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初三數(shù)理化,一模考前該如何提分?(附普陀區(qū)一??荚嚲恚?/h1> 更新:2020年05月20日 21:18 大學路
高考是一個是一場千軍萬馬過獨木橋的戰(zhàn)役。面對高考,考生總是有很多困惑,什么時候開始報名?高考體檢對報考專業(yè)有什么影響?什么時候填報志愿?怎么填報志愿?等等,為了幫助考生解惑,大學路整理了初三數(shù)理化,一??记霸撊绾翁岱??(附普陀區(qū)一??荚嚲恚┫嚓P信息,供考生參考,一起來看一下吧初三數(shù)理化,一??记霸撊绾翁岱??(附普陀區(qū)一??荚嚲恚?/></p><p><span style="font-size:15px">初三一模對于所有同學來說,是至關重要的,根據(jù)一??嫉某煽?,同學可以獲得自己的區(qū)排名,對于5月的填報志愿會有一個指導性作用。</span></p>

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<p style="text-align:start"><span style="font-size:15px">另外,四校八校的預錄取會在2月陸續(xù)拉開序幕,在二模考試前會有一部分學生提前簽約,所以過硬的一模成績便成了名校預錄取的敲門磚。那一模前,應該如何復習呢?<span style="color:rgb(255, 76, 65); font-size:15px"><strong>(PS:最下方附今年普陀區(qū)五科一模真題試卷+解析)</strong></span></span></p>

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<p style="text-align:center"><strong><span style="color:rgb(63, 63, 63); font-size:12px">▼▼▼</span></strong></p>

<p style="text-align:center"><span style="background-color:rgb(0, 0, 0); color:rgb(255, 255, 255)"><strong>?想要拿高分,數(shù)學應該注意什么?</strong></span></p>

<p style="text-align:start"><span style="font-size:15px">一??荚嚳疾斐龍A以外的初中全部內(nèi)容(有個別區(qū)縣會考察圓的知識),考試范圍不超過中考考綱,但是難度會在中考之上,特別是兩道壓軸題,<strong>二次函數(shù)和相似</strong>是數(shù)學高分的關鍵。如果之前沒有接觸過相關的一模試卷的話,當?shù)谝淮蚊媾R一??荚嚂r可能會措手不及,不能全面的展示自己的實力。</span></p>

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<p style="text-align:start"><span style="font-size:15px">試題中的24、25題是對解決綜合問題能力的考查。這兩道綜合題要做到“大題小做”,做到<strong>會把大題分解成若干小題,步步為營,各個擊破</strong>,在保證時間充裕的前提下,先解決前兩小問,最后的時間再去思考第三問。</span></p>

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<p style="text-align:start"><span style="font-size:15px">那壓軸題到底考什么呢?</span></p>

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<p style="text-align:start"><span style="font-size:15px">24題應是<strong>以函數(shù)為主的綜合題</strong>。</span></p>

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<p style="text-align:start"><span style="font-size:15px">此題的難點是第三問中開放或探究問題的解決。解決此類問題要注重運用待定系數(shù)法及數(shù)形結(jié)合的思想方法。同時要善于分解,并懂得如何解決如:</span></p>

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<p style="text-align:start"><span style="font-size:15px">(1)<strong>面積問題</strong>:用割補法解決。</span></p>

<p style="text-align:start"><span style="font-size:15px">(2)<strong>邊、角問題</strong>:相似或三角解決。</span></p>

<p style="text-align:start"><span style="font-size:15px">(3)<strong>相似問題</strong>:按角分類,邊成比例或三角解決。</span></p>

<p style="text-align:start"><span style="font-size:15px">(4)<strong>等腰三角形</strong>:按邊分類,勾股、全等、相似解決。</span></p>

<p style="text-align:start"><span style="font-size:15px">(5)<strong>直角問題</strong>:按角分類,全等、相似或三角解決。</span></p>

<p style="text-align:start"><span style="font-size:15px">(6)<strong>平行四邊形問題</strong>:按性質(zhì)分類,待定系數(shù)法解決。</span></p>

<p style="text-align:start"><span style="font-size:15px">(7)<strong>菱形、矩形、正方形,三角、全等、相似</strong>解決。</span></p>

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<p style="text-align:start"><span style="font-size:15px">25題應是<strong>以幾何為主的綜合</strong>。</span></p>

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<p style="text-align:start"><span style="font-size:15px">此題解決的難點是如何運用已有的知識解決圖形變換中量的計算問題。突破此難點應注重分類:</span></p>

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<p style="text-align:start"><span style="font-size:15px">(1)<strong>按角度旋轉(zhuǎn)可分為</strong>:含有特殊角、倍角、補角、余角。</span></p>

<p style="text-align:start"><span style="font-size:15px">(2)<strong>按幾何圖形可分為特殊三角形</strong>;如:等邊三角形、等腰三角形、直角三角形、等腰直角三角形;特殊四邊形;組合圖形。</span></p>

<p style="text-align:start"><span style="font-size:15px">(3)注重<strong>全等、相似、三角函數(shù)、方程</strong>等知識的靈活運用。</span></p>

<p style="text-align:start"><span style="font-size:15px">(4)<strong>要掌握圖形中線段長的計算方法</strong>:勾股、相似、三角、方程等。</span></p>

<p style="text-align:start"><span style="font-size:15px">(5)要熟練掌握<strong>幾何中的基本圖形</strong>。</span></p>

<p style="text-align:start"><span style="font-size:15px">(6)注重此題<strong>最后兩問之間的內(nèi)在聯(lián)系</strong>,尤其應明確兩問之間是“串聯(lián)”還是“并聯(lián)”。</span></p>

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<p style="text-align:center"><strong><span style="color:rgb(63, 63, 63); font-size:12px">▼▼▼</span></strong></p>

<p style="text-align:center"><span style="background-color:rgb(0, 0, 0); color:rgb(255, 255, 255)"><strong>?一模物理考什么?</strong></span></p>

<p style="text-align:start"><span style="font-size:15px">就物理而言,一模考的考點內(nèi)容包括壓強、浮力以及電學。</span></p>

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<p style="text-align:start"><span style="font-size:15px">其中的重難點,即壓軸題主要為固液壓強的變化、液體壓強與浮力的綜合計算題、動態(tài)電路、電路故障、電學計算題以及電學的兩個重要實驗:伏安法測電阻和測小燈泡電功率。</span></p>

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<p style="text-align:start"><span style="font-size:15px">在這里,重點闡述動態(tài)電路分析常用技巧。</span></p>

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<p style="text-align:start"><strong><span style="font-size:15px">一、開關的斷開與閉合引起電路的動態(tài)變化</span></strong></p>

