358の⑶ 写真に書いてるとこの式変形教えて欲しいです

108- 4 STEP I 2年B組 数Ⅱ 月 山本恵 (5) log3=log(√3)'=2 (6) log4= log(4)=log64*== (7) loga, 25= log() (8) log =-2 √-log-5=log 25+= 355 (1) log, (2x32)=log,64 =2 (2) 4x=log;=log;9=2 123 1 (3) 与式=logs =logs 300 x 60 与式 2 x 52 /25 12 2x3 log logs2+(2log: 5-2logs2-lov +(log,2+logs3) =log,5=1 356指針 log 9 Togs2 + log 8 log,2+ log,4\ log 9 log:2 + 3log,2)(log,2+2log,2) -2log,2 = 14 3log 2 log 3 log,25 log,8 log4 log:9 log:5 log 3 2log,5 3 3 2log 3 log,5 2 (1)2)3) と数が共通の自然数を3や5にそろえて計算してもよい。 底 a. の形で表せるとき、底がとなる 公式を用いる。 (4)56) 底をそろえて計算する。 3にそろえて計算すると次のようになる。) 1 log,25 log,8 log4 log,9 log,5 2log 5 3log,2 解答編 -109 360 (1) log,'''=log.²+log.y + log.< -2log.x+3log.y+4log. =2p+3q+4r (2) log log.x-log.y's (ya (3) log. -log,1-(log.+log.) log.x-(2log.y+2log.) -p-29-2r log.x+log,√√y-log. +log.y-log. =log.+ =(1+log15) log,5 数学Ⅱ STEP A・B、発展問題 (2) log15=logs=log 15-log3=1-a =log,5-=-4 =3logs (2×3)-log, (2²x3x52) -2logs(22x3x5) 1 log,32 log,25 = (1) log2 2log,2 2 361 log 8 log,23 =3(2log,2+logs3) 与式 (1) 底の変換公式で、 3にする。 1 -(2log,2+logs3+2logs5) logs log 3-1 -22log,2+ log,3+log,5) (2) log, log,9 =log, 10- log,10 log,5 log 32 =-4log,5=-4 (log,2+ log25) (log25 +10,5) log2+ log,5 log,5 (2) 真数について 5 とみて対数の性質 を利用する。 8 26 (3) 与式 logos log 125= logs 125 (22 -=logos 4 1 10g log,5 log,5-1 (? 1 (1) log2=- -log,5- log,5 log 2 log, 15 15 =log3-log,2-ab -log25- log,5 =log 14 = log( (4) log,3-log,2=log23- log22 =-2 与式 logos 13 23 -2logas 2x 13 (5) log,5-log,9=log35 log₂3 log,9 =1 log,5 (2) + logos 32 log,5=2 別与式 =(3logas 2-logas 13) (6) log,5-log,8=- log,5 log,23 -2(logas 2-logos 3) log222 log25= +(logas 2+logas 13-2logas 3) =2logos2=2log (1)-1 2 =-2 log, 18-log, 9-log: 357 (1) 左辺=log.b log.c log.b =log.c右辺 = log(2×5) log,(2x5)-log,5-log,2 =(log 2+ log25)(logs2+ log,5) -log,5-log,2 =(1+log,5X1+ log,2)-log,5-log.2 =1+log 2+ log,5+log25 log,2 -log25-log;2 したがって log,b log,c=log.c 1 18 39 log.clog.d log,a (2) = log.blog.blog.c log.d log b log,c log,d-log,a=! +1+1+log25-log,5-- =2 log25 =1+log25 log,2=1+log25 log25 =1+1=2 359 (1) log, 15 log2(3x5)=log23+log25 (2) log275 log2(3x52)=log,3+2log25 =a+b =a+2b log, (32x5) 2log 3+log:5 olog24 = =log,a=1=ti LABOT log (2×3)-log,3 358 (1) 与式 (log,2+2log,3)-log,3 log 3 + 1 log:4 + (3) log 45=- log,2= =(2108,3+ log 3 1 3 log 3+2log13) 2 2a+b ==a+2 => √2+10% W+10% (8) =log,3- 2 14 D log.33% 底を3にそろえて計算してもよい。 212+3+3 2 362 (1) 5=7 10+ 10+10=30 10-10-10-10-3-30 (3) 365-656-5 (4) 772-72 =(72)=49=2 log4-log-49-log:4=log,4 =log:2 LADOT 704-702-2 与えられた式をyとおき、両辺の対数をと って解いてもよい。 例えば,以下は (3) (3)の別解 y=36√ とおく。 6を底として両辺の対数を とると よって ゆえに log,y=log,√√5 log,36 log, y=2log,√5 log,y=log,5 したがって y=5 5章 指数関数と対数関数 第2節 対数関数 83- 対数関数 ■その性質 質 M, N は正の数で, a 1, 61, c1, p, kは実数。 nは自然数とする。 定義 d=Mp=logaM log.a=1. log,a=p loga 1-0, log.=-1 Dlog log. M+loga N, BaM Ba M log N =log. M-log. N *357 a b c d を1と異なる正の数とするとき 次の等式を証明せよ。 Jogab logic-logac 358 次の式を簡単にせよ。 (2) loga blog.c loged logaa=1 STEP (1) (log29+log. 3)(log2+log,4) (3) loga 10-log: 10-(log:5+logs2) B (2) log. 3-log. 25-log:8 359a=logz3. b=log 5 とするとき、次の式をαで表せ (3) 45

