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1c:Tc15,まずはどの科目にも言えることですが、基礎をしっかり理解し、解けるようにしてください。

数学はとにかく問題を解けばいい、と思っていませんか？

実はわたしもそう思っていました。
なので理論もわからず、とにかく問題集（私は青チャートを使っていました）を解き、間違える日々。
しかしこの勉強法は間違っている、と浪人してからやっと気付きました。
 
数学には定型パターンがあります。
高校数学を難しく感じるのは、そのパターンが非常に多いためです。
なので、まずはお決まりのパターンをしっかり覚えるようにしてください。

こういう問題がきたら、この公式だな、ってすぐに思いつくレベルまでもっていくのです。
そのためには教科書や授業ノートを使って、習ったことを完璧にしてください。
そして覚えたことは基礎問題でアウトプットします。
これを繰り返し、解法がわかった段階で応用問題に挑戦します。

以下、具体的な方法です。

私は青チャートを使っていたので、青チャートをイメージしてお答えしますが、ご自身の使っている問題集に置き換えて参考にしてみてください。

1.まずは一通り例題を解き、公式の使いどころを覚える。（基本問題）
→数学には解法パターンがあります。こういう問題が来たら、こういう方法で解く、というのが反射的にわかる、身につく、というところまでもっていきます。
この時、公式がわからない、理解できないときは教科書を開いて理解するようにしましょう。

2.例題の下にある問題を解く（標準問題）
→わからなくてもすぐに答えなどみずに、10分は考えるようにしましょう。この時色々な公式や解法が頭に浮かべば、知識は身についている証拠です。
逆に標準問題で手も足も出ないなら、教科書に立ち返りましょう。
ここまでできれば、定期テストや模試である程度の得点は見込めます。（青チャートなら国立大やマーチレベル）

3.章末問題を解く（応用、発展問題）
→数学を得点源にしたい人、難関国立大や早慶を狙う人は最終的に解けるようにしましょう。
このレベルだとさまざまな公式を合わせて使う、複合タイプの問題になります。
この問題をやるときは、「自分がどこまでわかっていて、どこからがわからないのか」をしっかり把握するようにしてください。復習するときはできないところの例題などを見返し、できるようにしましょう。

このように、大事なことはとにかく、
理論を理解する
ことです。
闇雲にやって量をこなすのではなく、丁寧に時間をかけて勉強してください。
2:["$","main",null,{"className":"px-4 pt-4 pb-4","children":["$","div",null,{"className":"max-w-3xl mx-auto w-full","children":[["$","div",null,{"className":"mb-8","children":["$","$L7",null,{"href":"https://unilink-app.onelink.me/isbO/h6xeh63x?advice=tcAWxGUBTqPwDZPuG1Pz","target":"_blank","children":["$","$L8",null,{"src":"/images/web_to_app_banner.jpg","width":3660,"height":1500,"sizes":"100vw","style":{"width":"100%","height":"auto"},"alt":"UniLink WebToAppバナー画像","className":"mb-4 rounded"}]}]}],["$","h1",null,{"className":"text-xl font-semibold mb-2","children":"自分に合う勉強法をみつけたい!!"}],["$","div",null,{"className":"flex justify-between mb-4","children":[["$","div",null,{"className":"text-left text-xs text-caption","children":["クリップ(",1,") コメント(",1,")"]}],["$","div",null,{"className":"text-right text-xs text-caption","children":"9/11 0:25"}]]}],["$","div",null,{"className":"coach-mark mb-4","children":"UniLink利用者の80%以上は、難関大学を志望する受験生です。これまでのデータから、偏差値の高いユーザーほど毎日UniLinkアプリを起動することが分かっています。"}],["$","div",null,{"className":"mb-4","children":["$","$L13",null,{"clientImageUrl":null,"clientUserName":"とまとぷりん","infoString":"高2 栃木県","adviceId":"tcAWxGUBTqPwDZPuG1Pz"}]}],["$","div",null,{"className":"mb-8","children":[["$","div",null,{"className":"leading-loose whitespace-pre-wrap","children":[["$","div","consultation-part-0",{"children":[null,"高校2年生です。\n\nいまの偏差値が55ほどで、目標としているのが60↑なのですが、自学で青チャートとサクシード、たまにニューアクションを使っています。