对VOR仪表指针显示的理解及实证
对VOR仪表指针显示的理解及实证 本人初学模拟飞行,刚开始时对无线电导航中涉及的VOR仪表指针的不同显示代表意义搞不太清楚,网上的众多教材也是说得不太清楚,有的估计还有笔误,经过一番学习,现把我对VOR仪表指针不同位置代表含义的理解写出来,希望得到高手们的指正。 本文所写内容,在FS2004中的172SP机型VOR仪表,Denver intl机场,进行了验证。 一、对VOR仪表盘中三角形朝向的理解如下图:data:image/png;base64,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文明用语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 假设CRS为选定的VOR台的径向线,用与 CRS 垂直的,穿过导航台的直线把空间(俯视角度)分为两半,如果飞机位置处于下半部分也就是有 CRS 的那个部分(A、B区域,或者说,飞机到VOR台的连线与选定径向线的夹角小于90度),仪表盘中的三角形朝下;同理,如果飞机位置在上半部分(C、D区域,或者说,飞机到VOR台的连线与选定径向线的夹角大于90度),仪表盘中的三角形朝上。切记:这只与此时飞机的具体位置有关,而与此时飞机机头朝向哪个方向飞行无关。举例如下图:data:image/png;base64,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 假如,我们设定的径向线为350,此时,飞机位置正好在径向线上,因此,仪表盘中三角形朝向是向下(虽然此时飞机机头朝着VOR台飞行);假如此时飞机位置不变,我们转动CBS,将径向线分别设定为280或30,那么,由于这两个径向线均与飞机的位置夹角小于90度,因此,三角形的朝向仍然不会改变,都是向下。但是,如果我们将径向线设定为170度,由于设定的径向线与飞机的夹角大于90度(正好是180度),因此,仪表盘上的三角形朝向就会翻转变为向上。同理,将径向线分别设为210度和110度,三角形朝向都是向上,不会改变。有趣的是,当我们慢慢转动CBS,当转到80度或260度时(正好与飞机位置成90度的夹角),此时三角形标志变为红白条,显示没有信号,但只要再稍微转动角度,三角形的朝向立即翻转。 因此,对于这个三角形的理解,不能简单的理解为:向上,就是向台飞行,向下,就是背台飞行。而应该理解为:与选定的径向线的朝向有关。因为,径向线是对称的。详细解释一下吧,还是以上图为例,图中,350度和170度是对称的,我们说径向线350度,通常是指由VOR台出发,以350度方向飞离VOR台,但是,把径向线350度向反方向延伸出去,就是径向线170度,如果飞机位置在VOR台的南偏东方向(170度方向),仍然以径向线350度飞行,这时飞机就不是飞离VOR台了,而是飞向VOR台。也就是说,此时飞机是逆着170度径向线在飞行。 因此,三角形朝下就表示:(飞机处于)背台飞行(的径向线上),即正向的径向线上;而三角形向上就表示:(飞机处于)向台飞行(的径向线上),即反向的径向线上。 二、对VOR仪表盘中CDI指针左右偏转的理解 模拟飞行中,设定了某个VOR台的某个径向线后,基本上飞机都不会正好处在这条径向线上,仪表盘中CDI指针都会发生偏转,需要我们调整飞行方向,把飞机调整到设定的径向线上来,使CDI指针垂直。如下图。 data:image/png;base64,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 第一步,快速确定飞机目前与VOR台的相对位置。将频率调整到VOR频率后,转动CBS,使CDI指针垂直,这样,结合顶端的刻度读数和三角形的朝向,立即可以判定出飞机与VOR台的相对位置。以上图为例,当转到顶端为350度时,CDI垂直,三角形向下,即可判断飞机处于VOR台的350度方向,当我们继续转到顶端为170度时,CDI会再次变得垂直,但是三角形向上,表示飞机此时在170度的反方向,即350度的位置上。第二步,确定飞机现有位置与设定径向线之间的关系。还是以上图为例,飞机位置为350度,假如设定径向线为30度,以VOR台为园心,设定径向线(30度)在飞机位置的顺时针方向,那么,仪表CDI指针偏右,三角形向下。这是经过在FS2004上实操验证过的。如下图: data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAOIAAADPCAYAAADoIg0/AAAgAElEQVR4Ae1dP2gkR/aeQIECBwouUHCBFxzcwgW34MALl5zAgQUOLHBgwQZGXHAIB4u4YBFOjHBwCAeLcGDEBQZdsKBfYNgLDnTJghwY5MCgCwxysMEEGyjYYIIJ6sf3ur7S65qeUfdM/6meeQVD9XRXV736Xn1dVa/+DZw5Q8AQ6ByBQecSmACGgCHgjIhWCAyBBBAwIiagBBPBEDAiWhkwBBJAwIiYgBJMBEPAiGhlwBBIAAEjYgJKMBEMASOilQFDIAEEjIgJKMFEMASMiFYGDIEEEDAiJqAEE8EQMCJaGTAEEkDAiJiAEkwEQ8CIaGXAEEgAASNiAkowEQwBI2LiZWA0Grnb21v5jd7eOjfOC5x7PhpNPM+Htn+pImBETFUz45G7fTN0Zy/O3PE3x+74myO3+9mOO/3nqSMhL3+8dHuf77mjr4/d4ZdHbuvDbXf105WRMVWdzpDLiDgDnE4ejZ0bjUeSdObjGjXdyJ2/OHO7T3bdzesbubf90bY7fn7iRqglx86dfnviDp4eGBE7UdxiiRoRF8Ovubc9GUFAONSCh18euMOvDqWZevPbjXv0p0fu6pfrjHhj5y5fXTiQ8+b1ENQ11yMEjIgpKUtqNk+h8UhqxtPvTtzGxrpbXxu4s3+eZtKCdD9euod/eOhufr0JNeD1z5du6y9b7uqXKyNiSnotIYsRsQRIrQeJDDKSPpumn+2461+u5Pfwjw+FdGLAkRrxMtSIrctsCS6EgBFxIfgafNn3+7IUsj7i9f+u3N6TXXf544X0GXc+2XbnL85DjXjy7anb/+LAwXhqrl8IGBFT1dfYiQX06KtDbzU9dnuf7zo0VTGcAQPOxasLt/PZjjv6+kispruf7Tr0Hc31DwEjYmo60zUhLKgcR3wz9MMW+bHC0VsMc9zKT6ynqeXH5CmFgBGxFEwtBSrsG2ZDE/FAfksSWTItIWBEbAnoSsnEhGQtGd+vFKkFThkBI2LK2jHZVgYBI+LKqNoymjICRsSUtWOyrQwCRsSVUbVlNGUEjIgpa8dkWxkEjIgro2rLaMoIGBFT1k6BbFc/X8mqi8FgIH4IYkMbAYo+XhgR+6I1T7TDLw8dSIjf+jvrDhO/X/7wsi+5MDmnIGBEnAJMqrc1EYWQawO3/8W+n3/qZ+GkKrzJNRUBI+JUaNJ8MEFE1I5rA3fNBcJpim1S3YOAEfEegFJ7rImI/iKbqfCliWp9xdRUVkoeI2IpmEoEmkIArJ4Qx+f0cXPadVFyPmwg4tpAVmYcfXUkNSKIePnqUpqpE6/jXZ2WTrvomX4+EZndaAIBI2ITqDLOuPDzvnOybOnivxeOP5AI14///DhXy+kab+b1WlYj4n3GCT/nikgXy6jDxM9ykdmfOhEwIi6CJgsqfR0X73kfK+lBEv5g7ZxJLG8ZnTvMWmZZRXrYx4bpahHlGvJRVv2w6J5+bte1ImBEXBROFljls0aaRbaN323kCAKynDw/yaRhXFq2sXPH/zgW8iJeLAiGe/nvl25zczOQGvE+ePeBDGsgzllExn6pkBV9TXPdImBErAl/bFchNc8H05uWB38/CM1GsXJOS7uAiNgeg6Q6/7/z3JvYZJjPSEQ2S/lRoM9w2t/YuPsoDIfDXNz2px0EWiTigjsaFRTOxiFimvRVgiASCvfpd6eBBFK41wahGQhiFjb7VDxlL2cREXFoMkIOEnFa/Kh9pdn64VaYqUNyooYlcVnzTovH7teDQItEzAQGHe8oGf0rKPC5bN73PBe4wp+ieON7/j8IuPPJjtv8/V1zkAUYTb2mZrlMJSLk8rJRjjJE1OhgzxvUso8LanN8TJBfc80i0B4R44It28jfuuHrG3f9v+uwBSA3QBoOb9rfkYwy0vfYD18PpR+lCzqu0VfDzmkkQpOqmklEn7AOc1+NmJMZ+VV5RvMUu4ijmavzvPfXvaw/GYUP+VZxhHt2UQqB9og4Ic7IjW6Hbv9vew59lLPvz0JNiXry8Osjt/3J9sRbjd9gYRpnQwyoDR689yBXIHc+3ZEaRBfepuXSJIv7iExbh7mXiHyJ+cV/fe2czNZBWpqMuMa2/phWJw7v6Pf0NdMw/14E2iUilSR+RsTDZwdu68Mtt7G56a5+vpYDVe6I2E2TCHuD4uOgCyC2t0efaqpj3qYGWOyBJllMRMgL+bSVtjQRY7GYD/j8uWyPVaklI1wwoUAmLaiwcZT2/34EuiGil0sOVnl2IJvmon8FI4Gc2zBGjXjstpvqm7CwRfiE/p