Bonjour à tous !
Sachant que le développement est abandonné, néanmoins, on a là un jeu parfaitement jouable dans lequel je continue à prendre beaucoup de plaisir !
Par contre, le système de calcul pour les fertilisant, je ne le trouve pas vraiment au top, aussi, j'ai "bidouillé" une feuille Excel (en réalité ou libre Office, mais dans un souci de partage, convertie en .xlsx).
Même si elle n'est pas terminé, elle est parfaitement fonctionnelle, son principe consiste à calculer la valeur la plus élevé en premier, puis le suivant et enfin le dernier.
Si vous avez des suggestion ou même des conseils, je suis preneur.
Quelques explications :
Dans un premier temps vous sélectionnez le champ à travailler (cliqué dessus pour voir apparaître la petite flèche du menu déroulant) :
![](data:image/png;base64,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)
Ensuite vous sélectionnez le type de culture.
Dans les bloc à droite vous avez les valeurs nécessaire à la culture, celles qui se trouve dans le champs en question (ces valeurs vous devez les entrer manuellement dans le tableau ce trouvant dessous) et enfin, l’écart, ce qu'il manque pour assurer une rendement optimum.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAZ4AAABiCAIAAADvOSKOAAAdQElEQVR4Ae1deVQUSZqnKCiP0bZtBLVtbJBDDhG7LYrDC3G0VbzasxEP8Gjboz1QKUBEBRFRKRAokEMREBE56hBQvEUFqip73sybmTez7dvZf3b3j3m7O2/2vfljZqfbfZlZFWRlBUlVZZKEEPV8EhmREd/v+33x/SryIHCZjz+YAcwAZmDEMeAy4jzCDmEGMAOYgflY2vAkwAxgBkYgA1jaRmBQsUuYAcwAljY8BzADmIERyACWthEYVOwSZgAz4II/mAHMAGZghDEwf/58F71e7+JC/o8/w8UA5n+4mOe2+2HGRXdLGes1KXhzdp2W272R2+riQl6MYmkb/gh/mCk0/LwNNYIPMi666vP79qSpm4eaHJTHF0naNNc2zpC6SCYojtXoKDpaUhfIpN6bVRoLObrbWfG+kz+PO1baYqkS46e2JHGWVOq3Qz3sX27ipBAdCPN1h0QiHTf58/kbUm+0DsS18/wMEFCOmcDEJnF1nzgtdMXhoiadnqqXzthcQE0W3d1Lm/zHuk6cs0t1fyDUQtaLExehEDM5tER5QtzZAeNrh11dTfaBfVnVdN7acT4qp4gqbS4u0k/X5VFfJSxp0zXmf7dpR3q56F8zuntlOenpOWX3mJHTMQ/EipQ4KURNfcmksLVJycnJybu/WTnHQyqRzU4qG0DanZW2AQNqyT3ITGBiS0rcEDljrMR1anxuM1Vvlrbmoj1zJ7qO9duY2yBSkMSJi1CzjMkhGeHk5OQ9B85VDhDdwaySiaAtTwqUTYnPBYuQwTqh0i6mtI3/3HeadFz4d1U6vZ4pbZrqjI1fzvhI5j7OM3jVqRttFDeaW1lb5d6TZG6ySZ9HJebUURMZdqauLicxynfyWKl07GTf6B259eSZ8MrGgm9jAzzGubmNmzJ7xfEy8qsMpG5r4baZUvd5W/cumj7en1zEwWwNZdTESSGmTJDe6Kr3hbpJxixKI9fKEJcBPxBCtDeSZ7u5eqy6SK0J2nLjPV3dgpJvQM5k8EYBgM8EFrbWvLVertIZG6+1kEt+UtqaK48vmCJ1n7HizG2RdO2DuwfN4pBJPCShdJCM0DATIVG5yVtKr/7cgvdUisc6A7izRTGlTRbz7ZHoiVLPr87f0/VLm7Z8b+hY148j9l5Snf3af8yY0H0VWr2u8sDccZIJoZtOn0/dGDze9aMFp+t10DM1eWu9pBPDE89dvXpul9xzUuB2lUYPr1Rt9Za6Tlt2Ij87MWy8ZJzieL2uX9raShJ9pZLxnwQt3XUoXdWggaFylmS7+okoba7TVmVWVFdXV1eWXEgMnyiR+m4v0eqh9AJpa4MQoi3fHSglxUejJ68aP5W6BSVXaKHjAAqo3IPPBFZaagq3zpS6Tl13mZa2T+O2/fIzd9ePFUcqRV1AiBMXwA/PAsUhiC8Z4+pbDS16eEJpBsgIRiLU3MpPCHaTfLzw0LXyenrRwROhaN3FlbbTjUUJvm6yoKSyJsu9NnrZMGn5+Va9Xnf7YLi7W+j+au2tA2FukgmxGeTdlJbqq1lZOaUNWmqBwTpTp8mN93CVzViQeDSroLrJvPCGVurbmhruNDS16qg1tlTqvbVQYyVts6SSj5efo271QVEN7XeWOClETX3GI36JdMLMhftVTTrz+o1Nr0XaSqvI1Z1Nq3qXv1Q6K7FEq7n+zedSt6A9FbpBqDNLG2Qm0PfUzGlZqc47uHCqVDJxkfJuG7lqk0gkEqlUKnHzXnuxcWgjYZ184sTF2qbzR+z4urhIPl5xoU0HSyjdwBkBEkGvazgmd3fFF6QDhsQyoZt1DelLJksnx546bH6MQK1/JRKpbCz5kUklrl5r81rIRbHrtPX5zO9n6JkavfZW1uYvZ/xCKnGRSGRTwrflkFeksErd7fNb5d4fj5W5ubtLJRL6IYYlddVt1PMEMktJJwawNaB/AjSIk0JUIFw9opPTMjJSt3/5kUTmn1hMsQx32cJPScG2mSRpVmHS6LWliX5St5B9FeqkQFrZBqNu4JlASxtTdmWfxqZUauh6yfjgb/JKTi78xNXVc2l6rXjiJk5cBJhA1BDM+GZQnzPni+p1VHDZCaXnyAhLImBpGywyYELr9Rr17kCZu3eg33hKXHTV+0PdJJNjU9QV9Keyur6FrvzF4nRq1VZ29uCBo7k3tbAzKcM6nU7TWHXtTFIkdbengpr37Mq2/A3TXKXe6y816rSlO/ykUGmzPCqFohrMSX7t4qQQFQjL00ZNcaKfu2Qi/dga7rJF2kqrIGGi7lVu95WOmb89IczdLYi6GQMfB3Az8Ewwr9oo2T1zJvP8ZbX5CoiBWXfn7PKpUskkxdEqJ++MAyD2FsSJi71oBjuPwRXzVGhCDZIRNMH0qs0DP0Zg0sksMya0XteYtXyKq4uLi1lcypKDZK4eiuRz+RcPrQj1m5dw6b5ee2Nf6FjJ+KCvT51Xbg6d4DoxOqVOp4Wcqas5Fj1prM/KlDyVKi9lhbd0zLxDNVpYZevF1R4S6fQVp6/lHozznShznbTgSHljq+XlD3rVZpE2PcwW0yHhy+KkkPXU1zVkLJ0scZ26KrtJD3fZIm3qNgj5JAnUlejYiRPc3WllG2AcwBfHTLDGBnrQkmeRY11j7jpvN8n40OQSPm809I8+WEmcuAyGwt52ikPwBNz8iPRoXq0GklCDZIT5u+NeSpRMIgv8Ou1KpdVrBPYiGrbzRL7XRr/coavcP2esxCxten1rReraudMnuktlH3nLt56roS8Jycemn02UuY2Z7Buzk37uCT2zueToitBpE2WuUtlHM8LjT5aRN8tgla2lhxd6T5CNmey/7Gh+erz3eNlHMSm1xeb32ljSNgCqIYyTOCnElg9teXIQOXN3lmigLgNp00LJt1y7u0jcGQ/QoAE1U8eUNvLuNmMmsLFZyGbXN1/b5ieTyHw3XxHjxTZx4mLxle9PiivGRT1ZpL8VqMff1gnFnRFmadPVpC6bMc5NNil8X7m5ii9IcfqLJG3iOPNBW/mwUuiDptoh8DguDtGFzslY2lCJBU4hVCJhjQPHxZqPD+YISxsqocIphEokrHHguFjz8cEcWUkb6xodH2IGMAOYgQ+XAbR2/hD/S1J8i9AvPvFhiG8R6jizEk1ICOY2kzQUymgGDksbEhvViT85xLc4aBKiCQkpVLTODsqkyCcgRRHtu9UFqRN00A+buXYrcnBQhzhiPupmboPjkE2HLIKRrd9IEGCnHYdgCEK7QxaB46AgCPlgNLrAB5LgEQGQnEYlSJhsKXIaDz3U6Akcr1WbhSbIHjWskNh56FDYKOvmFxSZ2+DYaYs+zSGLYGTKtPk9UkF22nEIhiC0O2QROA4KgpAPRqMLfCAJHhEAyWlUgoTJliKn8dBDjZ7A8Zc2+B41rJDYeehQ2JizWa/Xg21wmL96OqhdhyyC0YBpoXbacQgGZZ0v7Q5ZBI6DAmCAZts58sFodIEPJIBHqIgASE6jEiRMthQ5jYceChA14gPHX9rge9SwQmLnoUNhYwUJbIMjmrQJuNOO447zpd0hi7bhE4R81rB8INF4BIwIjY3PvS0KEt8w2VLEhyXy90cs+9/RaeJc1tiiYtXYfzh0gRNC2mB71NjvG/NMh8JGkQLZBsehfSEcsgigUqaF3GnHIRiUdVkMP9odsggcBwVByAej0QU+kASPCIDkNCpBwmRLkdN46KFGT+AEkTbb3YpYEbH30KGwUUFiPJqXmLfBsdcYdZ5DFsHIdCIJuNOOQzAsOcOLdocsAsdBQRDywWh0gQ8kwSMCIDmNSpAw2VLkNB56qNETOGGkzWa3IlZE7D10KGxUkOjdx6y2wbHXGHWeQxbByJRp+jGCMDvtOAQD5Awf2h2yCBwHBUHIB6PRBT6QBI8IgOQ0KkHCZEuR03jooUZP4ISSNvZuRayQ2HnoUNgYs9nO4SGnOWQR9LcyLcROOw7BYOSM87Q7ZBE4DgpWDIBafgU+kKzwCBER2hUB7rWdJje8Ye3l5TRPfPDQRq2IchqHdUc0AyeYtLH2qLH23d4jhzgSJEgOWQRusE3z3mnHIRiUdVkMlTNO0+6QReA4KLAZAA08CnwgsfHwjgjtBx8pESRMLDr54KGHYhPFMuDUIZqB4yVtTvHA1YkPR1zjDtwmvkUoFvFhiG8R6jizEk1ISKHiL21MwoUqI0UR7RTf30YQihowjvgciW8ROMssiA9DfItMf6FlNCGhg4rWNfA/lMNhqUSHIuA+ljY9IlERH4b4FsG0G6iAJiQgJagVBqJR/Ho0A0dekOIPZgAzgBkYYQyQ0van//yLi4sLgcBHfBjiW4TS7OLi8v5dp5j/xLc4qHdoQoLGa1gqWdIzLBigRhFJIiY28wUpljYmKcNSFj+rxbeIpY3n1MLSZj+BA0qb4U1tSqFiamrgwoYOk3m8141NydHnQr3SQgMv78zoekXVG7senFiWHTY1PWxOwQn1a8u55i7QVmiluYO1/JMWY86HTk0Pn6tKKXttJAjC+CIzOm3WJ6nmf54XT961sgkdHFoJtUjAHDd1P7m09bL807Qg39yEtK7uIXIcZP5Pr9J2KuaDj2Ldid//sfP9u/Y/3z9+cPWC6KgF65OOvzZ0gPOpArQVWmleG3JJ24+aP5Tt3bU8JioyZtWW5IbOtp/JFSXXaAO0cndhr1I5IInDiTWlJDzrCWmeM3b/MHafjVUFzSwA/0Lj2vRGgjD2VB+7tSS4MCy4bPOxridWM3jQwYcCkkmfURnaj1MVd+KFYVAg/Sc4Dcn09HbbN18WBs+qym4HLMAqHWYMLm2mbtX6c8GBOdHeyn5p6+s6MVfpN+vqwZS6/Qsy/TxzTtwxEqa3Resz/b0v702p2xt5xt+npPhZv7/wVu4uTI56Hn4/R+nne+XAiZqEuel+M4sKHhOE4XFKuDIgqqqgUFtaqC0tate8FM4i1HGir2b3hYBp2Vu/qzu+8nyAV25qkwnuGgAC9RFaCbows/qfj05sUih2nrn09M7Vp3euPmut+euPnT//cPn0EvmSrftv5u/fsVAedzj/Lz/2SwO0FVoJspdpEVTShX88PL5RIV+eePBm/oGkWLlizfHf/lF4ACyjtI7YVtI14nBia505IUGwOAqmJ+UtB08+6qLz1NTbeEVzLqON/JfeuGGO6ouv25+ZiOeFtXKf66uT2zKTKr/wKd59vRekNcfQlqahgGS6f7w81Lfy6LWHZSUPy0oe1bT1DQEka3IIU1dBbXRAaZziOkPaoJVOMAaXNuOL66ea7j0htQxIm+lp+5mdN1IKXhoJordYHeqRviWvl+jWJH6m/CLhQS9B9KjLwj3O7Cjss0SAgLdyd2GEzdBYs9hTuejQYwNBvClWh3ukb7n01tTX+V2gMnSzrqen59kLA5t+6ODQSoCSYZGAOU680Sf5KBVJnT0mY29376u3lE3uMaGt0EomDJBX/9AcXBURk3lX9/dfN//19+bV2d/qdy+WL77QrH//Tvc6ZVHEoqRnv+2XNmgrtBJYGVjaOv67JS039cTj1+3v3+lfHouRR21v/3Un92jQVmglAGBbGBhSpzicQCGBGNlTMGmVFXMXtbTZrHmeFdZF+t04dddIEAZ1QlFwWMNNMmu6vp1T8GXCwzf2jG0+hzlj7elmDyRj7belIbPrK3qMr5719bDTalArdkJiITG1F7VdaexpPFYW2r9qg1Y6wRhc2mhPDI+Z0tbvnamncvsFf+pK0NhWv9wrbdmJZ2S87tcu9UxbcfoFedlIfaCtfZxdCAZHhrrq6ClpK1LJAQ0NtxZ4KhcffmLo1e3+TBkUlK2YnurnkRGzvknTY7FHEDwtmgeydtzYWrfMK23purKVfml+nplLt7d1GuCG+DoO8urvjXsWy6Pi4+Ni5PMjYpanltf8/V37n66ui1SsqXre/v5d+4958QrF+tuv2i1doK16zi7kpZale79Esmp+/lVh9ko5dUUMNcELAMsW96pNHE6gkPrnF2fJ1P34zcPO1zVHboRF37vZ/ubhw55u8D3f/eSQXBW549FLE0EYu7OWqkKXtGrJif0qY5EqdJnmAZg8nDaoRkaODHKy3ZAIY8WOomD/0tgvC4M/LwiPrLvS5gAggpm2cEgcSExNVtJG97eudIYxh6XN9Lb28JUwj/RFux+8MBHUwirtK0p9jJr65V7K2O+fgu8raGsPuRYbsAuTI9Ozli0zUoOia2ofvCjffTHQQxm9/5GhW5sclCWPKEm/2JyxLjvQI33tWfqmH0kJT4vmqFhLm6HuZsyUVP/AojMF2pxN2QEemTsKe/o4vXASBsirv93ZG79sacKRVG2l8vRqhTxmc1PPgz9cXKVQrK/tJqXt30iZW13+pF9ZYK16WCXoMri0/fSDWp2wMCJq5eXmlp/ftXOOBm0dBADwFxQ41FYcTgASULBbRwyvMhZb3VYL8r2Rdp9e/5j0Z6rCZlVmtlGHhpfKBaSctZM33SiZW9TSCrIGLg3M2iGARBjKdpVGzqtIUj4oSKtdMqtg7mrdQwfWboNB4iRncGlzhjHHpM30pmJ3brBHRlySrosKhbGt/pdg1dZ0O9bTvMiiAwFt7ePswpQ2gjA0nbwS5pE6y0M5T5EX5Zm29Di5PAQfU1fTOq/U0M26XksVb4vUQCxpo66LYw6QHht1d77yUi440NXL6YWTMEA6MQodfy7bEiWPOXNX+6era8Gq7V8urbbIHL3gaoe16mGV9krbTyZV3oboiIVr8hsb/0k9Q+AczRkADDfNy0YOaWOcPIScMKz0Q7LMLu6fJoP+dleF+lFuonqOvO5i6aOK8qf6bqpP79NjctXcNXrzDTirNcjLdGrVRsqcvZ/BdASMYz8k0IUgCFPP5XhV8Oz6CpBWzFZ4eTBIHEgI6wWaeXzrSmcYc0TaDM0n8kOmZK45YX42SoLo1u7wVn6xvb2XIN4Wq+d6ZO4uBmvwAVq5u7A4MvU9bn3c1PbmVXVlpGfmzsI+U9fDq2n1V+vI2wGm9rurvZTzEtv7TUIHh1aCELEskms/qytx0/PWrZ+S9xPfEoSxuTbOSxl79KmBe0xoK7SSCcOSVx1/1l+sv3rxN7/ueP+u4z+KNkbJF+e0PPjbnaQlEYuzW/Tv32lfHFsYsXjPi9/1X0hCW6GVFiucq7bfV1d/Ex0Ru6m6g342ShriHg3aCq0EAGwLA0ubSJxAIYEY2VNg3U4iu/TdvrfAR7X+/BvLMshQlnA9JKzhVi9BvHm0J6Rg/o5Hb+0Z23yO7Yzl7mwHJFPPnXxt1pXn5AWQ6U3OV6rgOXdv9acV9/iEHRek9AgQJIQ90kY4wRhc2kxvm9Xa0oL6bQHKgLlluSptWf1rw4PGNdNT/f0KDp+szzxVn3nqTn7NG5Opp2TjWf+Zl/efrEtWZPj7l5W/JAjj86zFmeFRtc19sFZoF8AdM2xvOw4GK4O/KFUqaxLC0/1n36h6RZietW33UQYEFx47VXdgcZb/lHN71b0moSzCHDea3l7fcNZ/+sUdx+58H5fl75n9fY2BgHrBE4Ylrzr+5/auOLlizd6jt/K/2xcnj1i+//VvOn7+1ZX0pfLYbQdu5u/bvlD+1YmC//2x86eXGftiF+3Mq/4/WCu0i8UKh7R1/HvxpgVy+Yrdh29eS6u5llZTkPMDITwAgAQUOKRNHE4AElBgTkgwSzkKttlLvVfhoz5eb1E2gnhZXB/hcz1+b1vm7op5PiX7yobicSQAaQckU2/JtuJgX/W2I22Z+6sjfVQxyeZ3nMAonAU7WWIjed7cVV7SeW5LSYhv+b6ch2Xq54+NBLTSccbg0tbXeTBQ2f/u2Ceps9drum9WRkyxvE1GvlZG3dQnCNPj9lMrssOmpc8NL0q7ST0+ND5LV6QFzKtpMsBaoV0Ab1YcmZ6U3doQljnbK2N+ZGlOA/2E3PS0snabPCvYMy00KH/PucfkW2ZCWYQ5/pYgTM86M9bmfjE9Ldjv0s5MyiLUC54wQDq9//F+3+Ud38RFKSJj4hP23e+il04d/9WS8n38wuiohZv2nzb9QD45/el56nZFxOacqn++g7S+h1f2X2r1W7T6RYgHREZcBHitbv78+YpV6q526Gh8ANhaH1jaOsXhBAoJTE7nCuTDx2DfqgsP+qWNMPXcSqmJDSkMCylPSH36nNFihw2rHLHjfNtTIJBMT5+c2XIjMkA1J6h0bZK+mb6Utu0Kr3EOkrHu29Lg/pfpCoL8akvfQivJy2QHGYNLGxy+A7XG1rqvYu+Cd30d6OkcRwQhvkWoU7xg2OaVHTXt/5q/fn/RnZ+stKn/QpVjBC4dcWA05wHYYkMTEjTSw1jpbI4MIWQ0IQ3B75AaGg5cWk69EeIwm05yJL5FqGf8YNim+uA1v7txfeO66mf9DwcG72KRLWF0hAcAW6hoQoKGehgrncyRoUSMJqQhkDYeJIrPkfgWofQIk9UW2bJVDdsa8S3aYmDVoAkJGq9hrERkxjIZQBMS3tSI9UvH+BAzgBkYCQyQ0sa8ZYzLmAHMAGAAzfUIc8WEQhlNlrC0gWmMC5gBNgNoJi0KcsbEgCZLWNrYsxkfYwYAA2gmLVNWUCijyRKWNjCNcQEzwGYAzaRFQc6YGNBkCUsbezbjY8wAYADNpGXKCgplNFnC0gamMS5gBtgMoJm0KMgZEwOaLGFpY89mfIwZAAygmbRMWUGhjCZLWNrANMYFzACbATSTFgU5Y2JAkyUsbezZjI8xA4ABNJOWKSsolNFkCUsbmMa4gBlgM4Bm0qIgZ0wMaLKEpY09m/ExZgAwgGbSMmUFhTKaLGFpA9MYFzADbAbQTFoU5IyJAU2WsLSxZzM+xgwABtBMWqasoFBGkyUsbWAa4wJmgM0AmkmLgpwxMaDJEpY29mzGx5gBwMBI2NxntPqApQ1MY1zADLAZQHM9wlwxoVBGkyUsbezZjI8xA4ABNJMWBTljYkCTJSxtYBrjAmaAzQC/pDX1FG8rDgmouqCl/miV8XXOyqKQObVFjx37G1ZMFbH7j35adwJHCEIC2IQsmP+iFTue+BgzgBmgGOAnbQRh7HiwNUQl39T+2EQ8K6yN8Clan9Vt4JXDIxASLz7gnbG04QzGDHAxwFdHCMKkz6qe51t6oOjhkQjVnEXNTb3wXLS7dkRCstt7e0/E0sY1rXEbZoC/jhBE78uM2MIQX1WIj/pQlUN/KB6axyMUEtRX5yuxtOHkxQxwMSCEjhDGxu/LQ2cWBM+pU790PlktPUcqJIt/wvzE0sY1rXEbZkAAHTHotBsCVZGLK6J9VMuOPe/hm7ojExJfVtj9sbTh5MUMcDHAW0dMbws2Xg8JqbnW+bZoS3FwQHW2js/jUYLvE1KCIBCExBYm/sdY2rimNW7DDPCVtuel9dE+hfHprwwEYdBp1gUUyDd3POElbiMQEn8lsxkBSxtOXswAFwP8dKT7yRGFKjS6qeENnXrGxqPloT6l31XyeZgw4iDZyJIQFVjauKY1bsMM8NMRIXLUZgwMyYYSSAWWNpy8mAEuBrCOQGTDpgpNlvAvWnHNbNw2yhlAM2lttGWYK9BkCUvbKE9e7D4XA6N1Q6CR4DeWNq6ZjdtGOQNorkeGeZFmYx5NlrC0jfLkxe5zMYBm0tpoyzBXoMkSljaumY3bRjkDaCbtMCuZjXk0WcLSNsqTF7vPxQCaSWujLcNcgSZLWNq4ZjZuG+UMoJm0w6xkNubRZAlL2yhPXuw+FwNoJq2NtgxzBZosYWnjmtm4bZQzgGbSDrOS2ZhHkyUsbaM8ebH7XAygmbQ22jLMFWiyhKWNa2bjtlHOAJpJO8xKZmMeTZawtI3y5MXuczGAZtLaaMswV6DJEpY2rpmN20Y5A2gm7TArmY15NFnC0jbKkxe7z8UAmklroy3DXIEmS1jauGY2bhvlDKCZtMOsZDbm0WQJS9soT17sPhcDaCatjbYMcwWaLGFp45rZuG2UMzASNvcZrT5gaRvlyYvdxwyMWAb+H5BW0PMNFjOhAAAAAElFTkSuQmCC)
C'est le cadre Vcal qui va vous dire quel nutriment à traiter en premier, vous devez respecter l'ordre proposé car ile traite toujours du plus petit écart au plus grand.
![](data:image/png;base64,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)
À partir de là vous sélectionnez les engrais désiré en fonction des besoins tant que vous n'aurez pas renseigner les 3 engrais, vous aurez des "#N/D" pour les lignes concernées.
