英語長文の和訳問題です。 1枚目は問題、2枚目は回答になります。 ④の(for example〜...)や最後の文の(as opposed to〜...)のように、括弧で表されている文章が和訳をする時にどの位置に入るのかを見分ける方法を教えていただきたいです。 括弧で表... 続きを読む

is more open to bias than direct observation, however. Of particular concern)are social desirability effects, which occur when some people try to present themselves in a favorable light (for example, by saying that they exercise more than they actually do). Still, the survey method has produced many important results. For example, before (Masters and Johnson conducted their research on the human sexual response, most of the available information on how people behave sexually (as opposed to how laws, religion, or society said they should behave) came from

最後のd^2からdを考える際、X=3はそのままなのに、18は3‪√‬2になっているのは何故ですか？

18 基本 例題 67 最大 座標平面上で,点Pは原点Oを出発して, x軸上を毎秒1の速さで点 (6,0 0まで進む。この間にP, Q間の距離が最小となるのは出発してから何秒後 まで進み,点Qは点Pと同時に点 ( 0, -6) を出発して,毎秒1の速さで原点 か。また,その最小の距離を求めよ。 CHART & SOLUTION 基本 t秒後のP, Q間の距離をd とすると,三平方の定理からd=f(t) の形になる。ここで f(x)の最大・最小 平方したf(x) の最大・最小を考える d0 であるから,d=f(t)が最小のときdも最小となる。 解答 0≤1≤6 出発してからt秒後のP, Q 間の距 離をdとする。 P, Qは6秒後にそ れぞれ点 (6,0), (0, 0)に達するか ・① ら YA 6 x このとき, OP=t, OQ=6-t であ るから,三平方の定理により d2=12+(6-t)2 =2t2-12t+36 =2(t-3)2+18 tのとりうる値の範囲。 点Qのy座標は t-6 基本形に変形。 ① において, d は t=3 で最小値18 をとる。 d0 であるから,dが最小となるときdも最小となる。 よって, 3秒後にP,Q間の距離は最小になり,最小の距離は √18=3√2 軸t=3は①の範囲内。 この断りは重要! INFORMATION dの大小はdの大小から 例題では,d=√2+62 の根号内の a2+62 を取り出して まずその最小値を求めている。 これはd>0でd が変化す るなら, dが最小のときも最小になるからである。 右のグラフから, 大B2 (x≥0) d² A2 A≥0, B≥0, d≥0 * Ad≤B A²≤d²≤B² つまり,d≧0 のときdの大小はdの大小と一致する。 0 Ad B X 小 大

数学 答えと違うやり方でやった（二枚目）のですが、良いのでしょうか？k＝1のときを考えてないからダメだと思いますが。。

要 例題 43 虚数を係数とする 2次方程式 00000] xの方程式(1+i)x2+(k+i)x+3+3ki = 0 が実数解をもつように,実数k の値を定めよ。 また, その実数解を求めよ。 CHART & SOLUTION 2次方程式の解の判別 (x-6)=(+x)([+x) (£) ひとすると 基本 38 73 判別式は係数が実数のときに限る DOから求めようとするのは完全な誤り(下の INFORMATION 参照)。(ど)。 実数解をαとすると (1+i)μ2+(k+i)a+3+3ki=0 RBORONE ns-e+x(S-D) (1) 2章 6 この左辺をa+bi (a, b は実数) の形に変形すれば, 複素数の相等により (1) a=0, 6=0 α, kの連立方程式が得られる。 る。 .... 解答 NEDOZEURS-50-DE) to (S) 方程式の実数解をα とすると 整理して (1+i)a2+(k+i)a+3+3ki=0 (a2+ka+3)+(α2+α+3k)i=0 x=α を代入する。 a+bi=0 の形に整理。 α kは実数であるから, a2+ka+3, a2+α+3k も実数。この断り書きは重要。 よって ①② から ゆえに よって Q2+ka+3=0 _Q2+α+3k=0 ...... 2 (k-1)a-3(k-1)=0 (k-1)(a-3)=0 複素数の相等。 ← α を消去。 infk を消去すると k=1 または α=30= (L-n) + α-22-9=0 が得られ, [1] k=1のとき ① ② はともに α2+α+3=0 となる。 因数定理 (p.87 基本事項 2 ) を利用すれば解くことがで きる。 これを満たす実数 αは存在しないから、不適 [2] α=3 のとき ① ② はともに 12+3k=0 となる。 ゆえに k=-4 RS ←D=12-4・1・3=-11<0 ①:32+3k+3 = 0 ②:32+3+3k=0 [1] [2] から求めるkの値はk=-46 実数解は x=3 2次方程式の解と判別式 INFORMATION 2次方程式 ax2+bx+c=0 の解を判別式 D=62-4ac の符号によって判別できる のは a, b c が実数のときに限る。 例えば, α=i, b=1,c=0 のとき 62-4ac=1>0 であるが, 方程式 ix'+x=0の解 はx=0, i であり、 異なる2つの実数解をもたない (p.85 STEP UP 参照)。 PRACTICE 43° 0-6040-0 の方程式 (1+i)x²+(k-i)x-(k-1+2)=0 実数解をもつ #th to a litt