\n\nこれらの問題集で解けた問題と、似たようなものが模試や定期テストで出てくるのですが、解けずに終わってしまいます。\n\n頭の引き出しが開かないというか、パターン化出来ていないというか、なにかおすすめの勉強法があったらお願いします"]}]]}],["$","div",null,{"className":"pt-4","children":["$","$L14",null,{}]}],null]}],["$","h1",null,{"className":"text-xl font-semibold mb-2","children":"回答"}],["$","div",null,{"className":"mb-4","children":["$","$L15",null,{"adviserImageUrl":null,"adviserName":"なつみかん","adviserDepartment":"九州大学工学部","adviceId":"tcAWxGUBTqPwDZPuG1Pz"}]}],["$","div",null,{"className":"coach-mark mb-4","children":"すべての回答者は、学生証などを使用してUniLinkによって審査された東大・京大・慶應・早稲田・一橋・東工大・旧帝大のいずれかに所属する現役難関大生です。加えて、実際の回答をUniLinkが確認して一定の水準をクリアした合格者だけが登録できる仕組みとなっています。"}],["$","div",null,{"className":"mb-8","children":[["$","div",null,{"className":"leading-loose whitespace-pre-wrap mb-4","children":[["$","div","advice-part-0",{"children":[null,"こんにちは！九州大学四年のなつみかんです！\n\n数学の問題が解けるようになるためには基本的な問題をしっかりと理解する基礎固めがとても重要になります！ \n基本的な問題をじっくり解いて人に説明できるくらいまで理解するとテストなどに出てくる初見の問題にも柔軟に対応できるようになるはずです。\nさて、基本的な問題を解いてもいまいちパターン化できないということですが。私も覚えるのは苦手な方なので、できるようになるまでひたすら解き直すというやり方で覚えていました笑 人に説明できるようになるくらいまでなってこそちゃんと理解したことになります！\n勉強はできるまで何度も復習することが重要です！\nそれでは頑張って下さい！！"]}]]}],["$","div",null,{"className":"mb-4","children":["$","$L16",null,{"adviserImageUrl":null,"adviserName":"なつみかん","adviserDepartment":"九州大学工学部","adviceId":"tcAWxGUBTqPwDZPuG1Pz","numberOfFan":0,"clipsAvg":1.3333333333333333,"adviceRateAvg":0,"profile":""}]}],["$","div",null,{"children":["$","$L7",null,{"href":"https://ck.jp.ap.valuecommerce.com/servlet/referral?sid=3364577&pid=884970531&vc_url=http%3A%2F%2Fshingakunet.com%2F%3Fvos%3Dnrmnvccp0000100","rel":"nofollow","target":"_blank","children":["$","$L8",null,{"src":"/images/document_request_banner.jpg","width":3660,"height":1500,"sizes":"100vw","style":{"width":"100%","height":"auto"},"alt":"UniLink パンフレットバナー画像","className":"mt-4 rounded"}]}]}],["$","div",null,{"className":"pt-4","children":["$","$L17",null,{"id":"adsbygoogle-init-under-advice"}]}]]}],["$","div",null,{"className":"flex justify-between","children":[["$","h1",null,{"className":"text-xl font-semibold","children":["コメント(",1,")"]}],["$","$L18",null,{"adviceId":"tcAWxGUBTqPwDZPuG1Pz"}]]}],["$","div",null,{"className":"mb-8","children":["$","div",null,{"className":"divide-y","children":[["$","div",null,{"className":"flex py-4","children":[["$","div",null,{"className":"mr-2","children":["$","$L19",null,{"avatarUrl":null,"contributorName":"とまとぷりん","adviceId":"tcAWxGUBTqPwDZPuG1Pz"}]}],["$","div",null,{"className":"flex-1","children":[["$","div",null,{"className":"flex justify-between","children":[["$","div",null,{"className":"mb-2","children":["$","$L1a",null,{"contributorName":"とまとぷりん","adviceId":"tcAWxGUBTqPwDZPuG1Pz"}]}],["$","div",null,{"className":"text-xs text-caption","children":"9/11 0:31"}]]}],["$","div",null,{"className":"text-xs whitespace-pre-wrap","children":"ありがとうございます！