英語のdueとwillの違いを教えて頂きたいですm(_ _)m どちらも未来の予定を意味するみたいです。

オーレックス英和辞典 (第2版) LEX due /dju:/ 同音語 dew) 形名副 中心義当然そうあるべき 一形比較なし 1 叙述 a(...日[時]に) 予定された, 到着予定の The train is due in ten minutes. 列車はあと10 分で到着する予定だ I think the director is due back soon.\所長は じきに戻って来ると思います When is her baby due? 彼女の出産はいつの予 定ですか The report is due out soon. その報告はもうす ぐ発表される予定だ b〈...する〉予定 [約束]で, <...する〉はずで〈to do〉;〈...を〉予定されて,当然 <...の〉はずで <for〉 She is due to be promoted. = She is due for a promotion.彼女は昇進するはずだ The trade center is due to open next month.\ 貿易センターは来月開館することになっている We're due for some snow.\雪になるはずだ

下線部（1）の文構造が分かりません。特に2行目の文構造が分かりません。強調のdoであることは分かりますが、その後のthat以降が関係詞？かすらも分からないので、誰か教えて下さい！

次の英文は1991年に出版された本からのもので、 研究分野としての「人工知 能」 (Artificial Intelligence) について述べています。 下線部(1)~(3)を日本語に訳 しなさい。 What is Artificial Intelligence (AI)? Just about the only characterization of Al that would meet with universal acceptance is that it involves trying to make machines do tasks which are normally seen as requiring intelligence. There are countless refinements of this characterization: what sort of machines we want to consider; how we decide what tasks require intelligence and so on. One of the most important questions concerns the reasons why we want to make machines do such tasks. AI has always been split between people who want to make machines do tasks that require intelligence because they want more useful machines, and people who want to do it because they see it as a way of exploring how humans do such tasks. We will call the two approaches the engineering approach and the cognitive-science respectively. (2) (1) approach The techniques required for the two approaches are not always very different. For many of the tasks that engineering AI wants solutions to, the only systems we know about that can perform them are humans), so that, at least initially, the obvious way to design solutions is to try to mimic what we know about humans. For many of the tasks that cognitive-science Al wants solutions to, the evidence on how humans do them is too hard to interpret to enable us to construct computational models, so the only approach is to try to design solutions from scratch" and then see how well they fit what we know about humans. The main visible difference between the two approaches is in (3) their criteria for success; an engineer would be delighted to have create something that outperformed a person; a cognitive scientist would regard it as a failure. -1- M7 (492-61

''The first bad news to greet him.when he walled in was that the car battery was dead.'' この文の主語と補語を教えてください🙇🙇 主語はbad newsだけでいいのか、to greet以... 続きを読む

The first bad news to greet him (when he walked in was that the car battery was dead. S ✓ C V

空所補充問題です 文章全体読まないとわからない問題であれば教えてください It was the pump that circulated blood () their bodies. of か through で迷いました。 答えはthrough です ofだったら、... 続きを読む

多様体を構成するために、位相空間に完全アトラスを導入するところで質問です。 完全アトラスを導入するメリットとして、この文章の下線部を「異なる座標系を用いたのに同じ計算ができてしまうという問題が解消される」解釈したのですが、そこがよくわかりません。座標系を変えて計算する... 続きを読む

1 Two n-dimensional coordinate systems & and ŋ in S overlap smoothly provided the functions on¯¹ and ŋo §¯¹ are both smooth. Explicitly, if : U → R" and ŋ: R", then ŋ 1 is defined on the open set ε (ur) → ° (UV) V and carries it to n(u)—while its inverse function § 4-1 runs in the opposite direction (see Figure 1). These functions are then required to be smooth in the usual Euclidean sense defined above. This condition is con- sidered to hold trivially if u and do not meet. Č (UV) R" Ĕ(U) n(UV) R" S n(v) Figure 1. 1. Definition. An atlas A of dimension n on a space S is a collection of n-dimensional coordinate systems in S such that (A1) each point of S is contained in the domain of some coordinate system in, and (A2) any two coordinate systems in ✅ overlap smoothly. An atlas on S makes it possible to do calculus consistently on all of S. But different atlases may produce the same calculus, a technical difficulty eliminated as follows. Call an atlas Con S complete if C contains each co- ordinate system in S that overlaps smoothly with every coordinate system in C. 2. Lemma. Each atlas ✅ on S is contained in a unique complete atlas. Proof. If has dimension n, let A' be the set of all n-dimensional coordinate systems in S that overlap smoothly with every one contained in A. (a) A' is an atlas (of the same dimension as ✅).

解答と出来れば解説をお願いしたいです

3 次の設問 A、Bに答えなさい。 A 次の会話が成り立つように、( )内の語 () を適切に並べ替えなさい。 ただし、文頭に 来る語も小文字にしてある。 1. A: Guess what? I met John yesterday for the first time in ten years. Never (dream / seeing / I / of / at / did / him) Imari station. B: Is that so? Good for youl 2. A: Welcome back, Kathy. Take off your coat, first. coffee? Would you like some snack and B: Well, I would(if / could / appreciate / help/you/it/me) with some baggage downstairs. 3. A: How was the project you were talking about the other day? B:(gave / advice / to / the / thanks / you / me), that was so successful. 4.A:How much (your computer / have / it / to / repaired / cost / did)? B: It cost 20,000 yen. I regret spilling coffee on the keyboard. 5.A:If (had / your / not / help / it / been / for), I wouldn't have succeeded in the presentation. B: It's my pleasure. B 次の会話文の下線部(1)、(2)を英語に直しなさい。 A: 学校で授業がなかった間、君はオンライン授業を受けたそうだね。 How was it? B: Well, it worked better than I had expected, but my eyes were so tiring. (2) 私はやっぱり友達や先生たちと直接コミュニケーションを取った方がいいな。 A: I know what you mean.

