最終的にエマと彩︎香が参加するプログラムとその日程は？ という問題が理解できません💦 教えて頂けると嬉しいです 答えは make a kokesi で、25日です

2 次の対話は、かえで市の高校生の彩香と留学生のエマが、エマのホームステイ先で話 したときのものです。 また、 資料1はそのとき彩香たちが見ていたウェブサイトの画面で あり、 資料2はエマの予定表の一部です。 これらに関して、 あとの1~5に答えなさい。 Ayaka Emma Ayaka Emma Ayaka Emma : : Emma, do you know Sakura Village? : Sakura Village? No : It's a village next to our 2013 city. It takes about twenty minutes to get there by bus. There will be an interesting event in Sakura Village this spring.) Really? Look. This is the official website of the event. [ ] : Oh, it's written in English. It says they want people from other countries to come. [い] Ayaka Yes. Let's join one of them together. Emma : Sure! Ayaka : Which one do you want to join? Emma [ 5 ] Well, all the programs sound fun Ayaka : How about this one? You love nature, don't you? month,/ so it's difficuti A for me to climb a Emma : Yes, I do. But I injured my foot last mountain right now. Also, I want to learn something about Japanese culture. Ayaka : OK. [ ] But we can't join the program on March 18th, b X 3/18 Emma Ayaka : going to visit my grandmother's house, She's looking forward to Do you have other plans on weekends? any because we're B you. Comp : I sometimes clean the park as a volunteer. Look. This is my schedule. If possible, I don't want to miss that volunteer work. OK. Then let's join this program. It sounds interesting. Emma Really? But I know you like fishing. If we join the program on the 12th, you can enjoy fishing. 多い? Ayaka : Well, it's important to do volunteer work, so I think you should clean the park We can go fishing another day Emma : OK, thanks! The website says that to join the program, Ayaka : That's right. I'll do that when I get home. : Emma Thanks, Ayaka. I can't wait! (注) official 公式の schedule スケジュール

(1)なぜ、ウではなくエになるのかの理由を教えてほしいです 見づらくてすみません🙇‍♀️

これを読んで、あとの問いに答えなさい。 Hi, I'm Kaito. Today, I will talk about Al "devices. We use many kinds of Al devices lik use it to do work given by humans, I think Al devices can make our lives better. There "robots, "drones, and "smartphones, AI devices collect a lot of information, rememberi still a lot of work AI devices cannot do but they can do some work to make our lives easi Through my speech, I want you to learn more about Al devices and to live with them in the future. imagine how It was held by Kamome City At the event, I learned about many kinds of AI devices I didn't know anything about AI devices before I joined an event about them th that can help humans. we ca this summe 9 with her body, it asked her some questions, and gave her suggestions to make her fee better. A man from Kamome City Office said to me, Though this robot can work like doctor, (D). It cannot replace a doctor. But there will be more robots working in hospitals in the future." At the event, I started thinking about the ways to make Al device nt, I started to learn more about AI devices. I've learned that A this graph. It shows the "changes in the number of farmers in 2010, 2015, and 2020 in devices are used in many different ways. For example, AI devices help farmers. Japan and how old they were in each year. The number of farmers became smaller, and the "percentage of the farmers who were 60 years old and older than 60 years old became larger And now, AI devices are expected to be a great help to farmers. After I went to the event, 605799 Look saw graph : グラフ camera:カメラ changes in color(s): 下線部が表すグラフとして Changes in the number of farme ウ 250 (万人) 200 179.8 175.7 150 152.4 100 138.2 50 27A 2010 ° 37.5 2015 C60 years old and older than younger than 60 years old. Changes in the numbe (万人) 250 200 161.6 175 150 108.9 100 13 50 50 62.7 0 2010 60 years old and younger than t )~( (2) 1 を,あとのア~ there are B humans C robots c ア ウ 1-A 1- B 1 I went to another event to learn how AI devices actually help farmers. One robot I there helped farmers pick tomatoes. The robot has a "camera on it to collect a lot of information about the tomatoes. It remembers the shapes and "colors of "ripe tomatoes and decides when to pick the tomatoes. When it decides to pick the tomatoes, it picks them with its arms. Farmers send the tomatoes that the robot has picked to the stores. At this event, talked with a farmer who used the "tomato-picking robot. I asked him, "What do you think about working with the robot?" He said, "I don't think robots and humans can do all of the same work. But)(2). Today, robots have become very important. The number of young people who want to be farmers has become smaller, because a farmer's work is hard and needs much experience. If robots can do the hard work for farmers, they will improve farmers' lives. I hope more young people will want to become farmers." AI devices are used in our lives in many ways. I've learned that it is difficult for us to live without AI devices in today's world. However, we need to remember AI devices are not perfect. AI devices can remember all the information they collect, but 3). So, we always have to think about effective ways of using them. I hope that more AI devices will be used to help people. AI devices, like the doctor robot and the tomato-picking robot, can improve our lives. So, I want to make AI devices that can work well with humans to make our lives better in the future. That's my dream. Thank you for listening. (E) device(s): robot(s): ロボット drone(s): ドローン smartphone(s): スマートフォン be held 開催される suggestion(s): * City Office T replace: ~に取って代わる BC (3)次のa~ ano あとのア a Kait Kai Ka d Th Ro K eイアオ

