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TOEIC・英語 大学生・専門学校生・社会人

教科書の英文の和訳をお願いしたいです。 分からない単語(赤で記入)を調べても 自分の中で和訳ができません…。 授業内で発表など色々あって、そこで 間違うのが怖いので和訳をお願いしたいです…🙇‍♂️

なす多 What is holism()? The medical professional's view of human beings influences. the planning and care provided to patients. For years, the health 従事者 長いp て 提供れる。 care community considered bódy and mind as separate entities, er year Now, it is believed that caréPHOViders need to yiēw an individual s をのてaなす 明電 @ 体的に、ああを as a whole, complete person, not as an assémbly of distinct párts. Viewed in this light, any distúrbance in one part is a disturbance of the whole system, the whole being. Therefore, health care pro- の 体のれれ fessionals must consider how the part of an individual under た下にある concern) relátes to all others and also consider the inferaction 10 and relationship of the individual to the external environment. This view is called holism, a holistic view of humans. :生物じ理、社年的が Humans are an open biòpsychósocial systenm with many inter- めま 提供する: related subsystems. In'brder to ptovide appiopriate healthcare based on a patient's needs, healthcare professionals must focus 15 on the interrelated needs of body, mind, emotion, and spirit. Abraham Maslow's® theory It was Abraham Maslow's human needs théory that offered the frámework for holistic health care. His model includes both 、操供 る的 生理的 心鶏的 怪える 良々に」 physiologic) and psychologic needs, which he arfánges in Order of importance from those essential for phiysical sufVival to those necéssary to develop to the füllest human potential9 Lower-level 20 心体 週不可欠 needs must be met to some extent before higher-level needs can スリ組た、@か。 be addressedio An individual usually persists in trying to meet a 場たす need until it is met. If a need goes unmet, physical disòrders, 25 psychological“imbalance, or death can Maslow's five categories of needs, in hiefarchical order. O Physiologic needs: air, food, water, shelter, rest and sleep, and temperature maintenance) eSáfety and secúrity needs: the need to be safe and to feel 30 OCCur. Below are 野屋eカラーを 所 safe, both in the physical environment and in human rela- tionships; 8 Loye and belónging" needs: the need for giving and receiv- ing love and the need for feeling that one atains®) a place in 所属(優) (7) 脅け人れ a group; OSelf-esteem needs: self-esteem® (feelings of indépéndence, Cumpetence, and self-respect) and estéém from others Toidon 自等 35 独立性 身する

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TOEIC・英語 大学生・専門学校生・社会人

70の問題の回答がなぜDになるのかが分かりません。 因みにTOEICのリスニング問題のPart3です。

68. Who is the man? M It's such a pleasure to finally meet you, Olivia. As coordinator of this year's international trade conference, thank you for Transportation modes and how they can affect your supply chain"(B) An event coordinator accepting our invitation to lead one of our sessions. Saturday, November 19 10:00 am - 12:00 pm (A) An expert in international trade Sponsored by Dupree Logistics - Drew Flint, Senior Partner (C) A trade representative (D) An owner of an agency Room 101 W The pleasure is mine, Ruben. Our agency is always happy to have representatives 12:00 Noon - 1:15 pm 69. What has the woman agreed to do? (A) Lead a conference session (B) Conduct an interview (C) Schedule an appointment (D) Accept a new position Lunch participate in your conference. Witon Hotel - Wolfgang Puck's Spoon M As requested by your assistant, Jamie, your session has been scheduled for the afternoon of November 19. Ilf you check the schedule, you will see the title of your presentation listed in the last time slot on that day. 1:30 am - 3:00 pm 「Asia: A strategic approach to effectively developing and executing your Asian marketing plan" Sponsored by Blackbox Associates - Olivia Ingersol, Chief 70. Look at the graphic, Who does the woman Operating Officer Room 102 work for? 3:15 pm - 4:00 pm Closing Ceremony Wisconsin Center Ballroom (A) DuPree Logistics (B) The Witon Hotel (C) Wolfgang Puck's Spoon (D) Blackbox Assodiates W Thank you very much, and I'l see you at the conference.

