http://www.mapleprimes.com/questions/144402-Finding-Zero-Slope-Of-An-Implicit-Function en-us 2026 Maplesoft, A Division of Waterloo Maple Inc. Maplesoft Document System Thu, 11 Jun 2026 08:13:29 GMT Thu, 11 Jun 2026 08:13:29 GMT The latest answers and comments added to the Question, Finding zero slope of an implicit function http://www.mapleprimes.com/images/mapleprimeswhite.jpg http://www.mapleprimes.com/questions/144402-Finding-Zero-Slope-Of-An-Implicit-Function http://www.mapleprimes.com/questions/144402-Finding-Zero-Slope-Of-An-Implicit-Function?ref=Feed:MaplePrimes:Finding zero slope of an implicit function:Comments#answer144404 <p>Here is an example.</p> <p><img 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" alt=""></p> <p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAZoAAAARCAIAAABrZP2bAAAESklEQVR4nO2bLVP0PBSG+wOQ/JC1nUEikAgEAtnJrKhArOzMCkQFM6lEIBArEbgYRCUCUYFg3hoEYgUCUYFA5BX9ysdJm3Qbloc5l4Et3eTuobl7TpIGHEEQ5E8Q7FsAgiDIPKCdIQjyRxi0s5KGQRAEIS0tWmpOJsyl+6qqlsvl19eXcjzLssvLy/f3d5fGbEnTdLVafX9/W57vVczfBgz1arXCYCI+MNtZScOAMM4ZsfQzzksaurkZj6KoKArl4MvLy+np6aDdMDomiZFAQr6GLMseHh5sFFqImUDj/daRFa7H/ivTmVOeHurtdushpAhitjNGHBMtdzcriuLi4kI/vtls1uv1YD9WA601ZN6MNkFcnueDXdiLmUL3hBAUDtJHVr0QH8wrDwx1kiSbzWYeuQjSYrAzRtwHTUlDt8whjuObmxv9+N3d3YCD1JmDhThpMCoXZG9nw2ImIea7VrlvyVh3iq2X/xp5YKjzPD8+Pp5DLYL0AHbWl2khLbWPnPO+GFGOhfQ/db6NEeEc5WuLxeLx8VEXMOQgJSWUWSUNgpuVNFSqoOl2VoejaYwRubxSK9waRatkEbYJkPR18xcaAQY72os8MNQfHx8HBwcu7SLIOHB21t/S/f3MSP2zpGE/BPqMTMzNFA8jtJQPNs0fHh6+vr7qvWdZdn19DesKaWmZMnTWCU0BPT09LZfLkSaMYuprnVCOt8Jkv3BKtsZ7lZscn2X0LM8U6iAIPj8/XaQhyAignYnPZKWEVB/X3e0r3cdCaVdSypRh0dpREARvb29K3/f39ycnJ/paJ+8M1SpjGMzNOOecx3GcpunwiDKJkSzdkZ38wmp6UqoWHd3Mizww1OB/H0F2AbIzwLKE2lG6u7vP8lO5a6FJzXp7E+eKTXZ2dHRkcBBTgTRyCeD8eZIk6/V61M5AMaZ5Qs/VnOVaSx/t+lmyd3lgqNHOkNkB7Ax4IrejF0jVIDdr/1DXhpIViWcNFJtpmiqaSF8+jdea8igE0rOiKOI4HmzDLIZzRsPpE/LqEoVtO200rTsQg7Y/eaZQY7GJzA68FNDNcQnr74RxybZEk2AkIEyxHNG7pFHRfVgsFnme6wLU2XfZRC3qH21NU0tBdlnZrJOQJhJdiFxw3gmhZD4jndYRorbu51keLgUgP4ZuZ6KbARWJeaFTHD3ajLDQVveHOI5vb291TYKDdHmdlua1W3xVqwIKKmBYi2MM9DtIDLCqucsEmkFa85gQfi21azJce8vOm9NmkNeBGzWQH0Ozs4nrdVMoiuLs7Ew/7rhz1Xm2mwNjzNiIj2208wHLnhIRb4B2dnV1hdtokdlp7aypKxzmSmYhiqLn52floP17RZNXGMU3b4Yb8fOS0wyospuS3H2nmGf0l5yqqjo/P/+FIUX+dbrsTCqkfoyqqqIoMr2Cvt1ufXQ67RV0T2JmQ91B+ysAQ50kCa5pIj74H8qOvdP6j3JrAAAAAElFTkSuQmCC" alt=""></p> <p><img