Simple Traps Tutorial for UltraFractal - Page 7
Progressive Parameters
Progressive parameters are parameters which are incremented with each iteration. They are visible only when the "expert" box is checked. The Progressive Parameters for Simple Traps Enhanced work in the same manner as the Progressive Parameters described in the Enhanced Formulas tutorial. Only those parameters unique to Simple Traps Enhanced will be discussed here. The first set of images uses the Rose of Troy function, which has three parameters. The first image is the base image.
Rose of Troy Base | Inc Polar1 = 0.05 |
Inc Polar1 = 0.05 Inc Polar2 = 0.1 |
Inc Polar3 = 0.008 |
SimpleRoseOfTroy { ; Copyright © 2007 by Ronald Barnett. ::M2uL4hn2tr1WvtOuR43DQ+PIona724IRdzuF8BrtbB2iWsL2ee3gRXsFOSUalYScC2f8d4dK HfLAt9AswBwIzw7z3MDF5HY9IpgRa/L3fnnHrh1Wh9/3NdDtV/S/U1PV/lx+389etpktDnGH 4trqZ7OGOJE51SeracCHx75WSXHBHuILLY2fIvixqyG2E2/X6pk2SvcyItix+roHRZPiCCy8 v/OxIJWBdVsd9l4unbZNDkpJvCyArpni9/n824h896HIFNs3whBBesRCdagMWRZ43qmkjw42 qu+yK8UfNrlvav/uOywQDdrYKKgGXNifIYxqlhBLDSziDDXm8IoHtcZcU6ysVIkXHZLFnEvI BlCLSPCdLANPEhWsKYZy93V3PCLSicRT23wHSYFF4NUNWsrq4r4+6av6m2KKpDw0xqnW8cdn vHM7jvh9/HP32Q+Co8vID+8BZYzLAayN1QQm92QF+nboTf9NQrul8S/I2/vL+vXoPUWDFaPD T75tuaihBbWOOPRaa7fmJWOw6ZzQI3YziySeMcRYSKKR0FKLUOVgEyIFhDWkwHnahaNFX0PZ UQ4mSQ4+7gVGIJDa4+gaw8p90q7vDm5PWVbDtiM6N132UiDOEWKaFIgCZmERfQXHm28D0dEa RVpvL8sgvWr2PwNflTHW7Q73Ic7rhGS2WBlV032PKL8HB/DhHIJbdZzEEXygFgWyT04J+EBd QogjUj7LkRcZVNBCKlVjDlIUNNSAPDbkJIBL4dpU0CQYCizhuLAG1QJ9XdkpvaX6jCVRFPRK EVoaN95OxARabFBYyam+azAOQ2Xa/m+6N8KnwcfNXaLMNC/OhBaUhMf0W/qM3dtFxyVFlr0F JPY/uG6fY9fO/P6D2YX9z0i1S/uWNHTYEFU21Pg9/T+uDA5pJp5AgLTOkyVe9G1MQ7VrBIMf NmPkcfzkqLAevmvfxUlXftncHIAEWD4LiDSrhYAl9XMwLNgHRPQXL9Yo141wyj3lnmeh0uWN 70qtj99s1qZn7+itGWNNRrAQMJUMJCRkVMyZqnIx2KSsipWxMtI3ggFvsjkhXB1oFBPC/gZm UThZTmmByw0N1QB5JQxukgNgWr96Tft6VhdzlZkRmQ5RZBw+OQgnbJd9vUJ31btB5tlR6gGH +YgeXnj4Nw+rhvSsj2USgNfUWh2boMxiBrjQ5Hm7Gm7FcdCu+AXXg1DYdAGpYXPRiF9tgvB7 VrUOufAszRd5ygD8O4uLsjNw8HQZdBHipyw/h+WyYI3ToVAfbgWOSK3Ii1MjRjIeTOHNiAOj