8aDkAfCf0+EKFLp4mIvhxqav7YX0VNxY/H3ES8J5M4cyOuJfEhlSa6fncKxjqIXd8h0C4RmS6UNEKNiBOODuXMP5x6tPv5rtQ6wze304m4qIL1+7geO4c+EWoVFmL4KNwTTr878bDZG0JEDNL7gfrgFwz8ozYHYZp2mKSApViC21rWZAWOwdKq8fJYNy1TX+Nvl4hUjPdRuA6fZUTEWYC3t0M5jBNGgf2nh2774waappEMZ/86ywbEfQFHrSKHgaZ0+q7f8Rty4Yf+NK+L/MIBeua7jpKq4sLUPMijP2LAMNdcZXj6dciwZHG0S0QNHowhtyN3+NWRO/3+zA9qjByOFkPT68F7D90WFBorj+cG6rjmuMaXO4wBrqkaME6PcU+7z+dt+l3IwjS1j2v1/+I/F7m+NfqsGBoxdz8C3RERE5/fjtyB1IhncrqRjDCObqVPhmlajdSIzsmpuvoLjhkv4lio7set/RCxbPH/IokYhn5RmDrv4eCcn6/EcER8QUbUmtrwU2eSyxJXp0QUEFlI4MsvO4IMzyZqw0VQHzvpB8LAwT4N+oGoFQsd5Sp82OHNVOUqgETPgYXxCK0Qc8UIdE/EYrnu7hYVvKJ7d29kVzrM2IlVj19p+OhbhWZV/G5f//s8YyK4Pkm4k+yocdiA+9pg+oevEyHTSTR9IgIrFDBfyIL1kCvSYyw1AVGrvh3lDAmw8oUvcxQ2jqqP//XQAmYEdeo8vvt/28/pABPkoc+waBpCLqEuqmDfDyIyR2LguVuFABM+lBwclel9WSKk5oRiQH7mqocQUc8ukF+fZ9SEejxRckJcusiWl00MYxx6GQwcZid1LlsXeExJsx9EVAWNBQ5fVY6lYVYJrHPhCzt2DsMSoUk0yFZEBAxYMOmHBz29YD48ThobzIYR55+1mkPKxUTH2frJ9XU/9jgY3I05MsyK+ukTMVamUpQMKCulYoYHCBk3hTBrZ8LNiHcibA9voImKZjgMJvGUuK6zA8MN5+/CYJaafF3gkz4RS6CCAqe/sqwJcS+YzkvE07cg6C/jF1oCUQY49S0Yp6LnXf/V83lzZIw/kvH/soLjvTLvlglTNs05w/WbiApojF+hGUYSwsf0Obgwy2NOkFJ9jXkttAD7wsUwGLYBaVNzlA9zVUW+mBT8H/vMCO9P+4/7nARCn2G1H8ejn7Vw3W8iEqCxk+EIKpW1I4mIYNNqDUbRR1/yiyEBDMUwj1GBwgeKuARrcUKZRTOV8sHPuSgvUrvF9/AC79HPRYI/I5nbfPPbtaz0oW0B6WH2lliXp747EVkjN6KcN5JG45FibiqViXVyICCW5zS1AqHxDJVMgHkmEXMF0hcsTGifsKKWjL+tYJigzj4jmquhmUpy0KdA+M979PmsyEdNOB65m1+v3d7nu+7i1YWsfc3tD1EmnqK4a7q3FEScKJA1gZN6NIX5ZoGi75yDsYphJ1aVqHBd51f6tH6Igwa2uCXD/5xoXjjBfSIjGeVQI2KFD4gvd5j34ONuN67XRERNwGYoNk9aNUdyhRpxBgC7T3aFjKhxMLSTqmOeUIuHHeUCUTKp0ephOPizHeu9kQMRdz7ddmhBodWEBQfnOEkL8c/qP85OoJan9+WilkQWioRKQCTqWvb49F9PTCwOa+AWSqxfL7MwziSixwz40Iq6/XEHW5CUhBYTLpgvWMO1zhEF84AwJ9+ezDZACbk4dxlN0yupETHRA2teJyzOHZIxfSIWKBCd68J+jyJqwWtLd4sFdiYRkWvg4rHhO7CipmCkmFAKVnD8dGcBRxM11nf1Wv2uaYo+ojRNEysr6RMxAgxfMXwpWaCCJTAKN6HgJbwBLCa/6rMzqmucYMxKBTvKMXayORV1rMcbcQ95zjn1Xv4++3yeiN5Yc/lKnQnCdzteCJ42EQmSQlemb2HK2gePsxUG6hm/+vrWSl8X4IdCjKYpC7ngUxAuBdz0uDD0XWqecJwX/PdN1Ns3Q2nO7j/dd/tPD+QH67p8zOP3WgYgbSICDAUQJm2zAMkYoXqmm18tY5h+chon53KbP6G2SdUJEb0dAEa5uc5/jPKeyyuf0c89bPdP+kT0eKDfwI66bGXfLk5Ll5pYHn0hb2p38rpA48dX9lJNgDR15UvH0xsiHjw9kNUW6B8Gs7bOiV1XQgCT4x+9n00JnPph66LQM03l65U0y7oHTi+ICKtg+Crq9YeVit7yBQYu+Mlq/LLZUwUcrxBXrFwRKypuMkzZOJsM52VBV4SyNplcV3EnT0QUDlrNMP6TVCHpSms+XRbM3PBFWRL5cDBUMJ7QRMUzxkO/47zCyISPBWSdueN6x3LOm3zyROThnGhGhaGKeXO7ZO+RQDkizpFHPSbbOcYziI+j5DBhGx9mWd42R15TfSV5IrKwce5hqkB2IRexWZSIegUEdjtI2bF1hCl7hW4GkQvDJ3IzHSIWACigrw1cAJ1h6CcCYldi1EVENEP1xHBsFCwuJZwhi5dnar5TkrdioUiWiDBVc0J3IGLFzC178KkFco6MwxIt47RrA4fNnVnogz9HnE29AlsB8o7hrFKD/E0JUmO86RBRZQpWQMykINjqkV0qBBYmYlSDYNYSP34pr2bRBqZl6bKkR0Q2k/xgM04Tzrmo8OSerdifuYlIDOkTt7GT05sRL04Lxpq/FB3WJGJqGvM/IWOcr4kA6d1IjogwU3O9GWpFc9MRYEFcyFhTUGg50I/4yy28nS5jU08w1MIt/ZfBgpocEbUFb2KWfVNa7Wm8wAo/mWlUQKi5suXPCCHJQcqcQzp1pZWLuMIfnz6az5ATRr2+u3SI6MGl9W5VF/tWLlCaFPq6ckT5F1DLkowg+4SrMa2JuGfd8OlK8xR9Wmyl+c76ZM3dlXyzZJ/xLB0ieiGp/DDLY4bwK/9IFzZ9vSgw/hRlbItPfSwaZW3vI5/8ORe20Jw6X7a2hJuNKCkislkKs/QytPubVZ2PXRVKuVMjITGThYuwcwU9TrOVjBYnwuYpPhhhaVyNGBSnWv/dpIjIr68sd6k/rxZjFQR8YebiXLGiprTplCIby40QsUoeEwqbDBExTEFAjYjlSggsmvg1vTSIZIR+wp6j5URsJRTsCZANZ570dROxZIhIZQNUMZmrL14r2uxhIvxwyfBFw3gxLQwpSWFvOL0q6sCHiPIVGpaqRNZR2GSIyK9a6IskpOiOdHNvslL44i33731rjgBjJ8MkLOyp9d8niNjDspMMEVkjGhHLE4XECDVigwUQY5U4KIbkLy9l8yE1ETFfto/N0ySIKNtgDAai5ObVtjwp5IjIbDVBRh8nNvSlFRUtmJQcLe7ApI8TQZIgIqe0AURz5REoJGL51+cKiY2JkS6sqDiOW1wT5K8onRGxImBFwUONuDbofvpUkYCJ3uPxYmia8nCWNkRlfx4D/qH26ZiMWEPJD1OQqQ0wakqj8yoIFlKsCgeI0tepKWOrEA3wwk9WqIAITZKBcXufhR59Mtleg+kzXMsKQB+WtTX6sn1znRMR41JUqoDXkSL7priAVRd4+fMpqLckNvUaO5lZQ5n6ps/0iEgEuyhgTLsvflcYjZ00SfUBsY3WxiX10ectF9MhIvqHcF0VrpLKXtlgsV7GTs5ZZD8V1tSuXY6IsbxdC3dP+ukQkRbTngF4D75L/1gmXa8NZIuN0MdvW4dIz5qmFcuaUpLee2RiWpsKVzGF1Qjum4diIdRY6euWkJBNpwYDOWWq9cF0n19ajTEhBP1ETBDpk+umRvTgzSRin1BsWtYp5KJhItREkGNK2KZFpCxdr4AwIpbRdFRIckT86eouhijc3YMVviImYydTuDjDBX00zHgRAjJMBzChZiYZxYragQxIkrWz1YgVFJAj4s+KiBXiWMWgHC9jwYcfmvYdkRFNwzAXtcNpZkbEORhhRKwOmt5GUBMR1107bG+iZeqimcymaWpzYe/TTafaMyLepx7/XNVy2kSvC30KRIS0Wr4wFxUPVB5K5nquYEbEOWAzIpYDjRZBhJYa0W++jP8w1JCQ5WJrPhSbh6FWaomEyJkRcQ79GhErguYX6HJuLjbYZX8R20SIa7HQT5MeHwdu3Y8J/W06I+IcaBsR5wDNuUA+1oTwxViD6LogYkGatKKCkDh6uy1nRJwDaSPiHKDhFcwieXYoRxNgLeflj5dZRAWEmDOFWl7TVlTouo2PBIlowxcVVDhBxMQKUoWsdBO0CK+ie91IJ7U0a23ZFr8p2RCvj1uIuDZwoX/aUd6rJtuN1dSDNkFESN+Usqoi04PwOJ4Av7AeMTWZebKX3wYlTDygnhvQNQ1FViPOKgwx8JjB//2ZWP2u9MyaWXHYs4CA1DZqFzd5EGMcQndzoQf621ihQSJajVhR3xMLg/l+YgWKYqXks9mXm2uakoDQ4djJ3jackgcrb+3OlxU9hll7Gg1H2E3TVGVqgohGQIXO7EsSUQ4UTRw3HAcOeWFFberDYUScXV5mPp0g4szQ9lAjQCI2VbB1WnVc04oKf+JMx0U+JFYjLq4eI+L8GCZNxAJicWwRcmMyQnAFYcOzChdWI1YAKw5qu7jFiJT/3xYRUePit/3x9sLT6fSHt86a3HZxK19upoa0DYanQjPzwSJEPP7Hsaxih5kfFsZZP6ajff3eza83k3LGtZz/j1px94nfur/GFSO2wfCkCirfMSJWhkxeIDGq1iy6VmIci/hhel3JbGBVBnYKR5oYgK/DGRFrQDHs9F3jF7IGsZKPAgTAD7VMFdc1ESErp6JhWAO186LOiLgogljKgy/kRvaFxICsza6pAdQSUXDwm7Xho/cfST8QfUGM9+HH6zgs3sER6yDAXG7sQn8TaYgVFRGxSRv7sxIZO3f09ZHEBzlb38Bqlmwln3U+jkg5UQhyTRUqggHMrx0B1kokImrKae7Be9k4IMPi//D18C54FX35sKjNQ3zvRvEx5hLxamsszsDoo0uHiH/KiAijwfUv133Esrcykwzwc6vqfY70c1xvf7S9eF49waRJ6Rc6S9oliBcnniMia+g54onjbfN/MkTEXFPuGt32YtI2AU8xrZhoOOVJu/j5RJ90nkLv30FcWNTMNHS6oZmauzn5h81mWGMnZJsMnuSdZIgIdKgMWFHN3Y8AahP8Qv/q/lemhjh5fhLwhx5Q67HpSb2gT1j7sd1j585fnAcrKtLIuRIkp3wY0BdX4p1cGgn8SYqIUDJADQrvIaBt6pQFsOrwRZGMIB1rFsaLJVZw/I/9cmp1Sr+cLDBBRCaowvIWfH0QjhBxSjj9TorXSRERTREqPRgONLD6OkU0W5aJWNVBRIrO+aCIGy0TTtbG/1DjMHAdflWdRuExsQBdGnxExEXP6xCxjTjSISIAVAtJYbTpa3u/DcUhjSaIqONl/PBR4GW7i7YyV5QOSeZ9DFlwedXExACGLYonwXtpEFGBJlY0v6I7R0QVJkEcOxGJRKmzRkRGQDo0ERk//E4ddE/9q2tOlcMsHe309pP6fsrXHSMcQYMTjt7chnZ/LWbyKIll+kui1E1EYIQ4GX/nRCxQGsYL+bHo8qyNAtHmupUWEX0WtAUvjCnyizhXNpfzJRJFiEh86C+YZWyfz4ngC0bVyOv6Q9FIAi1HmiQRMZufM21gLAjNEoBTU0FrGedGkssRsZEU0owUwzVipBkMZPOsNKWsJlWSREQWZCL4WraAlONZ1bK2/KGFiNw8ih8o+sua/bFzaIoi72iallqC1QMs0iMiCpIvTLSIoVPOez3AtDURsVcNmmhSGBVurQnQUULL2BJIjoixxYugo99oZIxKflHtV3Qveq3Pf7lKRz7Ofc5IJHtyRIzkk7VqICP6jNZEjdFZrf/4GPNwm73P95Yq88kTEeTjam5Y8gpdXAuwmaZ9vFgUrjBCu5kaAhhT3vpwS/qGOA1LdBnrMzWhK8iTPBGRF22qluPHSDA8pDLo63vxNf7D6bD+lnlpI6BPSsYk8WVz6RPRk4b72qCPMHUFNsLOIpl+xmv6y6bZvuanQB/6SPAw26ogXF+zDLnTJ6JHF1PfsBcm+ouF8wqpGPp4T19TS7hXdJ/Pze8eAa0ftRAA/cLYmNe9sPVI0Asi4iuIH2Z60Ip68PeDTCljJ+vxsIwmnDY0dlJrIkxOeeORGH8aOX+hHn1YLBEC1DeMNDKVTZM0Ctvnv2kRUYGMbRP2n+6HeadUiPa5Pwm+kifPj2WlN5su179cyv6ZD//4yA3fjkRHt8Oh2/1kx53969zhzgjpqTT7rMi+yy76/mLf6TWP2N2N+m5kCVZCoLVLRF3oeU0foPhrmWvq9zGBItAvXN/YEF+u31kPCspOoh25i3+/dI8/eOyuf712bjxyL384d6gRtz7admcvsqOjL/974bY/2nE3vw3dSKiYkCZWXBQuDIa+sSZSb58RJv8XlJVlga1dIs5CjSB7H+eu4yt4/Hxyz0uQT+9ABuINX9+4nY+3hYCoIfEuvrKIZ+fTbWnGnnxz4va/OHC3b0HDrJYk+WeJZs8aQoA6d070pC2jq1ITEtn2iKhAZ+KF/qxwfIYz5L88DLXioz9m40on3xy7w2cHWZ/xo23ZfHf4+tptbm441Ia7T/bcyXdnWbNUE5HxFgpkN2tHIMZb/cd0PdlETLWIQvoqXLi3JBetERHE0fuL8IuHwVk8kw2QKgKN8UXOR917sitke/iHBw5N272/7ntjzq3b/stjd/DFvhDx8qdrh32xfX0YmsNLos9+ZkPpneVC+5jcDav5MrvmiOjB1TWXBnfadVWwN95Zd+thX8wT9/j9R9lhmP/yg77jW3f16sKto+/xZM8Nb7NGaSBi1QQtfGMIcKEvygY2ruJ+NCwrYWaVIm4QRt3jJmR4b/P3D4pXaIQX07holIjhjAVPFJBSr6aGhRP3YGQh2Fh/qMOUgWn/b3vhfSgPe5nAICNuPHKj21t3/PWxu/jvpVhKxWKKh0p5ZdKxMA0gMHbu8sdLh5YRygCMcWHjMJ8chqBYPmCA4+5yOWmgS7/1/vaHW2HSB8oYiCkW8twLaf1pjIgAgM1GgMhhhaLCD+OKHiMsta+pBx5wyvDFt3f7cmI7+Jwbj0JbNJAwF8D+tI6A/wiCJJzInSsnSiDoFwQkGWWxuHoeLkcjf2bHNgpFuB0uEv7wNkZEgobarnDxZkDn7oLT2PBu/FW8CxVdKUJifd7GO9lhNqgZ8aUVl7ACotys3F+WE/jZUFTUUlG6KxprDIDhYzseiZ0A1nNY1WWtJltGIWCaF40QUdduaHqKU4DmoIjuUzGoTUdvqx03hngfvLsZtu4//LJgQ1ykB6WZ6xwB3WLCMJO0llge6ENKfT1NauoVun17667/dy17nWLlzvkPL7MuiYSZFkG39xshomxKuzaQI72qZm/qdooVItKDwbgu7FNUiM+C1osAmqNSRvx2F6VbP/eJET6wWe2IfiHihhFo+Kb6R/2+5Op8XjsRSYKsRpuj5lFn3SGOudw4GyBm7QpfJorHX9b4/1yJ2UulEPC1EQxxuk84dSVNqUh9INHjyI3GI7f3+a67fOWHOrBh9fMTt/3JTjaUVSXOlsPWTsSw6evGRrkmBTPsFYW/qMFIIj6ex4fStUkc27KH7RkZoZGRSDTqo7/Gw0Sh2zDxnnqvSw/jkaSDecr7Tw9kdhWMPam72olIUzPM0JWdV8oEEedRko8LK/yF1H4IBXLJlhv+ean+R+WM2AsaAbF4qpkyh88O/WQLFWoeHavX5TLodJJ4qC1T1nXtRMzViDFQJf9PEFG/N6fC9KRiEHMZV3lrmFK4xq7t+lAbNEllEzAIN6ce58pXm2nNJWADC4MXqhF9JmYSsUxGC4BH8wTmcTSJWENiyp255hDgQm7gDQONDE80l1yvY669RsRYD4ws+PpVnh/oF/nyKwq/CSebF/uDblBI0HQyVwEBfOj0x05dX/18FWbJAFvMmAEJzc1GoHYiIjmapkOHHDeVskSk+L+XMzd80ZTJeezkI8GaET6MOsFRNvi85sP4P+8vs18mz8D0PxcyRY1HsIOEaJ4GDMvEs8w4zshbI0REk48mar3iOihklkC+psKMnJxpuy4lRvGgBud2jSAk+pIYeyq0tPFd+jPysdSPovzLx1MZY2CdzukOYPAd+ksNUPXMNUJEiCG1DWqazU139dPVnSJiGZVi9IycMMirngdlxnFU/a/jdE6m4KFJRZnhQ5ZCh3ej9wvDLfNNjwFWQ2AqIWfIYKwWOAYSapz09TJjM2feGiMiJnnrgi3EmqIMjO2xOYt30IeTwj4l/Jx5LX5NpQE50JzWRgYULsguk9ZV2OLIVuMuxme1boFR2AKfGNHXkBTd089X+LoxIoJI2vrJWgYbAonzhhnUPLppmMLW+rDu8SvPAocVHWhyLY0rSwoVDrvk6VYLsEHXQ5rxKtzSYNRiRpojos+E7BnDIQNlqWQBp4+vas640yII05LCrgGQCSQUOX0/aOfTnWx1CAsf/aKIZj0rCt/FvWkyeqOW3uAXOKAfLa2WLmRd0jSbIWKBYtGhh2GExKMPowyehX5FCkBH8mMZl7bmBtn//Fj2TQ0iR++F+yleUFb6lNG3VPBhxE+3DDBGDBxCHzl+l3GYXxmBZoioxYCy+qCwWMb4v88TjBEooLo5TWLiQ8O9VhG80PKqsQmuVfYAAARxSURBVOnqmnnzPvq/IBia3hx6YJ7QVZhokvN9yM9r+l3lqefp1k9EKIQ/rSh9PU1p+r6+TgVkJRMMO0W1JAoyCi5rlFBQU8mDkgMLsSGr7A0TdRuwlyjyF1oqKu8hiqJ74aFdVEGgfiIWpV5GYWXCFMWdyD2sLAD5pFaJCjVqF/Q1UbD5m1gF0lA+mB591nTax0R4yi676TUki0U7HYF2iDg9/eV74g0cKPixhTFX+H+3EWpO1qBhQjRQqfphGrtQCzM+kEunGV/Dqg050dw21y0CRsSW8Md+OmgC8qfHTWOC1PZ/bRDSY7qB4CQ6fF63hIUlM4mAEXESk1buoAmIiQL6x5Ur8xJRx8XrkJmYbCRgfD+8YBdtImBEbBLttgo506GPPOGa/+k3mVeLeyEEjIgLwbfAy7PIwWf050kG75Z5v0yYedK3dyohYESsBJcFNgSaQcCI2AyuFqshUAkBI2IluCywIdAMAkbEZnC1WA2BSggYESvBZYENgWYQSIeIZr1rRsMWay8QqJ+IMwiFQ2Ww6FZ+v97kJxSPnWw0FJ7/dnN3lJuHEhOQw/PXw/zqBqQ7I+1eaMOEXFkE2iHieOROvjuRcwlwOhTmOGKl/s7HO+78xcsw+IzFpo8/eCTPj74+dFsfbslcSBAMawIPnu7Ldup4/+gfx+70+7PkD6Bc2ZJlGa+EQP1ERPK6ZhqP3MsfzmX9Xjis1IuI2g3r3TAdCw7LcnCICNfxHTw7cLIJ8NjJycI4GZjPfBR5Iup0GcB8Q6AHCDRDRGYcx2a/vc22KHxxnieoXziLmvHoq0MJh41+SUTMxXwIkuJsu9HInX6X7ZeCw0zgcLpB+BkBibj5PUWgWSI654a/3UhzM2ypqEgjBPvnqdR6t2+Gbv+LPdmaAavfsUbu4Nmhu33rDxRBzfrvl3J/Y3NTToMNz3oKvoltCBCBBomYEQg14s4n27JfDROlD+MLFtSGGvFp1jSVE32lX3nqHr7/OH/IJA6f/OGlbN+Hxba2kJVomt9nBOonoqrxBBgQ6vmx29hYvyMNwoxddrzyB4/d1U/Z2Qi6j4hjtC5wsuwfHrrr324kKukf+ndxtBo2nkI/U/qkcbp91orJvnII1E/EjDL5c+rHI4dtFbEJLfqB2AsT1lOcLozmJo07sIpiASueHX516HY+3c0so6PsrAq575/Bwop9NmPjzcpp0DK8FAg0RMQZ2PgajeSbETJvEWVA1nwV4uGr5hsCqSLQPhGBBMkUo8L79OPn0/5XDT8tHrtvCHSEQDdE7CizlqwhkCoCRsRUNWNyrRQCRsSVUrdlNlUEjIipasbkWikEjIgrpW7LbKoIGBFT1YzJtVIIGBFXSt2W2VQRMCKmqhmTa6UQMCKulLots6kiYERMVTMm10ohYERcKXVbZlNFwIiYqmZMrpVCwIi4Uuq2zKaKgBExVc2YXCuFgBFxpdRtmU0VASNiqpoxuVYKASPiSqnbMpsqAkbEVDVjcq0UAkbElVK3ZTZVBP4fXg37rx9wF+0AAAAASUVORK5CYII= 同样,如果设定径向线为110度,径向线在顺时针方向,CDI指针仍然是右偏,但是,由于设定径向线与飞机位置夹角大于90度,三角形朝向变为向上。如下图:data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAOUAAADhCAYAAAA3WHIAAAAec0lEQVR4Ae1dPWgkx7ZWsIECBwocKLjBW9hgBQ5W4MACJxY4uIIbWODgChwYscFFODDCwUNsYoQDIxxcxAZGODDIgUEbGOTAoE0ezAYL2sAgBwZtsMEEG3SwQQcTnMfXmjNzuqarp3umf051n4Kmq//q56vzdVWdqjq1QuYMAUNAFQIrqlJjiTEEDAEyUpoQGALKEDBSKisQS44hYKQ0GTAElCFgpFRWIJYcQ8BIaTJgCChDwEiprEAsOYaAkdJkwBBQhoCRUlmBWHIMASOlyYAhoAwBI6WyArHkGAJGSpMBQ0AZAkZKZQViyTEEjJQmA4aAMgSMlMoKxJJjCBgpTQYMAWUIGCmVFYglxxAwUpoMGALKEDBSKisQS44hYKQ0GTAElCFgpFRWIOWTE9PwzQ1dPLug6F0sPo8pGg7p/JcLGkbi/iimwfMrOvv5nC5/vxTvm1cLAkZKLSWxUDpiOny8Rxvvr9H9/7lP12+GdEe/mI6+2qf19TVaXdugwZ+3RHgyIrp+fkmHXx3Q7eshHX59QEc/nI2/WSgB9lENCBgpawC12SBjone3tPXhBg3eDO+iHuEEEg5p4+E2Xb8akzKOaPujbbp6Pkjeu/3zitYfbNHwXbMpttjyETBS5uOj72lCOJGsEUg5pK0PNmjwekzK5PGYlA+2xqSMKHp7Q+v/2KThm7v6NHp7TWvrm3Q7vhahmrdFBIyULYJfWdTRLW0/EjVlErAg5csbIopo+PeAVtc26TbhbkxxdEOra/fp5i9J5spSZQEtiICRckHgVH32DqSUfcpx6kYRbTzYpOtXd6SMhte09v4m3byOkuZt9GZAK+/dt5pSVWGSGWN2y+Py2Tmtr6/T1sfbtP0Jji06/v7EfU3XNUj54QZdv2ZFD5KHmjKijYdbdJ3UlHf3Dv5zQBfP7rSuV7+f0fZn+wSKmtODgNWUblnEER083qdYjCJcPh9Q7Pbl3O9auY7p7McT2v54k9beW6XNj7Zp7z+HFI9iOv/plLY/3qLV1VXafLRFe18gTxgmuaHdf+3Q1ifbtPfFLt2+jUz72krZ+SM1UjI2TLo4TkgZjVk5HMrah1/WcsafY/z3GKd/+vMQfxWZXCiGcEy/lE/NrwABI6VbCEzKUZzUjgePD5TWkm7CC14zeZnMBT+z15pDwEjJWI9rD7Rb9z7bpY1HG7TxaJO2P90Jh5ScB86TPHNLQN6D33fffc+uG0PASOlCPa4p0f+Cw8wXc4ZAkwgYKSXaqDUcUuLxtJ8mXza/IVAPAkZKF1cmpZjcffnHVUob635i14ZAlQgYKR00sYICk7vXxXHw9aH1vRyc7LI+BIyU9WFrIRsCCyFgpGTYTAvJSNi5ZQSMlC0XgEVvCLgIGCldROzaEGgZASNlywVQS/QjouNvj+n61XUtwVug9SJgpKwX31ZC3/1sl1ZWVpKjlQRYpEshYKRcCj59H6N2ZELijOEdc2EhYKQMq7wmqYX1Okm+ef7Jh+ZRj4CRcokiuvnrJlkQDUIcfnO4REjjT0dEgxcDOv3vKZ38cDI5r62tlSLgPILK54jHPZbPiIWwDAJGyiXQO/vpLEWWokHxZHd+P4oiAvES8t276wtK4jTt57TASkEhZ2O8hWAq+pKRsihSGe+hVlt7f1qLQcFSxHHNdPzdcYrUZciHvuLBVwepA2ZMfGHsf7nvfeb7Rt4//PowqVGjt2Y8pEgZL/OOkXIZ9Iho89HmRNhhegNE9bn1f6wnihcp7Jl+p7Yc/N+Abl/fpg5YRJi4cbMX8WeGt7JCmx9upr7n8CbvO3FO7o+1uHwN4uOHkJfPSbrMsxACRsqFYEt/xAKL89H/Hk0eolmKJi7GDOU7WX6QG7XZ3hd7k+/LeNCnleHiW4TF91Cj3/wJq3b5Dk1WpKNozYra+vI32/4gH9VyT42U5fDKfPvsx3TfErVIstIkpzkJsqy+tzqpvUDgZRyTD2ekBw5NTXkfzeYyjmvT06enqXBkmIn/3gqhFbDzz50ywdu7HgSMlB5gytzG2GARDSlIiNoL/bMqHTbqmSGK0+zE871/L1YLc1qvX14nNSjIlxcfWge3f2OrBHOLIGCkXAQ1+c2I6Or5VWLK0Seo9x/cT6a8YQgl5VytJV/zOfWy/wL2aX1xu/f9oRR/Er+Lk/y4LQQZF2rOrY+3igdqb04QMFJOoCjvwQA+mqlSGKV/5187jShE0I+V8fr8Gx9slM/kvC9GRNA6y6l9bvzAyWrOeUBOnxspp1gU9kGxIbWurhDydeEAK3gRTeh5R93DGYgfPyLOvzxDawvMzM1HwEg5H6PJG8M3w6SpKoWN/RhyQHNN9i37KoQYrgEWjI08o0+N5r45PwJGSsZmXj9uRIS+oRQw9kPI0M+Ck8IIxQ7GGPvqgIuvWYt+MGPWV3x8+TZSSmQyiAnBwtgdE1CeTzwb/8h30J/quwP5fLONkh+a3Lil72CR7bqVKwLu3FYm2/an2A3Z3wTDhHK8CyVQ3f243AwoeghFDzBjDOV56yPT0sqisppSojH2o08EpYUUHPgxK6YWDWZGGrp8Cxi62EJBBMzNWU05IwNoam08nBWa81/OC01TmwnQbmQigGY9+twuOdHK6LuzmpIlYESZtSOExtd35E81n7FMjIcpKlnzWUVmue8+omR6nktMzFDq87imkXIsZJiC5goHNIfoV4bsMH9V5ktbXjDLKavvjhlBSHsfnZESM1I+nxqaYgGGkibl+O+euqn/AmOrspkIf2ooQkm+Ln69oJWM5WOpJWr64a4khf0mZQYhsSYx9NrRlQx3GVbZ1SJueHVdo5+5/zi9GBs15syc4boSoCTc/pIyg5CYjdNVB+HmVgDOqpqGTm2NIRKZVvj7VGP2lpRu7YEasssqebdvCUHX7NzywU8FC6o1ubs5XNWnSHfJVJFf5y+M7cRZG8l/YxCy825EiVUEzjPOarSxWeCP0lMWOd3JRAO3TLO+r/xeTBRHhMXoURSnNxKepKcamnaflE7huFpWNFmLmMlwggnvciw4LNx81p4Rt8ZEuvFTbdbFdPvXDZ18d3xn+vOHYzp6ckLVUHA2J/0hZUYNiQJOHAR28rebBalLd/CnZ0LyWVX+MspBTvJvJ80RHTw+oOgtIzWk82cXNKyJlb0hpTQihYJFDdmlPiTXKJj4PU9bib4ZCzfOefN4WQzbPqNPLBeUF8lnZWkeRcmihMELx3JEZRGkA+oFKbPMZXStZpQkK7IyRb4P/7KGu9JiVc9VZjnWE9VMqNHwltbeW6WTH+qfBth5Uro1ZKN/2Jmire+GJFkRUh49SZsQUa30YdhGNGP6spEWT9KkjimOIzp7ekZ7yUyvc+tTcrnknp3+SJbVtRBqhNw8eh6WJSWCcW3FSpu1nmjavw3dgGNNr2ntefxuSHtfHtDgz+XMgvrA7GxNiQnN0lJAMjOkgDFiH1Da7y9CStc0JRQq7j4nWvPtatFRvrW5UUSXv8v1s3Ey6+uqJqsSnSWlnO8JgU3N96yt9NoLeBFSIrWuNha4BeEyakwsr6vH3Wlfb/4cT5CPYzp6ckzRu3pi6yQpXUtzsBTQdYe+Mx9ltcouXjC6HIqTPyP461HgxXT52wXtf7FP+1/sJf3aq+f12V7qHCmv/rhKrTbADJBQmmRtEQG1pWxZaJvOlocLDJNJYha2DOHoH/LiaPpZp0iZLP9xzPU3DWio8bnGwUJa2O1q2BfdngGrg3jifpva6E6RUg4u4+9ZXx8jVOrlp1vWOElTMP91NU/djYxKpX1cY7oa3VJhVIxEZ0jpzlLBhqzmyiEAy+9yoXFItllBTK7lQCgMk8yb2YQF4EmendYVvocmui3XGVICSHm0BWjo8cq+JfBUte5yDrhuMxYTJPKcJLGUHSjK2tTWd4KUstmKGTshCVKe0JR5JoWqyIyevLBdE5AhaWPdZqibT4zN8jxhiRn8WH2iQXaCJ2UyAC5suzS/rMct9naupYAtS0qYC5HhhYSpO+4qm6HJ3FkhK5zHeca1my7RsEk5opTwAOS+OhYwnJclJTB0jYmVHftssxywKa/Ew23W8jO0qiRp20yzjDtoKcYfnAHGuc/aVolDFaSEkMgwsatYPQPzUhwr8I8osRkr057lh4JnniKogtQsFESwpHRNJ6Kf0GcnBa8qUrr2WGEHNxTnNmMZH9SM2q2wB0tKt98TUvOqDsFmocO5KlLix4f9UzjsoJRoIyJ30nqCi+KZPCwXwZKSBQVn7P3Re1ejsEms4Q/FnT692/2M0x/K9MFwEBaS4P4BNaixRfI658U6SxZsnINYdzkuBZluLOVLjT/W+CNbRgiCI6U7eRqatcQpBXiZwtH0rbuSJAS7PoyfJGYIlguDI6VrxqLP25ez0DVxdqejYZA+FOdu8a493cGRUv71al1trr3kWkgfFCUS/1C2EnCVgtr7lkGR0p0ehaasuTsEgA0ONOfr0kRDGyvni0IbW1dcVZer/JlAMZjqW1Yd2ZLhBUVKCSxmbZibIiCxqWpIZBr61Idxvklc9zImbCju20/SrdykZhikHBG5Rp60N0GmYtyMTwoc+n91ulAXREuMkAetLgxSEpGr4NEKaFvpkgJXaU3p1nwjosQEh5jYjVUlIZhcwUweiZPWJmwwpJTWsds01dAW6ebFK4WtUlJ6Ip6Zgve5/il4gxeDZPEzY6V1amYwpGQgcTYFzyxTJD5NkBIpkHHCH4KDRXVOt5FyiRKTTdfEREVc03ZHS6Sx7U9Z0HBuipSYSQVNJseNCQbaHczEcHpx1jgbLIjfmwTx+FuzvZMp+G7fL/Olim9ii/rPdlNCjmatKpeBi5QnI+UCpeUaxIIW1pwuBKSQw6/dpYZ1FKZXPYIuKbUXeB/Tt7BB5JbAcmf4tJQMb7SqSQk1u/a/mhfZnj1Q34wV5YHJ9NKUJqzqa3KqSZkY2RXjYRrb/5oKM0lLRh+qiTS6BpGxOFqzk6Y0JyuNlCRYNymjKKVEUIKZymRAwcJHWz8vzIOV/UsMP2h1cmjESFmilOTk55QCoaXaoETSG39VkqGpIZGZTPq0sQrLC5PrGTPUmpqMaKmuKRk0nOdZu54RkJ7dkFi1Rsox5jIti26200TxyXRqWu1ipGyi9BuIQwpY26R0Fw9AWafRScyMlAVKyDWo22ebrgXgUvXKzGY7760mtlhVJZIo6YNLYmpJn9qa0sYntYjIYumAskkKPBZEa3PupHot6VNLSrem1AKYpaM4AthFWxJTm7EtI2XxskzetJqyJGAaX2dtrBhrBhG0OCNlmZJAYX4+neiMlSHmAkJADIG4C4tTY4LivbZyJ7dR1LK7mMrmq7sPRFsFFlK8+HFBy4mzNrObrnlKTRsFGSkLSrmRsiBQ4jXZd2t7SEQkK/HC7IbckwRpxeC9BmekLFgKRsqCQInXNJMSyXR1BFqsEUpSatlVzJqvQrDNWy8Ck23bx4ofDc1sScqkT8n9XD7XC0lm6EbKTFjsZqUICAGXNTr8bbuLX6dW303Rk1Ma2ISFCw8LUs11BwF3gbEG41UsazhrmG7X/q8qQ94kSEbKDIACvyUXGKOs27ZOKOXNSOkRLgmSkdIDku+2aCr6Xmn9/ohmtLFtpknKm5HSUxISJCOlByTnNrSbfISwB6PbjG1zwYGUNyOlI1h8KUEyUjIq+WeJmbZxSl/KpUkOpL8tiwkSOyOlp7QkSEZKD0jObYmZJlIiLb7t2E+fpvf2aEvpI7EzUjqCxZcSJCMloxLeWU4C8ZUj7svyTs2NbSjLMn4jpQd0CZKvMD2f2m1FCMhyhH/GYQcvZ9MdTDBoWhsr02mknCmluxsSJCOlByTNt0eU7CotyzHx31sh32R0990msyfjNlJ6kJcgGSk9ICm+jZpuMqVuZSXVPPXtBYPZNLLcm9TGyniNlB7BkiAZKT0gKb7talVlea6urk5TLsdUR0TSpGiTU95k+oyU0+JJ+SRIRsoUNN4L4IQDi4pv/771vlf3A2wBIMsPazxntmP3TJ1ELSq/bWpzYBmnkdIjIdJQrpHSA5JzWwpWm0Mi0J7KtKD8pBaWnznJn1zycz5PHtTo4bhwNlJ6gHYL0fOa3RYISMFqi5QQaJkO1JDs0EecPLu3ksw+4mfyjOVcsvmLjWiHw/oWRM+sEpFNapmwBv0ZeuoGY3ejGgNipHSBmX+N2TB8YLeyNhzMSE6IlzEEIp+BeLBIkOVk3xLf1GkFb2Y9ZVaCGr6ni5TjzBspG5aCCqJLtpcTmtbzn88zQ5XExIwen4OtIfluXZsFyx+AWR7wlQbRTB8k51V7pAQBOaQBQffVgq49X98QCZrgkpR1WTS0mrKgAFlNWRAoJa9BmSMJtP9435uyVN9yZYWSoQ9PP84lcB3NWCOlt6hmH2C3Ji5odPbNFUTAI+AFv17oNS4nPieB5KSD3+MzfsI+x+/gfP/Bfd9rC9+XpLTm6xwYXetnc17v/WM09/ioU