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    public static double squareRoot(double num) throws IllegalArgumentException
    {
        if (num < 0.0)
            throw new IllegalArgumentException("Number cannot be negative.");
        double guess = num / 2.0, pastGuess;
        guess = 0.5 * (guess + (num / guess));

        do {
            pastGuess = guess;
            guess = 0.5 * (guess + (num / guess));
           } while ((pastGuess / guess) >= 1.01);// run until both numbers are within 1% of each other
        return guess; // return square root of num
    }

im trying to implement a simple squareRoot method using the babylonian algorithm. my problem is that for numbers less then 0.01, the result is very inaccurate.

i want the loop to run until both numbers (pastGuess and guess) are within 1% if each other, but i cant figure out the proper math for it.

i came up with:

((pastGuess / guess) >= 1.01)   

i also tryed:

((pastGuess / guess) >= 1.01 || (guess / pastGuess ) >= 1.01)  

this works abit better but is there a more efficient way of doing it?

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what about check for 0.99 for the case when pastGuess is smaller than guess? –  hoaz May 15 '13 at 18:49
    
Have you tried ABS(pastGuess - guess) > 0.0000001 or something of this sort? –  PM 77-1 May 15 '13 at 18:49
    
What do you want to do in the case where only the smaller number is within one percent of the larger, but not the other way around IE. 99 and 100. 99 is within 1% of 100, but 100 is not within 1% of 99 –  Paulpro May 15 '13 at 18:49
1  
yes ABS(pastGuess - guess) > 0.0000001 works but this is not 1% difference. –  Anthony Raimondo May 15 '13 at 18:54
    
what is the range of values that num can be.because the perfect way is depends on that –  Sanjaya Liyanage May 15 '13 at 18:55

4 Answers 4

up vote 4 down vote accepted
double ratio = pastGuess / guess;
(ratio >= 1.01 || ratio <= 0.99)

Note that I used 0.99 for readability. The correct value for the verification above to be symmetric would be a constant equal to (100/101) = 0.99009900...

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1  
+1 actually I think your approach is probably better than mine 'cause multiplication and division are usually bit more stable/precise than a subtraction. –  Trinimon May 15 '13 at 19:04

Guess you want 99% too, so basically it means that the difference is less than 1%:

Math.abs((pastGuess - guess) / guess) < 0.01

This should be already quite stable.

Cheers!

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float parcent = Math.abs(1f - (pastGuess / guess))

if(parcent <= 0.01f) 

:D

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Let's say the two numbers are 'a' and 'b'. Let's say a < b.

1% of 'b' = b/100

1% of 'a' = a/100

So 'a' is within 1% of 'b' if a > b-b/100 or (b-a)/b < 1/100

And 'b' is within 1% of 'a' if b < a+a/100 or (b-a)/a < 1/100.

Since a< b it implies (b-a)/b < (b-a)/a

So if (b-a)/a < 1/100 it implies that (b-a)/b < 1/100 as (b-a)/b is smaller than (b-a)/a.

So the check simply can be:

abs(guess-pastguess)/ ((guess < pastguess) ? guess : pastguess) < 0.01 ;

Let's look at an example:

If a=99.001 and b=100 then b=100 is not within 1 % of a=99 1% of 99.001 is .99001 so b has to be less than 99.99001

On the other hand b=99.0001 is within 1% of a=100 as 1% of 100 is 0.1. So any number greater than 99 is within 1% of 100.

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