Threaded Mode | Linear Mode

toshk · (This post was last modified: 08-03-2020 06:30 AM by toshk.)

Ecc= Eccentricity
Fcs=Foci
Vtx=Vertex
Dtx=Directrix expression
Sym=Symmetry expression
Asy=Asymptotes expressions
Ctr=Center
LRe=Latus Rectum Length
Radius= Radius
eqRθ = Simplified Canonical Expression; Rotating Angle

usage;
plot(X,Y) in Adv. Graphing if there exist a conic in the plot;
(2*X*Y)+X^2+(Y^2)-3*X=0
vget()
or
Conics(expression in x,y) as standalone application.

examples;
Conics((2*x*y)+x^2+(y^2)-3*x)
Conics(x^2+y^2-2);
Conics(x^2+y-2);

Code:

#pragma mode( separator(.,;) integer(h32) )

Conics();

EXPORT vget()

BEGIN

LOCAL I,func,fund;

LOCAL funcs:={}; 

FOR I FROM 1 TO 10 DO

 IF Advanced_Graphing.ISCHECK(I MOD 10) THEN

    func:=LOWER(string(expr(CAS.cat("'V'",(I MOD 10))))); 

    fund:=CAS.expr(LEFT(func,(INSTRING(func,"=")-1)) +"-1*"+ "("+ (RIGHT(func,(DIM(func)-INSTRING(func,"=")))) +")"); 

    IF TYPE(denom(normal(fund)))==8 THEN fund:=numer(normal(fund)); END;

    fund:=approx(CAS.expand(fund)); 

    fund:=(STRING(fund)); 

IF SIZE(CAS.coeff(fund,"'x'"))==1 AND SIZE(CAS.coeff(fund,"'y'"))==1 AND TYPE(lcoeff(CAS.lcoeff(fund,"'x'"),"'y'"))==0 THEN

       funcs[size(funcs)+1]:=CAS.expr(fund);

END;    

IF SIZE(CAS.coeff((fund),"'x'"))<4 AND SIZE(CAS.coeff((fund),"'y'"))<4 AND (TYPE(CAS.lcoeff(fund,"'x'"))==0 AND TYPE(CAS.lcoeff(fund,"'y'"))==0) THEN    

       funcs[size(funcs)+1]:=(CAS.expr(fund));

END; 

END;    

END;

IF SIZE(funcs)>=1 THEN Conics(CAS.exact(funcs[1])); END;

END;

#CAS

Conics(ff)

BEGIN

LOCAL Aq,Bq,Cq,Dq,Eqq,Fq;

LOCAL A,BB,Dx,Sx,LRa;

LOCAL g,c,AA,AAA,r1,ffx;

LOCAL LL,LLL,LLLL,LLLLL;

LOCAL aa,bb,MM,CC,DD,RRR;

IF AAngle<>1 THEN AAngle:=1; END;

LL:={}; LLL:={}; LLLL:={}; LLLLL:={}; aa:={}; bb:={}; M25:={}; M26:={}; r1:={};

IF TYPE(lcoeff(ff,x))==0 THEN A:=SIGN(lcoeff(ff,x)); ELSE A:=1; END;

IF has(ff,x) THEN aa:=A*(coeff(ff,x)); ELSE return ("NOT A CONIC1"); END;

IF has(ff,y) THEN bb:=A*(coeff(ff,y)); ELSE return ("NOT A CONIC2"); END;

IF SIZE(aa)==0 OR SIZE(bb)==0 THEN          return ("NOT A CONIC3"); END;

IF SIZE(aa)>3  OR SIZE(bb)>3  THEN          return ("NOT A CONIC4"); END;

IF (SIZE(aa)==2 AND SIZE(bb)==2) AND (aa[2])==0 THEN return ("NOT A CONIC5"); END;

IF (SIZE(aa)==2 AND SIZE(bb)==2) AND (TYPE(aa[1])==0 AND TYPE(bb[1])==0) THEN return ("line"); END;

IFTE( SIZE(aa)==2,aa={0,aa[1],aa[2]},Aq=aa[1]);

Aq:=aa[1];

IF has(aa[2],y) THEN BB:=coeff(aa[2],y); Bq:=BB[1]; Dq:=BB[2]; ELSE Bq:=0; Dq:=aa[2]; END;

IF has(aa[3],y) THEN BB:=coeff(aa[3],y); Fq:=BB[SIZE(BB)]; ELSE Fq:=aa[3]; END;

IFTE( SIZE(bb)==2,bb={0,bb[1],bb[2]},Cq=bb[1]);

Cq:=bb[1];

IF has(bb[2],x) THEN BB:=coeff(bb[2],x); Eqq:=BB[2]; ELSE Eqq:=bb[2]; END;