マーカーの部分を教えてください

08 基本 例題 65 最大・最小の文章題 (2) 0000 座標平面上で、点Pは原点Oを出発して、x軸上を毎秒1の速さで点(6 まで進み、点Qは点Pと同時に点(一般)を出発して、毎秒1の速さで 0まで進む。この間にP,Q間の距離が最小となるのは出発してから何 か。 また、その最小の距離を求めよ。 CHART SOLUTION 解答 ✓f(x) の最大・最小はf(x)の最大・最小を考える 基本 t秒後のP,Q間の距離をd とすると, 三平方の定理からd=f(t) の形にな る。ここでd> 0 であるから,d=f(t)が最小のときdも最小となる。 出発してからt秒後のP, Q 間の距離 を dとする。 P, Qは6秒後にそれぞ れ点 (6,0,0,0)に達するから 0≤t≤6 ...... ① このとき, OP=t, OQ=6-t である 6- TUAN JS x ◆ tのとりうる値の範囲 点Qのy座標は t-6 から, 三平方の定理により -6 d=t+(6-t)2=2t-12t+36 =2(t-3)2+18 よって、①の範囲の tについて, d2 は t=3で最小値18 をと る。 d> 0 であるから,このときも最小となる。 ゆえに、3秒後にP, Q間の距離は最小になり、 最小の距離は 18=3√2 である。 ◆軸t=3は①の範囲内 この断りは重要! 81-38 INFORMATIONdの大小はdの大小から らdが最小のときも最小に 右のグラフから ずその最小値を求めている。これはd>0でdが恋 例題では,d=√2+62の根号内のα+62 を取り出して,ま y Lv=5

この基礎問題の答えを教えていただけると嬉しいです😭😭😭マナビスのクリニックテストです

河合塾マナビス 学力チェックテスト 英語 1 次の英文の空所に入れるのに最も適当なものを,それぞれ1つずつ選べ。 1. Fish doesn't ( ) well in summer. 1 hold 2 keep 2. If I ( (1) was (2) were 3 last ④ stand ) in your place then, I would have refused. 3 had been ④have been 3. He always returns home early ( ) after his dog. 1 look 2 looked 3 looking 4 to look 4. Ask for ( ) you think you may need. 1 how 2 whatever ③ which ④why ) I came to find it. ① the more interesting 5. The more I studied Roman history, ( 2 the more interest ③ the more interested in ④ the more interested 2 日本文の意味に合うように、 与えられた語句を並べ替えよ。 6. 議長は,日本の女性労働者の現状について報告を受けることを切に望んだ。 The chairperson earnestly ( ) ( ) ( ) ( ) situation of Japanese female employees. ( ) ( ) ( 1 be 2 desired ③ informed 5 the 6 to ⑦present ④ of )

この6つの一般項を求めないさい。 という問題です。 途中式と答えをお願いします。🙏🏻

Date 3 2 ①α₁ = 1 aut = An An³ +6 h² + 2n+3 2) a₁ = -27 antl = 3an +60 3 α = 5 Auti = 3an + 2h+1. an 4 a₁ = 2 anti = 2an+3 ち a = 6 Anti -30h = -6u+3 ⑤α₁ = 20 Auti = An- 1 (Aut) (An+5)

この英文をもっと簡単に小学生でも伝わるように書き換えて頂きたいです🙇🏻‍♀️🙇🏻‍♀️

I'll introduce Mitsuami to you. 〔知語以上、現在完了をどこかでイラ!] 入れられないように It has three different meanings. The specific meaning of the knotis. Three string like pieces tied alternately. するために The source of knot logic in mathematical formulas. The history of Mitsuami is mainly. It has been around since the Joman period. but began in earnest during the Meiji period. It was was also papular because it met with Kimonos