csjcijc68unpraQG1JkEhcBCn8YPzE7wjjmYVmtTaoF64JRbBdwQ1aS7RP6C7xVJa2yI0uAR O2jj54YNOGzcbxaKGJuX0YJ6OqW37d6tqo3wGH2erouUeEfuNk381BeUf+8weewQuOoP3E1n bD7zlnFiH6nPP2PfewfOP+QE6n7G7nr/6qMoOM3mAYFjsixWxErYaubmRWuJNI3JPI/gEhcn 9fy55BysCeqQubuQOWH3k7u/TuyjIzKEaHmSkr+0n7+O5q9dkBW5zisytuSZ0VuNIJ0RG5I7 2m48ZRSJOVl6InlbDxydjxcMiRuHzmxkLzYcixynluo1Ufb1sKO80Qw3DfqTNuU9+JieSnKI wpNDkNpGOJnZMUt7hwHfQckN7kw1m4H6TKWgTkGzri9/SU7aXWynU5pG5ShiQA+WhT/6oQCh JyYhaaKes/ZaJ3u31/an9z27gcaxYUAnPD+eOfp0JOol/7f3v9+vxTWeXWXI2nXgKcg3G0Hb ES2IdLi+YLicHG4wfhqQHQMyKisixWxErYKXUZEvqQb2rIjUkRK2IlYkS1h5D4vTmgQfmv3h JJWqiOQP6A9YbeuuoE87Vj9G1UpK3f9CTfgw9QGj4WPiiLNejyqCeNBSRIIshhfnjcwmbAw+ F4YZev7Lcos9ufsltPxdHHenFnA47raaFNAKRcSvdipvhYwp9NPphaQuAZRV+gIjeDd1QaV2 empm2mOYpiEeGSZsdQ4qanmYIae3Z8g7lJREAFG2KjD3SJjtbEwgcIkFMDLiOELSnhFZuYB3 ajcs2IHr1GvRKTdkzsGgc2Fg5YFRCmbxw3CM1xRF4GpWsWUsEtdHDLW6ojcKgfRUsQ0UkEXD nNMaEUq2DX5/lqJciKETdgF2I39IvvgE6kjBH9SOE9CDmBfhhmvTwGB0zu9JX9JN+ByFOYGM IOKOJ1weWp89dKK0GCbcQeh16xqfFyDkFxPbRmUMSJOtDGK5FwAJku/clITxQ0mYh/+ojV8e jjSIcaCYPRm+YqIQ3WbEoR4nXEg0qeFkHo04ho8sztjkyGoHSeH676A5JN/KeQtvJcne62tw 3bqDOfwORAO8ZHxVWxPEL29uByHhjwIvpKeFCliiSVlGGFpKPKNcZW6KV5o0U5czrKMIb1K0 qM4S6SOUErL1MCBA6JQzwCKJ5zwNT4F4m5GJMfTIhBa7E3nkcC6YAvcQIA4RovB8y83gjazH JXOZogXl0qP/oiLmlnmLmjTEj6zRXNXMHnIGrRcOuYOHRMqjweKuYuSiYkBDnmLmzREj9SNn gLmPSEzs7BdZuYOCRM6LCdZuYONRMmLCdGuYuIRMmLCdAXMXLRM2LCdIXMnlIG50eJuYOKRM WqxuMXMnmIGVc3VyFzpIix4CuMXMHjIGD4flcxcKiYUXe5q4i5MExsw5+knjKmTxDj52knnK mjzDjejgLSFz55hxxEuAVMHnHGjNcdUxcUeYcMlzTFzZ4hxkgcCqYuMPMqP0eKqYuSeYMsQe MqYuIPMGqgPDVMHlHGLVwXkKmTwDjlK4LRFzH4h5IUAfRqYmzDjlmvrmKGXeYMd/6pixhHGH L/GVM3oi5GVM3oi5GVM3oi5/7UxEmkoZWJNLLDFmoqAalqig/rz1SOcz0tivFMjulb0r8Nme F0HoX5/psp89twVynYzZTx/H2P4xfqL+fK+UiPPTKGaUUJv3YS5yMpwG3M0+8NeUuxjyvb4R xl4hr9Nt4Skil4hr+Nt4SkiO7/T8mWOkIFzDD5T+mWcISx+Id+svpFHiUMmy1/mWOkIFTaxl fTLnkIFVwwFfTLnkIF1TQ8aeTLHnIFdY9V+mWuRkyNiUuRkyNiUuRkyNiUuRkyvDfTLRLzyW hy00rEoLHtcZa6qA9baJIw+mWWFnmmuMWVVkpLhJhBJBRxfK+X+PrcaANC== }
The next two images are for the function Ellipse Evolute.