IF has(bb[3],x) THEN BB:=coeff(bb[3],x); Fq:=BB[SIZE(BB)]; ELSE Fq:=bb[3]; END;

MM:=sum(sum([[Aq, Bq/2, Dq/2],[Bq/2, Cq, Eqq/2],[Dq/2, Eqq/2, Fq]]));

IF TYPE(MM)<>0 THEN return ("NOT A CONIC6"); END;

MM:=DET([[Aq, Bq/2, Dq/2],[Bq/2, Cq, Eqq/2],[Dq/2, Eqq/2, Fq]]);

IF MM==0 AND ((Dq^2 +Eqq^2 > ((Aq+Cq)*Fq)) OR (Dq^2 +Eqq^2 < ((Aq+Cq)*Fq)) OR (Dq^2 +Eqq^2 == ((Aq+Cq)*Fq)))  THEN return ("line"); END; 

LL:={(Bq*Eqq-2*Cq*Dq)/(4*Aq*Cq-Bq^2),(-2*Aq*Eqq+Bq*Dq)/(4*Aq*Cq-Bq^2)};

IF Bq==0 THEN  BB:=(Aq*(Dq/(2*Aq))^2)+(Cq*(Eqq/(2*Cq))^2)-Fq; RRR:=({(1/(aa[1]/BB)),(1/(bb[1]/BB))}); LLL:=ABS(RRR); END;

IF Bq<>0 THEN 

IF Aq<>Cq THEN r:=(ATAN(Bq/(Aq-Cq)))/2; AA:=approx(COS(r)); AAA:=approx(SIN(r)); ELSE r:=pi/4; AA:=COS(r); AAA:=SIN(r); END; 

CC:=AA*'x'- AAA*'y'; DD:=AAA*'x'+AA*'y'; 

ffx:=simplify((Aq*(CC)^2)+(Bq*(CC)*(DD))+(Cq*(DD)^2)+Dq*(CC)+Eqq*(DD)+Fq); 

aa:=SIGN(lcoeff(ffx,x))*(coeff(ffx,x)); IFTE( SIZE(aa)==2,aa={0,aa[1],aa[2]},0);

IF has(aa[2],y) THEN BB:=coeff(aa[2],y); Bq:=BB[1]; ELSE Bq:=0; END;

IF Bq<>0 THEN

aa:=SIGN(lcoeff(ffx,x))*(coeff(ffx,x)); IFTE( SIZE(aa)==2,aa={0,aa[1],aa[2]},0);

Aq:=aa[1];

IF has(aa[2],y) THEN BB:=coeff(aa[2],y); Bq:=ROUND(BB[1],2); Dq:=BB[2]; ELSE Bq:=0; Dq:=aa[2]; END;

IF has(aa[3],y) THEN BB:=coeff(aa[3],y); Fq:=BB[SIZE(BB)]; ELSE Fq:=aa[3]; END;

bb:=SIGN(lcoeff(ffx,x))*(coeff(ffx,y)); IFTE( SIZE(bb)==2,bb={0,bb[1],bb[2]},0);

Cq:=bb[1];

IF has(bb[2],x) THEN BB:=coeff(bb[2],x); Eqq:=BB[2]; ELSE Eqq:=bb[2]; END;

IF has(bb[3],x) THEN BB:=coeff(bb[3],x); Fq:=BB[SIZE(BB)]; ELSE Fq:=bb[3]; END;

ffx:=simplify((Aq*(x)^2)+(Bq*(x)*(y))+(Cq*(y)^2)+Dq*(x)+Eqq*(y)+Fq); 

END;

IF Bq==0 THEN M26:=Conics(ffx); ELSE return (M25); END;

LLLL:=M25[2,2]; LLLLL:=M25[3,2]; LL:=M26[4,2];

IF BBq<>0 THEN

M26[2,2]:={{AA*LLLL[1,1]-AAA*LLLL[1,2],AAA*LLLL[1,1]+AA*LLLL[1,2]},{AA*LLLL[2,1]-AAA*LLLL[2,2],AAA*LLLL[2,1]+AA*LLLL[2,2]}};

IF BBq<0 THEN

M26[3,2]:={{AA*LLLLL[1,1]-AAA*LLLLL[1,2],AAA*LLLLL[1,1]+AA*LLLLL[1,2]},{AA*LLLLL[2,1]-AAA*LLLLL[2,2],AAA*LLLLL[2,1]+AA*LLLLL[2,2]},{AA*LLLLL[3,1]-AAA*LLLLL[3,2],AAA*LLLLL[3,1]+AA*LLLLL[3,2]},{AA*LLLLL[4,1]-AAA*LLLLL[4,2],AAA*LLLLL[4,1]+AA*LLLLL[4,2]} };