![](data:image/png;base64,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)
Dans les colonnes suivantes, vous avez les valeurs des engrais, le réglage du fertiliser, et les valeurs restantes.
Si dans cette section vous avez des valeurs négatives, sur que vous dépassez les limites optimales.
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)
Dans le dernier cadres, vous avez une indication de la quantité total (en kg) de l'engrais utilisé.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAKoAAABcCAIAAABx37nRAAAOMklEQVR4Ae2ciVcTyRaHMR1CiCgCyuDM0xAFJhuLAQVEBBFURNRh4CGigI7ihqMD44Y8VBaROXYSCBDCGhJiWLM5iMM4iohC6P6j3unO1iFpJhyUQzrVx3Oortyuqvv76lZX9030SwSHDyvg58O+A9cTAX6fngQAP8CfmOgHDp9RgDjfrdHv5+dnAocPKODn57TeA/w+wJzgIsBPEMP3iqvAr2s4HrLJ6ZbISKkZ+0qS6Vvyw6Gt2U91K7an73xYcU82SW6zkoFnXZC3vS6frPMgV4vfP/Z8Q7PtaOlQG76WKJOawb4BzcSKzelbz0Qwk6tHSY1WNFhnZUkHueIH6zzI1eJnHHroFHy6xtxQ6PvsssL48EDG5h/SbnZgH+sV1dl7twUwgjlHirIjIVZm3aQJt9yZWZD5w2bBFXn3vTzBdyx/OjMs5li1XGdyuD3efisrZjuLDgUEs1PKWjRGq1x6ceEuCF98oJhyucE4IrlxlBuONRHCSb3QpDIuM9D3kHZhA6Bryg2FwpLzcrg7WIyg/6TdaMemn2vLJtNkbUYgtKtIrDeZ9C9Oh0Nbsut1zh712sZp1LRWpHFCmHRGMDu1rGXYaDKqm0uT2cFMBjNkT8Z1CXHBdDHGddiWfv58UgSLoOdyXyxiHi3J54YwmWFxF+oeFfBDmcxQ4fnWUZPJvV82r4l/V40/7f6Y3noYjEYcGw0KO3hLpmy7HBdI23bsmc408ihzC40VW/6yv7Mm6ztoEy4W5hiNHpxQUv+yq7fxvIibdK5Jo2nM2wltPVo/Ycc//jA9kM69KBsZUzaUZWeVNdr5G3WdZTEQ48Adtc5gnHieHwGxYsv+GFCKr+3fBgWnP9A4G7wg7cLuPz4kWnh2nVqnepgZRgs8cFftvmW3+IkeKW1BMd6YuwMKEl2RDsrvHg5n7sxvHn6SE0rfld/8Sq+uPxbBiCrrtC+ZrsajuErbEkr+11pXEM3YhOs54dYXGj08656845qItYkeknJD1l2THkILTLs/YoGy3C+718TCavET7/2M5OpRXAJWRu2EyWToKN0LMZKrR/TSYjbkH39DaTSZ9M15YZZYwS2ZafewyW8YqPs5iRMRHvF9RDBjk//+u6+wT/F7v779YjSTxtwRk3S04EqtTGsLKuwqxaUfsQ5GTSa9pHg35C+6rcY+Hn+QxqSF5TbpCAYrdWH3H+80KKseQzf2eyqDFp7fMuG2ZXL8Vo9sbeol/3UMDK/Ui4t2QZugABZ2BAYwWAd/11qtXY0t5JiHHoyZTAZZKQfXk8QXGivz8YTFyj/x12GjceBaLJ0ee23A6M4vvW2ETn9Xi5+RUNEqth6SHo2lJ8uWzSAvx4KzWmthY8GvazoZRrNHv3Vzh8+JoNRqtRF3EcOvs+E3mYxjPc3VvxSdSOYEQwExZTJ7rBDoWrrYd0uF4R+7j+HPa9YTDbBpR9qFTX6s081H6rAlX/vbAQL+5S1PPs5kQT8UvNSb8CXfxSO7pjhsf1EVNi+N+jGtdmwcLtoF+VsbtNvhBVdj3aRDB4eeK/li6LwYBeF7cOPQzXh/B/5lfn0d/P5xF5pe2I5WuEfz3L5jtw/XpH2QHrSJFVf+sk9WfYS4+Fvx6+qzt9CCDtYMDj47G8WE6MLKfpvbEwOPC9OzKp6rJyZftRZy6MSHAWPPZS4diimVasb1+OIfKChtHVRKriYFQyFZdVojwWCcvAvHwwW+INFCD1bJBqSVSVtprJTqYcviv7xlfevZCIjBLYWV8ntHd9IdtzOXp5WxZ8fDoKB9lyWD8uqM7VBozhPVk5xQ2ub4y1JVX+1ZUWzuvQH7iuZqrHWDfwW5dCYy/LTlfjnPPOvZaqOfuPj70Xacamh0g9+k67qdsXsLIyAkOjs/NRwKznlK3NyZTGNwhWgHkxH0n9QrdbfStzOYMaXX8yyLv1FZXyjaFRwA0Rhbvo87dV9BmLY6SUVsCMN/M7dcZjCOiK9nxWwPpEOBYdEZv7TiWwSCwQh5F3YhLHecpJO5P4YEMLawM6o6sduA25b13XczdwcxmGH8/Et5eyFmRu0kYbtqbxG7fLilLJUdzICwrd/FZjW29WssObBrK8OfGRqVUSkesdN3Y2wZEv4A7AinFeQixQ9tXe4XcZC28irw2y7597/GweYbF0urWlQTo21l/AAG97LCvoL/+9XrZ0HQev06XYeePPfrm+A3Tcqrj/PDN9NpdFY4N7uqnfissw7ue9qF5zJ52uLGsPPcr2+Df2OoAEbxrwqQ4ne6yYMT6irgPuGLgsMHFCCNfh/wHbiIAvw+PQkAfoDfcfd3fNvHp1XxGedB9PsManeOAvzuVPGZOlL81H3QBZ45KeC48yfafuXj5+fnMwHg046SRr9Pq0LiPPLl3fzfcyQfemU1wO8pNsRU2yNkt1Uqljy9wgvsKIDf/LmvWpktlAhjZMdL9MPv3an+6f3DI1JeZMdtJYJ9jCyONaiPx0njeF0/V719a7ZdQlaPX2N4oBAA/DapNshfZOpZfzxbnHpMXfmTPIENJ1f8Nb9saMiX7rIOPhvm2vDPKTRpkXD8gb7CjHY+W3qm/pMlosnq8fYQgH+ZrhvhdKnznIS3p7dxCkEXZioFsDDHMIVHuH1w/7SrUznS9KR2W/QvyoqlPE537QSCzL65yIUFhyd12AJAVm9pyYHfbDQW8mF+gqrtzZfh+uH8pDYhR5wQ15VXbMTbsfe88Qtev/gjr+v74tnijGK95LEyNVKaX/fRvpZjy/zszHWROOmsqbu6W2CJfvOHe6liHn+4dwFFl+bqj4h50UMd8yhKVm+FaMV/VfLufoaEF62oGVqcfj4oYsMJB5U3r6vzBDBPqBlY3PjIiSP0evwoMocB5u6GubthHq+/QUfcmi2N3pELuf0tU0u63+34393eJ+bv06rMKIrMN58Qc/cOvnyPomaSeif8koMiGZ/TUfZy3owsvDwj4XF6nhgR1Pyx9rAY4CfOrPUpL6lvdgk48tvyWVWjOisKFh7RGWwTAFvbebAgaeD6Ne2lrHYeW5pTrFfOrCX6YR4b5kUr7qkXEeTzizwxd09f8zTAvz6sXXsxzz5KF/MStEOLWCg3HhPzolWdX6x2yLTx7B5sVXD8w4J1oa0Iu/c/Gifc+5ewxwH39bbGLFu/0jujJ6JhvmhY/g6ZqOkWsMX7j6huXBrM+hEs/q54vnnNYk+ZjMeWZp7W3CrtTY6E444Z/rRFP6FzxLH4o+hs53AqG45L6i1Ib+ezJfn1c5YryOrxduxbP7PhcW88G04pnf5n7kNLqSIlWhwr6EiOBvgJeq9bEZl933SxN40rFkS1Z50e7XIHH0Wd8KPI4qs6VY5QIuR2FtycnrbvFcnqMWfs+JfQhQ8PD0t4kV2/Ks3Wh4z5mWvxMD9pVGNvat38X1NH3r/1W5P7a7t4oU979FB/aYnqXIZMwIZTKv76tLYG1/1qgH8Nks/2jJ5OliXsFQv5nadKDRq3LxzX0P63v5QUv1NSEJxQVwGQ8P32UbZReyCN/o064G8+LupldVeQDOB3EoeSWV0nD51PqI9/aUqhv/VTz2FhW8GzeQQxT/4xci5dlrBHIkrsvdLwYc4pP0R4unPWiaJn1MaPLKp/6xGxYWGcorBYU6v4gqBL2ir5/pS+c0WD2XwxL7Kr5hWRP8CP7QQp8l2/+X7toUhxZvmbKdtrYCyIF5cWMOLIVH2vkC25ICG+qXHgd2R1pxEUWfDyxC7Z4kXl6F/sPNfGY0tEfKkwqj3z1EjHa8u7XWS6a/LuVVVenFiYpFH8Q5TGip+Y1UVQ5K3XJ3aJPhLLFMZvnn2QJuZFyUtujNdU4OmA44YpbAIg2qouPp4HSjj0qvON6+JPyOpi5hRI7BKRE8tUxv++JlnMi32FfQXDkgyMGmq3fU936cvCRNNQChtOvjSz4BDEEv2ErC6GnwKJXYeHziUK40c+t5zEvgf27DWCWvLCXLXiM4rYot2snzzBgWN/nrJNCQy1S1YXq/T+xK4zdMcZhfFj9+wB7MtYqQPlp7ri2HBq2duP5rmnJztzTw9dKlGeTJDw2NKfGj7Z5oMDf6WCkNVFUOSTtyd2HcCdS1TGj6JLn/trlEeFEmG0LPeCcXQORc0fX5T0ZggkAo4kMamn/MHMDHHjb4t+7Mv8hKwuiqDWKeKtiV1n6I4zauN3+LmmkvcndsncB/jJlCHUe39il+CMU5EUP3UznMAzJwVAwtcpIHzqhDT6fUoForMg4UuVd/5Eqp6VQcKXQikfHLlzwhdF5/Vvagq6k6OxL+id+eVPAzEbRHzw82y+eLkVtRd/14QvsiArbufv7cg9PZgvkvDYkjNP59299nHzUwEvJ+12+JTG7zbhi8y8Vxuxdz0LA9pUNpx85W/CzzJBwpc6iz9ZwtcSB+bRu91CtrT4xRfX6AcJX7drhVdVkiZ8URRdev1iKI0Di3INekK+z5byAQlfCvzPXmayhC8yLVYd4sDx6SMD7wiRj81tkPClzOJPkvA16/X5MbAwWaP4exl7O/42ws94QcLXq5Z8wmDdJXwRRHOzk4/9X0Cqq+XDV8uHK+9Mv3Fs8+1bP5DwJQjprUXXhC9qlhVJHD/33w0LUsZGHTlfO36Q8PVW5l9/3CDh+/U19aIWQcLXKUcITiikAEj4etFC9JWHSumXvl9ZKwo2B/BTEKrnLgH8nmtFQUuAn4JQPXcJ4PdcKwpaAvwUhOq5SwC/51pR0BLgpyBUz10C+D3XioKWAD8FoXruEsDvuVYUtAT4KQjVc5cAfs+1oqAlKX4KpTSBKysp4CbhS6wCZd9RwM93XAWeuioA8Ltq4kM1AL8PwXZ19f93ac1dBP8jJwAAAABJRU5ErkJggg==)
Dans le dernier tableau, comme indiqué ci-dessus sont les données des champs en NPK que vous devez saisir manuellement.
![](data:image/png;base64,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)
Les feuilles "Calcul Engrais" et DATA sont verrouillées pour éviter une fausse manip et supprimé des formules importantes.