頑張ってみます！"}]]}]]}]]}]}],["$","h1",null,{"className":"text-xl font-semibold","children":"よく一緒に読まれている人気の回答"}],["$","div",null,{"className":"mb-8","children":["$","div",null,{"className":"divide-y","children":[["$","div",null,{"children":["$","$L7",null,{"href":"/advice/K821tWYBTqPwDZPuHbGt","children":["$","div",null,{"className":"flex items-center py-4","children":[["$","div",null,{"className":"flex-1","children":[["$","div",null,{"className":"mb-1","children":"成績が上がらない"}],["$","div",null,{"className":"text-xs text-caption line-clamp-2 mb-1","children":"\n数学はとにかく問題を解けばいい、と思っていませんか？\n\n\n実はわたしもそう思っていました。\nなので理論もわからず、とにかく問題集（私は青チャートを使っていました）を解き、間違える日々。\n\nしかしこの勉強法は間違っている、と浪人してからやっと気付きました。\n\n\n数学には定型パターンがあります。\n高校数学を難しく感じるのは、そのパターンが非常に多いためです。\nなので、まずはお決まりのパターンをしっかり覚えるようにしてください。\n\nこういう問題がきたら、この公式だな、ってすぐに思いつくレベルまでもっていくのです。\nそのためには教科書や授業ノートを使って、習ったことを完璧にしてください。\nそして覚えたことは基礎問題でアウトプットします。\nこれを繰り返し、解法がわかった段階で応用問題に挑戦します。\n\n\nまだ高校二年生なので、時間はたっぷりあります。\n焦って適当に勉強するのではなく、しっかり地固めをしてとりくんでくだ。"}],["$","div",null,{"className":"flex mb-1","children":[["$","svg",null,{"stroke":"currentColor","fill":"currentColor","strokeWidth":"0","viewBox":"0 0 24 24","className":"text-subPrimary mr-1","children":["$undefined",[["$","path","0",{"fill":"none","d":"M0 0h24v24H0V0z","children":[]}],["$","path","1",{"d":"M12 6c1.1 0 2 .9 2 2s-.9 2-2 2-2-.9-2-2 .9-2 2-2m0 10c2.7 0 5.8 1.29 6 2H6c.23-.72 3.31-2 6-2m0-12C9.79 4 8 5.79 8 8s1.79 4 4 4 4-1.79 4-4-1.79-4-4-4zm0 10c-2.67 0-8 1.34-8 4v2h16v-2c0-2.66-5.33-4-8-4z","children":[]}]]],"style":{"color":"$undefined"},"height":16,"width":16,"xmlns":"http://www.w3.org/2000/svg"}],["$","div",null,{"className":"text-xs","children":["名古屋大学工学部"," ","けろちゃん"]}]]}],["$","div",null,{"className":"flex justify-between","children":[["$","div",null,{"className":"flex","children":[["$","svg",null,{"stroke":"currentColor","fill":"currentColor","strokeWidth":"0","viewBox":"0 0 24 24","className":"text-subPrimary mr-1","children":["$undefined",[["$","path","0",{"fill":"none","d":"M0 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items-center py-4","children":[["$","div",null,{"className":"flex-1","children":[["$","div",null,{"className":"mb-1","children":"初見の問題が解けない"}],["$","div",null,{"className":"text-xs text-caption line-clamp-2 mb-1","children":"初見の問題が解けるようになるための\n数学の参考書と勉強法について紹介します！