<p style="text-align:start"><strong><span style="font-size:15px">解題思路:</span></strong></p>

<p style="text-align:start"><span style="font-size:15px"><span style="font-size:15px">(1)</span>分析開關斷開閉合時電路連接類型及各個電流表、電壓表所測對象;測電源電壓的電壓表示數(shù)不會發(fā)生改變。</span></p>

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<p style="text-align:start"><span style="font-size:15px"><span style="font-size:15px">(2)</span>電路中雙電阻串聯(lián)變單電阻,則總電阻變小,電流變大,被短路的電阻電壓電流都為0,另一電阻電壓電流都變大,且電壓為電源電壓。</span></p>

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<p style="text-align:start"><span style="font-size:15px"><span style="font-size:15px">(3)</span>電路中雙電阻并聯(lián)變單電阻,則總電阻變大,總電流變小,被斷路的電阻電壓電流都為0,另一電阻電壓電流都不變,總電流變小。</span></p>

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<p style="text-align:start"><strong><span style="font-size:15px">例:(2017年松江區(qū)物理一模第8題)</span></strong></p>

<p style="text-align:start"><span style="font-size:15px">在圖所示的電路中,電源電壓不變,當電鍵S由閉合到斷開時,電壓表</span><span style="background-color:rgb(255, 255, 255); color:rgb(62, 62, 62); font-family:hiragino sans gb,microsoft yahei,arial,sans-serif; font-size:15px">( ?。?/span></p>

<p style="text-align:start"><img 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*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" alt="" title=""></p>

<p style="text-align:start"><span style="font-size:15px">A.V1示數(shù)減小,V2示數(shù)減小</span></p>

<p style="text-align:start"><span style="font-size:15px">B.B.V1示數(shù)增大,V2示數(shù)增大</span></p>

<p style="text-align:start"><span style="font-size:15px">C.V1示數(shù)減小,V2示數(shù)增大</span></p>

<p style="text-align:start"><span style="font-size:15px">D.V1示數(shù)增大,V2示數(shù)減小</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start"><strong><span style="font-size:15px">分析:</span></strong><span style="font-size:15px">①電鍵S閉合時,電路為電阻R2的簡單電路,電阻R1被短路;電流表測電路中的電流;電壓表V1并聯(lián)在R1兩端,測R1兩端的電壓,因此示數(shù)為0;電壓表V2測量R2的電壓,即電源電壓;</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start"><span style="font-size:15px">②電鍵S斷開時,電路為電阻R1、R2的串聯(lián)電路;流表測電路中的電流,電壓表V1測R1的電壓,電壓表V2測量R2的電壓,即串聯(lián)電路的部分電壓。</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start"><span style="font-size:15px">③電路中單電阻變雙電阻串聯(lián),則總電阻變大,電流變小,原來被短路的電阻電壓電流都變大,另一電阻電壓電流都變小,所以V1示數(shù)增大,V2示數(shù)減小。</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start"><span style="font-size:15px">答案:D</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start"><strong><span style="font-size:15px">二、滑動變阻器滑片的移動引起電路的動態(tài)變化</span></strong></p>

<p style="text-align:start"><strong><span style="color:rgb(0, 0, 0); font-size:15px">解題思路:</span></strong></p>

<p style="text-align:start"><span style="font-size:15px">(1)</span><span style="font-size:15px">判斷電路連接類型及各個電流表、電壓表所測的對象;</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start"><span style="font-size:15px">(2)</span><span style="font-size:15px">確定滑動變阻器連入電路的部分,判斷滑片移動時電阻的變化;</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start"><span style="font-size:15px">(3)</span><span style="font-size:15px">串聯(lián)電路,定值電阻電流I、電壓U1同大或同小,滑動變阻器電流I、電壓U2一大一小,且電壓變化量?U1=?U2,定值電阻R=?U/?I。其中小燈泡為定值電阻;</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start"><span style="font-size:15px">(4)</span><span style="font-size:15px">并聯(lián)電路,定值電阻所在支路電流電壓電阻都不變;滑動變阻器所在支路電壓不變,電流與電阻成反比;干路電流電阻與滑動變阻器所在支路電流電阻同變大同變小,且電流變化量相同。</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start"><span style="font-size:15px">注意:電壓與電流的比值可轉(zhuǎn)化為電阻。</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start"><strong><span style="font-size:15px">例:(2017年徐匯區(qū)物理一模第16題)</span></strong></p>

<p style="text-align:start"><span style="font-size:15px">在如圖所示的電路中,電源電壓保持不變,閉合電鍵S,電路正常工作,下列一些數(shù)據(jù)中:①電壓表V的示數(shù);②電壓表V示數(shù)與電流表A1示數(shù)的比值;③電壓表示數(shù)V與電流表A示數(shù)的乘積;④電流表A1示數(shù)與A示數(shù)的比值;⑤電壓表示數(shù)V與電流表A示數(shù)的比值。</span></p>

<p style="text-align:start"><img 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" alt="" title=""></p>

<p style="text-align:start"><span style="font-size:15px">當滑動變阻器R1的滑片P向右移動時,變大的是</span><u>  ? ? ? </u><span style="font-size:15px">;變小的是</span><u>  ? ? ? </u><span style="font-size:15px">。(均選填相關數(shù)據(jù)的序號)</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start"><strong><span style="font-size:15px">分析:</span></strong><span style="font-size:15px">①滑動變阻器R1和定值電阻R2并聯(lián),電流表A1測通過R1的電流,電流表A2測通過R2的電流,電流表A測干路的電流,電壓表V測每個用電器兩端的電壓,即電源電壓,示數(shù)不變。</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start"><span style="font-size:15px">②定值電阻R2所在支路電流電壓電阻都不變,即A2示數(shù)不變;滑動變阻器所在支路,當滑片P向右移動時,阻值變大,電流變小,總電流也變小,即A1示數(shù)與A示數(shù)變小,且減小量相同。</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start"><span style="font-size:15px">③電壓表V示數(shù)與電流表A1示數(shù)的比值為滑動變阻器的阻值,變大;電壓表示數(shù)V與電流表A示數(shù)的比值為電路總電阻,變大;電流表A1示數(shù)與A示數(shù)都減小,且減小量相同,因此其比值變大。</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start"><span style="font-size:15px">故答案為:②④⑤;③。</span></p>