Base | Inc Polar1 = 0.01 Inc Polar2 = 0.01 Inc Power = (1.00592,1.02071) |
SimpleEllipseEvolute { ; Copyright © 2007 by Ronald Barnett. ::Pl7qDhn2tvVWLSOyR43bo/PI0T2ed3tuPsJfo06BzC2v41gfsIbpUVJapUalyqvY/x7Ivzqq eY22wAL4cgBiIPiMivIyD9RX9r4WGe8vc7NBBsB2IBF+zDTLjkvMOOssR+yzzjnYkwgXG6YH RFZRBHJDHOyQ5xJBj43IrboM+sPgnmwo47LLjO7fJBtrkuB2GK8fNTxjdBN4VKhx+rJPkU+Q SUUZ4t3IskwLmIsjzdopTjshF82WQLehNMTRh/D+YCSDDmXwtDs3QxRRBsVMdbBvSoM0bkNp FWPQmm7Io5nJrglv9mJ8yyA9gYBahhSWRR3nGVXVlHnXnV/wdR3HlHlVVHFlmVlHMhPQRV3X kmnVUHgpHAk5u067jrrKu9m+5Vw/wS/F/6A3egzEFsQWbPSafCN33H0PMSo4JASXJPe/p+pw AYpXfDF+3hIYcDP9WaI3EL7ZkNGCcZQ8R8w48JmwegB3vEDgaUdaZO3JjzLSyv9mB62QHRm1 4AQP4A0ZK52bgpedXjDUCeNYlsQwMYgBbzjDdooLdx2Rh/o8yNRhAYklt9fheETbJdhgHBg6 GPhEffMoReFCaD2DhCM+9C0P8/IqUIdB/8ppgc+UbnHnXl9+TAoh5JW506G2g6EGB8u1J8Yg wGihjijVm9Z8Kqj0jhSDZ/o4g+990UU7sa1llpRCPrTOil9bQ1GMdBCpMFHEATg3ei75g4qQ mOLNzj4WdH8RTPNJMEG2Uwz1ye2eaYBxTR059z9759shikGgrcAL7eBzANqQmbtdvI3BtTp3 o0bsAooEGFONQ/D7+zN/xQIMn6PRb3hgcLlpVbQYGmKwiFU4fK8CDgfcTGnA4ykmU6597Vrg oX2bLkdIu94pjNT+gB49OUo6kgAzRBAOsDg4EOOtjXcyTsL8miy5hLdHKV5JJ7Q7keI4LPjH 3pcAK5w68MbH3B4ZwMbg1TzVKSbshj1LyGOxKmaFzsi5WxCho2Il6O4xk05xLvAyp3H9A8fY lx9UYpgSJpMsWbDiqzeY+9UtLCTkeYnIbu9E5FRczlZ4VmQ5hI9yCnCA1emGFJqnJyDg2pKB NNgngRG/gaq8kiNnYTIowdwR2HpDd4gYRuQnKMZCRiQalFKKVkHOPNceWwkEczBXkCsZAbCw i/W43i+nB+Gs3B6vA5dAeOurAdX3AgdkBpdwUJK/hgsEjXmHxrQqV5PC1EZGUInqzhDiiNjc ijscMqN3iSOTX5OyFOyla5FZNne5l1dgzyP2ZmZKg4FTbMi8QjBarui6BlOEnCNnoIWvCiQy VJ1JkciozCCnxk5EOORjTwYjlLCFbkoHty1f9C93Qm81rI39I6O418NfURfz1V9N8KJ1h1Nm