積分の問題です。 (ア)はなんとか理解できたのですが、(イ)がどうしてもわかりません。 なぜ絶対値を外した時が＋の方ではなく－の方なのか(なぜ{X(X－a)}でないのか) この場合のf(a)から何が求まったのか このふたつが知りたいです また、この問題ではa≧0と最初条件... 続きを読む

出 ☆☆ 例題 258 絶対値を含む定積分で表された関数 D a≧0とする。 関数 f(a) = x (x-a) | dx の最小値とそのときのαの 値を求めよ。 ReAction f (x)の定積分は, f(x) の符号で区間を分けよ 例題 257 場合に分ける K x(x-a) dx は,面積で考える。 (ア) x=aが区間 0≦x≦1に含まれる x =αが区間 0≦x≦1に含まれない (ア) 0≦a <1のとき f(a) == = a = (-x(x-a))dx + x(x − a)dx -(a = 0) ³ + [1/3] 6 1 a³ 3 12 1 1 a+ 3 (ア) (イ) y=x(x-2)| 1 a y=|x(x-a)\ x M a さわぞわ 必要に応 GRE このとき f'(a) = a²- 1|2 f' (a) = 0 とすると,0≦a <1 より 8/2 a = a 0 2 よって, 0≦a< 1 にお f'(a) いて増減表は右のように f(a) |1|3 なる。と (イ) a≧1 のとき f(a) = ∫{-x(x-a)}dx a 2 23 3 a 02 22 Jo (ア)(イ)より, y=f(a)のグラフ は右の図のようになるから, ✓ : a x -1-0 0 => 12) a² = 12 より √√2 220 √2 1 a = ± + 2-√2 2 > 6 2 3 1 √2 y=|x(x-a)| 3 2 y /2 |-}()+++ √2 2 2 √2√2+1 1 a x 4 3 1 2 3 6 2-√2 12 6 y=f(a) PH- f(a) は a= √2 のとき 2-26 1-31-6 2 6 2-√2 O 21 a 最小値 2 6 ■258 関数f(t)=xードの最小値とそのときのもの値を求めよ。 5章 15 漬分 ( 京都教育大改) 453

1番下の文のif not undertakenは 文法的にはどうなってるんですか？

Perhaps the strongest reason to think the planet could be home to Something is that over the past 20 years, we've learned that many inhabitants of Earth live in environments as peculiar as those on Mars. Here, some organisms exist inside rocks in the chilly wastes of Antarctica, or a mile deep in the ground. Others live in ice sheets, or breed in the strongest acids. If it can happen here, it could possibly happen on Mars, too. Finding life on Mars obviously would be thrilling. It would, in a small way, ease our (@). In addition, it might illuminate that great mystery, the origin of life on Earth. But the possibility of life on Mars also suggests that we should approach the place with caution. If something is living there, then bringing Martian rocks back to Earth could be a mistake if not undertaken very carefully.

この長文問題の答えと解説をお願いします。

15 語数: 398 語 出題校 法政大 5 We are already aware that our every move online is tracked and analyzed. But you 2-53 couldn't have known how much Facebook can learn about you from the smallest of social interactions - a 'like'*. (1) Researchers from the University of Cambridge designed (2) a simple machine-learning 2-54 system to predict Facebook users' personal information based solely on which pages they had liked. E "We were completely surprised by the accuracy of the predictions," says Michael 2-55 Kosinski, lead researcher of the project. Kosinski and colleagues built the system by scanning likes for a sample of 58,000 volunteers, and matching them up with other 10 profile details such as age, gender, and relationship status. They also matched up those likes with the results of personality and intelligence tests the volunteers had taken. The team then used their model to make predictions about other volunteers, based solely on their likes. The system can distinguish between the profiles of black and white Facebook users, 15 getting it right 95 percent of the time. It was also 90 percent accurate in separating males and females, Democrats and Republicans. Personality traits like openness and intelligence were also estimated based on likes, and were as accurate in some areas as a standard personality test designed for the task. Mixing what a user likes with many kinds of other data from their real-life activities could improve these predictions even more. 20 Voting records, utility bills and marriage records are already being added to Facebook's database, where they are easier to analyze. Facebook recently partnered with offline data companies, which all collect this kind of information. This move will allow even deeper insights into the behavior of the web users. 25 30 (3) - Sarah Downey, a lawyer and analyst with a privacy technology company, foresees insurers using the information gained by Facebook to help them identify risky customers, and perhaps charge them with higher fees. But there are potential benefits for users, too. Kosinski suggests that Facebook could end up as an online locker for your personal information, releasing your profiles at your command to help you with career planning. Downey says the research is the first solid example of the kinds of insights that can be made through Facebook. "This study is a great example of how the little things you do online show so much about you,” she says. "You might not remember liking things, " but Facebook remembers and (4) it all adds up.", * a 'like': フェイスブック上で個人の好みを表示する機能。 日本語版のフェイスブックでは「いいね!」 と表記される。 2-56 2-57 2-58 36

共通する単語が何か教えて欲しいです🙏

(i) to break down food in the body to use as energy: I had a hard time (d_)ing the spicy food. (ii) a brief account or summary: This program gives you a (d_) of today's main news stories at the end.

共通する単語が何か教えて欲しいです🙏

(i) a regular gathering of an organization or business: People were excited to see the new product announcements at the annual technology (c) in New York. (ii) a commonly-followed guideline or practice: For many decades, it was a (c) in English writing that periods should be followed by two spaces, but commas by only one.