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数学 大学生・専門学校生・社会人

 リヤプノフ関数を用いた微分方程式系の安定性解析について勉強をしています。 写真の問題のうち、問23.1の(1)及び問23.2の(3)の解き方が分からないので教えて頂けますと幸いです。原点が中心、半径がルート3の円が不変集合になる理由も併せてお願い頂けるとありがたいです。よ... 続きを読む

23. リヤプノフ関数と安定性* 108 間 23.2 微分方程式系 dy =ーC dt (12) da =リー(=/3-2), (μ は負定数) dt について,次の間いに答えよ。 (1) V(r,g) = (z° +y°)/2 とする. このとき V12) (z,4) を求めよ。 (Ans. -μ(z°/3 -1)a?) (2) (12) の平衡点 (0,0) は安定であることを示せ。 (3) [研究] 点 (o,Yo) が (2o)? + (yo)? <3 を満たすとする. このとき, (zo,10) を通る解はt→8とすると (0,0) に収束することを示せ。 (ヒント. E={(0,9) : -0 <y < 8} であることに注意し, LaSalle の不変原理 と呼ばれる結果(下記参照) を適用する.) 【参考) RT 内の集合 Mは, 任意の co E Mに対し, zoを通る (2) の解が常に M に留まるな らば (2) に対する不変集合と呼ばれる。 LaSalle の不変原理 V(z) (zE S) は (2) のリヤプノフ関数とする. このとき, S 内に留まる(2) の有界解は, t→ o とするとき E:={ueS:Vg)(z) =D 0} に含まれ る(2) の最大不変集合に近づく

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数学 大学生・専門学校生・社会人

問題としてはこのURLのやつでexercise2.2.9の問題です。 2.2.9. Define T : ℓ^2(Zn ) → ℓ^2(Zn ) by (T(z))(n) =z(n + 1) − z(n). Find all eigenvalues of T.... 続きを読む

16:22マ l 全 の Exerc: 164/520 matrices, convolution operators, and Fourier r operators. 2.2.9. Define T:l'(Zn) - → e°(ZN) by ニ Find all eigenvalues of T. 2.2.10. Let T(m):e'(Z4) → '(Z) be the Fourier multipliei (mz)' where m = (1,0, i, -2) defined by T (m)(2) = i. Find be l(Z4) such that T(m) is the convolutior Tb (defined by Th(Z) = b*z). ii. Find the matrix that represents T(m) with resp standard basis. 2.2.11. i. Suppose Ti, T2:l(ZN) → e(ZN) are tra invariant linear transformations. Prove that th sition T, o T, is translation invariant. ii. Suppose A and B are circulant NxN matric directly (i.e., just using the definition of a matrix, not using Theorem 2.19) that AB is Show that this result and Theorem 2.19 imp Hint: Write out the (m + 1,n+1) entry of the definition of matrix multiplication; compare hint to Exercise 2.2.12 (i). iii. Suppose b,, bz e l'(Zn). Prove that the cor Tb, o Tb, of the convolution operators Tb, and convolution operator T, with b = 2 bz * b.. E Exercise 2.2.6. iv. Suppose m,, mz € l"(Z). Prove that the cor T(m2) ° T(m) and T(m) is the Fourier multiplier operator T) m(n) = m2(n)m」(n) for all n. v. Suppose Ti, T2:l"(Zw) → e'(Zn) are linear tra tions. Prove that if Ti is represented bya matri respect to the Fourier basis F (i.e., [T; (z)]F =A Tz is represented by a matrix Az with respect t the composition T20T, is represented by the ma with respect to F. Deduce part i again. Remark:ByTheerem 2.19, we have just proved of the Fourier multiplier operat Aresearchgate.net - 非公開

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