数Iの一次不等式の問題です 果物の個数が（4x＋26）個になるのはわかるけど、 9（x -1）と9xのところが何故そうなるのかがわかりません

問題33 1次不等式の文章題への応用 何人かの子どもに果物を配る。 1人に4個ずつ配ると26個余るが, 1人に 9個ずつ配っていくと最後の子どもは果物はもらえるが他の子どもより少 なくなる。 子どもの人数と果物の個数を求めよ。 思考プロセス 未知のものを文字でおく 子どもの人数、果物の個数のどちらかをxとおく。 子どもの人数をxとおく 果物の個数をxとおく → 子どもの人数は x-26 4 子どもの人数をxとおいた方が, 簡潔に表すことができる。 Action » 文章題は、 未知のものをxとおいてその変域に注意せよ 解 子どもの人数をx人とおくと, 果物の個数は ( 4x+26) 個 である。 xは自然数である。 これより すなわち ①を解くと ②を解くと 9(x-1)<4x + 26 <9x_ J9(x-1)<4x+26 14x+26 <9x x < 7 x> 26 5 26 5 < x <7 3 果物の個数は 4x+26 4 ③ ④ より この不等式を満たす自然数xを求めると このとき, 果物の個数は 4x+26 = 4.6 +26 = 50 子ども6人, 果物 50個 したがって Point... 文章題の不等式による解法の手順 ① 未知のものをxとおく。 (2) xの式で表せるものを考える。 大小関係を不等式で表す。 (4) (連立) 不等式を解く。 (5) ④ の範囲の中から適するxの値を求める と1人に9個ずつ配ると最 後の子どもも果物をもら えるから x=6 9(x-1)<4x +26 最後の子どもは他の子ど もより少ないから 4x+26<9x よって 9x-8 ≦4x+ 26 ≦9x-1 としてもよい。 26 0 = 5.2 であるから, 5 5.2 < x < 7 を満たす自然 数xは6 子どもの人数をx人とおく 果物の個数は (4x+26) 個 9(x-1)<4x+ 26 < 9x E

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【Ⅲ】 次の(A), (B)の設問に答えよ。 ((A)14点,(B)6点) (A) 次の英文を読んで,下の設問に最も適切な解答をせよ。 特に指示のない選択式の設問は記 号を1つ選んで答え, "You may choose more than one option." と指示のある設問に対して複 数の記号を選ぶ場合は、 アイウエオ順に解答すること。 Mike: Hello Alex, long time no see! Alex: Hi, it's been almost two years since we last met each other! How were you doing? Mike: Until recently, I was frustrated that I could not meet my friends at university, but I was able to spend more time with my family, so I was okay. By the way, how did you like the online classes? Alex: Personally, I did not like them. It was difficult for me to maintain my concentration at home. Also, I could not resist the temptation of using my smartphone, because there was no supervisor at home who checked whether I was working hard or not. Mike: If you use your phone during class, the professor will definitely tell you off! Hot Alex: Another reason why I prefer in-person classes is that I can ask questions or have discussions with my friends. In the Pre-covid-19 era, when I had questions, I went up to my friend Thomas, one of the best students in our faculty and he taught me everything that I did not understand. Mike: That was a huge issue for me as well. If I have questions piled up, then I am more likely to dislike the subject and have more anxiety towards it. So, my friends and I decided to have meetings online on a regular basis and this helped me to worry less about online learning. Alex: That was really (1) of you, I should have done that! So, are you in favor of online learning? Mike: Yes, although I have less face-to-face interaction with friends, I like online learning more. because I do not have to spend a lot of time commuting to school. I live far away from university and it takes two hours for me to get here by train. Alex: Really! I did not know that, what time do you wake up? Mike: I usually wake up at 5 am. ant mo Alex: That's so early! What do you do on the train? Mike: I just do netsurfing and I do not feel that I use my time productively on the train. If we can continue to take online classes wherever we want, we can get more flexibility in our schedules, We won't have to take the time to commute to the university to attend classes, or if we like it, we may even be able to watch lecture videos on our phones while traveling by train. Alex: I understand your opinion, but didn't you have any technical problems? Mike: I only had a few. Besides, most of the professors posted recorded videos of lectures after class. So, I watched the recordings when I missed some parts. Furthermore, I could study at my own pace and the videos allowed me to digest what I had learned. Alex: That's a good point, but it had an adverse effect on my learning. Mike: How? Alex: I started skipping my online classes because I thought I could just watch those recorded videos later. So, just before exams, I had so many videos to watch. Mike: Maybe, traditional classroom settings might be better for people like you. Alex: I think so. Oh, it's time to go to class. Mike: Oh, yeah, have a good day. Alex: You too! 問1 NOTES Topic of the conversation: ( 2 ) Standpoint Basis Mike (3) (5) Choose the best one to complete blank 1. 7 because cruel clever I kind 2 Choose the best title to complete blank 2. 7 How to get good results at university Technical issues in online classes Safe remote learning at home I Online learning or learning face to face Alex ( 4 ) (6) -11- 18

