# Real vs. Integer in Fortran

I have a program which loops over one variable and computes a value at each step:

``````  program cpout

implicit none

!declarations
integer, parameter :: dp = selected_real_kind(15)
! kind value for double precision

real(dp), parameter :: Ru = 8.314472_dp
real(dp) :: cp
integer :: loT, hiT, i
real(dp) :: iT
real(dp),dimension(14) :: ic8a
real(dp) :: ic8t
real(dp) :: ic8c

loT = 300
hiT = 3000

! ic8a is populated using a subroutine call
! I have checked, it reads in reals as it is supposed to

do i = loT, hiT, 1

iT = real(i,dp)

if (iT > ic8t) then
ic8c = Ru*(ic8a(1) + ic8a(2)*iT + ic8a(3)*(iT**2)
*                 + ic8a(4)*(iT**3) + ic8a(5)*(iT**4))
else
ic8c = Ru*(ic8a(8) + ic8a(9)*iT + ic8a(10)*(iT**2)
*                 + ic8a(11)*(iT**3) + ic8a(12)*(iT**4))
end if

end do

end program cpout
``````

In my first attempt, I used `iT` as the integer loop counter, and then used it directly in the formula. This produced a piecewise graph for `iT` > `ic8t`. When I added `i` as the counter, and converted `iT` to real before using it in the formula, the graph came out smooth as it should. Why should it matter whether `iT` is real or integer when plugging in to the formula? My compiler is g77.

EDIT: The formula gives some inaccurate values for `iT` < `ic8t` as well.

-
It looks like you ran into an issue with an implicit type conversion - something was cast into an integer where it should have been real. I tried a few simple cases with my copy of g77 to see if I could reproduce this and was unable to - trying the sample code above wouldn't compile since my copy of g77 didn't like the fortran 90 constructs. –  Tim Whitcomb Sep 20 '11 at 15:37
How is your g77 able to compile a Fortran 90 code? Isn't g77 just a symlink to some different compiler on your system? –  Vladimir F Sep 21 '11 at 13:44
@Vladimir, I am using the 'Force' program which I believe uses g77 on the back end. It seems that the compiler supports some Fortran 90 features but not others, which is consistent with the g77 webpage documentation. –  astay13 Sep 21 '11 at 19:58

If you just use INTEGER variable `i` (as you mentioned in your comment) you probably have arithmetic overflow. You can either convert `i` to REAL as you did or choose an appropriate kind parameter for it. A small example:

``````PROGRAM ex

IMPLICIT NONE

INTEGER, PARAMETER :: long = selected_int_kind(10)

! Here we have arithmetic overflow
! PRINT *, 2000**3
! But not here
PRINT *, 2000_long**3

END PROGRAM ex
``````
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the version of the program that I posted is the working version. What I am trying to find is the spot where the program doesn't work if `i` is used in the formula instead of `iT`. –  astay13 Sep 20 '11 at 17:47
Than you probably have an arithmetic overflow when rising some thousands to the power more than 2, i.e. when i will be 2000 the attempt to calculate 2000**3 will cause arithmetic overflow. So you basically calculate wrong numbers. You can use selected_int_kind() intrinsic function to choose appropriate kind parameter for your INTEGER variable i or just make it REAL as you did. –  Wildcat Sep 20 '11 at 18:01
Thanks! I used a larger integer type and it fixed the problem. –  astay13 Sep 21 '11 at 21:12