5

This question already has an answer here:

Look at the output of this link(scroll down to see the output) to find out what I'm trying to accomplish

The problem is with the for loop on line number 9-11

for(i=0; i<=0.9; i+=0.1){
  printf("%6.1f ",i);
}

I expected this to print values from 0.0 until 0.9 but it stops after printing 0.8, any idea why ??

marked as duplicate by Jens Gustedt, exexzian, Joseph Quinsey, iandotkelly, Donal Fellows Jan 25 '14 at 7:03

This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.

7

Using float here is source of problem. Instead, do it with an int:

int i;
for(i = 0; i <= 10; i++)
   printf("%6.1f ", (float)(i / 10.0));

Output:

0.0    0.1    0.2    0.3    0.4    0.5    0.6    0.7    0.8    0.9    1.0 
4

Adding as an answer as do not have enough reputation to comment.

Ideally floating point should not be used for iteration, but if you want to know why change ur code and see how.

for(float i=0; i<=0.9f; ){
    i+=0.1f;
    System.out.println(i);
}

Here is the result.

0.1
0.2
0.3
0.4
0.5
0.6
0.70000005
0.8000001
0.9000001

your 9th value exceeds 0.9.

  • Yes, but doesn't 0.9 in C also exceed 0.9 by the same amount? – Eric Jan 24 '14 at 20:29
  • Yes it does, here difference is, the increment is before printing the value. – Nirmal Mangal Jan 24 '14 at 20:52
  • Actually the key thing here is accumulation of errors due to summing - see my answer for at test case – Eric Jan 24 '14 at 21:05
1

Floating point arithmetic is inexact in computing. This is because of the way that a computer represents floating point values. Here's an excerpt from an MSDN article on the subject:

Every decimal integer can be exactly represented by a binary integer; however, this is not >true for fractional numbers. In fact, every number that is irrational in base 10 will also be >irrational in any system with a base smaller than 10.

For binary, in particular, only fractional numbers that can be represented in the form p/q, >where q is an integer power of 2, can be expressed exactly, with a finite number of bits.

Even common decimal fractions, such as decimal 0.0001, cannot be represented exactly in >binary. (0.0001 is a repeating binary fraction with a period of 104 bits!)

Link to the full article: https://support.microsoft.com/kb/42980

1

Floating point number cannot precisely represent decimals, so rounding errors accumulate:

#include <iostream>
#include <iomanip>
using namespace std;

int main() {
    float literal = 0.9;
    float sum = 0;
    for(int i = 0; i < 9; i++)
        sum += 0.1;

    cout << setprecision(10) << literal << ", " << sum << endl;
    return 0;
}

Output:

0.8999999762, 0.9000000954
0

You loop is right, but the float comparison in loops is not safe. The problem is that a binary floating point number cannot exactly represent 0.1

This would work.

    for(i=0.0; i<=0.9001; i+=0.1){
           printf("%6.1f ",i);

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