src="data:image/png;base64,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" alt=""><br> <br> <br> </p> <p><a href="/view.aspx?sf=144404/455675/implicitdiff.mw">Download implicitdiff.mw</a> See <a href='http://www.maplesoft.com/support/help/search.aspx?term=implicitdiff' target='_new'>?implicitdiff</a> for info.</p> <p>Here is an example.</p> <p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAZoAAABDCAIAAAAqIlRnAAAMX0lEQVR4nO2dLXPcOhfHDQIKCgL2GzwkIGAfVs9k5iHht6DzTEBAwY5nQWBh5i4oKKoWBBQE9jNE4BbkAxQEduqAgAUBAQsWBBToAu9ab0fW8YvWsvf8QKfx2tKRfPT3kSxLiSAIghgFSd8GEARBdAPJGUEQI4HkjCCIkUByRhDESCA5IwhiJJCcEcSAyFmaJEmSJBnv25SSnKUpy/u2QgiSM+IAWa1WHz9+7NuKJuQsK3SDZ0kSiYRYtlxeXj4+PvZiCskZcVis1+uzs7Onp6e+DWlHztI4AjSeZUyPzp6enqbT6fPz8/6NITkjDov5fP7ly5e+rWgPz2KQs5wxDnQ2l8tlL/EvyRlxQLy8vEwmk/V63bchrSm7nREYYcvZZrM5Pj7ef5czSjnLWSqHOq0/6gwZ1D3fZrPZzOfz19fXFmmEJU4LP336tFqtMAfDw7Ni9Dxlf9/cnJ2dgScNqBqFEJx1KWbIspvG7IwAXwWcn58vl8vubESBkbNuq66gfEGjk7Lfu18yrpwWRM6cNqjnz2azh4cH4CqfGXsb3LAs7BZveXdioZ/x/Pz8/v37P3/+qKeCBwPDs8KwnKVJ8p//XVxeXoLnBa5GjO8CZ4A1lrO0W89Cll03xmw+huWz2ezDhw9dWonAK2ft4xt80rsA2h2doeAZ/nSnDUIIIR4eHgzv3zUOn1oV9zqInGnFsy2sw12WZHeezKrLK1sWz8wCX19ff//+3bgAPBgQnqlWnZ6eXl1d2We1q0akGdXPQOcZRo0poZA3zvDfX1Gz7ODtA6OzxWJxcnKCTLYrPHIWsFUKpa0AP8hMdYf0UjMqctoghBBXV1ffvn1znF1xZc4yxsNEZ0bxLAtr4XV3X3lzzssj1pPh/v7+/PzcSBE8GBDde968ebNYLOyz2lUj3hRPYACeodZYGQmjOgg4OatVdvD2ueTs6OgImWxXVMqZp1U+sndJ8o41H+7T7l7OGFd+AOVMj9SKH9Snmhr/puy3HdkpJ8igArZBCCGm0+mPHz+cBjtqpgjwvLKquKZWJP1gIRKcpUmSTP/6r+nKgIXyR555fN7n7rjyKmdrv7+8vLx9+9Y4CTzYFHk7ZQi5q6yU5Vrjz7gQIkkSUM7aVSOShnLWosZQcmaW3Q4UFbPwxiwWiyTZ99B8RX48S1ledQ9KOXtk76BBqC1uwdOfNUpbAOVMH0crr8240Gbyldea425qe5TnO20QQojJZPLr16/yTz3+cHTDi2rD9EZld5qVRZIalmR3srnKfIxY1bBwl3TRlr3BocfdUeUtgTJMksR+jQgerI9SwTlLk+T/mVVZwqwvl5y1q0YkDeVMNK8xlJxBZTfvttqtRRoTl5xtR2iCDmjXjs7cP8jar7oWVJ+K6CxJEnW+JaJ5y4Gt2oNrRsdOi85y9Sz1KsNCJW0w7ztdvD3PnTpyBg9Pg+aBB6ttgzPUz0lZDpiI62wGrUbFlOZyhpv328QwR+KaO6qDdEhjIups6q7iapRdRGc1x85ayJkzmKrwMfPOeTtf3HKnCgfWP7/TkmsnZ+iP6DrrbLretYHmoRtnJZA5XjlzvQpoV41I9iBnBqjozC1npQtqD3m8nMXxKkB9uVd1C7odO1OzbiZnshfqv9ZvgxB2HG5KTpV3YuPanKV2ZIGWM7CnwFmKex3tc3dkeXf9a5skXGcTip28cnZxAU/UaFeNSAbV2SzvvTVfF2lMHBM19CdSwGka4CSJ1N9h1H8wB8yq3orqUwmKZ47bBiGEmE6n9/f3qs3YiRqIziaTlqTbUUotlETJmW1hEShth3w8c1baT9QwAjMtv8CvAvTuOs8wnc0bxzTadtWIJN5XAUbZhRA7x2PGkwpvTO/TaI2BZ7XH2fnwmWMKqzX+rf5hDoyrPTul0sv3Mv/AA+m7PvDXf1w2lIW9urq6vb2FLTdE3/LDsv0XeUL9IjNDu48PTFHVXzupFtqv43z3DePu0DTassBW51rNMPxEDf1FtVVZdh27PnJqV421LVWOldUKnSGEaFVj2IkalpMLYT796xnz+vo6mUzoI6c61JyQ1oCHh4eOAuaaX1agi9adhd3z+fNne8oleHCfgJ+gD64aO8RVdtBlkcbc3NzQJ+g1CS9nQojZbPbz5882KdT/rKFe0dpbGILNZnNxcWF8nQMe3DPr9fr09NQOHAZUjZ0jy74d+ICHFpDGFEsw9fFx7nDlTHZzwiraZrOZzWZ7/TIZmG1WRQ8WIri+vrbff4EH989qtbLjkQFVY+fIspszaJsYM5/PaflGgiCIVpCcEQQxEkjOCIIYCSRnhMZwtwUhCJIzQjKSbUGIQ4XkjJCMZVsQ4kAhOSO2jGdbEOJQGbmcbadwBZ9s25Cg5tVN3PU9I0EMhQjlDPpIsF1ysaqZEIHNq5W4a7UJnRD74BjUdwDg09Y90iD3fg0eL9HJGX7JChyoFm0u24hOOkmyJkZpaeifJPtWfJS/+43GlF2m4loLzLAgdAOs7QB5xe4r4WmQe78G1wD1eV6zthOI2OTMWJK1ddvBrMDXY/zWfIFAhNGIxNVUXCu1qieHb321HaBy95XgNMi9X4M7JrK+z/7kzF6oFRjZ8S5/6nhg5LvdLoyOitmi5Sos1iJDymI+xe+/qx5O24RSlquDVEqD1x68fvPU9Cxby5St/Q3K9ZTstM2y+4ruXEe/vN6/O1XljiHdOEA1lSv7m98j6mqJMq9F7o0u2RpVLleseZe2tlB219wN5W/yIORwhhmmA6mNpyeFjis60x9WtR5dOUvT1FxgW2vRmjppQqKuj7W7M5geaqo6VMZ5lm63ytj9o2XuMc9MT1mOtvyP+rsnbVdyjqILj5x598ExqqVBy94Z2tABCit9uepJdjsQ2L2ayVPkShfvvt5mScbVe1em0swNUe5hmrF7kOuaim48gRiLnBlumpWrH9qrb5enWK2+Vt/PVJcsY0WO2/9pGXrNM2XVNqNKzYC0lcRRRa/sbNbaB6fJgkjqtY3lDNXx4a4dPSoBthRplHv9S3KWyjVhVclIQDVr4Ib4lmGa4X4c98XQOpsOrIo15cKMK8q/zeejIwCRsTgQ/MhlvvNygVHTjarN004BH9nAo7IqbeUUbNFdrwLUoqN0yuHXgTubSDlRd2Fgxo1v0dkMJGb6eKWsWKWalEpq4IZ3TvewezaWGZajdjHa3Yq4ojO99vGVA0cremxmjiM57gj2KaNeqD4erf9hzNPSg/MH83Om7U7OXXR4ogZ2HxzF0jY7hjR0AOHefcWRgbWjRxvQude9xOFGsmLUsbFGbohyDzgZ6LHbc4gWmZw1m6hhDH/JeDzjO681up2KN2S86HSUPX7USrDFsATT0zbdiHNz0Mtlnpqe2iPQgy0tv/JkIG0tcX/RC4BptPbj3OereesdQxo4QO7cfQU8F9jRow11cq95CTASwhnLlQAqY0WFc97QDSvdY+sdkBlfiyG8rQPVazzhiE7OZOcGdDhoYEbrDenD3+CuJ2YMvev5mT2MikEgruyIoXXrlLuqbi3nM089X70C+l0x2pG2WXZP0bfoHzmVKUttUatHN1hmogYNbQbQHA6wbXDKf3Orkwibp9vZWYsDc+/KYKC/p/lqWr6jzFh+28gN9TKYrSUzdVCacac6ENB4+iFCOatLDEOQFYQ0