<p style="text-align:start"><img 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OnUkMNxXDabffOb37xp0yZRFAuFQjKZ7HblGsAwDEEQeJ4HgOnp6aGhIcdx2NewqG91lY2882QgrmsaluITYdjteiDInIcQwvTW9PS0IAiUUp7n2UthTwEAoigyUQkhkUiEyf/CixuPOPJdUgQAQBR523UccP/zP/5jw/oX//rkc4YOAJxlua+8uvmc886NJYDVLpVKHXvssVdddZVhGExvdbt+QclkMrIse4qKTdeFq7d6N4ehj4JsQiW0W7WU3b5lXxEEaYVisei6LgCwOIVMJsO+Bszd0zHYs28YBgAIgsBxXLFY/POf/7xgeMk+y1e4FGwXOB4ELmIbZOU733PUu975Xz++IhqHoqJExP5f33z7Zz77WU4CtpCLUnr*ae++OKL3tKubtcvKP39/aybxsfHWQ9ms9nQ74r6EYYewQfihrxkHTBN6kbDt+LW8/8hai8EaZFEIjE9PU0IGRwcBICBgQEAUBTFM2t6BJ7nOY6TJMk7wnGcaZqHHXqU7YCpG8m4DOACiLLcb5v2xV+78JSTV2vajxybqiqdnVFTKR4o5HI5NrPluu5LL73EXG3Ma9rtKgbCsixJkpgCY7QjNrKZdV0+EfOtHGyxqKAV9i2w1lwXZtNAkK4zMTGxcOFCphK6LUsVXNdl2st1XcdxJEmKx+OZTOYr/9+3vv6NSxMxgQMHXNfUDDkWA8dU1ez73ve+o95z7PfWXHvvfX+OJ/sOOfSQeBwEADa5tWPHjtHR0QULFkxNTUWjUWbP9T6yLGua5n2dnp4eHBwMPSFIHaurVgiGz08aGrvL5pOClNM+3eCfMqMdV0QQpC6apnEcJ8vyyMjI4ODg2NgYS+7XbbnKsSyLUmqaZiQSYfNzmqb98Y9/vPueJ+IxCUBTjVxcTgt8DFwBeIglpS986dNf/OKlp3z4zH888/IXLjgvHgcKkMvl2IRZLpfbZ599/vnPf8bj8TnkwqGUeu8WkUhkcHDQsizDMMJVXQ2/vPhrjhD1Sq0lwC2W70W3lzmp/WMxcO4KQbpFNBpl8z22bc/MzEiSZNu2ZVndlqscSZJkWZYkyQvWsCxLUZQNr2wDAAd0SnQAl5cEowjgckDoiSevWrzHgn/5P1/fb9+32CYAgANGOp2Ox+O2bT/yyCOHHHII01vT09Pdrl9QOI6zLCufz7NQQzZ+hr4oDb1bCIL0NI7jqKrKoux4nmdLndi8V0+h67osy+xVOJvNCoKQSCQURRkaeeeO8X/EElkRzGzW6k8uAQtABOAnAJSvfvVff3r9/Vu3TMVToNkgRQxqAFPVZ5999tFHH33SSSfJsiyKYrfr1wCu63Icp6pqPB6nlLquy4zREC/Riy5jBEEQD0JIMpk0TZONiQBQGgIQAvauf+6ufxTYJwqus+ufvfMfgKuAq4FrgGuD44IL4AC4EJEihBKgAADpvr54IkLBisWlo44cvfuOX0kwSGBRf98SRVcgAsCDpqUA9v7EJ76y5sp/Tw0ALwDnqhLszBavKMqDDz54+OGHJxKJYrHY7U5oAKa3TNMsjc4IPaYGrS4EQXoabyiUJIlNIrAjoV3ABgAAAkB2fQAA4gJTYQAuwK7PHAAIrgLAAXAAPFAOCAd01692lUN3lksB4Mknnv7sZz/7/PPPG4ZBKY1EIsViMZFIsBqxnSTZhBCL8nAcxzTNa6655rnnnvvVr37VmyZmN/sLAK0uBEHmPaRE8bwOV/GVe/0z8b7WH0IPO+ywd7zjHV/+8pczmQwzPlRVZXNjhUIBAAYHB1nsO8dxuq7zPD82Nnbddddde+21*oODg7u2LGj223Uc6DqQhBkfkMqTK6dcCX/ShQc4YByAASAK/8VKf1/dg5wHHfttdc+8sgj999/P/vr0NAQ2/XYm8FyXZdptUgk8vjjjx9//PG33HKLIAjM57Zo0aJut1HPgaoLQZD5DXHf8K+C0lFyp04ipHzwrNBe3ndCSDwev/XWW2+44YbTTz+dWVcsyaEoioqiePn9tm3b9tBDD33uc5/7yU9+ctBBB7GIDxZz3+026jlQdSEIMr8hDhDndb1F3DcaT1BqfwEAAL/TZ0i4N5z3RqXlfZuamgKAPfbY409/+tPChQuXL1/+/e9/f3Z2lvkG4/E4z/Nbt2696667LrzwwvPOO+/HP/7xPvvs09fXx2bFRFEkhORyuW43U2+BYRoIgvQ07Z/2Z1kqWIHkjdNa4AVreBCfIfMN2ssz4DjTNFlWw6mpKVEUzzrrrC1bthQKhUWLFqm*qrq7OzskUceeeqpp37iE59gK9gMw+B5vteSXQWhM2EaqLoQBOlp2j8UsqxF3K7ZKa62O8oFAKA1/k*nQxgmjaLJFQUJR6P67oeiURyuVw+n9+6dau**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*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*HFXLFEOl9*rWmpdq3SUrzX0Vz3urycqa1S3Ua*0sratdLupUJWtnCIOhhBkOZgy6FUVR0fH2feth07dui6Pjk5uWLFiksuuYRSeueddxqGcfTRR99+++1dFFWWZb1QBFEEANeyOEn+/T33Grr6xKOPfOD4DwHA2rVrZ6fGTjjhhLVr17I4Qzbs6LrOctszZ+McorEwjYCDqY9*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*rLEtWE9ETzPF4tFprEKhYJpmoODg00UzualAGDhwoUA8Nprrz311FPj4+NFRVuwYMFvfnsbUOfiiy8+7bTTli5dWprYyTRNx3E4QiVJ4nhO0zTXdVk2DRb9H4/HZ2dn+/v7Q6kvC1phc5OGYei6HlbJpXRifKxqwdSdMCsLOwxo8zXO2nPJB28AOOc+en0wp2GjK5qrtkYQJyG6DRGEsWHDhj322CMajRJCli5dunnzZs8Oax1WDptFY2N6oVAI8dFjcSXswZckKZ1OT01NpVKp0gS4QYhEIkytMkccx3Gu67722mvTM5nVq1f/+te/PuKIdxICsMuDwuwqnudf34qFUsdxKHD77rvvpk2b+vr6CCGZTKZ0wq91eJ4XBEHTtHg8zuIwWW77cNMkdiLlYpCbwMc*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*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*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*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*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*iab4pqamlq4cCHTsul0mv08rC1RPN+j4ziLFi0yTfP5559fvHhxo+VbHDebnVn5jsMfWLd2z8ULOdcR5Ai4FAgB033mH89dfOm//vkvD//54cdXvusQCsBZliiKhUKB53lJkpYuXfrYY48tXbq01nUVRZFlWRTFYrG4YMGC6enpdgR0NBBh2NzD6b9ktdQR1Ci1BsGwBpEgkz1lyaWqDpdBxuvgoX0B18D5NE7d7phD7VlWWpBmb66OqJm6C0txm0ql2PwKx3GhJnRwZ2em+geGAIBF0D32+JN333334ODgGWecMbpoJJ/P/+53v/vpT3/60ovP9/X1HbfqAz/4wQ/e+973uq6r*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*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*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*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*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*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*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" 