Intel® Fortran Compiler 17.0 Developer Guide and Reference
Statement and Attribute: Allows the specific name of an intrinsic procedure to be used as an actual argument.
The INTRINSIC attribute can be specified in a type declaration statement or an INTRINSIC statement, and takes one of the following forms:
Type Declaration Statement:
type,[att-ls,] INTRINSIC [, att-ls] :: in-pro[, in-pro]...
Statement:
INTRINSIC [::] in-pro[, in-pro] ...
type |
Is a data type specifier. |
att-ls |
Is an optional list of attribute specifiers. |
in-pro |
Is the name of an intrinsic procedure. |
In a type declaration statement, only functions can be declared INTRINSIC. However, you can use the INTRINSIC statement to declare subroutines, as well as functions, to be intrinsic.
The name declared INTRINSIC is assumed to be the name of an intrinsic procedure. If a generic intrinsic function name is given the INTRINSIC attribute, the name retains its generic properties.
Some specific intrinsic function names cannot be used as actual arguments. For more information, see table Specific Functions Not Allowed as Actual Arguments in Intrinsic Procedures.
The following example shows a type declaration statement specifying the INTRINSIC attribute:
PROGRAM EXAMPLE
...
REAL(8), INTRINSIC :: DACOS
...
CALL TEST(X, DACOS) ! Intrinsic function DACOS is an actual argument
The following example shows an INTRINSIC statement:
Main Program |
Subprogram |
---|---|
EXTERNAL CTN |
SUBROUTINE TRIG(X,F,Y) |
INTRINSIC SIN, COS |
Y = F(X) |
. . . |
RETURN |
END |
|
CALL TRIG(ANGLE,SIN,SINE) |
|
. . . |
FUNCTION CTN(X) |
CTN = COS(X)/SIN(X) |
|
CALL TRIG(ANGLE,COS,COSINE) |
RETURN |
. . . |
END |
CALL TRIG(ANGLE,CTN,COTANGENT) |
Note that when TRIG is called with a second argument of SIN or COS, the function reference F(X) references the Standard Fortran library functions SIN and COS; but when TRIG is called with a second argument of CTN, F(X) references the user function CTN.
The following shows another example:
INTRINSIC SIN, COS
REAL X, Y, R
! SIN and COS are arguments to Calc2:
R = Calc2 (SIN, COS)