3.1.1 Ordinal types

With the exception of floating point value types, all base types are ordinal types. Ordinal types have the following characteristics:

  1. Ordinal types are countable and ordered, i.e. it is, in principle, possible to start counting them one by one, in a specified order. This property allows the operation of functions as Inc, Ord, Dec on ordinal types to be defined.
  2. Ordinal values have a smallest possible value. Trying to apply the Pred function on the smallest possible value will generate a range check error if range checking is enabled.
  3. Ordinal values have a largest possible value. Trying to apply the Succ function on the largest possible value will generate a range check error if range checking is enabled.

Remark: Int64 and QWord are considered ordinal types on 64-bit CPUs. On 32-bit types they have some of the characteristics of ordinals, but they cannot be used e.g. in for loops.

Integers

A list of pre-defined integer types is presented in table (3.1).


Table 3.1: Predefined integer types

Name

Integer
Shortint
SmallInt
Longint
Longword
Int64
Byte
Word
Cardinal
QWord
Boolean
ByteBool
WordBool
LongBool
QWordBool
Char


The integer types, and their ranges and sizes, that are predefined in Free Pascal are listed in table (3.2). Please note that the qword and int64 types are not true ordinals, so some Pascal constructs will not work with these two integer types.


Table 3.2: Predefined integer types

Type Range Size in bytes



Byte 0 .. 255 1
Shortint -128 .. 127 1
Smallint -32768 .. 32767 2
Word 0 .. 65535 2
Integer either smallint or longint size 2 or 4
Cardinal longword 4
Longint -2147483648 .. 2147483647 4
Longword 0 .. 4294967295 4
Int64 -9223372036854775808 .. 9223372036854775807 8
QWord 0 .. 18446744073709551615 8




The integer type maps to the smallint type in the default Free Pascal mode. It maps to either a longint in either Delphi or ObjFPC mode. The cardinal type is currently always mapped to the longword type.

Remark: All decimal constants which do no fit within the -2147483648..2147483647 range are silently and automatically parsed as 64-bit integer constants as of version 1.9.0. Earlier versions would convert it to a real-typed constant.

Remark: In newer Delphi versions, the longint type is platform and CPU dependent. This is not so in FPC, where longint is 32-bit on all platforms.

As a pascal compiler, Free Pascal does automatic type conversion and upgrading in expressions where different kinds of integer types are used:

  1. Every platform has a ”native” integer size, depending on whether the platform is 8-bit, 16-bit, 32-bit or 64-bit. e.g. On AVR this is 8-bit.
  2. Every integer smaller than the ”native” size is promoted to a signed version of the ”native” size. Integers equal to the ”native” size keep their signedness.
  3. The result of binary arithmetic operators (+, -, *, etc.) is determined in the following way:
    1. If at least one of the operands is larger than the native integer size, the result is chosen to be the smallest type that encompasses the ranges of the types of both operands. This means that mixing an unsigned with a smaller or equal in size signed will produce a signed type that is larger than both of them.
    2. If both operands have the same signedness, the result is the same type as them. The only exception is subtracting (-): in the case of unsigned-unsigned subtracting produces a signed result in FPC (as in Delphi, but not in TP7).
    3. Mixing signed and unsigned operands of the ”native” int size produces a larger signed result. This means that mixing longint and longword on 32-bit platforms will produce an int64. Similarly, mixing byte and shortint on 8-bit platforms (AVR) will produce a smallint.
Boolean types

Free Pascal supports the Boolean type, with its two pre-defined possible values True and False. These are the only two values that can be assigned to a Boolean type. Of course, any expression that resolves to a boolean value, can also be assigned to a boolean type.


Table 3.3: Boolean types

Name SizeOrd(True)



Boolean 1 1
Boolean8 1 1
Boolean16 3 1
Boolean32 4 1
Boolean64 8 1
ByteBool 1 Any nonzero value
WordBool 2 Any nonzero value
LongBool 4 Any nonzero value
QWordBool8 Any nonzero value




In addition to the simple Boolean type, the additional Boolean8, Boolean16, Boolean32 and Boolean64 types exist. There are in fact integer types, which are assignment-compatible with the simple boolean type. As an integer, the values for True and False are 1 and 0. This can be used to interfac with C code that defines a boolean of this size with values 0 and 1.

