DIRECTORY Real USING [SqRt], Vector2 USING [VEC]; Complex: CEDAR DEFINITIONS IMPORTS Real = BEGIN VEC: TYPE = Vector2.VEC; Add: PROCEDURE [a: VEC, b: VEC] RETURNS [VEC] = INLINE {RETURN[[a.x+b.x,a.y+b.y]]}; -- same as vector sum Sub: PROCEDURE [a: VEC, b: VEC] RETURNS [VEC] = INLINE {RETURN[[a.x-b.x,a.y-b.y]]}; -- same as vector difference Neg: PROCEDURE [a: VEC] RETURNS [VEC] = INLINE {RETURN[[-a.x,-a.y]]}; -- same as vector complement Mul: PROCEDURE [a: VEC, b: VEC] RETURNS [VEC]; -- complex product Div: PROCEDURE [a: VEC, b: VEC] RETURNS [VEC]; -- complex quotient Conjugate: PROCEDURE [a: VEC] RETURNS [VEC] = INLINE {RETURN[[a.x,-a.y]]}; -- complex conjugate AlmostEqual: PROCEDURE [a: VEC, b: VEC, mag:[-126..0] _ -20] RETURNS [BOOLEAN]; FromPolar: PROCEDURE [r: REAL, radians: REAL] RETURNS [VEC]; Abs: PROCEDURE [a: VEC] RETURNS [REAL] = INLINE {RETURN[Real.SqRt[a.x*a.x+a.y*a.y]]}; -- same as Vector.Mag SqrAbs: PROCEDURE [a: VEC] RETURNS [REAL] = INLINE {RETURN[a.x*a.x+a.y*a.y]}; -- good for checking tolerance Arg: PROCEDURE [a: VEC] RETURNS [REAL]; Exp: PROCEDURE [a: VEC] RETURNS [VEC]; Ln: PROCEDURE [a: VEC] RETURNS [VEC]; Sqr: PROCEDURE [a: VEC] RETURNS [VEC]; -- like Mul[a,a] SqRt: PROCEDURE [a: VEC] RETURNS [VEC]; -- complex square root END. PComplex.mesa Copyright c 1985 by Xerox Corporation. All rights reserved. Last edited by Michael Plass, January 4, 1984 11:53 am Written by Michael Plass, 28-Sep-81 Tim Diebert May 20, 1985 2:08:04 pm PDT Vector operations returns the angle from the x axis to a, in radians. complex exponential function complex natural logarithm Κς˜šœ ™ Icodešœ Οmœ1™J˜—Jšžœ˜—…— P