looping. If that condition evaluates to false, it should drop out of the loop in accordance with step 3(c).

Use CONTINUE to fulfill the "Return to Step 2" part in steps 3(a) and 3(b); that moves execution back to the top of the loop. See also Jump command in MATLAB

Good luck.

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I propose a `for` loop with fixed number of passes instead of `while` at least during debugging. Usually something goes wrong with my code and the `while` condition stays true for an infinite loop. – Dedek Mraz Mar 4 '13 at 16:40

you can put calculation in a function:

``````function f = some_function(x)
R = 3;
V = 30;
f = (pi*R*x^2)-(pi*(x^3)/3)-V;
``````

You can try with 100 passes (for safety):

``````for i=1:100
xr_old = xr
fr_old = fr

xr = (xl+xu)/2;
fr = some_function(xr);

if abs((xr - xr_old)/xr) < MIN_STEP
break
end

temp = fl*fr
if temp < 0:
xu = xr
fu = fr
else if temp > 0:
xl = xr
fl = fr
end
end
``````
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