Aucun mot de passe n'est nécessaire pour désactiver la protection.
Voilà, n'hésitez pas à me donner vos avis et suggestions/améliorations !
Fichier Excel Calcul Fertiliseur V1.0
________________________________________________________________________________________________________________________
Nouvelle Version (voir poste ci-dessous)
Fichier Excel Calcul Fertiliseur V1.5
Sachant que le développement est abandonné, néanmoins, on a là un jeu parfaitement jouable dans lequel je continue à prendre beaucoup de plaisir !
Par contre, le système de calcul pour les fertilisant, je ne le trouve pas vraiment au top, aussi, j'ai "bidouillé" une feuille Excel (en réalité ou libre Office, mais dans un souci de partage, convertie en .xlsx).
Même si elle n'est pas terminé, elle est parfaitement fonctionnelle, son principe consiste à calculer la valeur la plus élevé en premier, puis le suivant et enfin le dernier.
Si vous avez des suggestion ou même des conseils, je suis preneur.
Quelques explications :
Dans un premier temps vous sélectionnez le champ à travailler (cliqué dessus pour voir apparaître la petite flèche du menu déroulant) :
Ensuite vous sélectionnez le type de culture.
Dans les bloc à droite vous avez les valeurs nécessaire à la culture, celles qui se trouve dans le champs en question (ces valeurs vous devez les entrer manuellement dans le tableau ce trouvant dessous) et enfin, l’écart, ce qu'il manque pour assurer une rendement optimum.
C'est le cadre Vcal qui va vous dire quel nutriment à traiter en premier, vous devez respecter l'ordre proposé car ile traite toujours du plus petit écart au plus grand.
À partir de là vous sélectionnez les engrais désiré en fonction des besoins tant que vous n'aurez pas renseigner les 3 engrais, vous aurez des "#N/D" pour les lignes concernées.
Dans les colonnes suivantes, vous avez les valeurs des engrais, le réglage du fertiliser, et les valeurs restantes.
Si dans cette section vous avez des valeurs négatives, sur que vous dépassez les limites optimales.
Dans le dernier cadres, vous avez une indication de la quantité total (en kg) de l'engrais utilisé.
Dans le dernier tableau, comme indiqué ci-dessus sont les données des champs en NPK que vous devez saisir manuellement.
Les feuilles "Calcul Engrais" et DATA sont verrouillées pour éviter une fausse manip et supprimé des formules importantes.
Aucun mot de passe n'est nécessaire pour désactiver la protection.
Voilà, n'hésitez pas à me donner vos avis et suggestions/améliorations !
Fichier Excel Calcul Fertiliseur V1.0
________________________________________________________________________________________________________________________
Nouvelle Version (voir poste ci-dessous)
Fichier Excel Calcul Fertiliseur V1.5
Ubuntu 20.04 - GTX 960 - Full SSD - 48 go RAM
The post was edited 4 times, last by Pacifickfr42: Nouvelle version ().