# Question in MATLAB about comparing values to pi

I want to find pi in MATLAB and when I do compare it with the pi that is already embodied in MATLAB. So when I write

``````while(p~=pi)
``````

the loop seems endless because it keeps testing for all the digits that the MATLAB pi has.

So when I wrote:

``````p=3.1416;
if p==pi
disp('yes');
else
disp('no');
end
``````

the answer naturally was no. So I want to find a way to keep only five digits after the point and test with that, test for pi=3.14159.

Can anyone help?

-

Look at the function `round2` on the File Exchange. It lets you round to a specific number of decimal places. E.g. for your example:

``````if round2(p,1e-5) == round2(pi,1e-5),
disp('yes');
end
``````
-
Note that round2 does NOT actually round to a specified number of decimal places. round2(1.23,.1) actually produces the number 1.20000000000000017763568394002504646778106689453125 –  user85109 May 26 '11 at 19:29
The problem of course is that one cannot represent the number 1.2 exactly in matlab. ALWAYS beware the limits of floating point precision. –  user85109 May 26 '11 at 19:31
Ah good point. But surely if pi and p are the same, then the closest FP value from round2 should also the same? –  n00dle May 26 '11 at 20:08
There is another flaw with your reasoning. One can have two distinct numbers that round2 will send to different results, yet they are indeed closer than the tolerance.>> x = [1.199 1.201]; >> round2(x,0.00725) ans = 1.1963 1.2035 –  user85109 May 27 '11 at 10:50
That example is entirely dependant on your input rounding value. if you did >> T = [1.199 1.201] >> round2(T,0.01) ans = 1.2000 1.2000. If you then compare the answers, you get: >> ans(1)==ans(2) ans = 1 –  n00dle May 27 '11 at 11:15
``````if abs(p-pi) <= 1e-5
disp yes;
else
disp no;
end
``````

See this Stack Overflow answer for details.

-
that's what I did too in the end! Thanks –  system May 26 '11 at 16:41

To compare floating point numbers one should use eps. something along the lines

if abs(p-pi)<=eps .... same

I've also seen 2*eps used in place of eps. But the above is the better way to compare floating points numbers. In your case, it becomes

while abs(p-pi)>2*eps ..... end

--Nasser

-
Technically, the most accurate use of EPS would be to pass it the magnitude of the values you are comparing. Calling EPS with no argument will return the distance from `1.0` to the next largest double-precision number (about `2.2204e-016`), but `eps(pi)` will give you a floating-point relative accuracy twice as large (about `4.4409e-016`). –  gnovice May 27 '11 at 4:23
good point. That is the reason why some use 2*eps as I mentioned. But I see now that your suggestion to do eps(magnitude) is better than doing 2*eps. –  Nasser May 27 '11 at 6:43