わからないので、よろしくお願い致します。

31. The earlier versions of the accounting software were considered difficult to this latest version is meeting use, with favorable reactions from users. (A) as though (B) whether (C) whereas (D) despite 32. Malcolm Webb --- - from Hartford Associates last week, after working there for over 30 years. (A) was resigned (B) is resigning (C) has resigned (D) resigned ------- (A) primary (B) primarily BOD (C) primer (D) priming AB A B C D 33. Although ProView software is ------- for word processing, it has excellent photo editing capabilities. ABOO

数2です。 係数が虚数の二次方程式の問題です。解と係数との関係を使って解きたいのですが、上手く出来ませんでした… どこが間違っているのか教えて欲しいです！

例題 30 係数に虚数を含む2次方程式の実数解 kを実数とする。xの2次方程式 (1+i)x+(k + 3i)x +6 +2ki = 0 が実 数解をもつときkの値、およびこの方程式の解を求めよ。 思考プロセ 係数に虚数を含む2次方程式では,「実数解をもつ⇔D≧0」としてはいけない。 例 2次方程式xix=0 は、x(x-i) = 0 より x = 0, i ← 実数解をもつ ところが D = (− i)² = −1 <0

(4)を訳したいのですが、文構造が分からずうまく訳せません、。どなたか解説をお願いします。

lo One fast-food company is well known in Japan for its extensive worker manual and the sales talk it covers. From the book, workers learn how to greet a customer, how to bow, how to take an order, pack a bag and give correct change. 5 Customers find the same nice service in all the franchised outlets, which contributes to both customer satisfaction and *corporate profits. One day, a mother came into one of these restaurants, and while she was ordering at the counter, her baby grabbed an 10 employee's hat and began to play with it. He was surprised and embarrassed. He could not concentrate on what the customer (2) was saying and had to ask her to repeat her order twice. He knew he was losing his dignity as a company representative by having an infant tearing up part of his uniform, and he wanted to 15 take it back, but at the same time he didn't know what to say or do. He stood there ( 3 ) until the mother *retrieved the hat and gave it back to him. He put it on again, resumed his normal calm attitude, and took her order efficiently as if nothing had happened. But everyone in the restaurant could see that a 20 one-year-old child had the power to bring the operation to a halt and must have wondered about it. What was the problem here? Simply put, the manual, detailed as it may be, fails to cover what to do in a situation where a young child steals part of your uniform. And without the manual to guide his behavior, the employee was lost. This is a trivial example of a very serious problem in Japan: the inability to 48

数学数列　 画像の四角で囲ったところのように変形するのはありですか？無しであればその理由を教えてください。

「つ」 306 308 数学的帰納法 〔3〕 ... 不等式の証明(2) 4以上の整数とするとき, 数学的帰納法を用いて次の不等式を証明せよ。 2" <n! 自然数nについての等式、不等式の証明は数学的帰納法を考える。 味の言い換え [1] n=4のときに ① が成り立つことを示す。 ( ① の左辺) (①の右辺) [2] 「n=kのときに ① が成り立つと仮定すると, n=k+1 のときにも ① が成り立つ」 ことを示す。 n=kのときの不等式 2 < h! が成り立つと仮定。 ⇒n=k+1のとき n=4 をそれぞれに代入して (左辺) (右辺) を示す。 (k+1)! -2k+1 = (k+1)k!-2k+1 > (k+1)-2+1 = ... > 0 仮定の利用 <<Action 数学的帰納法では,n=k+1 のときの式の複雑な部分に仮定の式を用いよ [1] n=4のとき (左辺) = 24 = 16, (右辺)=4!= 24 左辺) (右辺)であり, ① はn=4のとき成り立つ。 [2] n=k(k≧4) のとき, ① が成り立つと仮定すると 2<k! n=k+1 のとき (右辺) (左辺) (k+1)! - 2k+1 = = (k+ 1)k! - 2k+1 > (k+1)22k +1 =2^{(k+1)-2} k≧4であるから nは4以上の整数である。 =2(k-1) 2^(k-1)>0 2k+1 < (k+1)! よって ゆえに, ① は n =k+1 のときも成り立つ。 [1],[2] より,4以上のすべての整数nに対して成 り立つ。 4以上の整数について命 題が成り立つことを証明 する場合は,まず [1] と してn=4のとき成り 立つことを示す。 特訓 2 例題 306 (右辺) (左辺) > 0 を示 す。 仮定した不等式を用いる ためにk! をつくる｡ (k+₁) £! - (2² > (E11) 21-1-2 (7-1) £! 308nが4以上の整数とするとき, 次の不等式を証明せよ。 3n > n³ ... 1 6章 化式と数学的帰納法 条件 k≧4 を忘れないよ うにする｡ 18 (宇都宮大) p.519 問題308 509

