Discuss the general winter and summer precipitation patterns of polar regions.?
What will be the ideal response?
ANSWER: In the cold air of the polar regions there is little moisture, so there is little precipitation. Winter storms drop light, powdery snow that remains on the ground for a long time because of the low evaporation rates. In summer, a ridge of high pressure tends to block storm systems that would otherwise travel into the area; hence, precipitation in polar regions is meager in all seasons.
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troposphere mesosphere stratosphere ionosphere
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MK87nu5pdrOdesc3C7QAFtLm8xmzC9faO/geOvihpzTnTjU6rD1UQK70AK+S7uUvvt6Pni8/TamPWceG+5HD0a33R4SbEm7FvLZUvsN3c7JLZ173Mzgc5qi00MTOd/JBXiUODph68Kk3O5EHaen3fnk1iT2J38p0vB/MpmBupp22Tn6V2o7B2PBlBlpM0hO4jN63md8F69JyZyvMOe7z7s/6B/WeBge7SvMGN1xx5l5j8OfR97O7e/I/3n6wczh5z3Of9bb2TRP/jsPmtgqNa/93g9Kpsib0+yJ1vrl/JjQ1qC7MYTapicbGPgL0TvufHe88fcy1HJu2Vq7H9kSH3Lvqop1toDgmN9ixl8f6jfXfTse5nFcy4bglCKLNOXodXUt8fv8eJwz8NzCEWVwbR6ulNOw7yvjYdYyOI6c4ZjdC37FirsCMy8ojbF/zhPsGdyQCeYUhGtTE5Ztj2uMJdEuA0jzckdphiupJgNKrvKe6cFNxmydjU7Op9D0n/eBE+e4NrzNTM2SeuyZmhMVBjyeesCJ9vcyRpk5fRLjcebZL3M7fCIJRMeR+uAFZDOm/Ga/wCnL5PNTy9KTPc3nW5glDzMlfRY7594/HPEeie4z/ziHQY8cUD6PzL3kIdWF45fMft9zKdbHpfN8R792fqq+mi//LB3bPfqM8XN695krP1H97AzAIMCUULcmjgbNap2GxC038KlWqA85ZaDiGOmmWaEj20aY0VMAR1i7b/wEvlsVjfDQNHXCe+3uWIzxFxseDaAtCUd742Z58HG+VU2woffZAoc4vjNvUqy42F3nYW4TfbpgBbclLlEYhiYwcFpbLikfnjv6nRsPLsioSxXhoS2uJmvjVtswXIPPnRG50q3ccdwmSvA1vcU8OEIomh/Ou+tmRd7wxP7c7UOuDfhD2ln1Bz433Z55fE7xM/F9p01pHQPk5yhi2uqTZ0rUGZ+zpGKWPJ+vfyXlYZYczvtmTptPt2AeWx7m3p96JwJ5sB4413YGOnmCRM08fuL3miv/9EvHuT5SP43nT523JfPkh84Ak450M/89vf1kzphLmvF0Wvvd3Pholw9jUjnmhWoidzuyhEBOYe2wNmssOmONy0uE3kx4ee32o1vMNQzviH5xyF+r233jCvZC3m04rhX+CukR4pxM5dnFfLqR403LAZaa5i2QnxTzdrlw37A97ohLTqKMciWFoUovfGXG8X05pihjxu9jlrXmuHfVuiAHcgy68KC9ARWNB8