分からないですー💦

第3問 Reading 1 について, "Mujina" を読んで, 4人の生徒がその感想を述べている。 その内容 が適切でないものを1つ選びなさい。 ア It is obvious that there are streetlamps today, so I'm afraid of walking in lonesome areas such as Kiinokunizaka after sunset. イ People who had no eyes, nose, or mouth are unrealistic. I think what the merchant saw was all an illusion. ウ The merchant was really upset and found no words for what he saw. If I were in his position, I could talk calmly. H The merchant was surprised because the soba with eggs was really good. I would like to have the same one. ア イ ウ H

(1)の解説でn-1群とあるのはなぜですか？？ あと(1+2+…+2^n-2)項目となるのはなぜですか??

基礎問 202 第7章 131 群数列 (I) 1から順に並べた自然数を, 1|2, 34, 5, 6, 7|8, 9, 10, 11, 12, 13, 14, 15|16, のように,第n群 (n=1, 2, ...) 2-1 個の数を含むように分け る. (1) 第n群の最初の数をnで表せ. (2)第n群に含まれる数の総和を求めよ. (3) 3000 は第何群の何番目にあるか. い ある規則のある数列に区切りを入れてカタマリを作ってできる群数 |精講 列を考えるときは, .7e1 「もとの数列で、はじめから数えて第何項目か?」 と考えます。このとき,第n群に入っている項の数を用意し,各群の最後の数 に着目します. 解 答 (1) 第 (n-1) 群の最後の数は、はじめから数えて各群の最後の数が基 (1+2+…+2"-2) 項目初項り、公比2.項数n-1 すなわち, (2"-1-1) 項目だからその数字は 準 <等比数列の和の公式 を用いて計算する 第 (n-1) 群 203 (1)より,2"-130002" 第n群 (1) SET 第 (n+1) 群 3000, 1 2-1-1- 2"-1 2-1 2" ここで,2"=2048, 2124096 だから 2" <3000<212 .. n=12 よって, 第12群に含まれている. このとき,第11群の最後の数は, 2"-1=2047 だから, (1) ( 30002047953より, 3000は第12群の953番目にある. 注1.第12群に含まれているとき,第12群の最初の数に着目すると 3000-20481と計算しないといけません。逆に, ひき算をすると答 がちがってしまいます。 注2.(3) 2行目の 2"-13000<2"は2"-13000≦2"-1 でも, 2"-1-1<3000≦2"-1 でもよいのですが, (1) を利用すれば解答の形に なるでしょう。 注3 (1),(2)はnに具体的な数字を入れることによって検算が可能です。 ポイントもとの数列に規則のある群数列は, Ⅰ. 第群に含まれる頃の数を用意し Ⅱ. 各群の最後の数に着目し Ⅲ. はじめから数えて何項目か と考える 第7章 2-1-1 よって, 第n群の最初の数は (2"-1-1)+1=2"-1 (2)(1)より,第n群に含まれる数は 初項 2"-1, 公差 1 項数 27-1 の等差数列. よって, 求める総和は 1/21・2"-1{2・2"-'+ (2"-1-1)・1} =2"-2(2.2"-1+2"-1-1)=2"-2(3・2"-1-1) 1 (別解)2行目は初項2"-1 末項2"-1 項数 27-1 の等差数列と考えて もよい。 (3)3000は第n群に含まれているとすると 演習問題 131 1から順に並べた自然数を 1|2, 34, 5, 6| 7, 8, 9, 10 | 11, 12, 13, 14, 15 | 16, のように,第n群にn個の数を含むように分ける. (1) 第n群の最初の数を求めよ. (2)第n群に含まれる数の総和を求めよ. (3)100 は第何群の何番目にあるか.

高校数学です(F-115) 答えと私の答えの符号の向きが違っててどこが間違ってるのかがわかりません。 解説では両辺に−1をかけて符号の向きを逆にしているのですが、私はせずにそのまま計算しました。それだと答えが合わないのでしょうか。 どなたかよろしくお願いします🙇‍♀️

例題 115 三角不等式(2) *** 08.08=6 0°0≦180°のとき, 次の不等式を解け. 例 1 2cos2d-cose<0 8cos' <3+6sin 考え方 (1) coset とおくとtの2次不等式である. 0°≤0≤180° T -1≤cos 0≤1 (2)sin'+cos'0=1 を用いて sin だけの2次不等式にする. 0° 180°では 001 に注意する. 解答 (1) 2cos2-cos0<0 ......① Cost とおくと,0°180°より, t1....... ② にして E おき換えると > abo また,①は, 212-t<0 t(2t-1) <0 [等式 08120 より, o<t<1/1/...③ 3 y4 したがって, ② ③から, 20<cose< 60°1 nst (8) ③②を満たして る. よって、0°0≦180°では, 60°<< 90° 右の図より, -1 0 x x= 2 (2) 8cos' <3+6sin より, 8(1-sin20)<3+6sin0 8sin20+6sin0-5>0 (4sin0+5)(2sin0-1)>0 ここで, 4sin0 +5>0より, 2sin0-1>0 YA 1 sincos^0=1 利用 慣れたら,おき様 ないで因数分 きるようになる。 5-10 -1--1 したがって, sin0 > 2 150° 30° よって, 0°≧≦180°では, 右の図より, 30°< 6 < 150° 0 1 X sin 0≧0より、 C) MIN4sin0+5>0 Focus 三角方程式・不等式 sin, cos の種類を統一する 180°では, 0≦sin0≦1, -1≦cos01 0° tan 0 はすべての実数値 (tan 90° は定義されない)VON

