# Rounding float to the nearest factor?

I have a small math problem I am trying to solve

Given a number x and resolution y, I need to find the next x' with the required resolution.

e.g.

``````x = 1.002     y = 0.1   x'= 1.1

x = 0.348     y = 0.1   x'= 0.4

x = 0.50      y = 1     x'= 1

x = 0.32      y = 0.05     x'= 0.35
``````

Is there any smart way of doing this in Python?

-

``````import math

def next_multiple(x, y):
return math.ceil(x/y)*y

def try_it(x, y):
print x, y, next_multiple(x, y)

for x, y in [
(1.002, 0.1),
(0.348, 0.1),
(0.50, 1),
(0.32, 0.05)
]:
try_it(x, y)
``````

produces:

``````1.002 0.1 1.1
0.348 0.1 0.4
0.5 1 1.0
0.32 0.05 0.35
``````

I think your first example output is wrong, The correct answer for x' is 1.1, right?

-
It doesn't work for `x=0`. –  J.F. Sebastian Dec 7 '08 at 16:19
It works for x=0 just as it works for any x that is a multiple of y: the "next" is interpreted to mean "the smallest one not smaller than", so x=0.1, y=0.1 would print 0.1. If you want "the smallest one strictly greater than", you should do "return (math.floor(x/y)+1)*y". –  ShreevatsaR Dec 7 '08 at 16:54
Or "return math.floor(x/y+1)*y", because floor(t)+1 = floor(t+1) :-) –  ShreevatsaR Dec 7 '08 at 16:57