1vpAr3otuqSbPBnuhEleZLvTnbwyiF9ZlgZN2cspFcQZkY0pW950CgdTuUfGCnLQSoFt6khEQyByB2RUZMV/SG4EwqOvzvOzDB28EJLifOH+BIreBUQaIaUmSlo/qaRsnnMa4mRhRbnpkjp9iVlGsr6d/6541UOATA3vCpANFKWRNHt5Jf8vHevS6FtipQyzir8eZYH3B9AnjKpaOEbKYsiJd6TBe1TnYvXe+2VWDVFSt9KEJmWon5MPJjX9EV/Uoa3bD5lWBqm17EAq22+IoEStKMnR5xmO2cgILFaVlgzgs+8hf4e4qriKEIK9CVlPrH/5TJOhlUk/mXiKvOtalLKP3EVzZUywIT2rhSwpkhZOUau8sa9Jkqm3Mm8LpoGafAbyqPJypqMOBeNY9HvVJPSJhEUL1YpqI2SsmEhRu3MO0T7DHIVQU1qjduwC5SXRiNlHjoBPcPUNgyEo2/WKCnrwKgBoktStmVFzwedalLCnsv2p9OJydrA84Ha5n3UJFr2fmwTh7y4k4XYYst3Dbt/yfTqJiUR2dCILC7zV4GAO7xSRZhVhhEcKYNvmlVZehbWQghsfjidIYS+uDanL0UZCEklxmRopIF+R0ZSdN8yTAqVj5SnvAkLhQKr4aXgSIm/XFsr62vA34JsGAFobI2UFYEugcxb6lNRdMEFA0z48Bk8Di5TNSRYal21DYVwdoOoKZFYaR6iKdODDFIIZ/nTsn53dom5WyQYKbNxKnwXfUkpeIU/7MmLEhsjZXaha9e6cqqDqSldw0wYKjE3RcBIOcXC55Nj3ppbW8GQEkBLwcMiaHNTBCQ2VlNOcZn4Rmn5SekllGmtgyKla40gBewE/X56jJT55S7xgSUDzRr8oEgJ2CW4MOibcsr+eKm01XwhcbGaMg02TI1IfLS3soIjpavwwTxGc5RsAzBZfmSApBCAqRFJytRDhRfBkRJNVrnXhFa1tsKy7m2SJCGxjlK7C46UANS1hKZxqpT2gu9L+iQhNx5uqO5LcpkESUokXoKNtY文明用语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 以此类推,设定径向线为280度时,径向线在逆时针方向,CDI指针向左偏,三角形向下。设立径向线为210度时,CDI指针仍然向左偏,但是三角形变为向上。分别如下图。 data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAPgAAAD2CAYAAAD720p7AAAgAElEQVR4Ae1dMWgcRxdWkcLFX7hIkSLFb0jxG1JEkCKCNBGkiCBFBC4sSGGOFEakCCKFEWmMSGFEiiBSBJEioBQBuQicC8O5MciF4VwEzoXhXLi4wsUVLra44v18q5vTu7ndu93bm72Z2W+E2L3d2dmZ7823M/PmzZsNYSACRCBaBDaiLRkLRgSIgJDgrAREIGIESPCIhcuiEQESnHWACESMAAkesXBZNCJAgrMOEIGIESDBIxYui0YESHDWASIQMQIkeMTCZdGIAAnOOkAEIkaABI9YuCwaESDB11UHRsnMm5PRzKX1XBglsvnRDdnY2JC923tTeUiSoex+vZPe27m1KybPpjSdx225dm1Ddr+5ujeVAH/UigAJXivcvr8skeTdQA6+35fBYCAiibT/OZOtb1oyRNZHiRw/OJbu825akN6/Hdn+ck+G6U2R/osLObp/KDIS6T5py9GDk8vnfC92xPkjwSMWbvmiJTIY9GXnqx0ZpKwdyvDNhXzw8bb03yYpwVu39yQZn4sMZPfWvvRegeGJ7N9pSedRJ42XDPuy8/Xu+F75nPCJ1SBAgq8Gx+KpWF3ztGubXht3cn3ppqclGkr36bns3N6XYZqvRA6/35fT304lGQ5l8Konre8OLrvpyVBu/m9Lei/6YywGsvvNnpz/fVEcG8ZcOQIk+MohLZpgIvvf78vh/WO5eHwure9a0nszkIO7+3L217mYMW3R1FYebySSvBvK4b0D6b7sj/OTyPB1T7Y/25TtL7Zl/+6BDN4lgr/hoJcSvD9uzUWGKcGPH5ytPGtMsDgCJHhxrFYccyjtR23pPO5K8q4vx78cST9JpPdvTwZvxoPaFb+xVHKjRM7+OJWL8XjbPHv666m0H3VS8u99tS2tH49T8oPgNz7cnGnBSXCD3HqOJPh6cBe0cN3nF3L+V1vkXV8O7x9Kb5hI5ykIv+b2O0nk/K8zaT/uqJ5EIsPhQFp3D8ea80SGb/ty85OttOeRyFC2Pt+R7rNeOh6XEcbge9J+jN8M60KABK8b+ckYO5H+q56c/o7xbFf2bu9K7+1Q2v9ASVV3ptT7Rol0Hp7JxYteSm58atCrGA76MnjTk4N7R5OpMSjWMI3We3k57j7++VjOH56niSVve7J7a08G71TaPK0dARK8dsivXoipqKP7R5K87Urrzq50Xw7k/GHnKkLtZ0lK4uP7R9J90U3/L150ZevLXUnA9NFQ0ntPLy7vPbuQ1g+qRX/dk8Mf99NptPO/TuX0jzPVA6i9MHyhCF021V4LVOuMrvjhDwfSfd6Ro/sH0v77XNpPumskxWW3++zPs5Scp3+ApKfSfmw04VCmDdLuO66f/X1+SfwUxMtpNAw7cA8t+XDdQ43ahevfC9mCr0kmaBCTJJGj7/fl4N6htB+eycHdVqqxXlOWln+t+WiZ4/Ip8ckVI0CCrxjQUsmNEjm6uycHP59I++mF3PzoBlu9UgAy8iIESPBFCLm8j6mo347l9O+29F73Z+y+Xb6aaTcDARJ8nXIeJdJ71km75RivGg30OrPEd8eFAAm+TnlizMpx6zolEP27SXAfREyS+yCFKPNAgkcpVhaKCFwiQIKzJhCBiBEgwSMWLotGBEhw1gEiEDECJHjEwmXRiAAJzjpABCJGgAQPXLjD4VA2P9mUmx/fDLwkzL4LBEhwF6jWmCZcG5t/uCpmIAIaARJcoxHguSE3jjtf7yxdAqz/bt1ppf8Tk1ka4CyNpy8PkuC+SGLJfCxNcIu8Oh2co+vPED4CJHjgMoTLJE3OSetbolznf59PpYH0Tn47KZECo/qKAAnuq2QK5gstbVWCf/DhB1NpmPQKZoHRPEaABPdYOEWy5pLg/ddmE4MiOWEcHxEgwX2UyqI8qfFzUYIP3w5l79u99B/KNJyb47X/XMtswamVXyQI/++T4P7LaG4OswhuutgujqVJrz5GcwvCm04QIMGdwOo2USjFjMdTFyQumyYMbUx+MN3G4A8CJLg/sliYE1irgUwb710Zt5Qlo+v419+/nlrVHfxwsLA8jOAeARLcPcZLvcFsPPDBB9ka7nlExYfA/BszVmwJnBUOfzrMHH8jfYzNzfPm43Ljvzdy4+flCRsrojxU2mVJwO01EtwtvqVT773spcqvPLLY169duyYYF+vrZV6KnVX0s/o8yzJu8GYw6Y6bbrl+Zt45puOg2GOoDwESvD6sp99kKZ/mES2LNNOJieiWFUQqGnJb8PdKmL6Oy4IWOiuvedegIEyDwcIc7cznXbfj8fcMAiT4DCT1XcDeZGgF8whgrpvprHk5WznBNzbSnsG8d867133eTafi7N6FKZM5GgVdblokdy40RW6Q4EVQchAHY+IbH+WPZzH+NePwIq/X1mgge9GAj0zeOH8yZq5CspFMymFInXXEGJ/msUWlVjweCV4cq8oxQZiLpxe5LfbN/11qyTtPyu8wig+GIc5EoVaQmLr1N2ng6CKgNwIyQ9uu36XP8WFb+x7pLgq/hjTdSHENBfH9lbAc062srtBQlKGrXrVSG6VXWSzWsdgEJJ43PNn+clsOfuRUW1lZ2vFJcBuRFf/OVWKNHTXMrP4q2OquOJszrWmqAKspL1ufb828X38AJ8o4FLqmPK0a33WlR4I7Qh7dbIwpdUU151AsoUX3KaBFRfcZ/zMfnRoyamzl84x40NpDX8BQDgESvBxehWJjjJm3gANEyq2oNbVOxnilUGFqjtT7tyfHvxxnfhihlMyam685i0G9jgRflbjG2uI8jTRaxplQE6H1e7VCrYy2XadR1zk+RFnKOIzN8aFkWIwACb4Yo0IxbM8qpjuOeWB0L30I6HpDoWfy5jvBgRnm03WeTd5xPPmVXmcW1SsSfBFCBe6j26grnjkv8GitUWyFX60vr/gyfJwMrvq4zJRixawE9TgJXkFcWdNLqHzojqPl8SlgCs7+EPmUvyJ5OX