END;

IF BBq>0 THEN

M26[3,2]:={{AA*LLLLL[1,1]-AAA*LLLLL[1,2],AAA*LLLLL[1,1]+AA*LLLLL[1,2]},{AA*LLLLL[2,1]-AAA*LLLLL[2,2],AAA*LLLLL[2,1]+AA*LLLLL[2,2]} };

END;

M26[4,2]:={AA*LL[1]-AAA*LL[2],AAA*LL[1]+AA*LL[2]};

IF rowDim(M26)==5 THEN M26[5,2]:=normal(Sxh); END;

END;

IF BBq==0 THEN

M26[2,2]:={AA*LLLL[1]-AAA*LLLL[2],AAA*LLLL[1]+AA*LLLL[2]};

M26[3,2]:={AA*LLLLL[1]-AAA*LLLLL[2],AAA*LLLLL[1]+AA*LLLLL[2]};

M26[4,2]:=Dxh;

M26[5,2]:=Sxh;

END;

M25:=ADDROW(M25,["eqRθ",{simplify(exact(ffx)),r*1_(rad)}],rowDim(M25)+1);

return (M26);

END;

MM:=DET([[Aq, Bq/2, Dq/2],[Bq/2, Cq, Eqq/2],[Dq/2, Eqq/2, Fq]]);

BB:=sqrt(((Aq-Cq)^2)+(Bq^2)); g:=(sqrt((2*BB)/(Aq+Cq+BB))); 

IF MM>0 THEN g:=-1; g:=(sqrt((2*BB)/(g*(Aq+Cq)+BB))); END;

IF MM<0 THEN g:=1;  g:=(sqrt((2*BB)/(g*(Aq+Cq)+BB))); END;

IF MM==0 AND ((Dq^2 +Eqq^2 > ((Aq+Cq)*Fq)) OR (Dq^2 +Eqq^2 < ((Aq+Cq)*Fq)) OR (Dq^2 +Eqq^2 == ((Aq+Cq)*Fq)))  THEN return ("line"); END; 

BBq:=(Bq^2)-4*Aq*Cq;

CASE

IF BBq<0 THEN IF (SIZE(aa)==3 AND SIZE(bb)==3) AND (Aq==Cq) AND Bq==0 THEN 

MSGBOX("circle"); r:=(sqrt(((LL[1])^2+(LL[2])^2)-Fq)); 

return (M25:=[["Radius", r ],["Ctr",LL ]]);

ELSE MSGBOX("ellipse"); 

c:=(sqrt(ABS(LLL[2]-LLL[1]))); 

IF (RRR[1])<(RRR[2]) THEN LLLL:={{LL[1],LL[2]+c},{LL[1],LL[2]-c}}; LLLLL:={{LL[1],LL[2]+sqrt(LLL[2])},{LL[1],LL[2]-sqrt(LLL[2])},{LL[1]+sqrt(LLL[1]),LL[2]},{LL[1]-sqrt(LLL[1]),LL[2]}};

ELSE

LLLL:={{LL[1]+c,LL[2]},{LL[1]-c,LL[2]}}; LLLLL:={{LL[1]+sqrt(LLL[1]),LL[2]},{LL[1]-sqrt(LLL[1]),LL[2]},{LL[1],LL[2]+sqrt(LLL[2])},{LL[1],LL[2]-sqrt(LLL[2])}}; END;

END;

M25:=[["Ecc", g],["Fcs", LLLL ], ["Vtx",LLLLL ],["Ctr", LL ]];

END;

IF BBq>0 THEN 

IF (Aq == -Cq) OR (-Aq == Cq) THEN MSGBOX("rectangular hyperbola"); ELSE MSGBOX("hyperbola"); END;

c:=sqrt(ABS(LLL[2])+ABS(LLL[1]));

IF (RRR[1]) < (RRR[2]) THEN

LLLL:={{LL[1],LL[2]+c},{LL[1],LL[2]-c}}; LLLLL:={{LL[1],LL[2]+sqrt(LLL[2])},{LL[1],LL[2]-sqrt(LLL[2])}}; 

Sx:={expr(cat("(",LL[2]+sqrt(ABS(LLL[2]/LLL[1]))*(x-LL[1]),")","-y")), expr(cat("(",LL[2]-sqrt(ABS(LLL[2]/LLL[1]))*(x-LL[1]),")","-y"))};

Aq:=sqrt(ABS(LLL[2]/LLL[1])); Bq:=1; Cq:=(LL[2]-(sqrt(ABS(LLL[2]/LLL[1]))*LL[1]))/sqrt(Aq^2+Bq^2); Dq:=(LL[2]+(sqrt(ABS(LLL[2]/LLL[1]))*LL[1]))/sqrt(Aq^2+Bq^2);