赤い下線のところがどういう構造になっているか分からないです、教えてくださいm(_ _)m

moving from " (1) 点) There are historians and others who would like to make a neat division between "historical facts" and "values." The trouble is that values even enter into deciding what count as facts-there is a big leap involved in 'raw data" to a judgement of fact. More important, one finds that the more complex and multi-levelled the history is, and the more important the issues it raises for today, the less it is possible to sustain a fact-value division. But this by no means implies that there has simply to be a conflict of prejudices and biases, as the data are manipulated to suit one worldview or another. What it does mean is that the self of the historian is an important factor. The historian is shaped by experiences, contexts, norms, values, and beliefs. When dealing with history, especially the sort of history that is of most significance in philosophy, that shaping is bound to be relevant. As far as possible it needs to be articulated and open to discussion. The best historians are well aware of this. They are alert to many dimensions of bias and to the endless (and therefore endlessly discussable) significance of their own horizons and presuppositions. A great deal can of course be learned from those who do not share our presuppositions. Our capacity to make wise, well-supported judgements in matters of historical fact and significance can only be formed over years of discussion with others, many of whom have very different horizons from our own. It is possible to I have a 12-year-old chess champion or mathematical or musical genius, but it is unimaginable that the world's greatest expert on Socrates could be that age. The difficulty is not just one of the time to assimilate information; it is (2)

2つのかっこに共通する単語を答える問題です。わかる方お願いします。

the branch of science dealing with motion: Classical (m_) is a required course for physics majors. the operational details of something: Biologists study the (m_) of the human body.

並び替えです。順番もお願いします。

3. 次の日本語に合うように、下の語句を並べかえ、(*)に入るものの番号を答えなさい。 (1) 彼は週末はいつも遅くまで寝ている. He usually ( ( ) (*) ( ( )( @on @bed late in weekends till (2) 国連は世界の児童就労に反対する声明を発表した。 The United Nations ( ) ( ) ) ( ) ( * ) ( ⑩ against @around the world child labor ⑩that was (3) ボブは先生が言ったことに注意を払わなかった. ) ( * ) ( ). (*) [摂南大 stays )(*)( )( ). declared ⑤it [武庫川女子大 Bob () ( ) ( * ) ( @attention @ didn't ③ said ) ( * ) ( ) ( ). pay his teacher to ⑦ what [奥羽大 61

2番の求め方が分からないので解説お願いします😭🙏🏻

不快院 5 △ABCがあり,AB=√3,BC=√/6, cos∠ABC= AABC AD, AB=13, BC=16, cos LABC = 24 đo (1) 辺ACの長さを求めよ。 3 (2)ABCの外接円の半径を求めよ。また,△ABCの外接円の中心を0とする。直線 AO と外接円との交点のうち, Aと異なるものをDとするとき, sin ∠CBD の値を求めよ。 (3)(2)のとき,ABCD の面積を求めよ。 また, 線分AD と辺BCの交点をEとするとき 線分DE の長さを求めよ。分 AQ (配点 20 ) 080