数１の問題です （1）で「√２が無理数であることに矛盾する」の後にb=0を導き出せるのかが分かります よろしくお願いします🙇

例題 55 背理法による証明 〔2〕即痛さも [2]] 思考のプロセス α, bを有理数とするとき、 次の問に答えよ。 ただし,√2が無理数であ ことを用いてもよい。 (1)a+6√2=0 ならば a = 0かつ6=0 であることを示せ。 α(1+√2)+b(2-√2)=4+√2 を満たす α, bの値を求めよ。 (2) (1) 「a+6√2=0」から直接「α = 0かつ6=0」 を導くのは難しい 背理法 目標の言い換え矛盾をどこから導くか? を用いることに注意すると 条件 「 √2=-1と変形して(無理数) = (有理数)となり矛盾」としたい。 ■ 「α≠ 0 または 60」を仮定する必要はなく、 「60」 を仮定するだけで十分。 Action » 結論が 「p かつα」の背理法は, (またはg) のみを仮定せよ 解(1) 6≠ 0 と仮定する。a+b√2=0 より √2 (2) a a,bが有理数であるから, -1 は有理数である。 b これは,√2が無理数であることに矛盾する。 よって b=0 これをa+6√2=0 に代入すると したがって, α, 6 が有理数のとき 2 = a=0 a +6√2=0 ならば α = 0 かつ b = 0 alld 1/0 ★☆ b 結論の一部 b=0 して矛盾を導く。 (有理数) ÷ (0 でない有 = (有 b = 0 のみを仮定 矛盾を導いたのであ ら,得られる結論 のみである。

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☐ 11. It ( ) you good. 2 lay バ 9. You look so tired. A week in Hawaii will ( 1 do 2 feel 3 make 4 turn 10. Joe's brave action ( ) him his life. 1 cost 2 missed 3 happened 4 killed ) light about 8 minutes to go from the sun to the earth. brings 2 needs 3 requires 4 takes 12. They ( ) me 10,000 yen for repairing my bicycle. priced 2 cost 3 spent 4 charged 13. I've already paid back what I () him. 1 received (2 lent 3 counted 4 owed 14. Global food prices have ( 1 raised ) sharply due to high biofuel demand. 3 risen 2 arisen 4 been arisen 15. My little brother ( ) down for a nap after a big lunch. 4 lied 3 lays 1 laid 9. 動詞の語法 ②

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o use efties their ness d by und Target Vocabulary Match each word with the best meaning. 1. analyze confident creative easy-going nervous outgoing personality project psychology smoothly 2. 3. 4. 5. 6. 7. 8. 9. 10. a. worried or afraid of something in the future b. friendly and social c. carefully study and then describe, usually in research d. without strong opinions; flexible and relaxed e. a job; an assigned task f. sure of one's ability or success g. the actions, thinking, and emotions that describe a person h. able to imagine or make new things i. the study of the mind j. without sudden stops and starts Music and Dance

青ペンで丸をつけた「still」について質問ですが Stillには「しかも」 と言う意味の使い方があるんですか？？

performs actions that ne say (2) (3) (4) impossible is almost insulting. How can you remember everything the instructor says you 10 have to remember? Bend your knees. Look down the hill. Keep your weight on the downhill D ski. Keep your back straight, but nevertheless lean forward. The lectures seem endless how can you think about all that and still ski?