写真の黄色い線の部分の文構造を教えていただきたいです🙇 また、 ①ifは「ーかどうか」で訳していいのか ②thisは何を指しているか ③itは何を指しているか も教えていただきたいです。 よろしくお願いします💦

Phil Hello. This is 6 Minute English from BBC Learning English. I'm Phil. Beth And I'm Beth. Phil So, Beth, we're talking about the best education systems in the world today. You went to school here in Britain. What do you think of the British education system? Do you think it could be the best? Beth I think that it's quite good, there's probably a couple of things that I personally would change about it, but I would say it's quite good, but maybe not the best in the world. Phil Well, in this programme, we're going to be talking about the Pisa rankings. Beth The rankings are based on tests carried out by the OECD, that's an international organisation, every three years. The tests attempt to show which countries are the most effective at teaching maths, science and reading. But is that really possible to measure? Well, here is former BBC education correspondent Sean Coughlan talking to BBC World Service programme 'The Global Story'. Sean Coughlan When they were introduced first of all, that was a very contentious idea, because people said 'how can you possibly compare big countries... how can you compare America to Luxembourg or to, you know, or to parts of China, or whatever?' Phil Sean said that the tests were contentious. If something is contentious, then it is something that people might argue about it's controversial. So, at first, Pisa tests were contentious because not everyone believed it was fair to compare very different countries. Beth Phil, I've got a question for you about them. So, in 2022, Singapore was top of the reading rankings. But which of these countries came second? Was it: a) The USA? b) Ireland? or, c) The UK? Phil I think it might be b) Ireland. Beth OK. Well, we will find out if that's correct at the end of the programme. A common pattern in the Pisa rankings is that the most successful countries tend to be smaller. Talking to BBC World Service programme 'The Global Story', Sean Coughlan tells us that many large countries from Western Europe don't score that highly in the rankings. Sean Coughlan They're being outpaced and outperformed by these fast, upcoming countries - you know, Singapore, or Estonia, or Taiwan, or those sort of places which we don't historically think of as being economic rivals, but I suppose the argument for Pisa tests is, if you want to have a knowledge economy, an economy based on skills, this is how you measure it. Phil We heard that many large European countries are being outpaced by smaller nations. If someone outpaces you, they are going faster than you - at a higher pace.

Please print out the attached form, have Ms. Nester complete and sign it, and then return it to us. は「添付いたしました書式を印刷し、ネスターさんに記入、署名していただいたう... 続きを読む

下から15行目のthrow whichのthrow とはなんですか？

y II Day 12 15 5 Negro Leagues Baseball was a collection of major and minor-league baseball leagues that were the first to showcase black team sports on intertwined with the African American and American experience not only a national scale. Launched in 1895, the leagues, as with jazz, became as a cultural element, but as a lucrative business endeavor. team The leagues were not under central management, and schedules and composition League, were changeable from season to season. Appearance and disappearance of leagues was common: the National Colored Baseball for instance, collapsed after only two weeks of operations. Latins, especially Cubans, were also a significant presence on teams. In these ways, the Negro Leagues were quite similar to their white counterparts which would eventually consolidate into Major League Baseball. Blacks near the beginning of the 20th century had only a fraction of whites' purchasing power, so the emergence of the Negro Leagues might have seemed unlikely. However, the Negro Leagues had two main draws that accounted for its business success. The first was a deep reserve of athletic talent. After blacks were formally excluded from white leagues in the 1880s, the Negro Leagues were the sole organization through which black players could work professionally. The quality of Negro Leagues 20 players was high, and substantiated through exhibition matches between Negro Leagues and Major League teams: over the years, both had their fair share of wins and losses in these matches. Another reason for the success of the Negro Leagues was an increasingly affluent black fan base. Driven by American industrialization, blacks were concentrating in major cities such as New York City, Chicago, and Atlanta. Usually barred by custom-and in the South by law-from attending many white entertainment outlets, blacks turned to Negro Leagues games. As a result of these factors, by the 20th century the Negro Leagues were earning a combined millions of dollars. This profitability ended with the desegregation of Major League Baseball. Black fans began attending Major League games, starving the Negro Leagues of its core revenue source. By 1951, the Negro Leagues had ended, although a succession of black star athletes in the Major League had begun.