S/G7hQNqK/mzL9bOv2vRdkvo+vxdDQjZ7OggN26frYajbNemtjcrYhVssxsLwx55IYzFbFac 2L04sZox9EoGd5Mvupx9QoGVGRuvQrZ3U0Yum7sDfa4H+YKsaOry6Mt0mzqiMDdQgO2dMOyZ Oy5nP9CnuKbsVZWRBCZKycmtIyvaHTzZ7Y0aq7YNz9y3GBXK+4kaJp6TUEzku1ihX/FJHSP8 wMjNUj7u4HuT8GF7iw124vhTK2iylBzLiTAVnOj764Lq8SYuUsoEgfY42vsKkSQYZtQPtAtO fiyfi42x5XmMJR2RYbtwGtwb0gL15uyk8FYv/D/67/Kf/y7y+iRh8GUZf+YSueQJyBpHR61j I11MwDAjVlOgYqVMxKmZFztiFOX39iCtZvkYkSNSZGpcjUhuMfB9Dytw0T8zOMbilqJXoneh em9KGdT5o3JrzG1CpKPf9MT/qwXhdMiPAR0cnJb0Ra59EJFhiwBG6dOyBHuBA7/GebWw7hiE K7V3bcZve2du8JLeDwPSGGFDAaR8cvjilfAbwpXHeUD1gcbiFV5GRW9G7qloVZvyM9MOMBua iIzg7ysGhrqTaCTM8uj9gPTSiIAKscQWHegiXH3LgBpJkNcGWkeJWUcGWU6iF8oN1JaTdiWb 9GurwRu0GAyVXAmrEsEMPggrDM9xRF4zDtYtoZJa7aDLW6on40A/DDRCRTTScN+MzoRQp6M8 F4PT2Q5qSM1rWYr80j8jGkQn0Gc0L/S0LO6M4LO2cVBbFQP7zG4qPqxPQu1BzAj4o4spGOzq gfuTbrOQYr8N98jEXJ/CsPQ2E/5FlSxUl42RwUyvCDkS0znrkaaOT9hcvv6EFvP4oEDvmAOT kpvrOB0t9mCaY+9kAkSmVQekSjXiy3deYF3NAzQ8pxbTwl/H5A9AsxCeOSg8bNLKTqTTrUtm rbOvOtosU1KsrXwjgonqiq4qadPmJkmGlHlotTSkxQxwHynUwnvqLzUiTTqjrr0zJ1Mn4kyi qsiMdH5OLfdcWVVKAqKOR+KBnmxkk88PDXLJfCuW6wrPRo//KVLQp4GHmS/9NpLyTNEYc43k 3lKPtLeaX80u4pdxT7in2FPtLeaX80u4pdxT7in2FPtLeaX+fj2l25pJQeT/XZSA07bi0Zge c3Hq5vgXgD38I+jEAdXRll0k40EN3IFlllJx5qOgRp6I67ElIZfDKR80foGEvs5KyPSSqryK ryrFPD7aiQ+EsgYuFUREyngFk/G88WuJ9Mg4ZAxzAinBEPDIeGQ8Mg4ZAxzAinBEPDIeGQ8M g4ZA53hMgEXm7+3NyXhBEYUfnpAJ+MKQ8/4au8vzjvr/9d8jjzbQ8cOhG/TAQHYn6IXTnh+9 WfAjG5XzlxHSkhajzngLDHiMs+/nhLDXiM0v4/3IXGfFiMk7f/twlx1EZYJm4bxlRLcO+++x 55VPZGeyM8kZ4JzwTmhnMDPZGeyM8kZ4JzwTmhnMDPZGfAZG6fpLVxZ15112fnNaOOyiiyLq c+50Y/FwknllVVnf9vam48oq0syPFJI/XAI0XYA= }