英作文の添削お願いします。 テーマは「ソーシャルメディアの人気はいじめを増やすと思うか」です。 I agree with the topic that the popularity of social media like Facebook, Twitter and LI... 続きを読む

[My writing skills are terrible.] [Don't rush to co conclusions.] なぜskillとconclusionに[s]がつくのでしょうか？ [this]などがない場合はすべて複数形なのでしょうか？ 穴埋め形式... 続きを読む

これ銅板の方Cuとかで表すのかと思ったんですけどなんでHとかで表すんですか？

ここで正の無限大にって書くのはダメですか？

64 第1章 数列の極限 [n+] 例題23 無限級数の収束・発散 (1) 次の無限級数の収束・発散を調べ, 収束する場合はその和を求めよ. **** 1 1 (2) an (1) 1-3 2-4 3-5 n(n+2) I 2 3 (2) √2+13+14+1 yn+1 +1 2 無限級数 65 n vn+1 +1 ⑥東C始の不定形 n(vn+1-1) n+3 (3) n n+2人 より (vn+1+1)(vn+1-1) =√n+1-1 したがって lima= lim(vn+1-1 *-* 00 lim S玉の無限大に + 分母を有理化する. 第1章 +1 (1) 数列{a} が 0 に収 束しない Naは発散 考え方 無限級数の収束・発散を調べるには、 まず。 一般項 α の収束・発散を調べ 次に、部分和 S, を求める。 D S=atat…tat 無限級数 よって、この無限級数は発散する. となり 部分和 Sm ・{S.}が収束Σa. が収束 0350 = (3)S=(2-1)+(2)+(4-0)+ nn+ lim4.=0 ......+ limS=S 2,=S \n-1 n+1) 1+ n+Xn+3\ n+2 部分和 S を求める. SALHA 解答 =2+ したがって 1 (1) {Sが発散が発散 切除するか (1) 部分分数に分解して考える. (2)無理式である。 分母の有理化をする. 一般項を a.. 初項から第n項までの部分和をS" とする. _1/1 1 <部分分数に分解する) 3 n+2n+3\ lim S, 2 n+1 n+2) 3n+2n+3 42n+1 n+2 WANG DER {S.} の収束 発散を 調べる. n(n+2)=( 2 3 nt! 1+ 1+- 3 n n = lim 2+2 1 2 1+- 1+ n n a,= n(n+2) 2nn+2, lima.=0 3 =2 1-1 1 S 11 1.3 2.4 +3.5+...... 部分分数に分解する 3 部分和 S を求める。 よってこの無限級数は収束し、その和は 2 11 (n-1) (n+1) n(n+2) Focus 無限級数の収束 発散 23 bla ...... 1/1 1 2\m n+2) 数列 {a} が 0 に収束しない lima=0 無限級数Σamは発散する n=1 部分和 S を調べる n+1+2 より, limS,=lim 1/ {S} の収束・発散を lim SS (収束)のときan=S =1 1 1 調べる 2 133 n+1 n+2 1 lim- =0. 224 +1 よって、この無限級数は収束し、その和は 1 練習 lim- =0 n+2 23 (1) ** 4 limS=S ⇔ →Σa-S (2) 次の無限級数の収束・発散を調べ, 収束する場合はその和を求めよ。 itysty3+√5+15+√7 1 v2n-1+v2n+1 [n+1 n+4 n n+3 + 1 (3) 32-647-85-10 n²-2n →p.8112~15

