求助,波段区间的点位怎么看?
本帖最后由 xianghuabing 于 2023-6-2 11:47 编辑一个票的一个上涨波段的二一位、三一位具体点位怎么看?起点和终点怎么取值?如何测算?谢谢!
data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAP0AAAESCAYAAAA2UNMfAAAgAElEQVR4nO2de3Bb153fvxcXjwuAICFRlGDJliivY1PeOIb8pJJ6TLfZmEqaGFwrEymb1tJOZyw3bSxNpiMp04Sk260f26nsnTaSspNIzm4iuXFDepJUtNPEVLYe07Id0es0pjZ2TPkhQU+CJEBcPE//gHBxLl4EQOA+gN9Hc0fAFUgcAed7fr/zO79zfgIABoIgWgaL3g0wAo/p3QDC9JipD5HoCaLFEEDuPUG0FGTpCaLFINETRItBooe5gjCEMTFTHyLRE0SLQYE8gmgxyNITRItBoieIFoNED3MFYQhjYqY+RKIniBaDAnkE0WKQpSeIFsOqdwMIoscmwicKAAC/TYTXknm8zmpBt1Vtl4IphtOJFABAZsBEPJl7HEtq2GrzQu49MkGY7+jdiBaixyaiz2HFvZIVfQ6rIvilIjNgPJbECTmJ8VhS00HATH2ILD3RcBol8nwkAeiXrOiXMt2aHwTG5AQm46mGvK/ZIEtPNARJELDVZcPDbQ70OsSyrw2lGSYTqZKuez7FpgA9VnHRwWQqkcYz8zEcW4gjlG7dbk+iJ+pKj03Eox4HtrpsijDzCaWZyg2vlwXmPYpeu1gQD8giM+DYQhyHwvGWjAOQ6IklU4lVP7aQUEQ+ldDGze62WpRBIOAsPgi1ovUn0cNcQRijEXDasH+Zs6hVnU6mcSgcx5FIHMFUWofW5VhsYAqlGYZnZTw9H6vp95upD9E6PVETPTYRx1e2YaTLXSD4YwsJbL4Qwfqzc3hiTtZd8AAgM4YjkTg2nZ/HxuA8jkTikDlz57UI2L/MiVM+D/qk5o5vk6UnqsJrETDYIWGXx6G6H0ozPDkXM4RVrxSvRcBWlx172h0FA9doNIHdM1FMJ83xf6kGEj1RMbs8Dgx2SAVz46fnYxielU07J5YEAbs8Duxpd6j+bzIDnpyT8cRcDDIz5/+tGCR6YlF6bCKOdrrgt6vnwuOxJHbPRJtm/dsnWrB/mRNbXTbV/WCKYdvlCMbl5oj005we5toWqTVbXXac8nlUgg+mGAYuRnDf+XDTCB4Agqk0tl2KYNP5MCZiuf+XTxTw8so2DHVIJX/WTH2IRE8URRIEHFjuwtEVLkhXPV6ZAcOzMtafncNoNKFvAxvIRCyJTefnsePyAoKpnCM82CHh5VVt8Inmlg2590QB3VYLRla4VdZ9OpnGtssLLZfM4hMtOLrChT5HLqJvdndfBDCkdyMI4xBw2nB8ZZsqmj0aTWDzxQjebcJI9mKEGcOzkTgEQFnKa7MI2O62Q0AmrmE2yNITCvuXOVVLcTID9oWiNSesNBt9khUjK9yqCP94LImBixFTrVyYe3JSJ8wUhGkUhztdKsFPJ9O470KYBM8xLiex4dy8KsjX57Di5ZVteKrEPgMjQqJvcSRBwEiXG9vdduXeaDSBjcH5lpu/V0Iwlcam8/N4Yi43GPrtIv7VSvME+Mi9b2Gygu/n0k6PROLYcXlBx1aZh+1uOw53upTnWe/I6