\n\nまず、初見の問題について\nこれを2つに分類します。\n\n① 基本問題だが自分にとっては初見の問題\n② 応用問題で多くの人にとって初見の問題\n\nまず、①について\n基本問題の演習を繰り返し、\n基礎固めをしてください。\n具体的な方法は下に書いておきます！\n\n次に、②について\n応用問題は基本問題の組み合わせです！\nなので、身についた基礎をどの場面でどう使うか考える練習をしましょう！\nこれも具体的な方法を下に書きますね。\n\n上の①②に対応する\n数学の『オススメ教材』と『オススメ勉強法』について紹介します。\n\nまず、①の基本問題に関する『オススメ教材』ですが\n全範囲を満遍なくカバーし、\n数学の基礎力向上に最適な教材として\n・青チャート1A2B\nをオススメします！\n\n解答解説がしっかりしていて、\n問題を解くときの考え方まで紹介しているので、\n基礎固めはこの教材を何周もすれば十分です！\n\n基礎問題がしっかりできていれば、\n全国の受験生が受ける模試であれば\n偏差値60〜65程度は到達可能です。\n\n加えて、青チャートを完璧にすると\n模試の時にどれが基本問題でどれが応用問題かわかるようになりますよ！\n\n次に、青チャートが終わったならば\n今度は身についた基礎を使う練習\nつまり、応用問題を解くために基礎をどの場面でどう使うかを練習しましょう！\n\n次に②の応用問題を解く力を身につける\n演習用のオススメ教材としては以下の教材がオススメです！\n・1対1対応の数学\n・プラチカ\n・やさしい理系数学\n\n最後にに『オススメ勉強法』ですが\n青チャートを使うかどうかに関わらず、\n問題の考え方や解答を理解した後に解答を見ずに\n最初から最後まで自力で再現してみることが大切です。\n\nここで、再現できないようであれば、\nまだまだ理解が足りてないということです。\n\nつまり、\n問題を解く\n↓\n考え方と解説を理解する\n↓\n解答を見ずに、自力で再度解く\n\nこの3つのことを繰り返すことで飛躍的に数学力が上がります！\n\nぜひ、実践してみてください！\nやり方を忘れた時に見返してくれたら幸いです。"}],["$","div",null,{"className":"flex 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items-center py-4","children":[["$","div",null,{"className":"flex-1","children":[["$","div",null,{"className":"mb-1","children":"高二　数学を武器にしたい"}],["$","div",null,{"className":"text-xs text-caption line-clamp-2 mb-1","children":"こんにちは！\n私が紹介する勉強法はあくまで一例ですので、分厚い参考書は苦手、などあったら自分で変えたり試行錯誤して決めていってください。\n数学は初めから難しい問題に手をつけても結局力はつかないのでちゃんと自分に実力にあったものを順に進めていきましょう。\n\n①教科書、教科書傍用問題集\nまずは超基本のこの２つが解けるようになりましょう。公式の証明などもざっと知っておくと良いと思います。\n②青チャート\n①が終わったら、ある程度は青チャートが自分で解き進めていけると思うので、受験数学の解法をインプットしましょう。これは遅くても夏休み前までには終わらせたいです。全部は解かなくても大丈夫です。\n③過去問を用いた演習（1対1対応、プラチカなど…）\n②が終わると簡単な入試問題なら解けるようになります。青チャートで身につけた解法を使って応用問題を解くために色々な大学の過去問を集めたような問題集を使って演習しましょう。いろんな参考書があるので評判とか聞いて自分の好きなやつを選べばいいと思います。\nはじめは解けない問題も多いと思いますが、どうすれば（どんな方法を使えば）この問題が解けたのか、どうして自分は解けなかったのかっていうことを考えながらすすめてください。また記述練習、計算練習も怠らないようにしましょう。\n④過去問\n名大でしたら名大の理系数学などで演習するのが良いと思います。\n\n参考になったら嬉しいです。頑張ってください！"}],["$","div",null,{"className":"flex 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items-center py-4","children":[["$","div",null,{"className":"flex-1","children":[["$","div",null,{"className":"mb-1","children":"文系数学で高2のうちにやっておくべきこと"}],["$","div",null,{"className":"text-xs text-caption line-clamp-2 mb-1","children":"私も青チャートを使っていました！\n基本的に、高2だろうと高3だろうと勉強法は変わりません。\n青チャートが解ければ、他の問題は怖くありません。\n\n以下、勉強の極意です。\n\n1.まずは一通り例題を解き、公式の使いどころを覚える。（基本問題）\n→数学には解法パターンがあります。こういう問題が来たら、こういう方法で解く、というのが反射的にわかる、身につく、というところまでもっていきます。\nこの時、公式がわからない、理解できないときは教科書を開いて理解するようにしましょう。\n\n2.例題の下にある問題を解く（標準問題）\n→わからなくてもすぐに答えなどみずに、10分は考えるようにしましょう。この時色々な公式や解法が頭に浮かべば、知識は身についている証拠です。