# Finding the distance between 2 3D points

I'm running into a problem where my square of X is always becoming infinite leading to the resulting distance also being infinite, however I can't see anything wrong with my own maths:

``````// Claculate distance

xSqr = (x1 - x2) * (x1 - x2);
ySqr = (y1 - y2) * (y1 - y2);
zSqr = (z1 - z2) * (z1 - z2);

double mySqr = xSqr + ySqr + zSqr;

double myDistance = sqrt(mySqr);
``````

When I run my program I get user input for each of the co-ordinates and then display the distance after I have run the calulation.

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What is the range of your co-ordinants? –  GWW Jan 28 at 18:04
Did you debug the inputs? (What are `x1` and `x2` just before you calculate the distance?) –  leemes Jan 28 at 18:06
How are the variables x1 and x2 declared? –  Étienne Jan 28 at 18:17

If your inputs are single-precision `float`, then you should be fine if you force double-precision arithmetic:

``````xSqr = double(x1 - x2) * (x1 - x2);
//     ^^^^^^
``````

If the inputs are already double-precision, and you don't have a larger floating-point type available, then you'll need to rearrange the Euclidean distance calculation to avoid overflow:

``````r = sqrt(x^2 + y^2 + z^2)
= abs(x) * sqrt(1 + (y/x)^2 + (z/x)^2)
``````

where `x` is the largest of the three coordinate distances.

In code, that might look something like:

``````double d[] = {abs(x1-x2), abs(y1-y2), abs(z1-z2)};
if (d[0] < d[1]) swap(d[0],d[1]);
if (d[0] < d[2]) swap(d[0],d[2]);
double distance = d[0] * sqrt(1.0 + d[1]/d[0] + d[2]/d[0]);
``````

or alternatively, use `hypot`, which uses similar techniques to avoid overflow:

``````double distance = hypot(hypot(x1-x2,y1-y2),z1-z2);
``````

although this may not be available in pre-2011 C++ libraries.

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Try this:

``````long double myDistance=sqrt(pow(x1-x2,2.0)+pow(y1-y2,2.0)+pow(z1-z2,2.0));
``````
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Still gives the same results, thanks for the input though :) –  TotalJargon Jan 28 at 18:29