英語の問題です 解答と出来れば解説をお願いしたいです

えなさい。 1. I can't stand it anymore! Tom is always lazy at work, but he earns ( 2 次の各文の( )内にあてはまる語(旬)をア~エの中からそれぞれ1つずつ選び、記号で答 ) I do. ア as nearly much as イ more nearly than nearly as much as エ nearly more than 2. Since this wine glass can break easily, please handle it with ( ). ア trouble 1 danger ウ care I. ease 3. Smoked salmon is delicious ( ) salad. ア when eaten with with when eaten イ when eating with I with when eating 4. It's been ( ) a long time since I started to practice playing the guitar. ア much 1 pretty ウ quite I SO 5. "It's very cold today." "Yes, but ( ) so cold tomorrow." 7 I don't think it イ I think not I think it will be not I I don't think it will be 6. A "Kate won't be able to come to the party tonight? Why not?" B: "Well, she says her son has caught a cold and she ( ) care of him." ア should have taken イ must have taken I will have been taking ウ will be taking 7. Not ( ) which course to take, I decided to ask my teacher for advice. 7 being known イ to know ウ known I. knowing

この問題の答えは(D)be translated なのですが、なぜare translatedにならないのですか？

6. 人 VER To apply for a patent, several countries still require that all documents ------- into their own languages. (A) translate under lets) atiumbe wen pi (B) are translating (C) translated (D) be translated ebian

（2）の考え方を教えていただきたいです。 内積0を使うのかな？という検討はつきましたが、条件で与えられているベクトルをどのように扱えばいいか分からなくなってしまいました。

第1問 R3を3次元実列ベクトル全体の集合, I 3×3 を3×3 の実行列全体の集合とする. 1, 12, 73 ∈ R3は一次独立な単位長ベクトル, 4∈R3は n1, 2, ng と平行でない単位長ベクトルとす る.また,正方行列 A, B を 4 A= - 2 B = Σnin T \\n-n i=1 とする.ここで, XT, æT はそれぞれ行列 Xの転置行列とベクトルæの転置ベクトルを表 す。 以下の問いに答えよ。 (1)Aの階数が3となるような 4 に関する条件を求めよ. (2) 3次元ユークリッド空間において以下の3つの条件を満たす4つの平面 II = {æ ∈ R3 | new - d = 0} (d は実数, i = 1, 2, 3, 4) を考える (i) A の階数は3であ る, (ii) Ω = {æ ∈R3 | new-d≥0, i = 1, 2, 3, 4} が空集合ではない, (iii) II (i = 1, 2, 3, 4)に接する球C (⊂ Ω) が存在する. このときCの中心の位置ベクト ルをベクトルuER を用いて A-1u の形で表す. d (i = 1, 2, 3, 4)を用いてuを 表せ. (3) B が正定値対称行列であることを示せ. (4)4つの平面 {æ∈R3|nex-d=0} (dは実数, i = 1, 2, 3, 4) への距離の2乗和が 最小となる点P を考える. Pの位置ベクトルをベクトルver を用いて B-1 の形 で表す. ni, di (i = 1, 2, 3, 4) を用いて”を表せ. (5)13において点 Qi (位置ベクトルをER3とする)を通りに平行な直線をんとす る(i = 1, 2, 3). 任意の点R (位置ベクトルをy∈ とする) をんに直交射影した 点を R; とする.R の位置ベクトルを行列 Wi∈ R 3×3 を用いて y - Wi(y-æž) と表 す. I∈IR 3×3 を単位行列とする. (a) と I を用いて W を表せ. (b) WWWż を示せ. = (c)平面Σ = {ER3 | afx = b} を考える (a∈3は非零ベクトル, b は実数). 点SE∑はL, Iz, 13 への距離の2乗和を最小にする点である.n1, n2, n3 が互 いに直交するとき,Sの位置ベクトルをベクトルw∈3 を用いて aa ab I - w+ T ara の形で表す.ただし, は a,bには依存しないものとする. w を Wi, πi (i = 1, 2, 3) を用いて表せ. p. 1

この問題の構造式を教えていただきたいです

問12 次の図は、 分子式が C10H12O2 (分子量 164) であ 5 る化合物 C の 1H NMR (300MHz, CDCI3 溶媒中で測 定)、および IR (液膜) スペクトル図である。 また、 EIMS 測定では、基準ピークとしてm/z 149 が観測さ れた。 これらより、 化合物の構造式を書け。 なお、 1H NMR スペクトル図中には各ピークに相当するプロ トンの積分値を示してある。 1H NMR 2H 2H 2H ↑ (ppm) 8 7 6 5 IR 3750 2983 13C 3000 3H 2cm 3H IM H 1 0 C-O-CH I 1677 wwwwwwwtown wh 1750 1250 1000 (cm)