d9JgdwcVilEk80kHu0BbJtBIyrLIwv4HUEedj2aEyEW+InXak75yFbGjlO8bjrBsmt6RwhNL4/d/uQa9tthyZyO8rn9PG5fE7cB9MZm96/Jj4polOC0oJursP9adgcj8j9xurTcDugdGtMdH8+wNKz5WpGvwtf44H9K7Elc+SfuPh+c2xU2MABNR6U6ay8Dz3m/UPhP4cWjW7nyQ+Zizpm9ZdHJe2EipDZ+vOB40h6S31QpXnqWxCVM/X3efIzq9OwRqQnfxdi5o65bHL7oSmjgL7Ng9vswEU+sYPLZ+vDgbQ7hCnC2uP0qN+wbcacbj8G6Gj03WraZNEFyGiMWy/iUiTjvvu12wbTiR1uj7dbRnX0uD8fR3n/Fji3rP2rYXvcyi7cx1iK5ojDBvbmxOUBNpA1PygIQ5yN4I4HpTYchsMavI7D2suet5xYJ7IFV9MJlAwTlVHqjSF/gf+65vit7zOyTqXH0v73a83To0fhj6H3uGoeTQR8DdhlrktNrK7TJjGfs4XXmO4/nxklO5fmsfQBLXms/sVcMVraIK3xrQlZ+yg0y8n6+PPvpoHuj4luZ22fHs3pjw0/Z7xv6Lf7tn3g9rFFSM/uL7Pl/zx9PnTchvvNmp9+O5tTOsdN66ac3H4NGJfEsyYjAkaXqXMRK9gG3knma0g8VBLCd2nAqYP1wRYKpIE/222pw6/NeOFyrPnW9r4j9cmrKWJc9EvrY0JJ8O1iFINf/E08um5IwICNpTSggoNmOS/qUouMNBWJCXGgBJ/g3C3tMBCmQDsVa8t6286KP/iovllNSAft3TaZBzdVyCB6vmkTyye3aDS4JNK4lNu1rV0+3Jx5TMGGW3f+2J3PsmqVkFQhhmQe4lQ+3ehR4vJ0ziBMbY3h35B4g+F6TbtlGn2vTYUSZ6PiOwgropEmtSVevbHl22e0q9xNMKM7lpE0kGteayxNqRH6arC+lPEzli4PSh/IditsN1OWTRpB7conEh8jRLBPGeqPt1s3/2GiHKLRXdKGBE9L5NydZzm5pa6fur7T2TqYOfiXxHBnKfTglEk8iD72XD/CNPw0YTPSMdxzB9W5sPWxB+2TgH6KqKTzWM8iH9U855JEicXz0bDfjWzxgjkG0hnEfIzmjIl4ziPbVLPz09/H7JnF07nW7DwGddbwuEs7bxS522x9EjvYVu6kbjaS+KzeVh3iUik3pjWBuf67wFDlMvG2kbth+6a9udFRlUnbMD9/WpAY1++5IhqU0FYYmiouIe7qp9eN86Q57P1Mx0zwtK11587r5Qn2DlxKGp60C1ndoQY6IcqAwnxMw+o0AOvg/cUwD44oTCA3GRMgABYGCy7sxcK4KEeMkGhED/7LsOYEjpJHPnukO49Yd2d8+3ko8nTk85QWtlsTXtuIvdt3fWy4nXX/6PbRaXZvd+9LG8FEHjZ5UvwRt7a0ycg+70XcDBIKnktDyDBYyVUwYk500Zjx+8EjTm+ND2byLXVBUidWkN93QOrkCzzxztPQbbuNv53+/PJzrOJ4v8snAILHR5+PTU9nhp8cp4CfDM3OeDEL3X6jb/QZaZYuvF8/DK/qPY52D9LgiIMjU9bI3s/xMfRnjwx/LhYxembrJUYnrGltFec0c5ESbtx3gRpdhE/McZHZV0f38HD0vsHET3uuGqcPpC/VjE5KL2NSDPSFVOa3MfpeneopD8tZ0JsxCEKBz08zMO6jUfITnOml732bJ9KPvtEfk754x/xG3+iJ071VdOs6bofXcKc9waNb0jnngR3zqwW496PwG5BmlmHk5Oj+H4qiMSStaIbVAnH9JkQS3Jt66DMOc1OGTcp8DH4Nu1yK9EwX3CCdyulHnIWei0Aa+q0ffaNv9I2+0ZOm2fleB+7CHiroupYioNZXd+ge7/uGiTuSbMY3gOupw9bG4zh+fnT/j0atR7ANrCG4Q9ostj4UyZsK9+gn/v6mDV0atGECXkyfY8JHTJoln/MGRzQcdvixp8wD6DrxWqm3fewJ3XuFuET2v9E4zbWRvvF2nGbHqj4Tei7tnyvPaYfF83jf50WztHR0sR3pDuU9R1WIvhrMakgXlQ39ZcFwmkwnmgS4LtuFcbvElUdzIcnPgx4SojBdKUz/8I/ttHsiiix0fj/8biYQ3OhsRc+JiylTZg9UUd9q4vzZQejRiZhZd/gj0LAffePSN/pG3+gbfVnqjYNThvVU7MFwJzinfwJJA2XS4GDShblR+ubB7dDwc06s0PZE8OXnp5Gg2/CcwHnZllqdRBBd3qZUGDyxtbdc5Ri3E/Wwph7JG59mb7lo9Aq3Iu0eq7Z7EyunLxjQuTx2ST/2mQDl3G7wrR99o2/0jb7R06cp7rzoONKJ+Rx4ZPuhCyQYKPs4mKTwWIq+Adw4zRpoU4GhfwQa+rzDeYQeNxSZFAPQuT8lYdqRkTa0j4h2gSnPPRmiACkdIOXufT7xw+Plv3r6hm6/0Tf6Rt/oK6BoDG7qJxILS5hy25MkmK8tgdl3GauqasJU+4wHTMlLMDL1PNnvdR9KAdOWibBN5J0N6XMCl6cAAjp883n42jR7bXypC8Yl4SGs6GfCYNzh6/SYqZUaaYlp6Hhh4nspvE/EXziIqXA7kGg39pPBnGTDxqdkQM2VjaSrOZHPWM2Lej1X3s2UHA4L7jniPJ4eN6Q/sgGQevdUwhDGWO9gytTsnfYUFMjnpyOXYgenXJg6PuLWmjL2faMhTfkuU7DEU+B5r1eGQ1U76+hHk+CE1H1GaBxQ9p4ecsZVDHD62f2UGpqntOek/ml/6rSw89vx2nDut+Wkm1d3Z7WLzNxQ3ja+pW8e3D59mzMdp47UUkIHHBqJYzaT1zgF/SHeSXSTWDvsAPpUDG6vz8MlRodHwl4XnUzpNfKbeHyjz0PREeUeJsEfUGj/yIbTN/qD0Kx+/USUQModGx1t7zcF+gcFuJFY21H/x2dryROnPn86Ltvp1JbUI03ShdCe82abNzeZP0Sa+Bu33wLTjtC7RZHR9vS6dItZm4jd1srt2a/uJd2WNRkUepMpz+gjpvLgztYcift8W8X8GagT1N4ciZ4WtzOfxvD2eWiiS+wbCH4i9MDv8nXon/sxwQxWaEWDXHv0mVVBFKd24hOCGNywZT1/Uws9vPs2waE/HMBNOWg/P7T9PDT7XSYvk3SEFcpwJz1VGlIrh8PeSIKQg5Yo4+3EShiQ0Hpwe8/S6TD0ofuWQAG0YxtG0IDbKgql0nyBv7Rn9znSuWT+a+o7T4RSUQojPt2wZ6XmLsjX/rHivBp02K+g83419O27pKDtODeG/T28wwjqHYGGj0ex8IkOeB2Lf+ivBT9BfziA21KKTT2k+0fsZKM0cOJS3bhhTbND0h5BvDwIce7SEOC6Gt89dHsP3ecA8XB0D3ta2LuGCACOUCgH2EnUF2NL94XntnQmTYgR75x+Cv1PpKQBk2hP6u6p9nwjR7PQbfjr0HqM/vS1QtyJfPtjoqgnSN++S49mcWB8RCNDhfDgOMz72ca9tvVuODTCe+N11PWLQ2wSp/0RAe6UKNuoZzekc/XAuYLypfp9lGmmy4cHCn3PU+sO6gbg9ra9OxxvkpqCH8DWBqGy3mk9UNuZ3DH+9LDLfd1usG/0RGgEAUyJQ4hI/h9AbiPQNrHw5VwG3jd6OD3Ij/v8v0u0p4/wIeW+Df01ofumN2x9TkmO+W4H7eymCSNdvNsLUTiZNewPB3CnhCJ8Tcrr0UMUUDCHvWWkQ2raCVRo8tcegSyhRxkPsygMFV8PHJNTALfdb9uJsbyMBO/dRPccnbPBVjc9zgcQ0ybRNKXR9XNzC3vNprnf91