Fl85hiaiLpTTPBPz8dI8FWQP0B2Wy14OS8IakTI0rcgXktG8Pwy1PCsjKFZWcdWmZd+yYaRLreSz2B0i2/sIUkjWimQ57VksstI8PVjTE7gpxcjyq49o1t8Y7aKaAiSIOB4V5sq6Wb3TJQEXwfekxMYKCJ8Iwb3yL1vIY6ucKs2k+y4vIAjkbiOLWo+8l39yXgKm86HDbVLz3jDENEQ9rZLKsHvnomS4BvAWJ7F99tFHF3hKv9DGkNpuC1AwGnD33JLSwfDcXybXPqG8W4yjctphn/pzAyyPTYRkiDgVwbJ1SdLj+YO5PU6rDi6wq08H5OTeOQKLcvVm/w+dDAcU2Uz7m13qBKg9EQR/WMobDjdM/e97G657PzyUiKzX9wo7Wv2e7tnohjjrPuB5S5l046e7aNAXpMiCQJeXZWL1AdTDJvOzxt27bhZyf8eQmmGjUF9vwdy75uUoytyx1vJDBi4FCHB64DMGAYuRZTDOLyWzLKpJKg36LBAQLM2keibkO1uOwJO9dIcbZ7Rj+lkGgOXchH9HpsFB5Y7dWsPiR7NFcjrtlpwYHkuUv/EXKZ6C9FYFutDEzF1ADV/YNYSEn2TcbjTpUoMGaalOcNwJBLHsYXc2YIHlrt0ydgj0cM85YgWY2+7pOTUywzYdnnBUJlgzUylfeiRKwtKbMUnCqqtuVpBom8S/HYRg9wRzftCUc0KRRKVE0oz7ODc/H7Jip1tjjI/UX9I9E2AJAg42plbjx+PJemYKwMzLidVJ+/sX+YEZO0Spkj0MH8gb7BDQo8t81WG0gzbLlHGndZU24eGZ2XlrD1JAHDmdMEyXqMg0ZucPsmKve059/CRK1HTFJBsZWSWcfOVyrmRWdX32EgoI8/k8CWn6Hw787GzzaGs2csM2HBuruFJVGTpTcwuj0OVZvvIlajOLSKq5WA4puTnS8LV+X2DIdGbFJ9owZ72XLT+yTmZludMyr5QbrAOOG3KppxGQaKHOQN5e9od8ImZwM9kPEXRep1ZSh+ajKeAldcqz/d71dZ+S50HcxK9CfHbRdXa7r4QZd2ZnlVrlU05+d9vvSHRw3wZeY97ncqa/Gg0gTG5ectGm4Ul9yGbHU/O5QbvwQ6pYUt4JHqTEXDalAIVmQKTZOWbhYPheMbVRyZF93GvtMhP1AaJ3kRIgoDHufnewXCMUm2bCJkx1QapnW2OhpydT6KHeQJ5O9vsSuZdMMVoB52BqFcfGo0mMBrNTNcatYRHojcJkiAULNGZqSY6UTnDs7KSqRdw2tD9+7fr+vspI88k7PI4lFE/mGJYf3aO1uWbgGLHZAmjo9i/zIldnkwE/+T9X8Ddf/uj+r4vXca+JEFg59Z0MLbWy9haL9vlcejeJrrqc7FAoOhzv11Uvm+21su6rZa6vSe59yZgZ5tdScQJphgOhun4q2ZnMp5S5vYA8Kinfuv2JHoYP5DHf+GUbmtMGtGH8iP59Tpai0RvcAJOm7JsQ1benDDuTzXw1l4SMqnX9YBED2Nn5PFHYJGVNy6l+hALBAAmKFe159sfms8N8vWy9iR6AxNw2lQFK6jKbOsxJicwffMtAOpn7Un0Boa38gfDMVqXb1F+smuP8niry77knHwSPYwZyOuX1Fb+yTnaOmtkGtmHTt7/BVVO/s62pVW/JdEblIe4L/ZgOEbn3rUgWxhT9tK/8jcHlfsPL3HbLYkexgvkeS2CquTRszSXNzyN7kOvfOlBRNo7AGRq4fU6aj9dp7Hn8hA1kZm3ZR5PxlOKa0c0H8N+P4b8/txzABgdLXhdwuHAK196EJ/7+x8AAB5y22suSkqiNyAPuXOu/SFal29qBicnIXAiZ4EAhkq89sSWbYrot7vt2D0TrWkJl9x7GCuQ12MT0evIBfCo4qw50KIP/dPGOxSvTxKAra7aqt6S6A0Gb+VHowlapiNU8PGdWgN6JHoYK5C3nRP9s+Tamwat+tCxhYSy177XIaLHJlZ9Wi6J3kD0SzZlN910Mk0HXhIFBFPqfvFwDWv2FMgzEPzaPC3TNQfDfj8wnIvOw4+i0flqODQfV5Z0t7rsOBmrLnGLRI9MEEZvF98nWlRr85Rnby5K9aHByUlghBP5QOnofKWMyQkEUww+UYBPFLBx/P/gaBU/T6I3CP2SVVVfvtFFDAnj88nh4YJ7z1/9+0gkrlS5vfOX/7vs79nCGJ7n8vVJ9NDfygPAA9zyy3MRmsubjUb0od8NDhbeHMr4Cc8tcKJ/8RdV/V4K5BkASRDQL+VETwE8YjEm4ynFG3TPzVZV9JIsvQHgXfuJWIpc+xaj2oM1sozJSWXH3f2SDeNyZWm5ZOmhf0Ye79q/SFbelNTah4TRUSUNl39cCS8s5PoKHwReDBK9AeC/MP4EVIIox3gsqSTq9NgsFZfAItFD30Ben2SF15JLyKEddeZEjz4kM6aK/1Rq7Un0OvOAkw/g1bZVkmhdeBf/gQo34JDodYYfnZ+jHXVElfCGotee8xrLQdF76JeR12MTlXlYKM0wESPX3qw0og89LwjAELeZZign6NwemzQQSAGnREgCMDNig/BAeeNBll5H+P3QY3KSzrRvMhiDOgUXmef1+JoFAfgyGL4Mhp/c+y3l/pG/XNyOk+ihXyDvXi6hgp+bEeajWB8ShNyFgYD6eR05ef8XlMd9FZydR6LXCUkQ0GvPfUETcQriEbUxffMtyqGZ3dbFl+5I9DrRY7MoWXjTyTRl4RFV87wgKBtpfnn+knJ/MWtPooc+GXn8FzNe46mmhL4oZSkZclcNhSrLMiTkrjK8xgWB710kD59ErxP8F/MaRe2JJcJPD/lpYzFI9NAnkEfzeaKeTMRSqpTccuv1JHod6LZalLPwQmlGqbfEkpEZUxmPcvN6Er0O0HyeyKea3XWlmKhwXk+ih/aBvLs50Z+gfHvzwoTMtdg9jXgtprb0fAFM/jGJXgd6r5agBoDJBLn2ZkWr5JtK4b1Gv12ErcQpuSR6aBvI81oEVd15yrcn6kV+fOjGU68XfR2JXmP4+fxEnPLtifoywYn+E799o+hrSPQaw6dIUtTeWFRbHsqIvMX1KXHwPyoZe3z2Hoke2gbybrLl5vOnE5R6S9QXPkbUUyIHn0SvMX4bBfFakXosyVXCFC96rq/xkOihbSCvx5b7yKdI9ESdCaUZgqnMNEUSigufRK8hPjGXHhlMMao9TzSExVx8Er2GkGvfvGjlvlfCYi4+iR7aBfL4yD259s2F3gVTePgA8TqrRVW8EiDRa8pN3Hz+DB2aQTQI3ov0k6UvjlaBPN7VmqLluqZCz4Ip+ZZc7d7TnF5XaE5PaEEonQsSey0CfKJa5iR6jch8+Lk99MEUWXqicfCeZL6LT6KHNkEYcu2bGyMF8gC1J5l/Oi6JXiO6ORdrKkmuPdFY+EBx1sPMQqKHNkEY/oPPZkwRzYOegbxi8NPHdWTp9WEVZ+nP03yeaDDTKd7Sk+h1gbf0lH5LNBrem/RZyL0vQIsgDB9MmSZLrymszJ96YbRAHm9Y8o/DJtFrhM+S+6hpTk80Gn5OXzJ6/xgKR6tWufedCl+3lHv8aPuXeZbeCJ9BK9wrxmI/W85L0LoPVXsvlCyc1z8GQADqWXiLKAVb6wWQOQzT+WFI59a0FuXceAG5wXgLYwUprZX+rBF5dZUHvY5MfsjG4LxyPBu59xrAu1eUiUdoRTCd62u8p0miR+ODMPySCQXxjEepohDVYLRAHqAO5vHJYSR6DeCXTGi5jtCKM0Xm9ACJHkDjs6n4D5wi982J0TLyAHVfWyWSe68pfGIOZeMRWsHHj2hOTxAtQKhEbIJEj8YHYVaRe9/0GDGQx8OvIJHoNUDilnOpdh2hNyR6GDMIQ5gLI/YhuYR9IdFrgMRleZX6Igii3vCBPInLHrQWezFRX1QHaKQpeq8Hw0PDBfcGhwZ1aIk+8H2QRI9MEMaI7hlRPxotcDP1IRI90fJ8crjQC3heh3ZoBe2y04BTPg/89sLdToQ2LLZTrliufXa3HQMrOTUw+i47ILe7M5RmWPbRLACy9Jrgpdx7U9MMc3/KyCOIFoZED+NnUxHGx0x9iESvMbROT+gNiR7aLrVIxo/9EDVgluU6gERPEC0HiV4D+Ii9JJCpJ7ShVPo3iR6ND8Lw+5rziwkSS0c5lJohd9W5mMViGDGQp66fmEv/JtETRItByTlofBCGIvbG5nlBAIa4L2moem/MTIE8Er0GqM4qozm9MalB6EanVCYoufcak19MkGg8AvcHgQH18yZGJXpGoldhxCAMYS7M1IdI9BrAFx0gCL0h0UPbIEx+2WCiOTBiIK+7xCnMFMgjiDI0y7xfpjm9tvCjbAcF8giN4AN5lJGXR6ODMPySHV/XjmgejBjI40XPl1Mj914DgmlKw200w0PDwPBQ7sbQcNETb4TRUQ1bpS/ruPjRNBdMpjPyNKDbasH7q9sBZD789WfndG5Rc6Hk2DNuQBUy95plTl4Lx1e2oV/K2PXNFyIYkxMAyL3XBH6UpeQcQiv47E9KztGBbBqk1yLQ9lpCE2iXXRm0CMLwEXya1zcfRgzkdZeY05PoNYIvZ0UJOkSj4aeR+eXRqfdBm2wqfqT1WehjbzaMlpHHLw3n11qg3qcR/AdPwTyi0ZQrmkqi14jzNKcnNIT3JqeTJPoCtAnk5T74dTSnbzqMFshTR+7V7j1l5GnENKXiNg5WxHPK3mtRp2oV18f4FFyARA9AmyDMVCL3wfttogbv2DwsVnXWCBgtkNdjI/ded4KptLLTyScKFMyrI4KQuzAQUD9vUXqsOcMyRaLXj6lEri59D1l7okFIgqBYepmp+x1AogegXRCGH3HJxW8ujBTI4137fMEDJHpNeSue+wJustFHTzSGcq49QKIHoF0Qhh91KRW3uTBSIO9We070vKHJQj1PQ/hRlx+NCaKelNpok4VEryHqQJ6FttgSDaGHE/1Ukix9UbQMwvDr9T00r28ajBXI4+b0CbL0usOPvOTiE/WmxyZCuupATiXSqqOvs5DooW0Qhh95+YALYW6MEshbzLUHKA1Xc/hoKrn3hfApt0ZJsTUTfnt51x4gS685k1wwr89BY269aaUjrotxr5TrU6/FkkVfQ6KH1oG8lOqQTD+5+E2BUQJ5fKbnOIneOPBfRq+drD1RH/x2UdnINZ1MFxyTlYV6HLQPwpyQkwg4bQCAux0iDoY1boAJGR4aLrhXrIKNXhghkMdPF0tZeYBErwv8F0Lz+sowksCNCj+fPyGXFj259zqQWT/NPO62WmhvPVEX+KniZJHddVlI9NA+CCMzhok4WftmQu9AXrfVopyLF0ozTBbZaJOFRK8TvPvFu2UEUQuVzucBEj0AfYIwFMEvhAUCmQMtr14sENC7SRWjdyBPvT5f2soDJHrd4N0vv12kHXfEkuANBz91LAaJXif4eZckAL0OStIhasNrUZ+JN0GWfnH0CsLwLv79kk2nVhD1QM9AXjbnA8hY+WI763hI9DryQjShPOa/OIKohgdcub7zYrS8aw9k6n+UHxaIhiEJAs6taVfW6Tecmy96emmrMDQ0VPSeGYpd6IUkCJi5tkPZQ19pH2J06Xcd7nQxttbL2Fov29su6d4ePS8WCDDGkLsCgcx9sJKX3m3W++qXbEr/eX91e0U/Q+69zvDu2APk4hNVwrv2xxYSZV6Zg0QPfYMwY3JCScntdYhU3NKk6NWH+rn1+RdlEr0pCKWZKopPAT2iUnodVuW461CaYbzMJhseEj30z6Z6gXPLeHetmWDZPwy56+ofIPMcI3mn3oyMYpHVJ8OgRx/irfxotDIrD5DoDcEY55b1OawtmZ1XrvKswP1BYED9vIXhY0AvVDifB0j0hmA6mVayqCSBXPxytPoZeFm6rRblqDWZAWMVuvYAiR6A/tsiAXUQplld/GZG6z7Uz2VwjscWz8LjIdEbBH65JeC00cEaRFkebrMrj5+LxKv6WSUSkB2p+IBEq9z7ToWva+i9RAqT8dTVHXfAj1x2vBmOGe6zqvXeYujdPjP1oe/ZRZVrf2whUfXv0z2riK7MtcvjULKrXl3l0b099byULDpVOl3xrLpsJh5dxa/9y5xKPznc6ar65yn33kD4RAveX91edR61GVDy5xk3bREy91o9Cl8NkiDg/dXtytFY910IV7w+n4Xm9DBGIA8Agqm0ar31Ibe9zKsJI6FVHwo4bYrgp5PpqgUP0BHYhuPZcBxbr0bvt7vt2BeK6tyi+jE8NAwMczvphobpaOsqeYgL4B0KVxfAy0LuvQE5t6ZDGc03X4ioknfMCrn3S8cnWnBuTbvy/JqP5xBMFS9SWQ5y7w3IEW4J5mEPufhEhp2clR+TkzUJHiDRG5JnOdH3SzbaeUcAUMd4nq3RtQdI9ACME8jLMpVIKTvvJAHKHJ8wLo3uQ32SekddNRts8iHRGxR+JN/TLrXkJhwix6Meh/L4SCReVdptPhTIMyj567EDFyNLGt31hgJ5teO3izjl8yjPNwbny5atWgyy9AZFZgxPzsnK88EOScfWEHrCf/ej0cSSBA+QpTc0zWTtydLXRrc1k6WZZalWHiBLD8B4gbwsMmN4Zj6mPDeytV/sZBylRp3qh4rcMymN6kP8XL4eVh4g0RueTNAm89hvF017wEa5k3GI4vhEC3a25UT/5FyszKsrh0QP/c/IK0cwlcbBcO7LfrTdUebVhF40og/taXcom68m4ylMLFKCulJoTm8C8nff