なんで式変形でこうなるのか教えて欲しいです

(1) 複素数2, wに対して、不等式 [z+a]s[z]+[mr]が成り立つことを示せ. 3 絶対値,極形式(証明問題) (2) 複素数平面上で、原点を中心とする半径1の円周上に3点. i.yがある.ただし, α+β+y=0 とする. (a) 等式 |aß+By+ya|=1 =1が成り立つことを示せ. a+B+r (b) 不等式le(8+1)+8(y+1) +y (a+1)2la+8+y| が成り立つことを示せ (富山大・理(数) -後) 例えば|a|=1という条件が与えられているとしよう。このとき ( a を αで表せる) a 絶対値の条件式の扱い方 •|α/2=1であるから、 aa=1, ●α = cos0+isin0 とおく. ●|By|=kaBy|=k などという使い方がある. 絶対値の等式, 不等式の証明 してみたりしよう. そのままでは変形しにくいときは、両辺を2乗したり、極形式で表 ■解答量 (1) z=r(cos0+isin0), w=R(cosy+ising) (≧0, R≧0) とおくと, |z+w|=|(rcos0+Rcosy) +i (rsin0+Rsing) | =(rcoso+Rcos)+ (rsin0+Rsing)2 cossint) +2rk (costcosy+sinosing) +R2(cos2p+sin') =r2+2rRcos(0-9) +R2 ≦r2+2rR+R2=(r+R)2=(|z|+|w|) 2 2+w|≦|2|+|w| (2) (a) a+By+ya]-[a+8+yl① を示せばよい。 ||=|8|-|r|-1により, [a8yl-1.1. BF-1 Yy=1であるから, \aB+ By+ya] [aB+By+ya][aB+By+ya||1 \aB+By+ya|=- laby| aBy 1 + + a B ■P(z), Q(z+w) とおくと,wは PQ を表す複素数で,下図の ようになる. AOPQE |z+w| Q(z+w) 辺を考える 1001 と (1) 成 立 0 || この両辺を2乗した式を示して もよいが、ここでは工夫してみる。 =1により1/27 -ly+a+B[-ly+a+ 8[-]y+a+8 したがって、題意の等式が成り立つ. (b) la(8+1)+8 (y+1)+y (a+1)=(a+by+ra)+(a+8+z)] ...) (1)で, z=aß+By+ya, w=a+β+y とおくと, ①により|2|=|w|で, ②-|z+g_n_z]+[]-[g]+[s[-2]]=2la+8+yl . \α(B+1)+B(y+1)+y (a+1)| 2|α+B+yl 3 演習題(解答は p.113 ) |2|-|za|-|za|-1 をみたす三つのに対して、+230 B=z1zz+228 とおく。 (1) =y となることを示せ. (3)の分子は (2) Y |α|=|8|となることを示せ. Z」の対称式だから、 (Z1+Z2)(22+23)(23+21) (3) z=- 212223 は実数であることを示せ. (宮城教大) B, yで表せる. 2+22α-z」 などとし よう。 100

否定の問題です。教えてください。

1.次の文の( )に入る適当な語句を①~⑩から選びなさい。 (1) A: I went to Hokkaido and Okinawa last year. B: That's wonderful. I haven't had a chance to visit ( ) of them. either none (2) My grandfather is a heavy smoker, but he ( usually [大阪産業大 *〕 some ①ever ) drinks. ③mostly nearly (大阪学院大) ). I must be back by 8 o'clock." not [南九州大] seldom (3) "Can't you stay a little longer?" "I'm afraid ( so yes 3 now (4) "I'm sorry, we have ( ) rooms available at the moment. Why don't you try another hotel?" any no (5) It was so dark that we could ( [日本大〕 none nothing ). hardly see see hard see hardly [大阪経済大 ] )" Neither do I. So do I. 〔京都産業大] hard to see (6) "I rarely go to concerts these days." "( I don't, neither. I do, too.

答え合ってますでしょうか😭😭

③ 次の日本文の意味になるように, ( )内の語または語句を並べかえて適切な英文を作りなさい。 AR 〈関西外国語大〉 39. あなたの体重は私の体重の3分の2だ。 You (am / as / two-thirds / as heavy / I / are). are two thirds as heavy as I am 40. 彼女の話は私の3倍長かった。 Her talk was (times / mine / of / the length / three). three times the length of mine □ 41. 彼は,そんな話を信じるほど馬鹿ではない。(1語不要) <東京理科大 〉 He (believe/better / doesn't / knows than / to) such a story. knows better better than to believe i 42. 佐藤氏は日本で最も偉大な物理学者の1人になりました。 Mr. Sato (physicists / the greatest / become / has / one / of) in Japan. 〈関西外国語大〉 one of the greatest physicists D Chas has become 43.ガイは,愛がいちばん尊いと言う。 (2語不要) Guy (is / love / more/most/ nothing / precious / say's / than / the). says nothing is more precious than love 44.彼女は,自分の母校に1億円も寄付した。(1語不要) Hem S <東京理科大 〉 She (one/no/ than / more / donated /less) hundred million yen to her old school. done no torio done C) [donated no less than one 19rito 190 VO〈千葉工業大〉

1文目って第3文型の倒置でしょうか

V- 2 There are more solid studies (recently) [that looked at people [clinically diagnosed with insomnia disorder], (rather than self-described poor sleepers)]," agreed the University of Pittsburgh's Christopher Kline, [who studies sleep S V (through the lens of sports medicine) ]. The results show (exercise 両方で データ表現 improves both self-reported and objective measures of sleep quality, [such as (what's measured (in a clinical sleep lab)>])." 具体例の目印

黄色丸で囲ってあるitが何を指すのか教えてほしいです

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