r+u0a36CvocvBNoAmxex0SFNi7yVdMTw5Szy+zQkNXNuCwJmPaT57HnVjh4xELo+I28lXTFsOTMn8kVGSPNCpQ1uCzJ4eNWOHmMn8lbSJcOWM4IgiBKSM4IgRsIY5OxAxgUIgqhmBHJWzoXecnl52deupQRB9Mjg5YxnGdOjs6enp+l0+vz83KNVBEHsn4HLWc4YBzqby+WSdlcjiENj0HK2/YrHlrPNZnN8fExdToI4KIYsZ7tJ1OCrgPPz8+Vy2YNVBEH0RJRyBn7rbH7Jp69bY02RnM1mI5wOShCEm/jkDJ7AXbXOAhidLRaLk5OTwLYSBBER8cmZEMBCV7xqQwyXnB0dHQW2kyCIiIhsNVp5LryAqhDYdbAWi0Vir4BMEMR4ibPBG3Kmj6VhVhEkOSOIwyPOBt+NnFFnkyAOijF3NulVAEEcFIOIzppsiEETNQji0BiGnDXYEIOm0RLEoRGfnCnTYzXZqtwRxeD19XUymdBHTgRxUMQnZ11wc3NDn6ATxKExQjlbr9dnZ2er1apvQwiC2CsjlLP5fE7dTII4QP4FQBSxGPoFuA4AAAAASUVORK5CYII=" alt=""></p> <p><img 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alt=""></p> <p><img src="data:image/png;base64,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" alt=""></p> <p><img src="data:image/png;base64,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" alt=""><br> <br> <br> </p> <p><a href="/view.aspx?sf=144404/455675/implicitdiff.mw">Download implicitdiff.mw</a> See <a href='http://www.maplesoft.com/support/help/search.aspx?term=implicitdiff' target='_new'>?implicitdiff</a> for info.</p> 144404 Sat, 09 Mar 2013 15:42:28 Z Markiyan Hirnyk Markiyan Hirnyk http://www.mapleprimes.com/questions/144402-Finding-Zero-Slope-Of-An-Implicit-Function?ref=Feed:MaplePrimes:Finding zero slope of an implicit function:Comments#answer144433 <p>The Draghilev method to find all the points of zero and Pi/2 slope of an implicit function f(x1,x2)=0 while driving along the section of the line connected.</p> <p>Example solution of equation and searching of all the points of zero and Pi/2 slope (with animation):</p> <p>x1^3+x2^3-0.1e-1*sin(1.00001*x1+x2)=0;</p> <p><a href="/view.aspx?sf=144433/455729/D__LIST0.mw">D__LIST0.mw</a></p> <p>&nbsp;</p> <p>The Draghilev method to find all the points of zero and Pi/2 slope of an implicit function f(x1,x2)=0 while driving along the section of the line connected.