この写真の英語をどう読むのかをカタカナで送ってくれませんか？

Universal Design Fair At supermarkets, we can find bottles with special shapes. There are automatic doors and adjustable desks at Midori Public Library. At this event, you can see and touch many 5 products with a universal design. You will learn how to use them. You will also learn where to find facilities with a universal design in our city. DATE October 10 TIME 9:00 a.m.-5:00 p.m. PLACE Midori City Hall 10 10

この写真の英語をどう読むのかをカタカナで送ってくれませんか？

I had a host brother, Kevin. He was really interested in Japan and asked me many questions. Talking with him was fun. However, it was difficult to answer some questions. For example, he said, "Why do you say "Tadaima' when you get home? Why do you take off your shoes when you enter a house?" I couldn't explain the reasons. After I talked with him, I felt like learning about my own country. In the end, staying with a host family was a great experience. Sometimes we couldn't understand each other. However, I kept trying to speak in English, and they listened to me carefully. I » want to visit them again in the near future. [115 words] 5 10

英語です。 二枚目の文法を使って動詞を変形させる問題です。 一問目はわかったのですが、そのほかがわからなかったので教えてください🙏

Grammar A police officer is looking for a thief who stole a jewel from a shop last night. Miku Suspects Harry shop clerk Ms. Smith shop clerk 2 Mr. Sato shop owner security guard *suspect *. witness Witnesses to the Crime I'm not sure whether the thief was a man or a woman. The person had light-colored hair. Last night, I saw a person wearing glasses coming out of the shop. A few minutes later, the alarm went off. I saw a person running out of the shop at around 9 o'clock. I was talking with the shop owner, Ms. Smith, at that time. *thief E crime, light-colored, alarm, go off Q1. Complete the police officer's report. Use the words below in the correct form. [ commit / have / see / know ]umbs Asolarpotenz •stole only the most expensive jewel in the shop. The thief....seemed I have " had the key to the shop. ⚫turned off the security cameras beforehand. appears (2 )( "Known ) the details of the shop. My boss and I are (3 )( ) the most suspicious person tomorrow. We are sure of '5(4 ) the crime. *commit ~犯罪など) を犯す, beforehand 事前に, suspicious 疑わし Q2. Get into pairs and ask each other the questions below. (1) According to the witnesses' hints, who seems to have stolen the jewel? Choose one the suspects. Mr. Smith Sato (2) Why is he/she the most suspicious? Because s seems to have stolen the jewel. Key Points for Expressing (➡p. ① 述語動詞よりも前の時を表したいとき 同じ時 to have done / having done を用いる。 to be → seem to have done ｢~だった [した]ようだ」 予定・義務可能 意図 運命を表したいとき be to do 「~することになっている 〈予定〉」 「~しなければならない 〈義務〉」 「~することができる <可能> 「~するつもりである 〈意図〉」 「~する運命にある〈運命〉」

この問題の意味がわかりません。とくに⭐︎部分の計算の仕方が分からないので、教えてください。

なぜなのか ★★☆ 率 例題 第233 反復試行の確率の最大値から★★★☆ 6問の3択問題がある。 各問とも適当に解答するとき, 何問正解する確率 が最も大きくなるか。 232~235 思考プロセス 未知のものを文字でおく 6問のうちぇ問正解する確率をnの式で表す。. →pn= は式が複雑であるから, 関数とみて最大値を求めるのは難しい。 見方を変える nと+1の関係を調べる。 (ア) Dr<butt on1のとき く、 くい Dn+1 pn (nが大きくなると,も大きくなる) pn+1-p>0←差で考える > 1 ← 比で考える→ Dn+1 (nが大きくなると, pは小さくなる) →Þn+1−pn <0 の式の形から,差と比,どちらで考えるとよいか? とが ) Action n回起こる確率 PR の最大は, Pn+1 との大小を比べよ 1つの問題で正解する確率は である。 Pn 54 (D <1 pn 確率) であ pn+1 6! 25-n 1 3 26h 6 Ch. よって、6問のうちぇ問(nは0Sn≦6の整数)正解す る確率は W: 36-4 3h+6-h =36 反復試行の確率 n 26-n pn =6 3 C()() (3 n = 0,1,2,･･･, 5 において,n+1との比をとるとである。 r!(n-r)! 6! n!(6-n)! 26-n n! C 6 6! 26- pn (n+1)!(5-n)!」 36 n!(6-2 n)! 36 n!(6-n)! 25-n (n+1)!(5-n)! 26- 6-n 2(n+1) EXC (n+1)!= (n+1)xn! (6-n)!=(6-n)x(5-n)! いろいろな確率 (ア) Dn+1 6-n 1のとき ≥1 pn 2(n+1) 4 6-n≧2(n+1)より n≤ 3 Dn+1 よって, n=0,1のとき 2252 のは、 2(n+1)>0である。 >1より <butn=0 のとき かくか Dn 率) (イ) ■法 Dn+1 pn <1 のとき 6-n 2(n+1) <1 n=1のとき く 夏の 4 6-n<2(n+1)より n> 3 かのカー り出し、書かれて A 真 pn+1 よって, n=2,3,4,5 のとき, <1より n=2のとき 2>ps pn n=3のとき ps> pa n=4 のとき PA >Do 歌) Dn > Dn+1 (ア)(イ)より <<p>ps>pa>ps>D=5のときps > De 求 したがって,2問正解となる確率が最も大きい。 233 1個のさいころを10回投げるとき、1の目が何回出る確率が最も大きくなるか。 p.446 問題233 425 32

