For example:
9 / 5 #=> 1
but I expected 1.8
. How can I get the correct decimal (non-integer) result? Why is it returning 1
at all?
For example:
9 / 5 #=> 1
but I expected 1.8
. How can I get the correct decimal (non-integer) result? Why is it returning 1
at all?
It’s doing integer division. You can make one of the numbers a Float
by adding .0
:
9.0 / 5 #=> 1.8
9 / 5.0 #=> 1.8
.to_f
answer is better if you're dividing two variables that contain integers, e.g. a.to_f / b
. If you're literally dividing two hard-coded integers (which is probably weird), then using 9.0 / 5
is fine.
– jefflunt
Aug 5 '16 at 18:20
It’s doing integer division. You can use to_f
to force things into floating-point mode:
9.to_f / 5 #=> 1.8
9 / 5.to_f #=> 1.8
This also works if your values are variables instead of literals. Converting one value to a float is sufficient to coerce the whole expression to floating point arithmetic.
There is also the Numeric#fdiv
method which you can use instead:
9.fdiv(5) #=> 1.8
You can check it with irb:
$ irb
>> 2 / 3
=> 0
>> 2.to_f / 3
=> 0.666666666666667
>> 2 / 3.to_f
=> 0.666666666666667
You can include the ruby mathn
module.
require 'mathn'
This way, you are going to be able to make the division normally.
1/2 #=> (1/2)
(1/2) ** 3 #=> (1/8)
1/3*3 #=> 1
Math.sin(1/2) #=> 0.479425538604203
This way, you get exact division (class Rational) until you decide to apply an operation that cannot be expressed as a rational, for example Math.sin
.
Fixnum#to_r is not mentioned here, it was introduced since ruby 1.9. It converts Fixnum into rational form. Below are examples of its uses. This also can give exact division as long as all the numbers used are Fixnum.
a = 1.to_r #=> (1/1)
a = 10.to_r #=> (10/1)
a = a / 3 #=> (10/3)
a = a * 3 #=> (10/1)
a.to_f #=> 10.0
Example where a float operated on a rational number coverts the result to float.
a = 5.to_r #=> (5/1)
a = a * 5.0 #=> 25.0
def method; a - b/8; end
would return the result of the calculation from the method, as the last expression in a method call is the return value. – Phrogz Mar 31 '11 at 16:33