英語の問題です。 教えて欲しいです🙇‍♀️

(2) I had my teeth 1 check 1( )に入る最も適切な語句を ① ~ ④から選びなさい。 (1) He went on speaking as if she ( 1 can't 2 hasn't ) there. Son 3 wouldn't ) by a dentist this morning. ult niles 3 checking wahiwon (青山学院大 ) ④weren't pomibinand (岩手医科大) 24 to check 2 checked (3) You should not keep any pets ( 1 after 2 unless ) you can take good care of them. 3 when (中央大) ④which 1 as 2 in ) all be correct. ②anytime (6) If the weather ( ①must have been (4) This town will change ( ) another ten years. (5) Those may not ( 1 absolute ) fine yesterday, I would have done the laundry. 2 is (7) Studying takes up a lot of my time during the week, ( ) little time for hobbies. (芝浦工業大) since 3 of (國學院大) 3 everything ④necessarily (関西学院大 ) ③ wasn't 4 had been (皇學館大) ①1 has left (8) Have you heard the rumors ( 1 that 2 what leaves leaving 4 left ) Susan has returned to this town? ③ which (麗澤大) ④ who 1 by (9) What was found in this experiment is ( 2 for (10)( ) what to say, she remained silent. ) great importance to researchers. 3 in (立命館大) 4 of (愛知工業大) 1 Not knowing 2 Being not knowing ③No knowing ④Knowing no (11) I tried to ( 1 have 2 make ) her to tell me what happened last night. 3 get (十文字学園女子大) 4 let How gimon and (12) Do what you like, as ( 1 far 2 much B in 1 in 2 with bnat am ) as you leave me alone. 3 long (13) This tool is dangerous. Please read the instructions ( (14) If I hadn't drunk so much last night, I ( 1 feel (15) I wish you 1 attend (16) If I ( 1 were ) 2 will feel ) the party yesterday. 2 were attending ) much better than I do right now. ③ would feel ③ have attended (中京大) 4 would have felt (目白大) ④had attended ) in your situation, I would be more careful about what you post on social media. (フェリス女学院大) 4 many ) care. (聖隷クリストファー大) at ④take gwol 3 will be (南山大) ④would be

英語の問題です。 できれば解き方も教えて欲しいです

(2) She listened attentively to her teacher ( the in no order to 2 in order not to (3) I carried the jar of honey very carefully ( ) miss anything. 私たちの目は、ま 1 ( )に入る最も適切な語句を ① ~ ④から選びなさい。 (2) (1) It is no ( ) arguing with people when they are very upset. 4 way (3 use The wonder 2 doubt (京都女子大) 3 in order to none ) spill it on the floor. ④so not in order to (共立女子大) divibe 3 so that 4 so as not to (畿央大) 3 be found 4 have found (駒澤大) ①in order to 2 instead of The (4) My watch wasn't to ( ) anywhere. I find had 2 finding (5) ( your 1 Keeping 4 You should keep antivirus software updated can maintain your computer's security. 3 In order to keep 2 Keep (6) The end-of-term test questions were reasonable and easy ( They scores. I be solved 2 to solve 3 solved (7) Both women became successful lawyers before ( 1 enter to ) politics. 3 entering now noilgga 195/mulov 2 entered into Tho (169but (8) I went to his house for help, ) find that he was not there. am) dhia so that 1 before (9) I'm looking forward to (i) all of you in person. (1) see 5) (10) Jill didn't have ( ①1 enough (11)( 2 saw ). All of the students got good (芝浦工業大) 4 having solved (東海大) ④ entrance ( 同志社女子大) ④only to y in person. 01, exil voy bluow ytivit ③ seeing ) time to check my homework, so I asked Kevin instead. 2 many ③ such ) that she had passed the exam, she shouted with joy. ①On hearing (12) Naomi likes ( 2 Upon heard 3 When heard ) to the same song again and again until she gets sick of it. 4 seen (南山大) ④plenty ( 日本女子大 ) ④With hearing (松山大) I listen 2 listening 3 listened Sie bo to listening BAW (13) There is ) what he will do. (立命館大) s an ①no telling (14) Little by little, I'm getting accustomed to ( 1 do (15) The news of free entrance tickets sounded ( 2 no to tell 3 not telling ④ not to tell 2 doing ) my job at the cafe. 3 be done (高千穂大) ④have done 1 as 2 so ) good to be true, but it was true. 3 too ④very (中京大) (16) I find (c ) hard to understand why they have made this decision. ①it 2 so C 3 that hitaq ④very (日本大)

