空所補充 f で始まる単語を教えてください

In these harsh economic times, people are going to have to live more ( ) if they want to make ends meet.

(2)合っていますか？答えgood→bestにしました

Satomi : Good morning, Tom. 言え な英語を補いなさい。 Tom : Hi, Satomi. Satomi : Tom : I have a question. What's the date today? December 5th. Satomi : So, today is your fifteenth birthday, right? Happy birthday, Tom. Thank you very much. Tom : Satomi: This is a present for you. Here you are. Tom Oh, I'm very happy. Can I open it? Satomi Sure. (1) (気に入ってくれるといいな。) Tom : How nice! My favorite CD and many birthday cards. Satomi They are from every student in our class. I didn't know you remembered my birthday. Tom : Satomi : You're our classmate. (2) (この夏, あなたがクラスに来て以来の親友じゃないの。) You often talk about your country, Canada. I think it's so exciting. Tom I'm glad to hear that, Satomi. (3) (クラスのみんなに感謝しなくちゃね。) (注) present プレゼント card(s) カード Canada カナダ I hope that you will like it. We've been been best friends since you came to Our class this Summer.

（1）の矢印の変形がわかりません

44 基本 例題 22 数列の極限 (5) はさみうちの原理 2 0000 nはn≧3の整数とする。 不等式2">が成り立つことを,二項定理を用いて示せ。 2 6 (2) lim の値を求めよ。 n→00 271 指針 (1) 2"(1+1)" とみて, 二項定理を用いる。 (a+b)"=a"+"Ca" 'b+nCza"-262++nCn4b1+60 (2) 直接は求めにくいから, 前ページの基本例題 21 同様, はさみうちの原理を いる。 (1) で示した不等式も利用。 なお, はさみうちの原理を利用する解答の書き方 について, 次ページの注意も参照。 CHART 求めにくい極限 不等式利用ではさみうち (1) n≧3のとき 解答 2"=(1+1)"=1+ni+nCz+....+nCn-1+1 1+n+1/21n(n-1)+1/n(n-1)(n-2) 6 mil 1 5 n3+ 6 n+1> 1/ 6 1 よって 2"> 23 である n=1,2の場合も不等 は成り立つ。 2"≧1+mCi+nCz+C (等号成立はn=3のと き。) 基本 (1)実 (2) lim~ 818 lin <-2 指 解 (2) (1) の結果から よって 2n 0 n² 2n 2 66|n 各辺の逆数をとる。 6 2 各辺に n²(0) を掛け る。) lim=0であるから n lim -=0 B n no 2n I はさみうちの原理。 >> はさみうちの原理と二項定理 はさみうちの原理を適用するための不等式を作る手段として、上の例題のように、二項定 検討 理が用いられることも多い。 なお、二項定理から次の不等式が導かれることを覚えておく とよい。 のとき 練習 n を正の整数とする。 (1x1+nx(1+x1+nx+1/23n(n-1)x2 (*) ③ 22 (1) 上の検討 の不等式(*)を用いて (1+2" >nが成り立つことを示せ

(1、3)この英文で大丈夫ですか？

次の英文は,望 (Nozomi) が彼女の祖母について書いたものである。 この英文を読んで,(1)~(3)の問いに英語 で答えなさい。 I'm going to talk about my grandmother. She is sixty-three years old now. My grandmother likes swimming. She goes to a swimming school every Tuesday, Thursday and Saturday. She started to learn how to swim when she was sixty. One of her friends took her to the swimming school. There was a swimming class for old people who couldn't swim. Most of them were over sixty. She was surprised because old people were trying to do a new thing. She wanted to try something new so she decided to join the swimming class on that day. At first it s It took six months to swim. Now she can swim fifty meters. She said to me, "You can I hope I will enjoy swimming with her someday. was not easy for her to swim. start a new thing at any time." (注) most of~ 〜の大半 someday いつか over ~を超えて surprised 驚いた try to ~ ~しようと努める (trying は ing形) (1) How many times in a week does Nozomi's grandmother go swimming at the swimming school ? She goes swimming at the swimming school three times a week. (2) When did Nozomi's grandmother start to take a swimming class? She started to take a swimming class when was sixty. (3) Why did Nozomi's grandmother decide to join the swimming class? She wanted to try something new.

解き方を詳しく教えて欲しいのと途中式もお願いします🙏

1 次の問いに答えよ。 JAJ (1)(-6)×3+8 を計算 A03180 (2)5xy÷10xx4y を計算せよ。 (3)x2+2x-35 を因数分解せよ。 (4) 1次方程式 x+7 x-4 2 を解け。 4 (5)(√6+3)-√54 を計算せよ。 S 10 土 S () (6)関数y=ax^(αは定数)について、xの値が1から5まで増加するときの変化の割合は 4である。 αの値を求めよ。 S .11 TAC II-TO 3x+2y=3 ORIE (7) 連立方程式 y=x+4 を解け (8) 2次方程式 x2+5x=2(x+3) を解け。 て、 (9)1つの外角が40° である正多角形の内角の和は何度か。 01 (10) y=- のグラフをかけ。 x (6) Gue SO って 続けて3枚引く となる

何故「2」のようなあとの式になるのですか

チェック 5.3 ロロロ 【直線の通過領域】 y 平面上に, 2本の直線 y=x, miy=-x がある. 1上をP(t+1, t+1) が動き, m上 を点Q(t-1,-t+1) が動く. (2) tの値が-1≦t≦1の範囲で変化するとき, 直線 PQ が動いてできる領域を求め図示せよ. (1) tの値がすべての実数値をとって変化するとき, 直線 PQ が動いてできる領域を求め図示せよ (名城大改

添削お願いします🙇

I like playing sports because I like sports. I usually play badminton and basketball. It is so fun. Also I can play sports with my friend and my family.

英語わかる方教えてください😭

[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." 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 G (5) on the train. We can't carry many books with us every day. Teacher: (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: (5点x5) (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, but I don't think it's a big advantage. We don't always need all of our books with us. Just one book is enough. Teacher: [選択肢] J. Good idea. "Good for the environment." . Great. "Digital books are convenient." . Let's start with the negative side. 1. Let's start with the affirmative side. I. Very good. "Not a significant advantage."

I will call her tonight が、「今夜は彼女に電話するかも」ではなく、「今夜は彼女に電話するぞ」となる理由を教えてください🙇‍♀️

英語の授業での議論長文の問題です。(お題は「都会の生活と田舎の生活、どちらのほうが好きか」で、奈々(Nana)は田舎派です)模範解答は「Friendship and the love of our family are.」なのですが「It is friendship and... 続きを読む

Nana : Is having more things necessarily good? I don't think so. Some people in a city think that money is more important than anything else. We can't buy friendship and the love of our family with money. I think such things are more important. 20 C 英