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YBAKBoPo40zHrukkIkSQ70A+i8+AzOzU0EImEFU2ljFFGJUmSJJkhbjEKIIQ0RZUlCXPEOJOIhBhnlCJMJEWrdCNLhbDYBAKBoHohhHDOLYsihBRFQghRShnjhBBJw*mWZbFMZIVRZZkhJFhGpgQQggiCCOMEGKMMYRlSUIcmabJLUoIkeRa7vxJEcoQCAQCQXE5E0ymKBIhmHMO3sgz/yPGEOc8HIkQIjHKGWWMcYlIiCNKGeeIEIlSpsgKRuS0/ccRZ5xzhIlESC13/rWstAUCgWACA7qNI1mWZFninFOGOOOSRBQFc84ti+mJ8ZShG6ZhmCalNBqNhiMRLBGGkESkeCKhyKoiKxhjxphlMU0LYYSpZVHKJFKzc2xCsQkEAsFEgUvymQk2jii1tm3b9tZbO4739qQMQ1XVcDi8fMWK5atWdkztIIg0NzXrpo4xl8l7uno9leIIRRWl0s0pFSJ4RCAQCKoXy6IYY0kinHPTpJzzoaGht97asXHj05s2bVq0YG77lClNzZMisRhCaGhoqHt/dzyVbG1rW7ly5fve976OKR2aolBKOWOKomCMjWQKESLLSg1PswnFJhAIBBXF2Qdn5GmglJmmiRDXNI0xvn379k2bnj106FB9fcOiRYumtLU01NdHohFF0zjniURiYHDweG/Puz3H+/v7dV2/9dZbly9ZGotELcsihBBCmGnJsiwpCsI1O80mFJtAIBBUlLQ++L26zTRNy7I458lkYtu2bdu3bx8aGmptbV21atVFF12kSBKEPnJypjPH6NTIyJFjx3bt2vX6668pirJyxYrVK1dNnzadc444lzBhnGNCFFWtdMtLhVBsAoEgD84s2xBNB8EIlU13DrdmjDHGZFmGzxAfX2BLnY2CpWCSJJWwq+Tv1Wb4z0cRQrquE0KSycSbb27/6U/vmzx58tqLL169alVbW5thGKqk6oaZSCYxxk2TmjDGCGPKGOPcMIzDRw7fd999I6dOXX7ppR+45gONDY2GrsuybJkmx0gLhQoUlFPUjDHOuSRVRUBKzZqiAoGgWIBKsyzLsiz7iGEYpmlWtlaMMdM0DcOAGlIKXXpwMi+3LMswDFBv5WrYe/7SNE2SyPHj7z777LOJRPwv/6+PXHrpJY1NDYQgVVUsyzpy8NCLzz//2tat9pMyTdO0TC2kLZi/4O67725ra3v55Vdee+01xrmiqpwxWVE0LbhWs8cTIDH7Q1ml5IpQbAKBIA+g0ggh*qC/kilUpIkKRUKq4M6gDVDKdU0DapkL2cOXDIhxM42rus6Y0xRFM75yMhIRVoKzR0dHdm69dUnn/r9p27/1MwZM8KhkCxLlNF4YlyWlA0bNt73nz975tnnRkbGLIsxhmRFUVUVXJSRcOTmmz4UiUQfe+x3w8OnOOeIY24xZhWkhCRJAuMMJE8preD7kIlQbAKBIA+QgdAGIaQoCvRrjDFcIRBC*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*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*qKMTYMA5y3d9xxx8qVK6sn3L/yztCi4OJ2c76I9le5zq9gf5dZZ5eG+CKXYerLjPOunl1qm7WNLpcU6OospC0CJxhjWZbB1zQyMvLggw/edtttLS0thaiQQgDtJUlSJBKxPSt2uAfn7Mz+YxiSK3GEMJEoZZhgnBE14QxJBLcq5FWxY1IgMmLKlCmlE7BDsfEz/05z7NhRicjUQhgrGCmMcozR/u4jb+3Yc8P1H1q39sqmpibO+Xgi3rVo0Z/+9PTGjRvmzpvd0dEuE6wqMuYUI4Yxp8wyTb21raV1cmtDfQNCiHIrsPwVRSGEwNL43/zmN+9///svuOCCUlm0/*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*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*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**qjY1Nc2YMQO0clabMhwO2xfCfKSzzGpraRERik0gENQWjCPLQrK8/8BBgvHU6dPOmTHj5ptvfvnlV6Kx2MzOmRzhkKakUqmRkZGRkRFdNzVNgXgKO8KwejidTsWRYhjiNmGzBU3T7O1PwRsJqyBA1UFMv3OnAqCGVRpQ4+vPBQLBWQcE8nO+9dVX6+rqli5dFo3Gli5d2t3dfXJgkDKOMEYYGYYRiURidXW*oBBA4qh0rVPx9a1zg16YNNX2BQNPsNadVufQSAMpRT0n3NW8myIKK66pygQCASFYBrmkSNH/vmf/umRRx596aUtBw8e0FRl0aJFR48e/Y//+M+nn/6ToZuJRAoTzBgjGMEHj4ttyg+E8sMqbNjKHJZmA7becqpkewGAswT4k52h0s0qsdAqXQGBQCAoJpxzyzB6e3rmzJ3b3tGBMVZUdWZn56pVKxVFOTUyktJNPaVvfXXrzp07Dx85Mjo6enoBHKVV2OM7I0dcjts5tAB7Ns4mcFjyRETMsQkEgppC0dTOOXP+97/9mxqJEUw4R5xIqhr6whf+jnEUTyYpsyQZb978omGYPcd7hoaGJzU1waJv26FXPYCWApej83haPdNCnZ1RMDUfKpKJUGwCgaC2YAxZlhYOY4kgRCzTNHUjEo1RahFJ*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*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*Xnnnsuxjgej4fD4QJ1G6UURAHl2PuaVs/KuepVbFkVRkV+Rd7dXC54v8rdjea32mml+dVtTleqF7utKOf4Ot9ji4RWKwR7z2WwWizLsj+fPWnjIaGwnUQfDuq6DjaQZVmFyAEjjBEiBCOOEUIYISJhzgljFDGGMcKEKIqyqGvRvLldlBIsKZI*QYnhCOEksnkyZMnjxw5cujQoV27dh07dmx0dFTTtLVr186fP3/Z*WdnZ0NDQ32xmzgRA1cYXgB7IbbBYJyrfSDQnkUW9p2PuWkwJDxAPNqpTDCgllIWRWSS638zid5t97s03zpj1wtCqZdck0Q5vrsrHNe0Qm8A7My0BtC/w5TNWCvVLp25QCsNFDwdg9uTzrC1jDBSqaMcsxlWVFkjBmmlFFGGcMSwZxxhJimqhwpjDHGTEnSJFnhSLIoN00+Pjo0ODgA+mznzp0HDhzgnHd2dl522WWrVq1as2aNZVm2RQUuU4yxaZq2ng4mCrgcVBo4QuEI7GlX6WflqtiKO8fmawWSPUL0eEmAOTYv3rASReV5LK1wsed6gh7bnhkGkleJujsGgzXH/TXI25azyldWOqArlCRJ07RQKASeqOIG2lU/uq6rqgr+WHjbI5HI0NBQPB6PRCKTJk0K9rJZ1KKcypKCEKIM6TpllMqSJIVlSZZ1Q0+Mj3FuhSNR3TQ1FUkSNi0rmdKTifGXNr+w+cUXt27d2tvbO3ny5EsvvfTSSy8999xzp0yZomkaWFHwo6CU6roejUZtWy3wT0PTNPtzJBIBz6QkSZTSRCLR0NBQ6QflzRVZ3E7WSdbpK2fARd7zS0pWJ2QAUbhfEiBOxKM2yhqg4aXyLnEuedvixRB0P5I1rjKryswbgZnLgBP4AmOsaRpERaZSqWQyqes6fEUprXTtykc4HLatHHipLMv6/ve//6Mf/WjhwoVPP/10MBtIkWUFn7ZyOEeaJhMsI4QQR9QyNz3zzO7db8mqtGjxuevWXSpJoZ7ewR07dv/pmecefvgRPTk8e3bnxRdfvHbt2mXLljU1NYVCITAowVcMFjalFPzG8MhM04TZwWByME1TlmUoFgqByEyEUF1dXaWfEirfHJvL5L/zz4pPhHhx65UtZDRAsZmhmJnh+LlO9iIEl3gN727SYA89gNgr/jrVDCMjI9FoFNxZmqbV19fD0qhqiH8rM7quQ9shIFCSpEQi0d/f39bWFjhG1OKMccooJ0g6PQmGkJ7ST/T2HT164LlNmxChkkye/uOf9ryz99ix3u7uI70nhhQlfO21152/etG0aR3t7e1Tpkypr6+HZ2T3VIQQwzAURYFw/FgsBneE0wK7IlVVtSdZk8lkKBRSFMU0TUpplbwS5XMjBBhxB8ufVHhii7yWovdpqlKYC74UT/kD4ksXgem35ALXMAhsoNtijEGHaJrmvffe+9hjj4FZUOnalRXG2Ouvv66qKrTdNE1CiKIoJ06c+MpXvhLsx045RZgTSSZI5pQjhBDHzLIS4/Gh4b4p7S0XXrhaUaVj77675eUtp4bHm5qmrFt37qxZc5ctO3d257RoNKIoCtTHHsvaiw7Brtq0adPTTz8NWkdRFJgYK1AUMOlomubx48chUBbCMiv9iJBXxZbVwVX4C+3Fr5VZk7xnZq1tgfkvMvWTr467iD9+LzfNpdsyJRNMC3oZoJRIc5SuZIELkUgklUrBmlzOeSKRGBsbg7CRs+dZ2BvB2DYK6DmYXrIs68SJE8G6dcYZJliWZYwkPWXA9CVijJrG6Nj45PY2RYtEIqFJk9oQwkuXTF+8eNmCBYuntHeEQzJnFCzFrA8CrGpKqWEYp06dAmUWCoUsywJVVIgoAIxxIpGw42OrWrGlrckoSuRIsDkbL/jKEeUrp1RWFZ7mkyxcPn7DagIIx2M9i7WMoUQWmzM+UwQ6lhPOeSgUck6nff3rX1+6dCmsZqt07conBFiT/u///u9PP/00vH6gUSil06dPv//++wO6Is+YOwihVColyzI4DwcGBnbu3PnII4+88OKrkUjk4MGev/3bv12+fLksy4wxCVsYSeSMLkmLtgNtB9qXEHLjjTfeeOONxRIFqHPIvCzL8tKlS2GOrXrms3NmHnG5puihE+WfL/GSxjfraDRreKF7P+tLnaSFe2SdM/Mik6zqOatxVqAGyuo9zqX4A0eZppXjS1tXT/46Qc0Ar5NhGHZcRiEx7vbaL1gzAIUrijJ58mRZlsfHx3ft2mWa5kc+8pG1a9cmEglZlkOhEGNM13VN08S7nUnJ59iKpZB8zazkzT0ROO48b06sAO3K9WfhIYiZ+iCrLVW4dZXLuE/TQAGGRC4SdhZe9NGYQJAJhM4DYLJAcCBMNQUu1k5lAtlMQFlCUH5TU9MVV1yxYMGCVCo1a9YsyFxlY2tBQRolV2yBJ/k9Lk/2ddMiaqDyUKDzMJcMfcm2wDCNQkRXxJdHICgcWIZsh10oigK6DZJnFlKy7dgEjWVZFoTUq6ra2NgI82TRaDSRSMDqNF3XYdl1pUVSpQi5CAQCgVdA8cAabZjruuiiiyilra2tgcsE+yzNFLMT9kPWLlgYjjGG6TdYoFZpYVQvQrEJBAKBJ0DZQMCIaZrw5/r169evXw9J7oNhp1S2t1KDlC52PD1oO0j7Ylt1sEZNeCOzIhSbQCAQeMJO3gHuR0mSUqmUJEl2wsxgOsbOTWxncgFrDOItIbujvToNMlqBzhMu91ycLaG6AoFAUCAwpwVRHqBUNE2D9c72rp4BcEbqp+1c6lRdlNKhoSFYGwCTcJC0s9JSqUaEYhMIBIL82Bv3QHZ/QkgqlbIjJAtJJeWMinTubWbHp9jqrb6+HnIN219VWipVinBFCgSCPDjT98BaKztdU6WrlgXYRcW5sAzyS0GsfIGFE0LWrVs3a9YsZ6INZ95FmBKDXa2dInKXlXPjQ+dn52Z4zogSWBUgXJG5EIpNIBDkAXpYWLAFYQ6FTCmVGjsi397o2fbvwfFC9DHGePXq1atXr07Ljm8bT/Zd/O6nkUuYdvSjfULmEUEaQrEJBII8pGWBqfL+FFJJQTpEWZZhAgyCDA3DKGS7FncRgZTAJ2maZjgcBoUn7KryIxSbQCCoKWBPmbGxsaamJlmWe3t7u7u7o9FoQ0MD7DhTinXNsMJsfHx82rRpkUgkTbFV+VCg9hCKTSAQeKL6bTWAEBIKhWBnmWQy+cwzz3zve9+bOnUqZPQo0c6olmWNjo4ihP7hH/7hmmuugfXU8XhcURRFUapzMrKGEYpNIBDkwWlzOBNkVOdMmx3hAsYZKLMbbrihrq4OohlLcdNUKnX48OFHH300lUpBZI2iKLCeGiYmS+H/FORCKDaBQJAHF2dadfrZoEp2svxoNPrBD36wrq7O3vq56HdMpVIHDx589tln0zboIIRAhslKi+TsQig2gUDgg+p3SNo1tHMt6rre1NRka7sS3VdVVdM0YQE1hGLC/m1VLq6aRCg2gUDgFacfMthWRGUANoyGlc72IjAI/QeVU4rgEVhhBtGYyWSSEBKJRCDrv3PBtaA8VGBKs9TPuEreIS97mRalzgGu9XVJlcgzV2V8SbXoDU87x2P5pX5kZzmQLNg0TUhVzDmHAEWYYCuRJCHfVV1dXUNDQzgcBp8nbEZayFZtgmBUo8Xm8c0r21Axb33SVvl43+e6bPXP3P+zGmrlfkKZpVpOgVSD/AMD80ZODVFtDYE8I6BaoKrgkLTtKvcKB9N8GGPQpmkbykDMCMz25bw4szqOKliWhTGSJMIYSyaToZAG5TPOKKWypJom5E2WCUGWxSSJEPKeJpgmRej0VKgkEYwxpYxzJMs1G6tZjYrN108l61uYebBsW4ym9VnV0H85N852kZJLhFtx5RmghABSLZvkXaTqHjSY9XjF3xb3qjr9kC6tqHhtnUk6IC4RPpQu2gUSSFJK09KOQG6tgptz+rMsyxgjw9DPbOfNEEKcI4wRnEMItizLuSocdLkdxWpZFDYpVdVajtJ0U2xZO74A5PUIFdJJZR732KOljTeLOPx0lpBpZ3j5yr3MwPL0ohgCyzPw+aWQqh07kLXteQXlsV0e7UiXc6ph3BOAKq8z6BhwQtoHJ25mRVBslNIzZiinjCKEFKwQTChlYIQhhOCzZdlbBCCMEVhmnCPOuSQR07RM07LVfK2SU7Gl/eQKHOO4uJUqNeJLMwKK4h3KNXj3YnD4tWC8yNP+Ktf5E6JjDSbVTJkU8uIVRVC5CpkQTwHg76UKzTX70UOECITaw9Jsy7JgE7VKVzBIcyCdCqVU0xTI1WkYRjweHx83JOm0VkMINzU1hkKaLCvgzcQY2WkzKaUYK4oiwwZvebyjE5wqdUX6onCLsFjY5oLT+1dBp1lmBTJ7/6xmR4HyLG6Lgkm1iGS9XS53XC7T391KznWLia4IKwLsOq1pGmTZB1sNlEF1amJ3CCEIcVmWNU07ePDgjBnnKKpsWVZ/f/8Lz79w4MDRVEpPJpOc8/b29osuumju3LmxWAwmFyHLVzQaUVUFY5RIpGKxiKrKum4YBg2FtEo3rlRkV2xZww0qXdWcFCWsIG/n5bEaXjRHpch00GVteyHyzDqZl7UaHimWVD2OMDKF4PFG7oODvIX4alFlX6q0nTCrEEIIaDVYVcY5D4VCoOrspCSVrqMPMMapVIpSKxwOd3Z2Dg6efPrpp5959pm+vr45c+ZOamprbm5WVTWRSPT39//whz+Mx+Nz58695pprrrjickki9fUxhAjnSJblcBinUr*qhNLAgEok8UWICraS6RDgeTtIPyOl3P5GPPaGd4n2PzK06kYgt296JRNqrnk4L1i7jaT9xiKXOMGl/FE3uaUU7dl7u/sRZ4VhFI6Njb20ksvHTlyZMuWLUePHr333nsbGxsvvvji2bNna9oEs1QkSWKMDg4O7t2799FHH6aMLl26dPr06e3t7XWxJlXVEMKWZel6anh4+OTJgSNHjjzxxBMvvvjCDTfcsHjxYk3TzmT5kuFx2dNytUqZFFuAOTb3aG/3aysVb+ZxvseXNZy3LYXPWWYNrChEnsXtdoNJNVedfVXMuw72687Ne6Oq1RlVbq7ZSJLU3d399NNP79mzZ3R09Je//OXSpUsXL1484YwVzrksS4ODo6+88soLL7xgUWvZ*UXXnjhrFmzZElGSEYIM8YoZZwzSHeyb9++V1559Z133nnwwYeGh4dXrlzR0NDIGLMsKsuSYViSRCRpgsnBFxN7ji2r0yxAj+BlaYuXPs7LXEv5yRphkfmhWPL0rllLKtXSBSj5GmOlXVXEBXmVckhOCMVGCKmvr58+fXoqlerr65Mkae/evVdddVVDQ8NEVGxjY2O7du3auHGjJEkf+9htc+bMjkQj*JSSk+dOsU5V1VFUVRKKaUsHA4tX758wYIFu3bt+vGPf/K73/1eVdVVq1aGQmHTNGVZopTCkrZKt6yETLBn7J5mwo4ALNs6m7R72b/5rPMQFYl6CNz8APK0HZ4FtrGkUi1dnE6am85L0yZKeEhau5yPo+K1yjzCGNN1nTF22WWXLVu2TNO0ZDIZjUY/+tGPTp8+HfYa9d5kyM3v98XOfBm4C+89nSPkPMQY271798aNGwcGBr773e+uWrWyrq6OEEIpTaaS27Zte+GFF/fs2ZtMJiORcENDHWPcNK1QKLR8+fJ//ud/HhoaeuGFF7u79ztWthHnTzUwaY+g4u+Dk+yKLe9iXr+kpZhL+9M7uQITMmfgskZ4ey8wrfDCu6q8Y*kcHkGftUCyzOLWPbfswZjjPEdG8ok1dLhrtQ9Pru8wqySxjoxDAMmaaD+pmlCqGHpEgp7r1XaEcuyIKVWPB6vr69f*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*6nIVYwy0vr2zKNwLdrFxT6yFMbY*krp4XBYkjBB5MyeBGhkZOSNN95oa2tdt24d2JoYI8YZwURP6du2bVu2fPnJkwPvvvvuli1bbr75JjhBliXOCULI*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*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*Ll++fNOmTa*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*rDqvEpMqxJRy20TCAQ1yZQpUx577DFI4MQ5j0ajYF2djuanJjdSRNMwxhgTjjBHiHPCOIKlAIhgUGyZFpsT2OFz7ty5EFQJfrYSTSiCDUopheQd4PyUZXnu3Lm*h44cGDPnj3z5s1rbGw843jEhBBYqweTi5qmgRxCoVBXV9ftt99+2223UUoTiQSs9ps1a5amabC22mWleW0gFJtAIJhghMPhiy++GOJEQBNAGOHpmS3LIMwgmkZNyigjkixrGufYtCgmhGPyXlckd1psEPwJqVUg/hP8daZplk6rOSNW7CWDEA4Ti8UuueSS11577cUXX5w/fz7YbaDVYB1CKpVSVdiwh*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*uuWrp0KcwRQosqu5FeGRBzbAKBYILBGIvH43YCJ8g7DMoAIWRRKmE+PjLymc98VlbUY8eOX3HllYzjBx96ePqMmdPPmS6dGc9jWNeG/jx1Fo1GLcsCKy2RSPjamDQwTicntMg5mQcad8GCBV/+8pcffvjhr3zlK+vXr3//+98fi8UIIclkEtLBwCaroVCIELJnz57f//73L774Ymdn51//9V/PmzfP3kkHHJgeN6+YuAjFJhAIJhi2K9JOCwKetzMJNSjGOBQOmxad1NQUq6u/7PLL+/sHnnhyg2mapmVK*NrFY6RY4G2vRsL2H/2tnOWZbmn1CqwOXbyfjsHmL3fDVSmqalpxYoViqK8+eab+/bte/vttzs6Orq6ulpbWydNmiRJkq7ryWTyyJEje/fu7e3tDYfD119//bJly2bPnh0KhWwT7fQWAUKxCQQCQbUBhpSdrNKOX7ez+6uh0MEdO6PR6Kz2DlVV9+7dO336tKamBkIwY4xSpsgSwtg0LYy4LJEzu52d1pGgyWBGCkI27M0NnPsDZNUNaVsR2REf7i1K2zXQuawNiMViK1eunDFjxquvvrpr167R0dGdO3fC/B/Mt8EudPF4fMqUKUuXLl2zZk1LS4tty9rL4yr96MpBBRRbgM2lfF1S8c2r3CvjUr1Cai6k6l2qRW942jkeyy/1I6t5nLuQg612eoKKI84YpfTtnTsHTg4gLD3zp2e2v7lj0aJFrS0thw8dPt7TW1fXcO6iBbBOgCAkEQWWPNslw5+wtswOH*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*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*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*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*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" alt="" title=""></p>

