学年

教科

質問の種類

英語 高校生

教えてください😭

[2] あるクラスでディベートが行われています。 (1)~(3)はディベートの前半戦, (4)(5)は後半戦における発言の (1) 一部です。ディベートの流れを意識しながら、 進行役の先生のセリフ が流れよく成り立つよう、下線に当てはまるものを選択肢から選び, 記号で答えなさい。 [思•判・表] (2) (教科書 P.88~89, P.92~95 参照) (3) (1) Teacher Are you ready to start our class debate? (4) Our topic is here on the board: "Digital books are better than paper books." (5) Raise your hand if you have a reason to support for this statement. (2) Student A: With an eReader, we have access to all of the books that we own. We can read many on the train. We can't carry many books with us every day. Teacher: (5点x5) (3) Student B Paper books don't use electricity. It's important that we use as little electricity as possible to prevent global warming. Teacher: (4) Teacher: Next, we will refute the other side's opinions. Say which opinion you are refuting, give your refutation, then give an example. (5) Student C: They said that digital books are convenient, We don't always need all of our books with us. Teacher: but I don't think it's a big advantage. Just one book is enough. [選択肢] J. Good idea. "Good for the environment." . Great. "Digital books are convenient." t. Let's start with the negative side. 1. Let's start with the affirmative side. I. Very good. "Not a significant advantage."

解決済み 回答数: 1
英語 高校生

下線部③を並び替えてください。という問題なんですが、どのように考えたらいいのか分かりません。 教えてください!

19 Read the passage and answer the questions. ORG OF US. udma2 to enoitelugo Imagining locations for a wedding, people think of churches, 008 00 hotel chapels, or even a beautiful beach or park somewhere. However, there are ①many more fantastic and unusual places where wedding planners can arrange the perfect day for couples 5 who want something a bit different. 0001 Located deep underground, the National Showcaves Centre for Wales can provide a stunning background to a wedding ceremony. There is a huge section in the caves called the "Dome of St. Paul's," which includes two waterfalls flowing into a large lake. 10 The cave's natural and romantic setting ②could make a wedding truly special. 009 008 00% QHints aros chapel [tfæpǝl] 礼拝堂, チャペル the the ocean. stunning [stániŋ] とてもすばらしい cave [kéiv] than waterfall [wó:tǝrfò:]] 008 00 spectacular [spektækjulǝr] 壮観な As some people might not want to marry in a cave, a company 008 in New Zealand offers a wedding ceremony in a spectacular outdoor setting. The company will fly couples and their guests by 15 helicopter to the top of a mountain. Looking at the amazing fuquq ow! T panorama of mountains, lakes and rivers, lovers ③[ will become might their wedding / how / easily imagine ] one of the most memorable days of their lives.nd 20 a (S) atos Even more adventurous couples can get married underwater. 20 Putting on scuba gear, the couples descend to a depth of 15 gear [giǝr] meters in the sea off the coast of Trang province in Thailand. Of course, exchanging wedding vows underwater is difficult, so they T 25 need to use a series of diving hand signals, ending with an "OK" sign to indicate "I do." As well as these locations, there are thousands of other places around the world that can offer lovers an alternative to the tradition of walking down the aisle. Perhaps f future weddings will be held in space, on the moon, or even on Mars. (269 words) 『リーディングに役立つ英文法-ENGLISH CHALLENGER」 Kyoko Okamoto, Benedict Rowlett Aya Kinoshita, Sara Ellis*** descend [disénd] b off the coast of ~ ~沖で Trang province in Thailand タイのトラン県 vow [vȧu]) pninatai.l aisle 通路 onsiquis el lliw omi) indW (S)

解決済み 回答数: 1
数学 高校生

(2) x→∞であるから、x >1,0<1/x <1と考えて良いのはなぜですか?

00000 次の極限値を求めよ。ただし,[x] は xを超えない最大の整数を表す。 関 a (2) lim(3x+5)* (x2+3x+x) (2) 中部大, 関西大 DO 基本 例題 52 関数の極限 (4) はさみうちの原理 X11 2基本事項 基本 を利用して, る。 ます (1) lim [3x] →∞ XC 行い、分母分子を ・変形することに 0。 ち込むのもよい x=10gx2 =10g√x 1-3x-1 1 て, 分母分子に +3x-1 を抱 解答 子を√xで割 101 化。 P.82 基本事項 5, 基本 21 極限が直接求めにくい場合は、はさみうちの原理 (p.825 ①の2)の利用を考える。 (1)n≦x<n+1(nは整数) のとき [x]=n すなわち [x]≦x<[x]+1 よって [3x]3x<[3x]+1 この式を利用してf(x)≦ [3x] ・≦g(x) X (ただしlimf(x)=limg(x)) となるf(x), g(x) を作り出す。 なお、記号〔]はガ ウス記号である。 (2)底が最大の項でくくり出すと (3/15(1/2)+113 (1/3)"の極限と(1/3) +1 2 の極限を同時に考えていくのは複雑である。そこで, はさみうちの原理を利用する。x→∞であるから, x1 すなわち0/12 <1と考 えてよい。 |CHART 求めにくい極限 不等式利用ではさみうち (1) 不等式 [3]≦3x<[3x]+1が成り立つ。 2200 x>0のとき,各辺をxで割ると [3x] -≤3< [3x] + ここで,3< [3x] 1 + から x x よって 3- < 1 [3x] 1>0 ≤3 x x x x [3x] 3-- x x 1 x 89 2章 ⑤関数の極限 そ lim(3-1)-37 Anie (n =3であるから lim [3x]=3 mil (3*+5*)*= (5* {(3)*+1}}* =5{(3)*+1}* x→∞であるから,x>10<<1と考えてよい。 x はさみうちの原理 f(x) (x)=g(x) で limf(x)=limg(x)=α X-00 ならば limh(x)=α X1x 底が最大の項 5*でく くり出す。 a このとき(g)+1}{(2) +1F <{(13) +1(*) 4>1のときはくも ならば A°<A° すなわち1{(1/2)+(1/2)+ +1 (3)+ > であるか lim 5から、 {(1/2)+1}=1- =1であるから lim (22)+1=1 ら, (*) が成り立つ。 $30 形する。 =t x= x→∞ よってlim(3+5") = lim5(2/2)+1=5-1-5 =5・1=5 [近畿大] 5 EX34y 練習 次の極限値を求めよ。ただし,[] はガウス記号を表す。 ③ 52 (1) lim x+[2x] AMI (2) lim 818 x+1 X1x p. 95 EX 37、

解決済み 回答数: 1