# Float number behavior

My roommate just came up with a question.

Why in php, maybe other languages as well(?) floor(\$foo) and (int)\$foo is 7 ?

``````\$foo = (0.7 + 0.1) * 10;
var_dump(
\$foo,
floor(\$foo),
(int)\$foo,
ceil(\$foo),
is_infinite(\$foo),
is_finite(\$foo));
``````

result

``````float(8)
float(7)
int(7)
float(8)
bool(false)
bool(true)
``````

Notice that \$foo is not infinite number.

From answers I can see that everyones says that it is actually x.(9) But what is reason behind number being x.(9) and not actual x as it should be in real life?

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`\$foo` is not infinite in decimal but it is infinite in binary. –  Pascal Cuoq Jul 7 '13 at 14:33

A rational number will become a repeating decimal if the denominator isn't the base's prime factor(s). Float in computers are almost base-2, so any number whose rational representation's denominator is not a power of 2 would be an infinite periodic decimal. For example 0.1 would be rounded to 0.100000001490116119384765625 which is the nearest sum of power of 2s

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Not always. If you end up with 8.0000001 due to floating point imprecision, the floor will snap to 8. Sometimes it may be 7.999999, which will snap to 7.

Chances are, if you're multiplying 0.x by y(which is read as an int in most languages), it will come out whole, so you won't see this behavior.

This is similar in other languages as well.

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Because 0.7 and/or 0.1 are internally actually 0.6999999.... or 0.09.....

That means your (0.7 * 0.1) comes out as something more like 0.7999..... After multiplying by 10 and int/flooring, you end up with 7.

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The floor function rounds down to nearest integer. Casting to int simply throws away the decimal part. `\$foo` is a float, and it is not exactly 8, (must be 7.99999...) so you can observe that behavior.

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