Which continent has more than 12,000 cubic kilometers of water available per year?
-Australia
-North America
-Asia
-Europe
-Africa
-South America
-Asia
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uxsb0uSBBSS5oZigMUspZ7VdB69T6krqH9OUCVjMp2GsUdXtPKcZk0JAosQIDGH8yRlwtCPSSjLMsNR/pvRntVsVqw+ZQkV8XAYjITZbGJZ03XavoXGX82D/bOHkJqzD4nqwhb2NNgCUhf2RDbnhqiomgqoBjCIEa0yxbMhQjihC/oszaHKUh5zQFElarLrsfMkK45GoNJFf+QSXmAxR72xQeypCUAtiwUeiO7cb0shtfDk0t7ULC9wLIk8hoakprQeC8qyx9T6z9jCnbqwhX3htoDUhT2RAaYBN8wT4vt+GpM0SwHydF0fz7w8Z1Hh26Rhp1nE0zooHOzMiQIviXkOyp4gmSvKVyOSzDDORREwOqNRqmksMLQSIA2uSlOWu58fVaAvpaQCRduALj7lNLc1yzMGUUj9VBnVbNHsb2FPgy0gdWEfs18QpQQQB0AWBMG8cCoAnCxKAs8nhC4b8UU6P6ELUjEb4ixzARNp9mqeAVxmmQQ0NqPR/jFQVFnBksRxPMvi+8WrSJomGcNl1IUKch6oKgfMlmXjKJhNxkwYAPAWif4pgwrYXZDShT2VtoDUhT2REZIXIVM8kFWO48IQeCoN+5dlOWQIz1NXqSSJTB7TnZPMCy0AxyTNwzCmOVCKkBVx/gzKeIwVEXYWZEGkDtbCIcCy3Dw1i1auYilkC3zGsazt2vZsBNqf52Ua4ZV/lItKQ6geAVaWoQx2EUG1sC/WFpC6sI/ZvNJT8ZKu3T/8BfA0ISnHMl/60pdM03ScYdHgJDI13Z31MF2HZ8IwBMrJ8bQYSuQFM8thUAo01vWCqcBKWATcU0QJC7yhKrYzZYrSAf1+H+iqpMgJBWtGpr2ttePTExZxaRjVa8vtkxPfc02jWiySwSOL0seJfLTA04U9BbaA1IX97UahCrCsqMVHS0zh+7WmQJULosZhNivoIsa0Yqog8rwke2HqOI6iAg/V45iQOBdEWgMlzVMOCXAoHvOg8NMkB/GPGJbDAsAxHBa22DZwU0cUZJ4X49DjeLHXOTGbKwzOi/CqYhUL3Q+XfXiG+cKZurCnwBaQurC/xe4nUWUMi6nyBjk/d5JS+APtnxCU02D/NCUIifPeJ/AnQZC8gFF0LMlqlti0YV/O0hYAmBFFkeUAVQVAzzjNMA26mteYgndzcRy7Lq2WAngr8JhEYSx4t27d2Ln8IlZUhLj8fg7CAj8X9jTaAlIX9kQGkhvYJK14UvTmYxkkcnyWJjGJMMoRAzw1LRKn0ihOGMwVLaoYAFaATsTKQFRDJ5QELooAMxMeZ8BoAZDDIBZ5gUb30x5WQZIktFFVkgj3jaOVq7J0/94d256VlVpxIglCwhd9PRa2sMfbAlIX9kvYvMs02GBAS/kBAAIvFUScEuoJAPqZpGEAyJhjx0slRRZEGXioKauePRn1hztb2xFJSZhGLLyBy7LY9wNWUxnqMcAZA5AKoE3m9a1pRwAGSQJ8AjMc9EaDfrm5iYonFj0+j/+j9NmFLeyLsgWkLuyJbB63BIJ/aWmp2Wzeu3edpkyliULDoQQQ8BzNj+KyGFPPQEpr9xXl/cU0yRADhBS5Dgh7DmM+iggcTdOqcZx7vgOyP0kwYCeo/nlDFFVV57lYgsgDvOZMBm9pt0+3L36J