ySnXquHpld+kZnoh5CTVlZw+MRz+5X+llOegS/+QifJv3Bv8s9wP0U27U/OflgD+69Keq7nRiiEJzfu2Hy5CPAxYKqxx9m1SP9UmRm6mdNTy/j76A3F8P8yGT8tPek7aOSRn6OtwHmxNt9aD0j1EM9GizPMuY0tkv5ZXv7x6cHbYN0XdR1XIdSDcEjhkK6k3DiGz86xicYzTwY5ZjMlmnXcnOMXmh7F2MsNByNabOMMURxkamfGDFkqpPTidu5xXQfHUNPJ02bKQaQCj1lqzF3HDP2W0zYfuH3+2IU7R1R2Ts5pfB1zTlMepHQ+qVOIZjOVuFa1uHxz0TTespn2j4legSwO9S3c9rz4H6jg2dG72aHKnQAITDDQQeOwFIR9MLAtdoNZzo9UkwensaWZ31mOjpxzTFQnkFi+wgxxGVtw4cfktkxHd9bIICDSEfK4QE8y5TG0T9YjthAmXYToZQsJjxb/Xdr93XXBDl62jAvac//6hBOvHIVDfebu7mmNj+ZWN2BjtPbuejmiPVcr7BBhMLopO09njvSDeLEmBOw1LbXqoA5NOrR7AkGRhxo9+G88RBswygFd55pnqVQ3DXgUQtu/REEugCwNWTyszCIYVpYBovT3F0ZIF9t76SkPZpp0OMWLWkqag4Yl1vchE8gThdAqxjyzSmXxmHrb2ePZA3DW57DVqnjxEoA9LXxgLivWJE/ukHAx+1sFTqrrNoIHJ754HhvN94IIS40KtjiL4zQ+FbDCRO280Pin1EQfRTFOoEIX8KEJ7SXNP/F/LihButPCJKubmTz9IOeKyfUBK0dtCR6xaz795TzcCbHzRE17PLTR2ih+h3tDGYS+RfecDD11xzv/GpCWDzJkKBoAE/egjo0OGhM25p59390Oumh7M1iqzTiaM8hAavDGaRmqqJzQl/rzlW4hsXxQCBvYbYf91j3FoY0oXSMtqF3OhjvqFEUcZekHIwuariRmOjHnpbZoZzbfaqYVjgycouDj56XZgbfvWmLo4zXx37piOuPzpPlRmEelmvFq93QRmcu52rYEJcixo4O5m42JDjOGjxgXFc1R5Zi87Cr+ihBgIKekxS9I9rtUsGYxi6NozZw2P46FqJw9NI9YZqLCELpnBKu8BmcprO2c/17s8g0Vs309gQAiwbb5obGO9kDXdbx15503zoN4coleF2AP6lGK7RHXHskOnOF9sG1Vvo1OGo1h16sXfsQwgNYVeCnQR8xPT6aNo8+zpj4EmzgXm0Xq4UhQW2Dh8fpcWbEBUK4ege8PdLfzupxVN/DD/GoFKxaotO3bgyasn1SL/t5KNo7HuKFfZgT9+l+gpNxCJr6Qd3JnStK4jR8aht91/HYjznUogHzZLZf2Lt/P6/tHP73tO48WP9wPBCaXjryvoC8FRgoHfclOnFhLOEgvDAVqQDgHm81JTjQzYY+9AXuS1PsGeYAu/sz9NG28bhYTdSdE2giyxDeezGE2vwrj8GNhGskfpp4h280Tm0MUA/Ctjuu8plpLFrvXKHHX91+K9stfu1B4XDx2fGJ1KLZEv6EOQqY1tF4pqZg2jns5Qr3SWL/OS+HRbkWBZsm/MA+WOIdKE6RIPxl7tGAVmU3noGQiJkUTjUI1vmp09pv9I1O0bnk5OuKTIjQCLod2MzJX4fUsizFwOnTwd9oLrUfa/ycFP+fyBfpzCGkfTqIPgmOQc6gR4R3DMRzU5jesWP8VSoFbXs8+eKsGPaypmH90Nvwz5GB0rmax88hX8Eis4khASln7dm/+mOL0awQiHvMOd17mira09qu63doB7CGXb23bc9vQ0aiALf3dIimNRJCDnB6RwPAtdYwoOYaDDpqVQTXsKOo0hjaYDQGMJCOHXnkhtHOdjx2OTJPX2htSAwKJ/vtl/agfKMnS6mJjikUj