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英語 高校生

問題を解いたのですが答えが分かりません😭教えてください🙏

テーマ 資源・エネルギー 10 文法項目 動名詞(いろいろな形/動名詞と不定詞) UNIT 6 Reading Track 29-30 HUNDR パンダのふんの研究が、いつの日か環境問題の解決に寄与するかもしれません。 In June, 2016, a baby *giant panda, Tian Bao, was born at a zoo in Belgium. It became big news because the birth of a baby panda is an *extremely Actually, that of Tian Bao was only the sixth in Europe in the last 20 years. While its population is slowly increasing, the giant panda remains one of the rarest animals 5 in the world. Therefore, scientists have been doing research on how pandas have babies. rare event. So, you may think the scientists working at the Belgium zoo *accomplished the goal of their research. But they have another goal; apart from having done that research, they've been studying panda *poo. Why are they doing that? G Som pluoda Dol Tian Bao's mother Hao Hao and its father Xing Hui live in the same zoo as their baby does. While they enjoy sitting in the sun and eating bamboo, iedario ew dinga 2.5T (s) the scientist team collects their poo. By studying the poo, the team is aiming to understand how pandas can digest bamboo. Note 30 In fact, bamboo is receiving a lot of attention in biofuel research these days. 15 It's among the fastest-growing plants on earth, and yet needs the least care. So the in hewa plant can become a good source of *renewable energy. But because bamboo is very tough and hard to *degrade, today's method for making a biofuel from bamboo costs a lot. *Technically, pandas are meat-eating animals, but over the years the food they eat 20 has changed to almost only bamboo. The scientists are trying to find the *microbes that help a panda digest about 10kg of bamboo a day. By using these microbes, they will be able to discover an easy and cheap method for ( 4 ). It may take time, but some day panda poo may help cars run. (296 words)

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数学 高校生

!!!至急お願いします!!! マーカーのところで、式の変形の方法を教えて欲しいです🙇‍♂️

135 等式の証明 基本例題 nが自然数のとき, 数学的帰納法を用いて次の等式を証明せよ。 1・1!+2・2!+. ·+n•n!=(n+1)!−1 数学的帰納法による証明は, 前ページの例のように次の手順で示す。 [1] n=1のときを証明。 [2]=kのときに成り立つという仮定のもとで, n= 1のときも成り立つことを証明。 [1][2] より,すべての自然数nで成り立つ。 ← まとめ [2] においては,n=kのとき ① が成り立つと仮定した等式を使って, ①のn=k+1のと きの左辺1・1!+2・+••••••+k・k!+(k+1)・(k+1)! が,右辺(k+1)+1}!-1に等しくな ることを示す。 また、結論を忘れずに書くこと。 [補足] 上の [1] [2] が示されたとすると,次のようにして, n= 1,2,3, ........ 立つこととなる。 [1] から, n=1のとき①が成り立つ (*) および [2] から, n=2のとき① が成り立つ (**) および [2] から, n=3のとき ① が成り立つ → n=1のとき 1-(8-a1)-mor-CI= (左辺)=1・1!=1, (右辺)=(1+1)!−1=1 よっては成り立つ。 [2] n=kのとき, ① が成り立つと仮定すると 1・1!+2・2!+••••••+k•k!=(k+1)! -1 n=k+1のときを考えると, ② から JUNCTUS 1·1+2·2!+·+k·k! +(k+1)•(k+1)! =(k+1)!-1+(k+1)・(k+1)! ={1+(k+1)}(k+1)! -1 =(k+2)(k+1)!−1=(k+2)!−1 ② ={(k+1)+1}!-1 よって,n=k+1のときにも ①は成り立つ。 871 [1], [2] からすべての自然数nについて ① は成り立つ。 (J bom) "C=4 [類 早稲田大〕 p.590 基本事項 ① 出発点 と順に成り (*) (**) 注意 は数学的帰納法の 決まり文句。 答案ではきちん と書くようにしよう。 < ① でn=kとおいたもの。 n=k+1のときの①の左 辺。 n=k+1のときの ① の右 辺。 591 3章 17 数学的帰納法

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