4aWH9ac/If7RIs1/YU+BLSB1YU9kNH2JssBMNU1gqWlhtDoUrZ+CAAHzPKMiPU/mzf5ojCohXGFJkhXwyiSE1q72fR9+SqIMet9xnKIWdRIFnqrKgiT6YSDLkud5juvohpaRBBCaQ2yv006zhEM5y7DZvAbVp2yx4r+wL9wWkLqwX2BzFljQQcTESYTShJfp0jyJUxZhVSs5jpXnyAsDNs81XckykiY54J4siiSOBI6GoCaxxwmioipRmkVJ7kUJw2W8oOCilwpQ3zxPpzNHllWekzHrsbStdB7FhMU4iIOcAf6qWPaUyWK2yOHKaCU/WsavyKF6tMDrwhb2BdsCUhf2WcYWpG9eooQWzxMkniachn6GUYawpJUdPw6ijGdxqVztd3vd/mip0WBR5js+vEvAeRzYSm0tyKI4ztw4jvJcNsvt0SRlSW9s8RzKWCGMkCorntvrDye8KCEspjmuVOvjyWxkTU1TndiOqvG2N4lCR1BKOROinH9Y3m+Bqgt7qmwBqQv7xfYArWjBJ4Rp+WcWszxd02cw5sQsD7wgYunfOFGQ05xN04znuRzoKmHi0Dc0JQqcLMv0ktkZ9EvVBivIDGKP2x02SxVVatZqgkS9riTOXSeMYi/Pc8PUGMwmaeZ4LslihOGwJAg8nVZImYcffBpEs0fOeWEL+2JsAakLeyKj1fPzbN7RJE3Tefsp2v6E46IoIgmRJElVVZo9xXFFHT8eI1qKWpbleRXUSqXSubGXs1NZUeDPo9EoCaPVtda8QpWqaEHoggWhE0UhzaeSJADiMEwZlsWYD/1oNBw2mlsMd3+Fiv1U6ZSFLewLtwWkLuxJjVaXRgjA1PM81/VonyhB0BQZfiZFzX+wNKNLUjTUn8fzNqY0YypNJVWBd8EBAH81Xedp9T8lyLIkSQBGZZlXFCWMvKI7AP0IeAFbgJamtGEqjxnOdf1up797PuFpfVUaAbtY31/YU2gLSF3YkxrAHGZZgEgAwShi4GeRlgoEU0Y5E8chgCbocUWUYGeAxTSl9fyntBB1UlK0s0knQww3z7nKMk3TJJFPkng2mzGMpgg8gCnwVU1WMpq0ygJSw2cFQSjkXJ6zSZhalo3mlf3yBT1d2FNqC0hd2JNaXvQnAZgLwxBjZl7ij7JOTWMxDTglScwkRFdUQEPbolVRgGnSenxpijBL0oTjkAyIyTCeH3CY4Vk2jhPP93VdBrjOC4O3AKTOPw5A1rF8MWJINaG1VkNCQ7FyNktSzPFf8OVY2MIeZwtIXdiT2tyDGQQBwCggG8Y0qj8kFFUB40RRzDDyPUBbrKnqbDoG2AWWChDZ7Q9F2atW6zPbo0mmAu857tR2ZI4TOFR4A4jM0zh/OCDtPYV5mpOacBIv5UkeeBEcNk5w4Ee0M8qDM1nYwp5CW0Dqwp7U5l326GIUIfO60TTCPwwt12PSRJQqCOMibj/F+H6EE92T48bTSc6xqytr+dEJYjlNNeKQuO4g4VGtpMOhgPYiXaFF+4s0AY7DhETznoAi7ZZK4iAOE8b3PNqfmtaj+gVr+ovl/oV9kbaA1IU9kWV5hmkP1NS2bSCqhmH4josFPoqTcDSplUxC66fS9nw8X3hFMRYExnEcpuiras1sWZktLS8LgkQ7AKapIkuqLBWLUQmmja1Q0XiKuI6jKLIo8rQBQEgwYk1NB/yWZen27Zt7d26ff/7lwHUVzYQPWaxQLexpswWkLuyXMFTESM35I2ZQRFKOR3EaMzRulCabFt1SgL3GqkqxFSit6/pRGIdxFEYRgr0xT9KMNq8qelPTIFaOBSCG17Q5VZwCMse0UADhBQzbTdO0Hd+yprykIyQeHO6fv/S