IFTE(Aq<>0, r1={r-ATAN(Bq/Aq),r+ATAN(Bq/Aq)}, r1={r+(pi/2),r+(pi/2)});

Sxh:={x*COS(r1[1])+y*SIN(r1[1])+Cq,x*COS(r1[2])+y*SIN(r1[2])-Dq};

ELSE

LLLL:={{LL[1]+c,LL[2]},{LL[1]-c,LL[2]}}; LLLLL:={{LL[1]+sqrt(LLL[1]),LL[2]},{LL[1]-sqrt(LLL[1]),LL[2]}};

Sx:={expr(cat("(",LL[2]+sqrt(ABS(LLL[2]/LLL[1]))*(x-LL[1]),")","-y")), expr(cat("(",LL[2]-sqrt(ABS(LLL[2]/LLL[1]))*(x-LL[1]),")","-y"))};

Aq:=sqrt(ABS(LLL[2]/LLL[1])); Bq:=1; Cq:=(LL[2]-(sqrt(ABS(LLL[2]/LLL[1]))*LL[1]))/sqrt(Aq^2+Bq^2); Dq:=(LL[2]+(sqrt(ABS(LLL[2]/LLL[1]))*LL[1]))/sqrt(Aq^2+Bq^2);

IFTE(Aq<>0, r1={r-ATAN(Bq/Aq),r+ATAN(Bq/Aq)}, r1={r+(pi/2),r+(pi/2)});

Sxh:={x*COS(r1[1])+y*SIN(r1[1])+Cq,x*COS(r1[2])+y*SIN(r1[2])-Dq};

END;

LLLLL:=sub(LLLLL,1,2);

M25:=[["Ecc", g],["Fcs", LLLL ], ["Vtx",LLLLL ],["Ctr", LL ], ["Asy", Sx ]];

END;

IF BBq==0 THEN MSGBOX("parabola"); g:=1;

IF aa[1]<>0 THEN bb:={bb[2],bb[3]}; aa:=SIGN(aa[1])*aa;  bb:=(SIGN(bb[1])*bb); BB:=bb[1]; bb:=bb/bb[1];

LLLLL[1]:=(-aa[2]/(aa[1]*2)); LLLLL[2]:=subst(-bb[2],x,LLLLL[1]);  LLLL:={LLLLL[1],LLLLL[2]+(SIGN(lcoeff(-bb[2])))*((BB/4/aa[1]))};

Dx:=expr(cat("(",LLLLL[2]-(SIGN(lcoeff(-bb[2])))*(BB/4/aa[1]),")","-y")); Sx:=expr(cat(LLLLL[1],"-x")); LRa:=BB/aa[1];

Dxh:=(x*COS(r+(pi/2))+y*SIN(r+(pi/2))-(LLLLL[2]-(SIGN(lcoeff(-bb[2])))*(BB/4/aa[1]))); Sxh:=(x*COS(r)+y*SIN(r))-LLLLL[1];

ELSE

aa:={aa[2],aa[3]}; bb:=SIGN(bb[1])*bb; aa:=(SIGN(aa[1])*aa); BB:=aa[1]; aa:=aa/aa[1]; 

LLLLL[2]:=-bb[2]/(bb[1]*2); LLLLL[1]:=subst(-aa[2],y,LLLLL[2]);; LLLL:={LLLLL[1]+(SIGN(lcoeff(-aa[2],y)))*(BB/4/bb[1]),LLLLL[2]};

Dx:=expr(cat("(",LLLLL[1]-(SIGN(lcoeff(-aa[2],y)))*(BB/4/bb[1]),")","-x")); Sx:=expr(cat(LLLLL[2],"-y")); LRa:=BB/bb[1];

Dxh:=(x*COS(r)+y*SIN(r))-(LLLLL[1]-(SIGN(lcoeff(-aa[2],y)))*(BB/4/bb[1])); Sxh:=(x*COS(r+(pi/2))+y*SIN(r+(pi/2)))-LLLLL[2];

END;

M25:=[["Ecc", g],["Fcs", LLLL ], ["Vtx",LLLLL ],["Dtx", Dx ], ["Sym", Sx ], ["LRe", LRa]];

END;

END;

M25;

END;

#end

scropsey · 06-21-2018, 06:39 PM

I copied the program over to the Prime and it passed the error check, but every time I try the Conics(expression), I get "NOT A CONIC".

Is there more to it?

toshk · 07-14-2018, 10:11 PM

(06-21-2018 06:39 PM)scropsey Wrote: I copied the program over to the Prime and it passed the error check, but every time I try the Conics(expression), I get "NOT A CONIC".

Is there more to it?

where is ur expression?

toshk · 02-26-2020, 11:14 PM