このthoughってどういう役割をしているんですか？？ though、although ってその節で〜だが、という逆説を表す接続詞だと思っていたんですが文脈に合わなくて…

stories as books. She sent her first book to various publishers, but none of them were interested in publishing it. Unlike the publishers, Potter felt certain that the book would be a success, so in 1901, she paid one publisher to print copies of The Tale of Peter Rabbit. Because of costs, this first version was in black and white. The book was quickly sold out, so the publisher decided to publish a color version. This became a bestseller, and the publisher made a lot of money from that book and the other 22 books written later. Potter's sense of business, though was shown in the way she created and sold goods related to the books. After publishing the first book, she made a doll of Peter Rabbit and patented* it. This was the first time a character from a book had been patented. She then went on to develop dolls, games, dishes, and other products. Today, we are used to seeing toys and products connected with characters from books for sale. Peter Rabbit, though, was the first of these. The methods Potter developed to make a successful business out of her children's books are the ones that are often used by entertainment businesses today.

英語の文章問題です はやめにおねがいします 解説が欲しいです 1.2.3.

Reading 6 x The Wind and the Sun 次は、『イソップ物語』の中の1話「北風と太陽」です。英文を読んで問いに答えましょう。 The Wind and the Sun were talking. "I can beat you at anything," said the Wind. "No, I can beat you at anything," said the Sun. A man with a coat came by. The Sun said, "Can you take off his coat then?" So the Wind blew and blew with all his might. But the man only held his coat tightly. Now it was the Sun's turn. He shone gently and steadily on the man. Soon the man grew warm and happy, and he took off his coat. To amo y elondon mor Sometimes we can move people effectively by kindness, not by force. 0.0 Bavale ed al & ting a ni bil por mantenit-il

関係詞の練習プリントで、大問2がよく分からないので 解説お願いしたいです🙇‍♂️回答だけでも大丈夫です！

2 次の各文がそれぞれほぼ同じ意味の英文になるように、( )に適する語を書きなさい。 (1) I met Cathy. She was a good singer. = I met Cathy, ( ) was a good singer. ) is by the river? (2) Do you see the blue house? It is by the river. - Do you see the blue house ( (3) Ken smiled at me. It made me so happy. = Ken smiled at me, ( ) made me so happy. (4) Susan was born in Japan in 1964. The Tokyo Olympics was held then. = Susan was born in Japan in 1964, ( ) the Tokyo Olympics was held. (5) I'll show you the lake. We often enjoy fishing in it. = I'll show you the lake in ( ) we often enjoy fishing. (6) She went into the living room, and there she found her father lying on the sofa. = She went into the living room, ( ) she found her father lying on the sofa. (7) Egypt is a country where my father never been. = Egypt is a country ( ) ( ) my father never been.

④の解説をお願いします🙏🏻 ベストアンサーさせていただきます！

〔一次関数の利用〕 2 下の図で直線ℓはy=2x-4で、直線は2点B (8,0), D (0,8) を通る直線である。 このとき、次の問いに答えよ。 ただし座標軸の1目盛りを1cm とする。 (3点×4) ① 直線の式を求めよ。 y ① y=-x+8 m D(0, 8) y=2x-4 2 (4,4) ② 2直線の交点Pの座標を求めよ。 f B(8, 0) ③ △PAB の面積を求めよ。 4 C 点Pを通り, 四角形 PDOAの面積を二等分する直線の式を求めよ。 (3) 4 12 cm2 y= x+3

接続詞の問題です、答えあってますでしょうか33、38番の訳がわかりません😭😭

WE DA 33. ( ) I started watching the tennis final, I could not do anything else until it ended. ④ Once だれ ③ For ① Althought ② During ) he is so talented, he cannot finish all the work he has now. 34. ( ① Despite 35. ( ② Because 3 Since ) she is short, she runs faster than any other student in my class. ① Even ② Therefore ① even if 36. I go jogging every morning, ( たとえ でも② except for ・キリスト ② despite <近畿大 ) < 神奈川大 > ⑦Although ④ Although ~だけれども ③ Thoughだけれど ④ If 〈杏林大〉 実際に雨が降っても降らなくてもジョギング 容が事実かわからない < 岩手医科大 > ~ 3 even thought ) they are not Christians. 4 unless < 金城学院大 〉 it's rainingy ③ in spite of ④ although 37. Many Japanese have a Christian style wedding, ( ①1 as if 38. ( ) as she was, Rosamond had no choice but to agree to his offer. 形 as SV ① According 2 As well lende③3 Known 誰も1人であるきたがらない! Reluctant 譲歩を表す〈松山大) - ~したくないSは~であるけれども 39. That road is ( ) nobody wants to walk along it. so+形 or 副 that ~ 1 so dangerous that ② such dangerous as とても~なので)(8 ③ very dangerous that such dangerous that 〈大東文化大 > ecal'him such a 形名 that 40. John was ( ) a good runner that we could nof catch ① enough 自分のコントロールを失うくらいおこっていた ③ such ② so 41.( ) was my anger that I lost control of myself. ① So 2 Such ver③Very とても~なので 4 very <東京理科大 > such that ~ほど AS 4 Great <福岡大〉

この問題の解き方が全体的に分かりません。なぜ分母が3の(6-n)乗ではないのか、鉛筆で引いた下線部分はどういうことか、を中心に、解き方を教えてください🙇‍♀️

なぜなのか。 例題 1233 反復試行の確率の最大値★★★ 6問の3択問題がある。 各問とも適当に解答するとき, 何問正解する確率 が最も大きくなるか 未知のものを文字でおく pn = 6問のうちぇ問正解する確率をn の式で表す。 |は式が複雑であるから, 関数とみて最大値を求めるのは難しい。 見方を変えるとn+1の関係を調べる。 (ア) <Dr+1のとき nが大きくなると,も大きくなる) (イ) >+1のとき ((日) (nが大きくなると, pm は小さくなる) pu+1-p>0←差で考える pt1-p<0 Dn+1 > 1 ← 比で考える→ Dn+1 <1 pn pn の式の形から,差と比, どちらで考えるとよいか? (1) ( Action» n回起こる確率pnの最大は,+1と1の大小を比べよ 1 1つの問題で正解する確率は である。 3 Pn よって、6問のうちη問(nは0≦x≦6の整数) 正解す る確率は C(+) (+)-n!(6-n)! pn=6Cn 26-n (36 n = 0, 1, 2, .･･, 5 において, n+1との比をとると 反復試行の確率 n! ncy= r!(n-r)! である。 Pn+1 6! 25-n 6! 26-n ÷ pn (n+1)!(5-n)! 36 n!(6-n)! 36 n!(6-n)! 25-n 6-n = . (n+1)!(5-n)! 26-n 2(n+1) (n+1)!= (n+1)xn! (6-n)!=(6-n)x(5-n)! いろいろな確率 Dn+1 6-n 326-25-2 ≧1 のとき ≧ 1 pn 2(n+1) 4 6-n≧2(n+1) より n≤ 2(n+1)>0である。 3 Dn+1 よって, n=0,1のとき, >1より <Putin=0のときかくか pn n=1のときか (イ) Dn+1 6-n <1 のとき < 1 Pn 2(n+1) 4 6-n<2(n+1) より n> 3 Dn+1 よって, n=2,3,4,5 のとき, E <1より n=2のとき D>ps pn n=3のとき > Da n=4のとき DA>Do Dn > Dn+1 (ア)(イ)より <<p>3>pa>ps>Don=5のとき ps > Do したがって, 2問正解となる確率が最も大きい。 233 1個のさいころを10回投げるとき 1の目が何回出る確率が最も大きくなるか。 p.446 問題233 425