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SUBROUTINE HIDGV (Z0, Z1,ZE,Z2, MX,MY, NX,NY, LX,LY, S, T, X PL2) C$ (General View) C$ Make a hidden-line drawing of a surface defined in C$ Cartesian coordinates on a uniform grid, permitting the C$ specification of general 4-D transformations on the C$ surface. The arguments are: C$ C$ Z0......Cutoff value. Only function values, ZE(I,J), above C$ (S .GT. 0.0) or below (S .LT. 0) Z0 are visible. C$ ZE......Array containing the surface. ZE(I,J) = C$ F(X(I),Y(J)). C$ Z1,Z2...Span of surface values. C$ MX,MY...Actual declared dimensions of the array ZE(*,*). C$ NX,NY...Sections of ZE(*,*) actually used. C$ LX,LY...Increments in X and Y directions (.GT. 0). Values C$ of LX and LY larger than 1 produce a coarser mesh C$ on the drawing without losing the smoothness of the C$ complete surface. LX should be an integral divisor C$ of NX-1, and LY of NY-1. If this is not the case, C$ the next smallest value which satisfies this C$ requirement is used internally. C$ S.......=+1.0, graph positive part of function, C$ =-1.0, graph negative part of function, C$ = 0.0, graph both positive and negative parts. C$ If S = 0.0, the cutoff value Z0 has no effect. C$ T(4,4)..4-D transformation matrix defining orientation of C$ the surface. The window coordinates of a point C$ (X,Y,Z,1.0) are (U,V,W,H) = (X,Y,Z,1.0) T. X, Y, C$ and Z are computed in the range 0..1, and Z is C$ obtained from the function values by scaling the C$ range Z1..Z2 onto 0..1. A point (U,V,W,H) is C$ visible if U/H, V/H, and W/H lie in the range 0..1. C$ PL2.....2-D pen movement subroutine, usually PL2CA C$ C$ (04-FEB-82)