1WNeV29ozl5f8r/zesZzyNKbgHxrb+S5PVEftrvtKitfzwAuiR7GDeTxPDkXU+b2AadNOTmFMAb17ENei6AK4A3PymVeXT0kepOQb+0PL3fp2BqikQx2SMoybb2tPEBzelORP8/bdmkBxxZq33hRTxhYZr98HoNDgzSnr4IeWyb7rhFz+SwkepOxy+PA/mVOAEAwxbD+7NyS8rDrBQXy6sNIl1tZlh2Tk9h8IVz39yDRmwxJEPDONR5lx9XwrIyhInM+vqZ7VnQDG3pwbYcHHrsDLrsNjDFE4gnMxWJ4K3ger3zwYc3tItEvnX7JhuMr3crzRq7S6H66p97XYwZoQzVXwJmrSR69zst8oqXgNcVquA9suIn9/L/eyM6+72Szcy42O9vOgh90sJ/99QZ297VrltSmak67bcarHn3olM+jfK/7lzkb1lYK5JmQ0WhCtd8+6+4vxs9O/wEvPe/FB2/cCY/nX6C9/XP44OSn8fPnnDj50ceNbDKxCLs8DmVFJphidcu+K4XuoyRd1V9+u6hYBbbWy3odVtW/F7P0ANhyp5MN//N7mRz+LywhP8X+82fvY52upVuVVrf0S7m8FoGdW9OhfJe7PI5Gv6f+/2m6arsOLHcpHeWUT10co5jo//xPN7Bff+8gi8zMMMYYmzl3lr35wih79t9/nW1Y2bWktqjeMO/S+3My+sUXrzjl8zBJEBr9nvr/p+mq7fKJFha9zltgIVggoNZdIMBWezxszz2fLivO1Z7Kq+qUq0JDFWoqv/x2UfUd9ku2hr8nzelhjoy8YgRTadW5+I97neixZeaFfA33G35zAl+/+w5s29sH4CUAp3DqpR8iFv0DgD8COIW3jv81/s3tfnS53cXeiliEWvqQJAg42ulW1uRHowlNjjunYhcm5+n5GL7isqPXkSl8ebTTBaRzRyO32e342q234MHv3IbuO/4Ux787jnO/D2IhFMYrP/wF1tzSg89/4yu4dfNnkIzNY/apGP77a28glS5+vDILBAoe59eMpxrylfG4V0KPLWN3gymGR65oU9iERA9jb62thG2XI3jnmkymnt8uAsEzyr99Zu11+LMdHtx0z2q8+tMp/O7nb2Dh7k8DXZl/vywD//jU/8Tg4Bdwe8CPUPBj/P7CJfzyvT+WfD9e1Pwg0MpU24f6JRt2cfn1j1xZqPkc+2oh0TcB08k0ds9EcWD51aW74Bn0SVaMy0ncvHIFbrwHAFLoWJVx3Tv/8P8ACLj9z7+ItZ+8EWtu7AIQBJDEpq3r0fvcP5UVPbE0fKIFhztzeyeOROKaHoNGc/om4WA4hjGumOHI9avxxLf2oeNzm/HdZ+8EsICbP7MKX336q/jMv/4sXN42vPPrcfx417fx8g+fAxAGEIHUloDTZsMWA6T2NisHljtVRSi1cuuzkOhh3kBePjsuLyCYyojVG57DqkPPwP5/T2DPt74P4EOMPPkr/HjXj+FwxyF12LDxS7cDAELnPgZwCcAOWKzD2PfSr/ETCKrz7ojyVNqHdrY5VEeebbu8oPneCXLvm4hgKo1HrixgpCvjxm9323HkQhBn3lzAJ3pP4Z6/2AQA+MVf/QwAcOVMEDfc243Pf+NTAM4B+Cbe/uUreOo/RCBP/qPye5/nDrIb9vsx5PfnngMABe4qoscmqrInh2fluh2BVQ204aYJYRt7gMtBAMA8A/7hi6tx6zfP4Zrr18OCjYhFV+PShymsubETQArAAoAP8fHU2/i7b7ThwMk3cFdoVvl9vOhZIFAQyKNo/eJ4LQJeXeVRovUTsRQ2nZ/XpS1k6ZuRa2/A9Pmz6LZa4BGA234exNGpW7Dxax9h/V2/QeeaLqy6vhPppAPRiIwrH87gzFthnDi8DCPvvKMSPFEfjq5wK4KXWWbFRS9I9CaEBQLACGddB/KsrWhF9y13AadPAekUfEjjzncm8cRfrcC6zg50ukQ4rWFAiEBOJHBxQcZ7V+Zx8qPT+GxU26BSK3BguQv9Uk5q2y5FMJ3UZnmuGCR6ZIIwZl+r58kOAAGnTZnf/zObBV+bPY9tiyzFZV35LYyp3HoeWpsvpFQf2uVxqOrK7wvJulcpouh9EzMaTWD3TM5yb3XZsLd9aSfpCqOjyqDCPyYK6ZdsqsDdwXAcT8zV95DLWjCU6PWyIItZeTOvWT89H8NBruz1416poio5paw8UZz8PuS3i4qXBQDjsaRqANYTQ4meaAy7Z6LKoRtAJqhER2g3Dp9owciK3Eaa6WQaAxcjhjjLECDRmw7GoA7iIfO8XH+SGcPAxQimEpngkSQAx7valiR8cuuL47UION7lVs4wDKUZNl+MIJQ2huABkwXyygWXaqHYdILvzLxbn32st9vLv301a+SZzhfGKZ8HXosAnyjg5ZVtuO9C2HAlsszIYwD+myXzmfKD6bZLC5hKGO/zbfimfRYIqA9s4A5ZqOTElS2MFVz1aheQO9Sw1OEPi71fvdpT8JnlXfX4vX67yGauzR3NNHNtB/PbxYb3gWa//sZqYe9c0646wmy72657u4pdurv39SphvJRg22KBPL2sezY6Xk9XejKewn0Xwoq76b1qnfolc5bANgLdVgu+uLJNSb4BMvsgjkSMUYgkH91FXwnPC4IiPP4xvyFEjw0iWxhTBhv+cbW/Q2uKCX+ky03Cr4FuqwUvr2xT5vAyy5X7pn4AAAWtSURBVFSlMargAYPN6au1aIJQXDT5ueLl3qfRy4SMMQg1eAqN3tiSFf7IikzQSRIy1VUGLkY0ObKpGSgleKN/ftZ6VT0pJa6MJotEm1G9C1+rm11K5Nn7RszIG5ycLGj3UJ3fIyv8bMfNCn/3TFRVLJMopNdhxdFOlyL4pEkEDwBWgOH+LbO47cEP4e4UAGZFdFbA68+txpvPVJcfXExcega7swOO2heobcApRrmUVcZ5IPnWXu2cCOAbqPXnNZ1MFwj/wHIn7pWs2KHDXm8zsMvjwONep7IOLzPgpyYRPAAIVouF/du77sBXvynh7i2/Uf5h55234Xtv/Fbpj7W4yVqu5dZ7Oa9e1Orea/15dlstON6lDkZNJdIYuBQx5JKTHngtAg53ulQZjaE0w8ClCMZl7ffF14oAtVEqfMHV/qq3qInG47UIOLDcha2uXKeWWSYSbZSS2HrR67BiZIVbOeYKyOyJ33ZZ3x1zNdHIqid0mfPa2eZQFWBga73swHKXFpVXDHntbZdUn0W2wKRZPw9hzz2fZj2fvA7zl6OQ52W0d3mx9tZ1EIQUXnnhdfzgt5M4O6/PCR9aYcRAnt747SKOdrpV7v5kPIUdVxZaJoMve2otvxc+lGbYcXmhYHusmfqQddvePtz6+T4AXTj10tu4+Z5NcDhFALO4pucaWJ4CDrz+W1yM6HfSB6E9k/HMcU68u++3izjl8+BgOI59oaih8snriSQI2NvuwJ52SQnWASZ25/MQGAM7/t1vKVVPAEGpeuJwhvDm6Bj+7qmxslVPiOZmZ5sD+5c5VQIIpRmGZ2U8Pd9cS3sBZ2YPfHYpLsvT8zHsC8lNsZoh3v+pbw+9cex13P5gP2ILCWz66oP46HenAUHANX/ShdU9LtgSszj7Tgh/nJnRu72EDrwRT+F/RRO4wSbihqtikAQB/U4btrrseC+Zxrsmt349NhE/6XJjb7sEryU3uk3GU9h2eQGHwnGYJz5fHku26smbP30RV858gNnzF3HvQ1/Gxs/1AkhAqXpy3RpdG0roy1Qihc0Xwth8IbdFFwB6bBYcX+nGSJdbKZ5pJnyiBfuXOfHONR70OdRz990zUWwMzptqOa4SxP/x/b8Y6r7zU+hctw6Xz1zEpffP4OTRUcRTEay/dQWAyxCtV/DasY/wqz++r3d7G8JjAF7WuxEm4d1kGt+PxBFhwB12EdLVNd0em4h/53GgX7IhBWAqmTa0ZeyXbPhPXieOdLrQ61Bnoz89H8usvVdxJr2Z+pBl8aonV7AwewaReGuv0xI5ZMbwxJyMDefmCzaW9DpEHO504dyadhxY7jKU9feJFuxtl/D+6nYcX+lW5SMAwJicxIZz89g907xBSgAQLn74dfYPP5rFuycuAACcy51Yc8sqfP4bd8DhnAdwVql68vdvva1vawlD0uuw4lGPo0BEWSZiKTwzH8NEPKl55NtrEdDnsOIrbnvJ9o3JSRyaj+l+Sq1WCCl2G6u06skHs3M6N5cwMj7Rgu1uOx5usxdEv7NMJ9MYjyVxQk5iPFb/QSAr8nslK/oc1pJHggVTDEcicRwKx0y/BFctwss/uJ6tv0tE55ouSG2dsKBY1ZPTePPsOb3bSpiIfsmGh9pKW9cs2UHgdCKNiXhuDj0RS5VdHuvjEmb8NhE32UT0OayqZKJijMlJPBuOt3RasfBnf3I9+0TncnS6nHBarYAgXK16soD3rszg5EdnEZL1P6u7kZgpm8ps+EQLtrpseMBlU0XHq2EqkYbMWM0HeU7EUnhRTuBIJN4wq26mPkQFLGGuL8zs9F11u+92ZP6WGrAxciKWUk0htEioMVMfItETutLLiX+d1aLEAryCUNKyTyXSCF7NDg2mGE5f3fqbFXszZM01EhI9QbQYpjgYkyCI+kGiR2Y+RhBLwUx9iERPEC0GzekJosX4/1rw3TaJDd3WAAAAAElFTkSuQmCC
您好,看自然段的真底和真顶,其三一二一的区分,就是把一个自然段看成一个大柱,在其上面找三一位置和二一位置,即是。 美丽天山 发表于 2023-6-2 12:53
您好,看自然段的真底和真顶,其三一二一的区分,就是把一个自然段看成一个大柱,在其上面找三一位置和二一 ...
再问下通达信可以测到自然段的三一位置和二一位置的具体点位吗? xianghuabing 发表于 2023-6-2 13:18
再问下通达信可以测到自然段的三一位置和二一位置的具体点位吗?
您好,在画线工具中有“测量距离” 我有时候会用周线看,更直观! 一起紫色气东来 发表于 2023-6-2 20:16
我有时候会用周线看,更直观!
可以结合自己的实际情况看。 好好学习,天天上涨。 LI630126 发表于 2023-9-1 17:18
好好学习,天天上涨。
祝您学习快乐 好好学习天天上涨。
页:
[1]