8oilFFCp+5NQW5HRhT4UtIHVhT2Qsoq30WHQ/KJW2PzVM1w+jNOOiCLbTXPyc9lChjaQIEYvafBFJQNRnRRRpEESiwqYsXe4vKgTkcUQyzAi8OF/FUlU15RCDaFerJCE5k+pgqmZZtmO7SonlRPXmtatf+srXG6tbdNX/QeGUOVdduFcX9jTYAlIX9qQ2d3QCXBYr/hjkPMv5lueTNAGQzLIc0JQrglFpYGlKA1QZFs8pLYO5KCGRlfIiAQCl4QGEJHGsCJhRRQFzIPlFTopTDoCbNgFMw6Jlalp0pmKiKJCThGPZ09Pj0bBfX1pBWMxppj+z4KcLe6psAakL+2WsWGrP50X8ARPBaLh+SoGTw7QoQM7OY6FA8qOiZXSS0S4AQDdnjjuzbS7ggeFSkM1ZAE0epVnKwBFYlM1DsrI8FjguLY6dxJGABZH2VSnYK86iOHAcC+WPFvZ/+GKBrQv74m0BqQt7IgPkm6+zz6vt285sPB6D8E8xTUilTU9ZHjH53KMKNDNLBVrcD7HAWGEHSTVYxFEQJkW/KY6XZZnJXaagtLCDoUvzaIGcoUUCYfu8EDUgtiRxAMIsApgOAGEta8ZwD+ukLDqmLOzpsgWkLuyJDIAS0+ZT1G9ZNJ0OQ89Pc8QITEwIOw+xyih1hV0VSVZk8eT0lCmWq5IsJxldj2Jo/1QBoJPnWNMswz6BY0Xz3ikJxxTJrBz8jcadYiCzNFI1IzxmFUViBc71HC7JD4/2MxKyvFJUyfpYhGqeL7qkLuwLtgWkfhH2aOzPLw8BT1It5OEnfF4IM4+uB70fR0maZ6SIhJJkFfgkpZbFqhSAZgYUFJisRFenYBdWQEWpaYdJafkoYJ2KJCRpDIipawqTi1HgxiROMsZxfYRIyVAAjBMSAWGFo8UkyoG5MjQYgBWE6cTLguTo6MCypuWa8jl+u/+mbFFt5tdqC0j9nC17sGbyybbyj5aiexRS2V/uAQdilqGPRQ89FqCzYnOeZyC90UN1XNQ+LSJAH+xeNIu+Xxn1U72b0CMnDRTV9VxNVc867Xava7leq9WitVJSCqlATuG1wElRmliex43GW+sbRqUKBLTfH0qSkmVZ4Pm6qmZJynOo1Si5rhOHsaSozixBnIglgOMsRSxlvojHHC0wHUYRgKlj2WapkTIYIR/Q+/T4xLGscm01jiJRVOeLZln2ufDTJym6+pvtZ/is7rKPuXiLQIpfyRaQ+muxz+g393H4+zuwhV+qcd38c/IHtUboa0QL4udFt6biZ/4kOZ50TYlhPM9Ls0wQRcBQ27YxJ7KYvpUGS7H0qEBOXc8fTiYYc7IiAMdUJDWHfVLGtWnkP8ejJCGAxkBaWRaeQBZoqpDB8XBGX6dxSPKcaCwWJSFN4Q8cgGZM0oSksCd86OHh4fq5y/PogqIJNgfAmhfXAy+e6CewRePDX58tHsDP3z4TT5kHGPp3mf9p86X7H/HgYB/hdAGVH9uYFohKa+EVUEqBEz3y6ahYPEd5RpPni/DRz/hYOCDP8VmeDgaDqCCP80qpAoN5HngnTUXl6KI/mi/3z2YzGqPKcm7g00ZUPAc7hFEIh+IFFl6zFCjzInWVpcfhsSJzCLFBRHzXy3LC8Yquq27o0CypPJ/XFohTdjKZvPvuu9/69u9iUbn/raki+FycqJ/+9v8AmwV84kt+Jj9d2K9kC0j9nO0X4enj9v5lgfUBu5yj4/3qUJ84ZP6gFv+jzUSZB2Mp/9TP7FP7fJYBRe33+/O4VIauUwGLBNCm1anp+hXGWZEIwHHSvI4UvAYo1FQAUCZJYgDieegVDWKly1n3Ty+KCecnsiwwCBMaAEDoYTTaNCVJbWCgcURcl9ZdhROET7969Wq3211d36I9seblqNmigetCpf5t9pgysw82LIrRfC62gNTP3T4CpbyAqftcsnhe0WP46S/9HMNBUOEo/dibPzUeHgAoenAyDxHsE4d73Jsfs9d9de+6Low9AErf9+EFEEdKOfNcUySA1CgEyCSqKquqCjsDr5xj6zwuSlGUJIopdQYMZmggapbCcTEhqZ8lpbLO5ByNomK4JCNhnAH0YkyL+M2ZL4exwEksYfrd3t3bt+uNJZH2ByjWzbL7PVM/b1h4GPr6D8RQ/pkXaD47o19+ml/Yo7aA1F+ffTQOCy45f2CZeXm6X9kocHyKmT4KJDTO/pEhwX60vTinT40W9uFAegKbp07RTNMoghdFFCqtkcLkNGpVFMUoxAkBlspJklRUoU5lIJ8ClxbFq7jCFxBGQRG9mpOYLuXNCW9IYoDFJEkTkrOIRyiJosT3YlyYKIjwVhGxnCAKCh+TeG/vzstf+wZI//srbA8R4Ym+x8I+0xaBaH9HW0Dqr8ke4mmWFUzxUSfqAytKf36unzr3A6BPQO5DrPlEqMCjOzykzx9zFXz0ei4YgZnOZjPARlmGfyrLAkn1aQBpNgdHXpJoZ2mmCFMFBQ+anWfFYlGe4QUOQFbkxCRKAJoxpuUCaKAqLwBoJoRJcwSUNyZ0Y87gICQz261oAKe06CqtxxrRWiuSKKZJcnZ6nJF47t5g5qKVfcxc83e8kh+7gvMrtICbhf1CW0Dqr9Wy/GNOy8JQgVZ/N67KPETPv22Io3lM18fVXBGI9fETyB+s/n92UBd8IkDqZDIBwW4YRqlUCoJwNJ6BxgcpP3eSzuuoAnQyxVo8EE9CAHYDtsDNiOZTCYSu3WdFKT9AYVSs+1ObtwlIkkzgRCbngBAHQZzKIO0BqmUec0EaAOSKUpbn6XQ8ok0EUpKliPamoleCpcv+C576d7ZixXJxHX9FW0Dq52yu62u09BwTRiFoUj/wdF3nilTO9668B3zthRde4jDPotz1HE3VaP9klnUcZ95eFMAIZDVo6nnV0Ye1lvMH61GAyFmWBmFIgYxhkoRmHKVpwhQKOi8a5MF7mfutongKkVHO8ChPMxDoQFNhn6KBEwNcka7a+5EoK2lMMHxi4aIFqEJFARSqzWnAaT5/DUeG87Rt23Uj00TD4ZBlaY4T/RMhhlaCs/WKlSt4MRqNVlZWTs/ac3cqrYSSJKZpAnN1aHRpJvHi0kptNrVs2+EFehA48kprZTq1XDuoVsup48O5JSW4RNncb0sLAHI49H1dM3ud9huvvfpH/7v/HnMYaHngh4qq0nSDIkz14e346LoVXov5JZ2vpDEPCsEkScxxAvzmui51L4iUVj+sov3pBcDfcMtpwFmez6cx5sEXzBEzL85Q5MgxQRxhhAReyIsGi/OLP38s4RLBlZw/Ywv7tC0g9XM2wNMsp7gmicLUmly/fhXY3Pb2JjyCrmsX8EcETkjSJI5DCp+8NO8GOh/q8+d7jlOfWNOfjwT6dkEAPIWtcRSxHB0AtK0Tex8C5jzx/qGAEQOeFvugAkPmI6Qo05dzlNzldFgViaQYc0VMFR1sDwGFti2ZAxSikN1qtQAo79498GnDKD2OSfE5IOEp+M6J6nzQwhuz7KMWUkVja
The Moho is located between the ________.
A. inner and outer cores B. lithosphere and the asthenosphere C. continental margin and the abyssal plain D. crust and the mantle E. mantle and the outer core