文法問題です。答えがないので合っているかどうか教えてほしいです

Choose the best answer to fill in each blank. (1) I like that white bicycle of 1 she 2 her 4 herself Fil 1 【神戸学院大 】 sa (1) p.495 (1) I f 3 hers many people in the I v (2) p.153 (2) H (2) The photographer is well known United States. Let's go and see her photo exhibition. with H as (3) Stop talking. 2 for Didn't you hear the bell ( 3 to )? 【 関東学院大】 (3)参 p.178 1 rang 2 rings 3 ring 4 ringed (3) D (4) The book is ( ) a guide to Africa as a story set in the (4) .265 【日本女子大 】 area. 1 no less than (4) 2 none the better for 3 not so much 4 not the same (5) (5) We requested that the meeting ( ) put off. finished our preparation. We hadn't (5) p.327 1 be (6) Please help yourself ( 2 should 3 is 4 would be (6 ) whatever you like. 【桜美林大 】 (6) p.498 1 by (7) Do you know that young lady ( 2 in 3 for 4 to 1 talk 2 talking ) with our boss? 【日本歯科大】 3 to talk 4 talked (8) I brought my friend to the cafeteria to eat lunch. After eating (7) 参 p.224 (8) 参 p.340 lunch, he asked me ( ) smoke there. 【名古屋工業大 】 ① that he can 2 where could he 3 whether or not 4 if he could (9) "I think Matt is a hard worker." "You ( ) be joking. He's rather lazy." A (9) p.117 ①had better ③ have 2 must would rather (10) We should decide when to start the new project ( discussed the other day. 1 which 3 with which (11) I sent Jane two letters, ( ①neither of which 3 of neither which for which 4 in which ) she has received. 2 neither which which of neither AJEA ) we (10) pp.58, 285 【創価大】 (11) 参 .306

258(3)の問の答えの四角で囲ってるところが何故か分かりません。 公式を使うのかな？と思うけれどなぜ、そうなるか教えていただけると嬉しいです🙏

すべ 正弦で表 比較 I&a cos 10°, sin 40°, cos 80°, 39 258 次の式の値を求めよ。 *(1) sin 80°cos 170°-cos 80° sin 170° (2) sin 20°+sin 70°+cos110°+cos 160° (3) 1 31 tan 250° cos240° annie 0.02180円 40 259 次の式のとりの範囲を求める /1\ (2) Tolt non/100° 1+3 41

(2)の問題、答えの解説して欲しいです、、

練習 次の極限値を求めよ. ただし, n は自然数とする. 12 n (1) lim *** →∞ 3" 解説を見る 3" 33333 3 (2) = . n! 1 2 3 4 5 n より, n≧4のとき, 0< 3" 333/3-3 9/3\n-3 = n! 123 ここで、 <1より、 2 21780 lim (2) 9/3\ -3 =0 よって, ①,②とはさみうちの原理より, 3" lim non! (2) lim 3" →∞ n! p.61 77 ・① 3 n 書込開始