共通する単語が何か教えて欲しいです🙏

(i) unaffected by a particular disease because of either preventive measures or inherent resistance: The vaccine made them (i) to the disease for life. (ii) protected from punishment or legal action due to special status or privilege: The ambassador was (į from prosecution under international law.

このfor whichのforは訳に出しますか？もし出すなら理由も教えてくれると助かります🙏🙏

X Even inventions that meet the need for which they were initially designed may IS I prove more valuable at meeting unforeseen 210 needs.

（1）のbの塩化銀の溶解度積は塩化銀がすでに沈殿しているのに値は大きくならないのですか？ 解説お願いします🙇‍♀️

変化と平衡 思考 159. 溶解度積■一般に, Cu2+ と Zn2+ が溶けた溶液の水素イオン濃度 [H+] を調製し, H2Sを通じると CuSのみを沈殿させることができる。 次に示す実験条件,および数値 を用いて,下の問いに答えよ。 ただし, [H2S] は常に一定とし, 有効数字は2桁とする。 [H2S]=1.0×10-'mol/L, [Cu2+] = 5.0×10mol/L, [Zn²+]=1.0×10-mol/L CuSのKsp (Cus)=6.5×10-30(mol/L)2 ZnSのKsp (Zns)=3.0×10-18(mol/L)2 -8 H2S の電離定数 H2SH++HSK=8.0×10 mol/L HS¯ H++S2-K2=1.5×10-14mol/L ⇒ (1) ZnS の沈殿が生じない [S2-] の範囲を示せ (1) (2) 硫化水素の2段階の電離を H2S2H++S2- とまとめて表した場合, この平 エ衡の平衡定数K を Ki, K2 を用いて表せ。 (3) Cus のみを沈殿させることができる[H+]の下限を答えよ。 (17 東京大 改 )

時制と動詞の形 写真の問題(計10問)の正誤、どなたか教えていただきたいです( ; ; )

4 下線部を過去形にかえて、全文を書きかえなさい。 1. I think everybody knows the song. I thought everybody knew the song. 2. Maria says that she saw the accident on her way home. Maria said that she had seen the accident on her 3. I believe my dream will come true. I believed my dream came true. 5 与えられた語句を使って, 日本語の意味に合う英文を作りなさい。 way home. 1.私はロジャーはテニスの試合に勝つと思う。 [think Roger / win / the tennis match ] I think Roger will win the tennis match. 2. 両親は今、居間でテレビを観ている。 [TV / in the living room/now] My parents are hatching TV in the living room now, 3.彼女はその雑誌を読んだことがあると言った。 [ say / the magazine ] She say that she had read the magazine before.

二次関数の問題です。 ラストでaの範囲を求める際 なぜ－4<a<－√2 は範囲に該当しないのですか 存在範囲の問題の最後の最後でいつも間違えてしまいます。 範囲を見極めるコツとかあったらそれも知りたいです。 よろしくお願いします🙇‍♀️

特講 例題 111 方程式の解の存在範囲 [3] D [頻出] ★★☆☆ xについての2次方程式 x2 + (α-1)x-a+2=0の1つの解が20 の間にあり、もう1つの解が0と1の間にあるような定数αの値の範囲を 求めよ。 既知の問題に帰着 3章 2次関数と2次不等式 思考プロセス (例題 109 (3)... 1つの解が 例題 111 x < 0, もう1つの解が 0<x …1つの解が-2<x< 0, もう1つの解が0<x<1 ⇒端点 x = -2, x=1の条件をどのようにすればよいか? Action» 2数α, bの間の解は, f (a), f (b) の符号を考えよ ■ f(x) = x +(a-1)x-d+2 とおく。 f(x) = 0 の2つの解を α, β (a <β) とすると,-2<α < 0 <B<1であ るから,グラフは右の図。 よって f(-2) = -α-2a +8 > 0 f(0) = -α+2 < 0 ...(2) y -2 y=f(x) のグラフは,下 に凸の放物線である。 a O 1 + O + -2. 1 x f(1) = -a° + a +2 > 0 ① より, d' +2a-8 < 0 となるから よって 4<a<2 ・・・ ④ ... ②より, d-2 > 0 となるから (a+4) (a-2) < 0 (a+√2)(a_√2) > 0 よって a<-√2,√2<a … ⑤ ③より,d-a-2<0 となるから (a+1)(a-2) < 0 よって -1<a<2 ⑥ ④~⑥ より, 求めるαの値の範 (5) (5) x f(-2) > 0, f(0) < 0, f (1) > 0 のとき,必ず y=f(x) のグラフと x軸 は2点で交わるから 判 別式について考える必要 はない。 また,頂点や軸の位置に ついては,特に考慮しな くてもよい。 囲は √2 <a< 2 Point... 方程式の解の存在範囲 関数 f(x) が a≦x≦b の範囲で連続(つながった曲線) で,f(a)f(b) < 0 ならば,f(c) =0 となるcがαとも の間(a<c<6) に存在する。 y=f(x)/ y=f(x) a x cbx 不等式 f(a)f(b) < 0 は f(a) と f (b) が異符号であ ることを表し {f(a) > 0 の場合と 1f(b) <0 {f(a) <0 の場 \f(b)>0 合の両方を表している。