üK  ³ ÿ()ñ"H"ñÿ()ñ"E"Z³"This program iterates and plots the results of the function z=Lz(1-z) of which the"Z³"Mandelbrot equation is simply a special form. In addition to the usual parameters,"Y(³"input a complex number L (real constant + I constant) which will seed the pattern"$2³"and give endless variations!"<³cF³"Axis values may have to be adjusted for best results - use the test option liberally!"³³ &P… ploô,scrnloaä,scrnsavå,Zž "(T)est or (F)ull screen ";screeî 6d (ÿ%(screeî)ï"T")ò(ÿ%(screeî)ï"F")ì â Z!nclôìÿ()ñ"E"ñÿ()ñ"H"-xsetçìÿ()ñ"0"ñÿ()ñ"E"ñÿ()ñ"f";‚setøìÿ()ñ"e"ñÿ()ñ"1"ñÿ()ñ"Y"ñÿ(;)ñÿ( )MŒ³"Parameters for horizontal axis?"ž "x min ";xmiîž "x max ";xmaør–³"Parameters for vertical axis?"ž "y min ";ymiîž "y max ";ymaøž "Maximum number of iterations ";ôS ž "Real constant ";ãž "I constant ";äž "Please name screen file ";á6ª ÿs(á)ï"" â ³ "Filename already exists"œ  ´áìáñÿ()¾æì³ setçNÈ ÿ%(screeî)ì"T" â highùìhighøìH ’ highùìÿhighøìÏVÒtwentùìfouòìtwïìsideøìxmaøòxmiîsideùìymaøòymiîoÜgapøìsideøô(highøô)øìxmiîgapùìsideùôhighùùìymaøoldéìòìrìì/æ™ ùìhighù ã  à òùìùògapù.ð™ øì ã highø à øìøñgapøú ÿuï"" â TáìøâìùéìôË éðô ÷ áóáñâóâîfouòúì(ãóá)ò(äóâ)ò(ãóáóá)ñ(twïóáóäóâ)ñ(ãóâóâ)âì(ãóâ)ñ(áóä)ò(twïóãóáóâ)ò(áóáóä)ñ(äóâóâ)áìúéìéñÊ, éëô â ëì ’ ëìéú()ñ*" ëï â ploô (ø,ù,æ)7, ëì â x±ìøñ ploô(x±,ù,æ)6«øìxmiî«@Ë ÿuì""Ê J ÿ%(screeî)ï"T" â › †T³ setøreplùì""d^ ÿ%(screeî)ì"T" â ³"Do you wish to save full screen of present test? (y/n) "replùìÿv()-h ÿ%(replù)ì"Y" â screeîì"F"œ ¾Ar³³ "Do you want to make another run? (y/n) "replùìÿv().| ÿ%(replù)ì"Y" â Z ’ ‚"catalog."“† scrnsavå(á,å)9 åï â ³ "Screen save error - try again!" ’ ¤6š³"Type new file name ";ááìáñÿ()œ †¤Àá,å)9 åï â ³ "Screen save error - t