この後の計算過程を教えてください。お願いします🙇🏻‍♀️

1+ 17.5 7.5 F 1

この問題教えてください

1) It is impossible to solve the problem. The problem ( 2 各組の文がほぼ同じ内容になるように,( )に適切な語を書きなさい。(完答4点×5= 20点) gmids duol nonToasq brids a boxlas I duw loge bos yleisimmi boilgood ) solve. WSH enorib mobasnioq bas Prowans ( suse a kind o of language. ongi o boblob Illeni amble 2) It is said that dolphins use a kish Com Dolphins (quilhgnits) (a) (b) (om bist) a kind of language. ydw jud point of on bis 3) It is so warm that we can swim in the lake.ġgoinghyd.W that we c It is warm ( think) for us ( 4) The ice is so thin that we can't skate on it. oivedade Tanoiib got om sving Volh ) (ormation to) in the lake.or obt foreigners to know their enture. The ice is (istiqeo) ( ) (anoi) us (rol gniles) skate on. Ojiziv 5) My bike needs repairing.od od "asil ni insoqmi viv ai i broj My bike needs to (9)(5) axles bas qlod ab

(1)と(2)両方とも分かりません💦 解き方お願いします！🙇‍♀️

316 右の図は,底面の半径が2,高さが4√2の円錐である。頂点をA とし,母線 AB 上に AC=2 となる点Cをとり、円錐の側面を長さが最も 短くなるように, 点Bから点Cまで糸を一巻きさせる。 □(1) 糸の長さを求めなさい。 ABCDE □(2) 頂点Aから糸までの距離が最も短くなる点をDとするとき, 線分AD の長さを求めなさい。 D C OP AAHI おま A B ISE

（1）を部分分数分解ではなく、x＝2sinθと置いたのですが、それだとダメなんでしょうか？

206 第6章 積分法 基礎問 113 区分求積法 定積分を用いて,次の極限値を求めよ. n2 122 n² + (1) lim n4n2 12 4n2-22 ++・・・+ 4n2 (2) lim +k (2) lim dx 1 = (2+2) 189 207 =1/-10g(2x)+10g(2+1)=1102/11083 1 nk=n+1k →頭に「一」 がつく理由は, 86 ポイント参照。 1 27 n -=lim n→∞nk=n+1k =lim 11 n―00 n k=n+1 k n --log-log2 精講 limΣの形をした極限値を求めるとき, Σ計算が実行できればよい のですが、そうでないときでもある特殊な形をしていれば極限値を k 公式によれば, n 積分の範囲が1→2となる理由を考えてみましょう。区分求積の 求めることができます. →とかわっています. だから, n→∞としたと k それが 「区分求積」といわれる考え方で,その特 殊な形とは YA きの n y=f(x), の範囲がxの範囲ということになります。 n+1sks2n n // ( n+1 nn において, lim 2n -=1, lim lim nk=1" (円) n→∞ n n→∞ n -=2 であることより, 1≦x≦2とな ります。 です. 右図で斜線部分の長方形の面積は1/12 (1) で表 12 nnk-1' 3x n k ポイント せます。 lim 1.2m)=f(x) dr n→∞nk=1 dx よって、21(h)は,図のすべての長方形の総和です。ここで,n(分割 x=1で囲まれた面積に近づくと考えられます。 以上のことから, lim 1 ½ ½ ƒ ( h² ) = f f ( x ) d x n→00 n k=1 ということがわかります. 数) を多くすると曲線より上側にはみでている部分はどんどん小さくなります。 そして最終的にはy=f(x), x軸, 2直線 x = 0, 参考 分割数を倍にすると幅が半 分になるので,この部分だ け小さくなる y=f(x) a b-a bx a+k. n x lim b-a n 12 00 n k=1 n f(a+k.ba) = f(x)dr 区分求積の公式の一般形は下のような形 ですが, 大学入試では上の形でできない ものは出題数が少なく、出題されてもか なりの上位校に限られていますので、ポイントの 形で使えるようになれば十分です. y=f(x) b-a n - a fla+k⋅ b - a). b-a 解 (1)(与式)=lim7_12 non k=1 4n-k² lim 12 1 n→∞nk=1 (k' 4- An 演習問題 113 Elim n+2k の値を求めよ. nwk=1n2+nk+k2 第6章