マーカーのところで、∫の中がx dyになるのはなぜですか？ ∫-cosx dyじゃないんですか？

基本 例題 257 曲線x=g(y) と軸の間の面積 次の曲線と直線で囲まれた部分の面積Sを求めよ。 (1) y=elogx, y = -1,y=2e, y 軸 (2)y=-cosx(0≦x≦z), y=1/28=-1 427 82 000 指針 まず, 曲線の概形をかき, 曲線と直線や座標軸との交点を調べる。 解答 2y軸 p.424 基本事項 3 8 重要263 y x=g(y) d S 常に (1) y=elogx を xについて解きで積分するとよい。 ...... ・・xについての積分で面積を求めるよりも,計算がらくになる。 (2)と同じように考えても,高校数学の範囲ではy=-COSx を x=g(y) の形にはできない。 そこで置換積分法を利用する。 なお,(1),(2) ともに別解のような、長方形の面積から引く方法 y でもよい。 x=ar C (1) y=elogx から y=10gax x=ee S= g(y)≥0 s=gydy (1) の別解 (長方形の面積か y YA よっ -e2. x= ら引く方法) -1≤y≤2e T\ x>0(x) 2e 12e 1 よってS=Setdy=[ez] (2) =eeee1分5 ①とする=e-e-2/ よび直線 y=x に関して対称である。 (2)y=-cosx から dy=sinxdx -1 お 2e+1 y よって は 8.S である。[ S=xdy= fxsinxdx 58 x 3 (051) 5 2 から 3 --xcosx}" + f2" cosxdx X COS X T π 3 123 !e2 → ↑ 1 S=e²(2e+1) -S" (elogx+1)dx =2e3+e² -[e(xlogx-x)+x] =e³-e¹-1 2 (2)の別解 (上と同じ方法) S=(1+1) -cosx+1)dx 2 → π 3 1 inx- 3 y=-cost 3 1部分の 2. S 233 2 π 2 3 -*+*+0- 3 6 π 2 2 +[sin x] π 0 π x 2 π 2 2 2 3" 8/3

あっていますか？ あと、展開しなくても大丈夫なんですか？

ST 練8 練習 次の関数を微分せよ。 (1)y=(3x+1)。 (2) y=(3-2x2)3 (3)y=- 1 (x2+1)3

英語の長文です どこに文法表現があるか知りたいです！ よろしくお願いします。

5 UNIT3 Reading Passage 10 15 20 20 25 30 Listening When important events are happening around the world, most people turn to traditional media sources, such as CNN and BBC,¹ for their news. However, during the invasion of Iraq by the United States and its allies in early 2003, a significant number of people followed the war from the point of view of an anonymous² Iraqi citizen who called himself "Salam Pax" (salam means "peace" in Arabic, and pax means "peace" in Latin). Salam Pax wrote a diary about everyday life in Baghdad during the war, and posted it on his web site. Pax's online diary was a kind of web site known as a "blog." Blogs, short for "web-logs," are online diaries usually kept by individuals, but sometimes they are written by companies and other groups of people. They are a rapidly growing type of web site on the Internet. There are estimated to be several hundred thousand blogs on the Internet, and with the popularity of other social media sites, the number of people writing online about their lives continues to grow. may find A blog differs from a traditional web site in several ways. Most importantly, it is updated much more regularly. Many blogs are updated every day, and some are updated several times a day. Also, most blogs use special software or web sites which are specifically aimed at bloggers, so you do not need to be a computer expert to create your own blog. This means that ordinary people who computers difficult to use can easily set up and start writing their own blog. In 2003, the Internet company AOL³ introduced their own blogging service, enabling its 35 million members to quickly and easily start blogging. There are many different kinds of blogs. The most popular type is an online diary of links, where the blog writer surfs the Internet and then posts links to sites or news articles that they find interesting, with a few comments about each one. Other types are personal diaries, where the writer talks about their life and feelings. Sometimes these blogs can be very personal. There is another kind of blogging, called "moblogging," short for "mobile blogging." Mobloggers use cell phones to take photo's, which are posted instantly to the Internet. When the content and images posted online involve news subjects, mobloggers become citizen journalists. In fact, the Korean web site OhMyNews was a well known source for articles from international citizen journalists. However, in 2010, OhMyNews stopped posting new articles. Instead, it is now a blog site where citizen journalists can choose what makes the headlines, or just share ideas about how regular people are changing the news world. Anyone who visits the web site of a big media company can clearly see how the idea of blogging has changed the reporting of news. Quite often, a list of reader comments follow news articles. It seems that the news is becoming less like a report or a lecture, and more like a conversation, where anyone can join in. CNN, BBC Cable News Network, British Broadcasting Corporation anonymous not named; unknown 3 AOL America Online