赤線の略、文法が分かりません。 数が多くてすみません💦

【3】 次の文章とグラフを読んで問いに答えなさい。 現実? ? ✓ ~したい? Today, the eating habits of Japanese people have changed. More people like to eat bread and pasta, They also enjoy a lot of different dishes from other countries more often. ? Japan import's a lot of "produce from foreign countries. 2177 Look at the graph. These five countries spend a lot of money to import produce from SR? other countries. Among them, Japan spends the most and spends about 30 “billion dollars more than the UK. Russia doesn't spend as much as Germany but spends about 2 billion 日本は30億 dollars more than Italy. アメリカより使ってる? Why does Japan import so much produce? There are many reasons for this. Let's think about two of the reasons. One reason is the change in the favorite foods of Japanese people. ①Dishes from foreign countries are ( a ) among Japanese people, but some things ( b ) to cook those dishes are not available in Japan. The "shortage of farmland is another reason. About 70% of land in Japan is not good as farmland, because the land is in the mountains and is (②) with tree. And on some parts of the land which is good as farmland, people have built houses, shops and so on. Can Japan always import a lot of produce? It is not ( 3 ) to this question. In some parts of the world. *natural disasters like floods and *livestock epidemics sometimes damage produce which Japan needs. 4 (1. thing 2. should 3. we 4. 5. remember 6. another 7. there). If world peace is broken, maybe it will be difficult for Japan to import things. 4 another. There is things we should vem *produce billion 101 shortage natural disasters livestock epidemics

英作文の添削お願いします。 テーマは「自動運転車の長所と短所について」です。 100点満点で点数も付けていただきたいです。

that There are advantages and disadvantages I think one of the advantages is people than Cats which we have to most that people think to using self-driving cars. it is more useful for many drive by ourselves. In general, the elders should. drive in order to avoid some accidents. However, they advantage of self-driving. can Cars. not go to anywhere they houp by taking In contrast, I think using Self-driving cars may lead to some accidents, which is one of the dis advantages. If the systems of self-driving cars are out of order • Traffic accidents may occur. Moreover, self-driving cars are more expensive Conventional cars, so buying self- driving cars Than may be hard for many people.