5wPGN3D7yvX78usOFnmEWABJ/FpNCVsz/PMpdtth+1Cz1fdyTbTjzY7u1I0hkI3YrjHLqPqnYEdcukjveR4CVRtoliKho052hhfA0mnzhCwx9M1zZHEYm5c60wNOVDL4VEv6qFJPgVFgvP0A3Mskbb/35/4bPrjmAIgGMUU00jESxdhXmvLhvOYQXHcIkACV6iJqQVyfKmsv2F/5XJXtFVoshBRLUJjt9llswGUcglM0mCFwAOLbc9H4uWA9ZXvge0cphP1iTwPc/L5O/sr1mdCKYum27aSoIvqE0Yz9nGKxjDgjghBHt6yVcl4CqwhBWc/pDhHLqRJgcSfI70sxRqIRiH6CLpCo8PVSgfJl2GMuepMY/l5x1DlKYq3kjwnNqTpVBDtzw0gmiCwy1UEwJ6KbrcOG+q4o0Ez6nxdgXB79CCrfGHJVtTQlbvq4mKt/BqreMamirUrk97GwlFoaahwWIMrRgMbWihy7LsORRvth170xRvJLiqPalCzdppMySFmiqK2HbnUEA1MTRd8UaCq1pv+0sLttUbiWCzATPMCLYcSjZVTtv/tGfW5/vmcKNK+eY9S4KP0Tn9fdp9cYgKNSNoe/wJzXLTg614w0cPw7HYAwkuktplm9bOHEMWvCmDOTaa4MaWfSTp1kkGE3OM3RCm8QTPWvK5e2s3WH53HncmXXNUYswBM1wiAMtD9MwMuXFMl5pGrJ9oPMHtqaTQtaz2mm901xmuEIAdg+0vDz7gYg3NJfhIUr/b+muOJYghB7gXxuIXXaaQy+My7/aHPZjlsyVBaSzBQQZNBJyHHmy7c5/Xp68V65Fkbrqw1jw5enn4tXoZYEYyQ25fHCMuUxzzjP3BYvfcIJN9tHs7mZ5vsx8N5mrjCA6f5PZOGiGs6S5SozTBm2SWWgSbvDgaM5wf3ovLnLdxBMdYyxZq/1X4iii9+WC6aoy7gORxeuq6PT+OuhFTiKs0BSSjyQ1b7dxdRgqk5UsUlEGvWW/ioooqsoCuQteLpdeQY849SaT3b1f6g6Ek40wNXvfSjRqGQ3OlSm7LPdsogh/8cDAlyBB8qRURp213jrn92A04iuBSJo6eOsPcOOwJlgnJcCBH9/bl5mfbMkyNbBLpPDqTo58Opfe6fichjSG4vd8VBBpsMNZZIhLjbMC65KJbcZzn7moK/JUMpvObSPdpW7a+2Jazh5cutJO3g8sWfDpiLb+aQXD40r69N9163/XfE2qRGmATvNFmqUUA03Eskm59Nr2NMXaHLR1GIHhHes8vZO9OSwbDREjw0iiWewAmivbXOf8LXC7tdcfGeFGXjQRfXiL4WG5+WtFBJTahfNIReTeQowfH0nnSTZ1zYn0+RuB1j8Ib0YJrAqBrHgsJ7FVjUfg7X56fK3kSc+G6viwzN959eiFJMky75Xvf7MrwzUAunvdqJzcAiZ7g9jLQWOa8ITzb7jxWc8uVMLdEIprg2JO87LLSi2cXMkwSkVEixz+05Pj+EQleAv9SUbGwXwus1MO+Rh5J2gvR5cL5JFhjy8l1nhRCAN1pjW3ZD+dlC37ZIU8GPdn88Ka0H13IOrzoq1pRqOz+R1KV2zZqiWnppG13TrPU1VVNrDizl5UWTh1j8Kdowc14O5GTe0dy9OAkJTjH4IWRXBwRXjv0lzgmEiwsm/rQLUaKMWwEYCOh604hHwHYL+31QHY+35KdW63LFhvXXval/U+HBLdBrvIb4yYtoFiMWoCJXTbanVepKfnPwuDF1CGMxdOtqsp8OE3c8bHu1hsli6+LPpaXnj6C69zu826+JAO7o9cyp2V7EU/ZfBJFut/ZxsaE5CE6hoiS4FFZrWXUeE1wtDIM7hAwLbg5Tlm3uXvtylJuBMFXhpYHCdl25/uRWOR5AG1mFuAnwJAbRxI8E6b6LmbtBlrf292+KbNsZpzn9tWNTd0m+NIrzdaEYHQtuG2bHbynFkVge2OGWCzy1lT3C7/W9vwy90EjL3OcG9n9zegIbi8qCZ7gqg7oruLmJ5vB7XSqihLUqe0UAtaReQFz6DCuWsbENS/NKtejI7gmQUxmqRCyLhvtzqtU+/LPauyztj2yu/KInxWv/JurPREVwe0u7NHP8eyHDSs8XclOfl1iKWO1utLop7Ps/s/+PEu9s2pnEVpGPrTiURE8Srvz8dZKdiVqNNvWUHjbPh2GL5rMWeforq87RENwaJj1Vxa2xLGEhXbnnih0YsHbLgeccmZtcWWTGqSHlh0GMr6EaAhuLyzBFzeKMBLZ/nJ6t5KYbOp9lhFsDNDN1g4tbVKb3xiD++jAkwT3uYaN82YqEY60O3cvsEl3/L0rM1UtA3OOmYw0eNyDiobgBnQcQ97b266+U6vG3tuIxhuNXU6ffuu6NO88BKOXKAkey8oxOP3bUK0I7c7r+QxkkRqtOv61snPSgteTraXeEgXBoQTRQgma4Kq7l9qdK4IvJWE+VBoB1CeQd0JgJRO97dVkCWnpN9T3QBQEj3FpKGYFdLnwAWPwAwHdmPi+hDSKWqOJgC5UGtRX149qUSAXKs+2TT3tzgvgV1MUErwmoPEaeDeJcX20rkQoXzTTfjXWDVev0hskYO1DAg+qnobgW3DbuUMsRNAEj8lZpKc8KJUt2+7c5zXi0RE8hh1LtEUeiI5NE9OguvClaiQjrxQBEnylcM5PzG7B58f2/6495ADBGfxCgASvUR6xEdw2uaVZao2VqeCrSPCCQFWNZmuaAXzoQY+9MQ+buuoNvVAR5r+Ul5c1lj/o/l/sBD+6H8969jXWcSevJsGdwDqdaGwEn7I739iQpfannoaIvxwhoC3afNaTsAV3VAHKJgtDFm3nnGl3Ti16WVidxWcL7gzaq4TtFhwudEINtr/zUMvRlHyT4DVIGgooo5TConz4ZAsyjERsn2tBlqNhmTZ1D0df617QXXRtg44xUajB7on4voAhVJxXnW9NcB8cLGaVL2iCa4BDJrguB8bhZTeczxIsr7lHQMvNBxfJWSUmwbNQqfEa3B/rihLyh6pG2Lx4lZYbCe5AJBrgYIhhacJtu3MHMDFJRwjo+keCOwBZAxwMwRUO8MIJazVdDnWbp54joOVGgjsQlgY4OIKPJB1r6zK0/2k7QIlJukJAy44Ed4CyBjg4glt7jV1//7qXfrUdiC2aJHX9I8EdiFUDHDrB6e/cQQVxnKSufyS4A7A1wKERXLuZQjm4sMRBBXGcpK5/JLgDsDXAIREcbqXQJTf5z7Q7d4BXbElicz8sEca/2enT/MZeYq6DkR+OJLgDtDXAIRHctjvv/dtzgE64ScLQB1aK9r/xVY4j7tmr73R9wD3XQb+PBHeAtgY4FIKn9vNqM4PcimjNlzuAz9sk7d1UtZwzz9/bmOoRIU4urisstc4LCb5CYE1SGmCs7gkh2Hbn9Hc+KzXT9dbyNV3vrCO649jNxsQ/+PEg3e53NuXVXjHvw5EEXy22aWoa4FBacJ1nnJPg+RVDYwWLv7wAv3Um7mTRRw09IPNOHCfvzcvkmq4HbYuuW0PsKIo9pXwOtkPFUD5K68IUwxnI1RApbxGOJvjp7/X55TP5wrHO95aRRzQEB8i+O3yw7c59/yCVqUiu4sKc13i6yRtX64+Aq3zY6ba+a00+PKh7vgZ/c1YAMd2Cp19Rj72qYjNB7QUElZKhGALo6UC++IdjD+1pVmNaJ9F0nup8bzHErmKR4FdYOD2zu+f0d14ObkNwHLVDDE3wOp1UkuDl5LdU7JBacF1BcU6Clxe5IZUhuJ5OM9fKp7rcE/rDAnn6GvzNWQHEQiE4pnE0wWl3XkC4GVE0qdBaG4KnXnAedzKecHfJfGyMXN29qVrKQRMcGw1iYz4DMuy7vdt8cCRT2xujMkJxxFAeAU1wyNwQPE/5Vv4NxZ7Ast5r165N6p2vDhdRmrAJLpKOxwzBcfQtgMxQDJk80u68moS0xtxgWjfBYWxj3o0jepK+Bv8YURIpjL002CUfdx7dtjs/+ytc3+3OwSrwAj3nbeROgucDR4LnY1P5jvbbbipj5USZwJRZamr8UoPVmoYd9hZGnjiyBdforPi887gj6PYawH1qIW0lIM1SVyd8LfO6W3Bt5LL56aYkSbK6gq04peBbcOChN0DwaYyr85VWhHf+VoQV1yvnya2T4KYxwRFur30O4RJcdcs0kaCl9iHYY0VMqzDUgICqF67epgle9/x72TKFS3BVUkxbTEB/b0N86KbbduftR/SYqkQW7On+3atlqZiW7b3021lHFARHbZkQfGMjVcKsswbZZqnIG0McCJiFL5Apeo6+h2hqnib49pfba9Vs2gSnWarvNCieP01wuI7yPURDcKzH1SSHY0MTsJILX9u6BHLjoxtTeSHBjSTCPh4/mLa58L17DrTDIHgBxYndasL+2yY9PgAwd3QZIHT9oaHduUu0601bu4WCjEMIYeSyAJI2wTXJ9Llrgmt/57BX1j2JAsVgFE8RQC/MNpP1NKtT2YqC4Oh6axLPO09LX6BHMIVSiR+a4D7NyZcoAqPaCIwk/VDreoUGJYQQJMGNZ00NeN455p/hEK+OqTPf7eJDqJC+5hE7z+g6FhnB/bDAAkm1UYsGPOsc1mN12QlDkadXjSE/DPEgoOsXbBwg7xBCwVq4nsJAYYUxrG00osE25+im49/+AKC1ryNM7M7HmxqkducOhwJ1lInvuEQAzjFNPcMxJMVpIYIP3vRl79tW2tVFYetwWGAvItEAm3MosUx33VTGCdHGTvqmCO6QcFhwsHd7L60IUMbAeT9DHAjYjiZCKtUCgiepKV7rzv6lp5RRIru3di99QDskC7yy2ONZQ2ocpzThVj5sgiO+82DlwTuvMs4BiPsFobhnypLCgto/TMncfTa9oUD3uXv7W92CA2BsDVNUUWZ/HLIKzmtEoAgC6AHqxqUunU6RvBWJU4jgRz+tZ0mcGYOXBdUmOFdyFakKjJOFgJ72BNHL1sWsNOu8Nofgl4q15N1QWrf3ZOuzLek8uZDhRHuI++tRvhUBSCvb6OiwCGKMYyOAbZ11642GI7Qwh+CiPJQmqTb78KeDVKPdfdFX9/ws8tQSUg9WmPmJEnM1DwHtVCKEpaFZZZlP8JknhtJ/05XWd0eSvJu56d0F/fXFORd9eCcivzKklKXaHTfqTl0LlVYNyAKCJ3Lx7GJm3HH887EkQ3+75wYk2z4dq4EYiMAiBDDOxpJj3UAsesbX+wsJDi1i+58ru9vBm6Ec/3Iy7qL7TXJYG9lGMr4KgvnyBwEYV2ly+7o1cBHEFhIcreD2Z9uX66k/3pStT7flyomk3wQHALZfcmrUi1SLZsfR5MY4vPv8yrdAaMgsIHhoxcnOrxYY7MV93momuwS8WhcCRz9PLyqB/UXIoREEx5hKkxyO62eCUrDM3OOFxiCQWq2N1xOgzoQewi9BAQlgLI6VZQtJXiAtRokXASwr1nUEawtCD40gOIQ0sW4bf53pjCH0qrv6/Gty4zw0q7UsRBpDcBR+56udqS80fGwxEAEgoI1asEoxcxgXIFSNIjjko7/SWNaJDQIZmo0AFjFtqHF3qEYtWVJsHMFt4xcQnqG5CMC6UX/0Y6sPjavdWKFm+y2fWl/e3LreyJLbvs5hwRZTaBzBITz7q43VZlicwtAsBPQ2wGi5Q/K1VlRSjSQ4wLHnxmPrmhWtAE2NZztygPxTX2uR2UM0luBwq2R8qEG4+MfOkQzNQCA1aBnLHbI/+W09Tk1co91cgo+RtT12cOrMdZVbf/p6SgzkDtGRQ1EUG09we91vKnAuKy1af4KLZ+8vBv0L/P/FGhpPcAg2a5PCWAXe5HLB3ff1969PTYthViXmQIKPpWsvK61zV5SYK5gvZbM3L0BPLZTth6pgSIIr9CB0/c/5cQVOwKdYHmxvKwUlWx0beKwbNhJcSSBr6oyLUhRAgZ7qj7Y5D7QopbNNgluQQeGCxQamIuAI66ZQNpuzitPon/DEYssSQy9sM9WUQIJnSBqKF01wnGNhCkM4CGBvuFShphaRoJvetMVFJHhOncXX354vnSjeIrN2yoEg2MtZCjWsP2hiIMHnSD1r5RkVb3MA8+BWaYVa5B9rEnxBpaTibQFAnt22h1b43eTQ7NIXlHyqePsPFW8F4VpLNCrUsmEnwbNxmbmap3iDoz6G9SIADyy2hVoTFWpZUiDBs1DJuZaleEMXcOFihcjHeTlwOb+M4RPIbXfLb/y3mQq1LMBJ8CxU5lzLUryhgqElh28vhvoQsPcPgxwyLdQa/IElwZesjxM3zJZ5K3cwXRLQEo/ZK8JMC44WPTc0lOQkeG6NWHwja6kpKhu8hcDQgmG1CLQftcX2oQa8Y1/yWQVFErwKeiKCnSgxN25aEXPkOLAisNbjGBqByAZffYx9yacFRamfJHgpuPIj3/z4ZmblS91ANbR7mI9W8TvoCeURGz0ohvkIkODz8Sl8FwsY0DW3p2vQ0ux+syvYtZKhHALY2RNrAHRrjXP40gPWDIsRIMEXY1Q6hl0h9a4ZpRNr4APnD89nSG0whQ89huIIkODFsSoV8+TXk9xKihadLdA0nFiOC0zs5Z2a2BxrT2NW5BcJXgSlJeNAAYcxuKmk9hFGGk1wG7QIPtgQ5OkwgBkWkHD6cRGK2fdJ8GxcVn4VZM5TFuE6Pgbw1R56gBskU044s8wLiIcy2x898xvLO7EbLEM1BEjwaviVehqtNRzsm0psH3dv7aYWcSnZS6XsT2TbeWXWRytVnuXMOgATdNWb4C+tDqmR4HWgnPEOe8MFm+zB+YIb9z5mCK7KbpfR/p1uHaTi87Q6AiR4dQyXTgFKI4w/7Ypu/0aLFoRSbkxy00W3y5H1Gx86tOgMbhAgwd3gWipVdMntnS6zyIBxPP6hkPIiWDoDdKvnKcvsMlF55l6KJLh7jEu9AUtSQWKbDHm/jYIOHwn81+H9FRpt8z4c8/JmX0deUTaG+hAgwevDutSbTLc8yzLOJo7+Dbt4dHn1P0i4TMBzGELotHC+SH+g84Nz7LuN8nBKcBkpVHuGBK+GX21PwzjGJs7C38pl8CRu1jVryesk7gqvp0s5dZden9eGYvNeRIIHKHMssjCtqgsylk3TKMqQJ5iZItjmpnPXagcog1CyTIKHIqmcfOqxMM6zlq6WJeyi+HB2od+bZWUGXQD8yJu0vFEM5uAY62USPFbJWuUyGnhzBOGy/nEf13GsuhwT7pMMwXFkqB8Bol4/5o15IzywaIJjAQ5DvQiQ4PXi3bi3aYJDm85QLwIkeL14N+5tWvuPbj9tzOutAiR4vXg37m1QwOlWHNZrWQtQGgdMTQUmwWsCuqmvQYuNXUZAciyggaUeQ30IkOD1Yd3YN2FKjZZs6xE/Cb4e3PnWPARGSd4dXl8CARJ8CdD4iCMERiKDV105++NUTv44k9M/z9KWv/2wLQlNW5cCnQRfCjY+5AqBZNCV/e/25OTP84m1HDzd9N/M2ZbIVWYiSJcEj0CIURVh1JfDnw7k/HnvslijROBz/uIZlXPLyJkEXwY1PuMIgUQEBL93IGcveoLReP9VXxIOy5fGmwRfGjo+uHoExgQft+Dg9cnvpzJ4S4YvizUJvixyfM4BAmOC/9CS7a/3ZO9OS3a/bZHgFZAmwSuAx0dXjQAI3pPDe/tyPjaIwfibGvTlcSbBl8eOT7pAIOnLkVayjd8x5EB8KbRJ8KVg40NOEMBc92iQKtmgRb8ceScyeNWT80cdJ6+MPVESPHYJB1a+3tO2XJvxBXdNeq8GgZXEj+yS4H7IgbmYIIB2m1rzCRwVT0jwigDycSLgMwIkuM/SYd6IQEUESPCKAPJxIuAzAiS4z9Jh3ohARQRI8IoA8nEi4DMCJLjP0mHeiEBFBEjwigDycSLgMwIkuM/SYd6IQEUESPCKAPJxIuAzAiS4z9Jh3ohARQRI8IoA8nEi4DMCJLjP0mHeiEBFBEjwigDyceHFA04AAAAySURBVCLgMwIkuM/SYd6IQEUESPCKAPJxIuAzAiS4z9Jh3ohARQRI8IoA8nEi4DMC/wfQ+8EhjvDzTAAAAABJRU5ErkJggg== data:image/png;base64,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为何图片发不出来?
为何图片发不出来? 图片挂了?图片挂了 虽然但是fs2004也太老了吧owo
还有这个图片awa,怀疑楼主搬了一篇很老的文章来水贴() Anchovy 发表于 2023-10-7 12:30
虽然但是fs2004也太老了吧owo
还有这个图片awa,怀疑楼主搬了一篇很老的文章来水贴() ...
本人初学,这个贴子是本人自己学习VOR导航的感悟。虽然2004很旧了,但我觉得还是从基础的172学起,没有直接学737的GPS。不知为何不能发图片,图片除了第一张是嫖的,其它都是我自己画的。 这没图有点..........
页:
[1]