According to http://www.microapl.co.uk/apl/APL1_2.PDF, there are circle function between ¯12 and 12. For example, functions 1, 2, and 3 are respectively sin
, cos
, and tan
. I found on this reference what are functions ¯7 to 7. However, I didn't find what are functions 8 to 12 (and their reciprocals). Could anybody point me what they are?
I've looked at the reference of APL X, but I can not find a description of the left arguments, which allows a maximum range of 12 to 12. Where did you read that there is this range of values?
Dyalog APL allows a range from 12 to 12, here's a quote from the Dyalog APL Reference:
R ← X ○ Y
Y must be numeric. X must be an integer in the range ¯ 12 ≤ X ≤ 12 R is numeric.
Perhaps you are confusing APL X and Dyalog APL.
These are the (Dyalog) operations for each value of X
(X) ○ Y  X  X ○ Y
++
(1Y*2)*.5  0  (1Y*2)*.5
Arcsin Y  1  Sine Y
Arccos Y  2  Cosine Y
Arctan Y  3  Tangent Y
(Y+1)×((Y1)÷Y+1)*.5 4  (1+Y*2)*.5
Arcsinh Y  5  Sinh Y
Arccosh Y  6  Cosh Y
Arctanh Y  7  Tanh Y
8○Y  8  (1+Y*2)*0.5
Y  9  a
+Y  10  Y
b×0J1  11  b
*Y×0J1  12  θ
X determines which of a family of trigonometric, hyperbolic, Pythagorean and complex functions to apply to Y, from the following table.
Note that when Y is complex, a and b are used to represent its real and imaginary parts, while θ represents its phase.

I read it into the reference I gave in the question. I don't really care of which implementation of APL. What I'd like to know is what are operations for each value of
X
. – Charles Brunet Feb 7 '13 at 12:40 
I updated my answer, this is the explanation of the Dyalog APL reference. – CrazyMetal Feb 7 '13 at 13:13

Well, it is almost clear now... Does
8○Y
means the negative of8○Y
? What area
andb
? Real and Imaginary parts? – Charles Brunet Feb 7 '13 at 13:33 
I have updated my answer again. To the Parameter 8 I can not find any detailed information. I hope that I could help a bit – CrazyMetal Feb 7 '13 at 14:23
In his "Dictionary of APL" Iverson defined even more, from 15 to 15: http://www.jsoftware.com/papers/APLDictionary1.htm#circle