学年

質問の種類

英語 高校生

cの1〜4を教えていただきたいです!

103 の の 3 Old'senss 大画) 口04 When we visited her office for a regular check-up, Dr. Dixon told my mom )tp の: 〈杏林大) examined oaddor T to go to the hospital a to have her stomach 。 examine. 3 の bo oOwing to the appearance of competitors in the neighborhood, we will have 〈福岡大) 口05 egive up our plan to rise the price by twenty percent. rai'se A barOU onioela to oveilor 9V19do E) IIsp97 S) 9gugeib EXERCISE C >> ( )内の語句を並べかえて英文を完成させなさい。 )wel en A ID 29aion (8 口01 あなたの話を聞いて,数年前に私にも同じようなことがあったのを思い出した。 Your (happened / of / reminded/ similar / story/which / something / me) to me a few years ago. deib ydilsod 〈東洋大) eoil S 102 彼女は急用ができて, 昨日は福岡に出張することができなかった。[1語不要] (couldn't/ going / business / on / prevented /urgent / from / her) a business trip to Fukuoka yesterday. 9an9aib ori 1oeeso lo T9dmun edT 〈福岡大) cnteretist ① teT 口03 My younger brother ( cut / hair / having / his/ hates) short. bad sH liegnileote If the birthrate continues to fall in Japan, it will be difficult ( system / 〈愛知大) Jaid melota © Iegta S 口04 collapsing / the / stop / to / pension / from). 「な 文英 く芝浦工業大〉 8 ard abrstegy artaam.pdh aebaotis notA <大津印) T0口 plaingd usof why

解決済み 回答数: 2
数学 大学生・専門学校生・社会人

多様体の接空間に関する基底定理の証明です。g(q)=∫〜と定義した関数を微積分学の基本定理を用いながら変形してg(q)=g(0)+∑gᵢuⁱと導出するのですが、これがうまくいきません。 自分は、g(q)の式をまず両辺tで微分して、次に両辺uⁱで積分して、最後に両辺tで積分... 続きを読む

12. Theorem.If{ = (x', , x") is a coordinate system in M at p, then its coordinate vectors d, lp, …… 0,l, forma basis for the tangent space T,(M); and D= E(x) 。 i=1 for all ve T(M). Proof. By the preceding remarks we can work solely on the coordinate neighborhood of G. Since u(c) = Othere is no loss of generality in assuming ど(p) = 0eR". Shrinking W if necessary gives E(W) = {qe R":|q| < } for some 8. Ifg is a smooth function on E(W) then for each 1 <isndefine og (tq) dt du g(9) = for all qe {(W). It follows using the fundamental theorem of calculus that g= g(0) + E&,u' on (W). Thus if fe &(M), setting g = f。' yields f= f(P) + Ex on U. Applying d/ax' gives f(p) = (f /0x)(P). Thus applying the tangent vector e to the formula gives (f) = 0+ E(x'(p) + E Ap)u(x) = E(Px). ず ax Since this holds for all f e &(M), the tangent vectors v and Z Ux') d,l, are equal. It remains to show that the coordinate vectors are linearly independent. But if ) a, o.l, = 0, then application to x' yields dxi 0=24 (P) = 2q d」= 4. In particular the (vector space) dimension of T,(M) is the same as the dimension of M.

未解決 回答数: 1