\n逆に標準問題で手も足も出ないなら、教科書に立ち返りましょう。\nここまでできれば、定期テストや模試である程度の得点は見込めます。（青チャートなら国立大やマーチレベル）\n\n3.章末問題を解く（応用、発展問題）\n→数学を得点源にしたい人、難関国立大や早慶を狙う人は最終的に解けるようにしましょう。\nこのレベルだとさまざまな公式を合わせて使う、複合タイプの問題になります。\nこの問題をやるときは、「自分がどこまでわかっていて、どこからがわからないのか」をしっかり把握するようにしてください。復習するときはできないところの例題などを見返し、できるようにしましょう。\nこれが解ければ模試の大問もほぼ完投できます。\n\n\nこのように、大事なことはとにかく、\n理論を理解する\nことです。\n闇雲にやって量をこなすのではなく、丁寧に時間をかけて勉強してください。\n"}],["$","div",null,{"className":"flex 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items-center py-4","children":[["$","div",null,{"className":"flex-1","children":[["$","div",null,{"className":"mb-1","children":"数学の勉強法"}],["$","div",null,{"className":"text-xs text-caption line-clamp-2 mb-1","children":"はじめまして！東京大学理科一類の者です。\n\n数学に悩んでいると言うことなので、数学の勉強方法をご紹介させてください！\n\nまず基礎的な話として、各項目の公式、定理を洗い出してみてください。次には、その公式や定理の証明や導出が行えるのかと言うことを考えてみてください。証明や導出は教科書やネットにのっていますので、確認したい場合は使用してください。公式や定理の証明や導出を行えるようにすることで、どの定理と定理が密接に関係しているのかやその式の本質的な意味が理解できるようになるはずです。\n\n例えばですが、余弦定理の証明をしようとしたときに、三平方の定理を使用することになると思います。ではその三平方の定理を証明できるか？と言った具合に、どの定理にどの定理が絡んでいるかを確認することができます。また定義と定理の違いを再認識できるはずです。（結構重要）\n\n次に問題集の使用方法ですが初見の問題を解いた後、自力で解くことのできた問題も含めて、解答で使用している計算操作に対して、「なぜその操作を選択したのか（どんな結果をみたい・得たいからその操作をしたのか）」という根拠を持っておくことが大切です。\nこの訓練を常時意識して取り組むことで、難問にぶつかったとしても闇雲に手を動かすのではなく、最速で私的にその問題を切り崩していくことが可能になるはずです。\nどのような難問でも基本的には、基本問題の絡み合いなので、「どの基本問題が組み合わさってこの問題は構成されているのだろう？」ということを意識するのがいいかと思われます！\n\n参考書の復習の際は、すべての問題を再度手を動かして解く必要はありません。再度手を動かして解く必要があるのは、その問題を読んである程度の時間が経っても解法が浮かばない場合です。この場合の解法とは、計算のことではなく先ほど述べた基本問題への分解ができるかという意味です。\n解法が浮かんだ場合は、実際に解答と照らし合わせてみる程度で大丈夫だと思います。\n\n\n以上が私のおすすめの数学の勉強法になります。\n\n以前解けるようになったはずの問題が時間が経てば解けなくなっているとのことだったので、本質的な理解につながるような勉強方法をご紹介しました。\n\n是非参考にしてください！\n"}],["$","div",null,{"className":"flex 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items-center py-4","children":[["$","div",null,{"className":"flex-1","children":[["$","div",null,{"className":"mb-1","children":"数学 問題演習方法について"}],["$","div",null,{"className":"text-xs text-caption line-clamp-2 mb-1","children":"まず僕が思う数学の話をさせてもらいます。\n\n数学はそういうものだと暗記しなくてはいけないところと理解しなければならないところがあります。それを覚えたり理解できたら次は簡単な問題で使いこなす練習をします。入試の問題は覚えたものを組み合わせて解かないといけないのでそれを組み合わせて解く練習をします。そして入試問題に慣れたら志望大学のレベルに高めて行きます。\n入試の数学はどの分野のどの事項を使って解けばいいのか考えながら解かないといけません。\n\nさて問題の青チャートですが、僕が思うに青チャートは簡単な問題です。一つの道具を使いこなす練習をします。これは考えるとかいうよりも使う事項を確認して使う練習をしています。なので使う事項を思い出して解いていって慣れていってください。しかしもし解けなかったら？その問題のキーとなることを覚えていたり理解できているでしょうか？出来ていなかったら解けるはずもないのでその事項を確認しましょう。んでそれを使って解いてみましょう。使うものを覚えていたり理解できていても解き方がわからなかったら？それは経験値不足です。答えを見てこうとくのか！と理解して自分でその解き方ができるようになりましょう。数学は答えだけあっていてもダメです。解き方があっているのか、他の解き方はないのか、一問一問大切にして行きましょう！\n\n数学は解答を覚えても意味は少ないです。