# Working with very small numbers in Matlab

I have a simple program I'm trying to get to solve the problem of approximating the derivative of sin(x) + cos(x) at x=0. The formula for this is [f(x+h) + f(x)]/h where x is 0, as stated, and I'm trying 6 different values for h: 10e-3, 10e-6, 10e-9, 10e-12, 10e-15, 10e-18. The following code works for all of them except 10e-18, but I can't figure out why. 10e-18 is small, but it doesn't seem like it should be that small. The output for the last h is 0, the rest are very close to 1, as they should be.

``````function fprime = twoPointForward(x)
h = 10e-3;
f = sin(x) + cos(x);

for i=1:6;
fprime = ((sin(x+h) + cos(x+h))-f)/h

h=h/1000;

end

end
``````

I appreciate any help. All the other threads I found dealing with this have solutions that are more specific to their respective problems.

• Because of the exact way in which floating point numbers are implemented this is going to cause a lot of problems. Read this: docs.oracle.com/cd/E19957-01/806-3568/ncg_goldberg.html Commented Jul 24, 2014 at 19:19
• You can see how small of a number Matlab can represent using `eps`. If `h` ever gets smaller than `eps(x)` you are going to have severe problems. In practice, try to use numbers at least few orders of magnitude larger. Commented Jul 24, 2014 at 19:39
• 1e-18 isn't that small; it's plenty within the scope of the floating point exponent to represent. But cos(1e-18) \approx 1 - 1e-18, which is beyond the capability of floating point to represent accurately - the exponent is pinned by the 1 part, then the 1e-18 falls off the bottom of the mantissa.
– dpwe
Commented Jul 24, 2014 at 21:28
• Maybe this is not an option, but to point out the obvious -- you know you could do this symbolically: `cos(x) - sin(x)`? The reason you are having problems is because Subtracting nearly equal numbers is badly behaved Commented Feb 27, 2015 at 14:01

You may try to work with logarithms when h gets too small. However, is there really a reason for having `h=10^-18`. It seems that if this is a problem you should consider finding another apporach.