この解説の授業受けておらず友達に答え見せて貰い(1)の答えが、紅茶にミルクを注がれると一杯の紅茶の味がよくなるという発見 と書いてあったのですが、私はミルクに紅茶を注がれると一杯の紅茶の味がよくなるというという発見だと思います。どちらが正しいですか？よろしくお願いします🙇

15 The secret of how to make a perfect cup of tea has finally been discovered by put the milk in first. The finding that a cup of tea tastes better English scientists if the tea is poured into the milk appeared to have settled an argument that has been of major concern to this nation of tea drinkers. 52 It all began after Dr. *Andrew Stapley, a chemical engineer at *Loughborough University, revealed 3) the recipe for a perfect cup of tea. He said the keys to producing the perfect cup were using *soft water, warming the pot and allowing the tea to stand for three minutes. As to the difficult issue of whether the milk or tea should be poured in first, Dr. Stapley said science proved it must be the former. The reason is that 10 when milk is exposed to high temperatures, such as being poured into a cup of very hot tea, it loses its fresh taste. 3 However, only a few hours after Dr. Stapley announced his findings to the world, a noisy debate started within the scientific community. Dr. Julia King, head of the *Institute of Physics, said the secret was to keep the water temperature at 98°C. Putting the milk in first was only a social custom that "has nothing to do with taste," she said. "In the past, only the rich could afford high quality *china cups which could withstand the hot tea being poured in directly. In contrast, those of us with cheap china had to put the milk in first to prevent our cups from cracking." ウ 262 words)

四角10と四角11が分かりません💦 お願いします🙇

dx 4t-1 3t2-2 解答 (1) 4t-1 10 関数 y=xe3* について,y"-6y'+9yの値を求めよ。 (y'や' を求めましょう) ↓ビブ 37 y' = (x)'e² + x x (e³)' = =232 + Xxe 3x 3x + x3x = e³x (1+x) y" = /e³x (1+x) 7 = (e³x)" (1+x) + (1+x) (e³*) = + xx1 e3x =e3x + e3x= 11 関数 y=e*sinx について, y''-2y'+2yの値を求めよ。 y= ↓ビブン y' = (e*)'sinx) + exx (Sinx) = ex Sinx t ex x Cost = set (sinxt cost) 7(e) sin t 1-cost - 67 +971 5. 解答 0 (Sinxes (cosx-Six) - 2 (e^ ( Sinx + COST) | 120^ Ex gil lex) x (sinx + cosx) texx (sinxt COSX) い e (sinxcosxt exx (cosxsinx) -4- COSXだけ残った。 解答 0 10組 田

Q&Aの解答が分かりません。 明日テストなので回答よろしくお願いします。

10 *** 5 Dances Around the World This is a student's report about dances around the world. Section 1 Setting 生徒が世界のさまざまなダンスについてレポートしています。 How did the hula begin? There are many dances around the world. Each of them has a unique background. Here, let's look at three styles of dancing: the hula, Irish dance, breakdancing. and The first dance is the hula in Hawaii. It comes from the indigenous religion there. In ancient Hawaii, people showed their respect for gods by dancing. They also danced to pass on important values from generation to generation. That was because they had no formal writing system at the time. In other words, the hula was more than a leisure activity. In the hula, dancers use their hands to express G emotions and things in nature. The dancers believe that they can communicate various messages through 15 the hula. background [bækgrȧund] hula [hú:lǝ] ♦Irish láiriЛ] breakdancing [bréikdænsin] religion [rilidzǝn] ancient [éinfant] generation [dzènǝréifn] leisure [li:3ǝr]) TF Su Read 世 フラダンスを踊るハワイ先住民の女性 (1938年) 1. Does each of the dances have a unique background? & 2. What did people in Hawaii show by dancing? 1 2 13 .text ⚫ new words A 3. What do hula dancers believe? 8 pass on ~~を伝える 8 from generation to generation (t 10 at the time 10 writing system 書きことばのしくみ

Q＆A教えてください！！

Section 1 What is a proverb? An ALT is talking about pr Setting 教室で、ALTがことわざについて話しています。 G In my high school days, proverbs helped me a lot. They come from people's common experiences and G traditional knowledge. One famous proverb is "A friend in need is a friend 5 indeed." A true friend stands by you when you have trouble. Another proverb is "Where there is a will, there is a way." When you do something, have a clear goal and work hard. Then you reach the goal in the 10 end. Proverbs often encourage us when we need help. Proverbs enrich our lives. proverb(s) [právǝbiz common (k knowledge indeed (indi encourage [inká:ridz]<! enrich (inrit TFO 1 2 13 text new words & 1. Did proverbs help the ALT in her high school days? 2. What does a true friend do when you have trouble? 3. What do proverbs often do when we need help? Yes it is A true friend stands by They otten encastage 2 come from ~~に由来する 4 A friend in need is a friend indeed. 「まさかの時の友こそ真の友 5 stand by ~ ~を助ける 6 Where there is a will, there is a 8 in the end 最後には Sum Read the ことね 550 効果 Gr TH P