<p style="text-align:start"><span style="font-size:15px">參考答案:1、不變;變大 ??2、D</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start"><span style="font-size:15px">動態(tài)電路分析,萬變不離其中,看似比較難的比值或者乘積都能通過最基本的物理量得到,因此學生能夠掌握分析出最基本的電阻、電壓、電流的變化情況是解動態(tài)電路分析題的關鍵,希望上述的一些解題技巧能夠?qū)Υ蠹矣兴鶐椭?/span></p>

<p style="text-align:start">?</p>

<p style="text-align:center"><strong><span style="color:rgb(63, 63, 63); font-size:12px">▼▼▼</span></strong></p>

<p style="text-align:center"><span style="background-color:rgb(0, 0, 0); color:rgb(255, 255, 255)"><strong>?該如何備考化學學科?</strong></span></p>

<p><span style="font-size:15px">做自己所在區(qū)的近五年一模試題&各區(qū)模擬壓軸題,嚴格按照自己所在區(qū)的考試時間來答題(40分鐘的最好35分鐘完成,90分鐘的最好80分鐘完成)。按照各區(qū)考試特點,極有可能出現(xiàn)幾年前的高仿類似壓軸題。做完自己對著標答找出不足之處。</span></p>

<p>?</p>

<p style="text-align:start"><strong><span style="font-size:15px">建議:</span></strong><span style="font-size:15px">按照每年出題的趨勢,建議壓軸選擇重點放在計算、圖形與溶液析出晶體這三類型的題上,壓軸簡答題重點放在氣體檢驗題型上,在這里我們來舉個例子。</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start"><strong><span style="font-size:15px">【計算壓軸例題】</span></strong></p>

<p style="text-align:start"><span style="font-size:15px">一定量的木炭在盛有氧氣和氮氣混氣體的密閉容器中燃燒,有關分析正確的是( ???)</span></p>

<p>?</p>

<p style="text-align:start"><span style="font-size:15px">A.反應前后混合氣體中氮氣的質(zhì)量分數(shù)不變<br />
B.反應后氣體混合物的組成有3種情況<br />
C.若反應后氣體是3種氣體的混合物,則其中C、O元素的質(zhì)量比一定小于12:16<br />
D.若反應后氣體中有氧氣,則容器中C、O元素的質(zhì)量比大于12:32</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start"><strong><span style="font-size:15px">點撥:</span></strong></p>

<p style="text-align:start"><span style="font-size:15px">此題考查的是化學計算中的極值思想,此題只要找準極點題目就不攻自破。</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start"><strong><span style="font-size:15px">解析:</span></strong></p>