東工大の場合は覚える勉強をしてもいい点を取れないと思います。基本を理解、使えるようになって答えを導くため基本事項の組み合わせ方を試す経験をこれから積んでいってください。\n\n上手く伝えれませんが、とにかく基本を大切に！頑張ってください！！"}],["$","div",null,{"className":"flex 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items-center py-4","children":[["$","div",null,{"className":"flex-1","children":[["$","div",null,{"className":"mb-1","children":"数学のできる人"}],["$","div",null,{"className":"text-xs text-caption line-clamp-2 mb-1","children":"初見の問題が解けるようになる数学の勉強法について話しますね。\n\nまず、初見の問題は大きく分けて2つあります。\n\n① 基本問題だが自分にとっては初見\n② 応用問題で多くの人にとって初見\n\nまず、①について\n基本問題の演習を繰り返し、基礎固めをしてください。\n具体的な方法は下に書いておきますね。\n\n次に、②について\n応用問題は基本問題の組み合わせです！\nなので、身についた基礎をどの場面でどう使うか考える練習をしましょう！\nこれも具体的な方法を下に書きますね。\n\n\n上の①②に対応する\n数学の『オススメ教材』と『オススメ勉強法』について紹介します。\n\nまず、『オススメ教材』ですが\n全範囲を満遍なくカバーし、数学の基礎力向上に最適な教材として\n・青チャート1A2B\nをオススメします！\n\n解答解説がしっかりしていて、\nなおかつ、問題を解くときの考え方まで紹介しているので、基礎固めはこの教材を何周もすれば十分です！\n\n基礎がしっかりできていれば、\n全国の受験生が受ける模試であれば\n偏差値60〜65程度は到達可能です。\n\n青チャートを完璧にすると\n模試の時にどれが基本問題でどれが応用問題かわかるようになりますよ！\n\n次に、青チャートが終わったならば\n今度は身についた基礎を使う練習\nつまり、応用問題を解くために基礎をどの場面でどう使うかを練習しましょう！\n\nこの演習用として\n・1対1対応の数学\n・プラチカ\n・やさしい理系数学\nなどがオススメです！\n\n次に『オススメ勉強法』ですが\n青チャートを使うかどうかに関わらず、\n問題の考え方や解答を理解した後に解答を見ずに\n最初から最後まで自力で再現してみることが大切です。\n\nここで、再現できないようであれば、\nまだまだ理解が足りてないということです。\n\nつまり、\n問題を解く\n↓\n考え方と解説を理解する\n↓\n解答を見ずに、自力で再度解く\n\nこの3つのことを繰り返すことで飛躍的に数学力が上がります！\n\nぜひ、実践してみてください！"}],["$","div",null,{"className":"flex mb-1","children":[["$","svg",null,{"stroke":"currentColor","fill":"currentColor","strokeWidth":"0","viewBox":"0 0 24 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items-center py-4","children":[["$","div",null,{"className":"flex-1","children":[["$","div",null,{"className":"mb-1","children":"応用力"}],["$","div",null,{"className":"text-xs text-caption line-clamp-2 mb-1","children":"入試の数学の問題には2パターンあると思っています。\n\n1° パターン化された問題(典型問題)\n2° パターン化されていない問題\n\nです。そんなに難しくない問題を出題する大学では、1°の場合が多く、1°の対策としては解法を覚えてしまうという手段があります。\nしかし、いわゆる難関大は1°よりも2°を出題しないと受験生間で差がつきません。よって2°を出題します。\n\n2°の問題は解法を覚えても意味がありません。では2°を解くためにはどのようなことをすればいいのか？\n\n数学の問題を解く際、\n問題を理解→解くための計画→計画したことを実行→自分の答えを見直す\nという流れで問題を解いていきます。\n\n1°の問題では暗記している場合、\n覚えていることを実行→自分の答えを見直す\nという解き方をしているため、2°に太刀打ちできません。\n\n2°の問題を解くには\n問題を理解→解くための計画\nをする練習が必要です。\n\nそのためには、\nまずチャート式などの数学の基本事項が分かっている、理解している必要があります。\n\nそれを2°タイプの問題を解いて練習を積み重ね、思いつく手段を実行し、基本事項を組み合わせて問題を解いていきましょう。\n\n数学は暗記する部分もありますが、それだけでは難関大には対応できません。頑張ってください。"}],["$","div",null,{"className":"flex mb-1","children":[["$","svg",null,{"stroke":"currentColor","fill":"currentColor","strokeWidth":"0","viewBox":"0 0 24 24","className":"text-subPrimary 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