To make interfacing with C even easier, Free Pascal also supports the ByteBool, WordBool, LongBool and QWordBool types. These are of type Byte, Word, Longint or Int64, but are again assignment compatible with a Boolean. The only difference with the Boolean8/16/32/64 types is in what values are considered true or false: The value False is equivalent to 0 (zero) and any nonzero value is considered True when converting to a boolean value. A boolean value of True is converted to Not(0) in case it is assigned to a variable of type ByteBool, WordBool, LongBool or QWordBool.

Assuming B to be of type Boolean, the following are valid assignments:

 B := True;  
 B := False;  
 B := 1<>2;  { Results in B := True }

Boolean expressions are also used in conditions.

Remark: In Free Pascal, boolean expressions are by default always evaluated in such a way that when the result is known, the rest of the expression will no longer be evaluated: this is called short-cut boolean evaluation.

In the following example, the function Func will never be called, which may have strange side-effects.

 ...  
 B := False;  
 A := B and Func;

Here Func is a function which returns a Boolean type.

This behaviour is controllable by the {$B } compiler directive.

Enumeration types

Enumeration types are supported in Free Pascal. On top of the Turbo Pascal implementation, Free Pascal allows also a C-style extension of the enumeration type, where a value is assigned to a particular element of the enumeration list.

_________________________________________________________________________________________________________
Enumerated types

--enumerated type (---|--identifier list-----) ----------------------
                    --assigned enum-list---|
                            ,

--identifier list-|identifier ------------------------------------------
              ----,----

--assigned enum list--|identifier-:= - expression ------------------------
                  -----------,-----------
___________________________________________________________________

(see chapter 12, page 534 for how to use expressions) When using assigned enumerated types, the assigned elements must be in ascending numerical order in the list, or the compiler will complain. The expressions used in assigned enumerated elements must be known at compile time. So the following is a correct enumerated type declaration:

Type  
  Direction = ( North, East, South, West );

A C-style enumeration type looks as follows:

Type  
  EnumType = (one, two, three, forty := 40,fortyone);

As a result, the ordinal number of forty is 40, and not 3, as it would be when the ’:= 40’ wasn’t present. The ordinal value of fortyone is then 41, and not 4, as it would be when the assignment wasn’t present. After an assignment in an enumerated definition the compiler adds 1 to the assigned value to assign to the next enumerated value.

When specifying such an enumeration type, it is important to keep in mind that the enumerated elements should be kept in ascending order. The following will produce a compiler error:

Type  
  EnumType = (one, two, three, forty := 40, thirty := 30);

It is necessary to keep forty and thirty in the correct order. When using enumeration types it is important to keep the following points in mind:

  1. The Pred and Succ functions cannot be used on this kind of enumeration types. Trying to do this anyhow will result in a compiler error.
  2. Enumeration types are stored using a default, independent of the actual number of values: the compiler does not try to optimize for space. This behaviour can be changed with the {$PACKENUM n} compiler directive, which tells the compiler the minimal number of bytes to be used for enumeration types. For instance
    Type  
    {$PACKENUM 4}  
      LargeEnum = ( BigOne, BigTwo, BigThree );  
    {$PACKENUM 1}  
      SmallEnum = ( one, two, three );  
    Var S : SmallEnum;  
        L : LargeEnum;  
    begin  
      WriteLn (’Small enum : ’,SizeOf(S));  
      WriteLn (’Large enum : ’,SizeOf(L));  
    end.

    will, when run, print the following:

    Small enum : 1  
    Large enum : 4

More information can be found in the Programmer’s Guide, in the compiler directives section.

Subrange types

A subrange type is a range of values from an ordinal type (the host type). To define a subrange type, one must specify its limiting values: the highest and lowest value of the type.

_________________________________________________________________________________________________________
Subrange types

--subrange type-constant ..- constant--------------------------------
___________________________________________________________________

Some of the predefined integer types are defined as subrange types:

Type  
  Longint  = $80000000..$7fffffff;  
  Integer  = -32768..32767;  
  shortint = -128..127;  
  byte     = 0..255;  
  Word     = 0..65535;

Subrange types of enumeration types can also be defined:

Type  
  Days = (monday,tuesday,wednesday,thursday,friday,  
          saturday,sunday);  
  WorkDays = monday .. friday;  
  WeekEnd = Saturday .. Sunday;