<p style="text-align:start"><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAX4AAABfCAIAAABgPzuMAAAhlklEQVR42u2deXxVxd3/32e5axJCQoJEWRRZBFQ*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*n04SXvSB6Djej1fL9KdtEq3Utki9OJQDivZWVhhCi7h1aLSLPvhQUQTHjyVIQ8MWWuFfzxtkGCFLyN7Yu9jG9akEMuljEZ9P46yJQ0XWIqBFCCFOIoBC+NjBiQiTeZnUHoaf5j8UXntYpH065+Srml+CpQlNF/VKTgwa1jmiUa9+3fLwEyDp1hOOATshDz190etYpC6cDqcDZXRv8s0+kDwXA21Nq6hLg7bC5GA1Ed9/0z4aN6lUMqeOuUP6VD35SbG/LU9DojkkPxRrwgxt300ec5736aoL7WLcDIPukLp3jfAecpgN7lmvLN7Ys7j+OJYgfuGxQVrx7WifuuQnCfPzBPsDdLz3+kJdzzwYg2HneJ21qVa0cF6azUf+jvsNltsUkqls97fJrmfFaNoQKlu//1Y0EIKy6Wj8g+8Ij7MAH/PiczjoNyyDScNx3jxuNd18VAKdlZsYNUQ48TweoVd+afUB4JogjnHaoKeGrPS4I5vQhvtQMODkM3pK1LM6Pllk3pHbAJ7eaJHHpUQyCSrBbBrPe7w9Q7b9+tLVvH0JzRscBd+5m1Tb2NbrpiNZKFO0NVFIG7m4nHXR0WmcU+G5lbNq4e11tMwGFThiA3+ft+MMXTFME7Ui2h3fez1FxEAncc11FTSUhM1ZDdxexIj+RbvaSQsDg9CaGghQP1dWUUgL06NYt3svtjP7v8bdwWdHMZQZkc1IT38D1eEFjQ3UR0POU7o0WFMXKkac2eka3j283s7sqoSmVuDs0y0BgimB8KHadMou2eK1UlNUoOqPvcTw11g2pa2YF7puwtsZMr9f/vDzyEhq6/GwB4CSN7MbuCngcYLKi+HtA7ZURn7NCjz5r57JSgNx8NhXWe4aOsML6q9mLCkrXnEbuGV4zqoD7awHClXyzmX1JWmaUuPRojrDDrRsw6EqWT7dAM5ZrP7rBv7nM9MDOz6xTT7GG9WP8n424cnNEM1ApTi94wReubfoDk6fEFClkVkd/BHTAJHrOd2pKMua5VEVTT1Ch+zDy5gAmWzL7jvSvKvUAJSsYcFLN8NMYO7aypefn94rarbZpX1darJUUKmtsq2jGOsr1Ti2Lrg8OcBzyy54mPegHlFbujXfWvdF1ACIlDQj8fGhoyEDfqV1EXokCYRL9aEBGMAPdUhp/56/+jzbJ5swsNy5AjP8Ht13kBe+0R4f86e9WlQewHr1+3+DBJYNPYFX+rpaGfEJOzGJNI+hOL8AONTqmSNEVBcDMSWHRI/kXnMagnqGn50Uf13OEq42cDjqhgNvX+F3n8cVud2ZVUcYlfQpHDOSykWVFiS57bQ2JS4/H53KZnuj9w36pvfLHKijev8u9d18W8Fn+uuqd2v03zP8yt6qlL6e0wXTFAWkFm5teqvuLW6PfQ3Vv8uIn2rEiEORzegDDz/GlHTaOh56xlP47R3d7+xc/Gb7w321gSAdQGp0VHXQd8961dapKClO37nUF4YPVW3du6DT+xpWLV/lDLWzg9r4UcLOL/KZ8M7IY1ikb0GtS4wt54Q4AOq0YePIRxmNE92RccwNQQYDCJq9yc94NNhCq0uOj8+dHTfDtwMEseeOrP0yvmD09zbbnVG+JdjQS+sJijW/0H8blXXfS7qt6pZ4zhm9iXcf6Iqu0xYJ5IYQIx+T77Y/1QfwLKF8fLIBd87b0eah4xYaup7Fm5faKljYORv0cgCAFTXaTvFx/RxrAzux4Yfavjzb7vs7phf/kPqKEoQP/89VKWiTfWV3ok70LwpQ3eonk+jxQiTs45CT3M39dP2t2j9mPfrpj2d4937eBJRMyfUKULjDW7Ig0DFJFxG/OL4aSR99ouObrmfaNT+5PIPCHbxRQQF/jgFHS5V/bQgjhE329e8Ee86xRP9Q4b7oAH5TkNj/UuTDX4KQQxP8Tl44VodhYX2LDzLUbRe5yX/z48JOjTQiMGScidS4b5oqL79zW0lHn/KWxKZhJC4vi07S3MhI1ztNjBex05hTvrR+tNMS56UVg3vJq0DzSeGwhgkIIUSROJATi4Rca2d6oEeWlQggxb4aAcli7dFednynuGbIezB/dL8rr3PbsENnuJZUtGQmOmt27NCKEEP+YGSGzcTbp4lePCyHu2W1Hh5nfrWqhKZti4pNb7bgR5ci26HjK6i11RikPiRsH568padEsrRBCiErRiwgYt48vajRmbYv84kohxKZPBZTA+hkbGjzHjayA8iE3+irrsvLh/ymYMK/FkT/221IIpp0U2hLnODhNwM47nhD1pcK3PJI5dHlxpMXht57EpSf/0/IZi/Ma2TQi+l8gHnu9weGpP+QuTyz0oL*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*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" 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<p style="text-align:start"><span style="font-size:15px">碳在氧氣中燃燒生成一氧化碳或二氧化碳,或一氧化碳和二氧化碳的混合物,氮氣不參加反應,氧氣很少,生成CO,則剩余氣體是紅點1左邊部分;氧氣多一點則剩余氣體為兩個紅點之間的部分;氧氣恰好充足,則剩余氣體為紅點2代表部分;氧氣過量則是紅點2右邊部分??赏瞥鍪S嗷旌蠚怏w有4種可能,題目接下來就迎刃而解了;答案選C。</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start"><span style="font-size:15px">初三是個轉(zhuǎn)折期,這是一段為夢想奮斗的時光,痛苦卻又快樂著!各位同學,加油啦!祝福你們一模取得好成績!</span></p>

<p style="text-align:start">?</p>

<p style="text-align:start">?</p>

<p style="text-align:start">?</p>

<p style="text-align:start">?</p><div style="margin-top: 120px; margin-left: 500px;text-align: right;">資料來源:<a data-mid="4" href="/">課外輔導</a>以上就是大學路為大家?guī)淼某跞龜?shù)理化,一??记霸撊绾翁岱??(附普陀區(qū)一??荚嚲恚?,希望能幫助到廣大考生!</div>
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