</p> <p>Example solution of equation and searching of all the points of zero and Pi/2 slope (with animation):</p> <p>x1^3+x2^3-0.1e-1*sin(1.00001*x1+x2)=0;</p> <p><a href="/view.aspx?sf=144433/455729/D__LIST0.mw">D__LIST0.mw</a></p> <p>&nbsp;</p> 144433 Sun, 10 Mar 2013 09:53:14 Z one_man one_man http://www.mapleprimes.com/questions/144402-Finding-Zero-Slope-Of-An-Implicit-Function?ref=Feed:MaplePrimes:Finding zero slope of an implicit function:Comments#comment144405 <p>For example, see <a href="http://www.mapleprimes.com/questions/40425-Implicit-Differentiation-finding-Extreme-Values">http://www.mapleprimes.com/questions/40425-Implicit-Differentiation-finding-Extreme-Values</a> .</p> <p>This link can be found by the "implicit" search in MaplePrimes at the top of this page.</p> <p>For example, see <a href="http://www.mapleprimes.com/questions/40425-Implicit-Differentiation-finding-Extreme-Values">http://www.mapleprimes.com/questions/40425-Implicit-Differentiation-finding-Extreme-Values</a> .</p> <p>This link can be found by the "implicit" search in MaplePrimes at the top of this page.</p> 144405 Sat, 09 Mar 2013 15:47:35 Z Markiyan Hirnyk Markiyan Hirnyk http://www.mapleprimes.com/questions/144402-Finding-Zero-Slope-Of-An-Implicit-Function?ref=Feed:MaplePrimes:Finding zero slope of an implicit function:Comments#comment144406 <p>In order to optimize y, one can apply the approaches from <a href="http://www.mapleprimes.com/questions/39566-Find-Maxmin-From-Implicit-Function">http://www.mapleprimes.com/questions/39566-Find-Maxmin-From-Implicit-Function</a> . This link can be found by the previous search too.</p> <p>In order to optimize y, one can apply the approaches from <a href="http://www.mapleprimes.com/questions/39566-Find-Maxmin-From-Implicit-Function">http://www.mapleprimes.com/questions/39566-Find-Maxmin-From-Implicit-Function</a> . This link can be found by the previous search too.</p> 144406 Sat, 09 Mar 2013 15:53:06 Z Markiyan Hirnyk Markiyan Hirnyk http://www.mapleprimes.com/questions/144402-Finding-Zero-Slope-Of-An-Implicit-Function?ref=Feed:MaplePrimes:Finding zero slope of an implicit function:Comments#comment144407 <p>Dear Markiyan</p> <p>&nbsp;</p> <p>Thanks alot.&nbsp;</p> <p>&nbsp;</p> <p>Dear Markiyan</p> <p>&nbsp;</p> <p>Thanks alot.&nbsp;</p> <p>&nbsp;</p> 144407 Sat, 09 Mar 2013 15:54:47 Z maplelearner maplelearner