教えてください。

56 第1章 例題21 数学的帰納法と極限 a²+5 (n=1, 2, 3, ...) (2)(1)で示した 1<a, 4 を利用できるように, m+1-1= a²+5 解答 (I) n=1のとき, α=4 より ①は成り立つ 数学的帰納法で (Ⅲ)n=k のとき,①が成り立つと仮定すると, 1<a≦4 +5 +54°+5 より 6 6 6 21 つまり、 Kan+- <4 6 したがって, n=k+1 のときも① は成り立つ。 よって、(I), (II)より, すべての自然数nについて 1<a≦4 が成り立つ。 3.各辺を6で割る。 2.各辺に5を加える A る。 (3)(2)で示した不等式を利用して、 例題17 (p.47) と同様にして極限値を求めればよい (1) 1<a,≦4... ① とおく. 6 0=4, Or+1=6 で定義される数列{a}について,次の問いに答えよ . (1) 1<a,≦4 を示せ. (3) lima を求めよ. 5 (2) ax+1-1≤ (an−1). 考え方 (1) 数学的帰納法を使う. n=k のとき, 1<a,S4 が成り立つと仮定して、 nk+1のときも成り立つことを示す。 (3)②より4-1s(._,-1) なんで 2条になるのです 2条になるので( **** 1 無限数列 57 -2-1) <)ある 第1章 S 10=4 これと (1) より つまり。 0<a.-153() \1 5\" -1の右辺を変 ここでlim3 うちの原理より =0 であるから, ③とはさみ 1-00 はさみうちの原理を 利用する lim (a,-1)=0 よって, lima=1 Focus 予想した lima, の値を利用せよ no より, lima+1=lim a²+5 (2) +1-1=- 02²+5 -1 mim 6 00 0 6 したがって. a= a²+5 6 これより α=1.5 (1) より a=1 「仮定した式について 1.各辺を2乗する。 注2)による誘導がない場合は,次のように考えるとよい. lima=α とすると, 漸化式 +1= a²+5 6 極限値をα とおいて, αの値を予想する. lima.=ab, lim4+1=α a-1 6 =(a+1)(a) m ここで、1<a.4より、 a.+1 4+10 6 6 a.+1 5 6 6 (a+1)(a,-1)≤(a−1) よって, a1= (a,-1)② m +1-1と am - 1 の 100 関係式にする. 因数分解して次数を 下げるのと同時に A (-1) を作る. 各辺に1を加えて 6 で割る。 する 30 131≤lima, a≤4 と予想できるので, lima=1 を示す. 注》例題21の(2)で出てくるという値は何を意味するだろうか.また,例題 21 では,上 手に不等式の評価に持ち込み,その後,その不等式を繰り返し 最終的には「はさ みうちの原理」を用いて{a}の極限値を求めている. このことを次ページの解説で もう少し分析してみよう. 練習 an>1より、 a1= 0, an+1= 21 a2+3 4 (n=1, 2, 3, ......) 10-1>0 **** で定義される数列{a}について、 次の問いに答えよ。 (a) F (8) (1) 0≦a<1 を示せ. (3) liman を求めよ. 00 (2)1-ant <= を示せ. 1-an 2 →p.6111

一本目二本目共に何故そのように表せるのかを教えてください。

例題 17 漸化式と極限 (3) ( a1=1, an+1=√2an+3 (n=1, 2, 3 ......) で定義される数列{a}について,次の問いに答えよ. (1) 数列 {a} が極限値αをもつとき, αの値を求めよ. (2) (1)のαについて, la,+i-als/la-al を示せ. 無限数列 47 **** 第1章 (3) lima=α であることを示せ. 11-0 考え方 (1) lima= α のとき, lima,+1=α であるから, ya y=x/ →00 これを与えられた漸化式に代入して考える. y=√2x+3 求めたαが条件に合うか確認が必要 (2)(1) で求めたα を代入し, 漸化式を用いて不等式の 左辺を変形する。 10 a2a3 TI BM (3) 実際にlima を求める はさみうちの原理を利用する. (=1 解答 (1) lima=α とすると, liman=liman+1=α なので, 無理方程式 →80 漸化式 α+1=√2a+3 より, a=√2+3 両辺を2乗して α=2α+3 より ......1 α=-1,3 α=-1 は ①を満たさないから, α=3 (2)|a,+1-3|=|v2a,+3 -3|=| (2a,+3)-9 1 (p.98 参照) a²-2a-3=0 (a+1) (α-3)=0 α=-1, 3 が①を満 √2a+3 +3 たすか確認する. |2a-6| √2a+3 +3 2 lan √2a+3+3 lan (3)(2)より14,-3|≦12/21an-1-3| *(1)+ よって, |a,+1-3|23|42-31は成り立つ. VII 23 2\n-1 la-31 21 分子の有理化 √2+30 より √2a,+3+3≥3 1 √2a,+3+3 3 (2) をくり返し用いる. |a-3|=|1-3| |=|-2|=2 Focus したここで=1 より, 2, lim 2-1 2\n-1 = 0 とはさみうちの原理より, lim|an-3|=0 よって, lima=3 となり、題意は成り立つ。 liman=α⇒ liman+=α n→∞ n→∞ a=1, an+1=√an+2 (n=1,2,3 ………) 練習 17 で定義される数列{an} について, lima を求めよ. ➡p.619) →∞ ***