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TOEIC・英語 大学生・専門学校生・社会人

ミドリの蛍光ペンで引いている部分がなぜそうなるのか分からないので教えてほしいです💦

) without an overcoat. (帝塚山学院大) It is warm here in winter. I can ( 0 do 2 hold ③ keep ④ bear し (3) 幸福は財産の多さにはない。(高知大) Happiness does not consist ( 2 at 3 of ④ in ) how many possessions you own. 0 on (3) 4 ) for this error. (中央大) (4) It's very hard to ( 0 make ② look ③ acount ④ take デ大) (4)と3 (5) That coat doesn't ( O go with )your shoes. (南山大) 3 suit for 4 fit at 2 match to 2 (6) The car crash ( 0 carried )in the death of three people. (南山大) caused 3 resulted ④ eliminated (6)_3 (7) Although he was drunk, he insisted ( 2 in ③ to ④ for ) driving. (北海道工業大) 0 on (7) 1 (8) 彼女の推測は正しいことがわかった。(専修大) Her guess turned ( 0 off 2 out ③ at ④ in ) to be right. 2 (路面が)凍結していたために多くの事故が起こった。 (専修大) Many accidents resulted ( 0 in 2 on ) the icy conditions. 3 for の from 1(10) The total fee for the summer course ( many classes you take. (中央大) O leans on ② depends on ③ counts on ④ relies on (10) (11)I certainly agree ( )you on this point. (駒淫大) ① with ② at ③ in ④ for ートフォン 、( を手に入れた。 (12)「すみません, このジャケットが気に入りました。 試着してもいいですか」 「もちろんです」 2 (愛知学院大) )?""Sure." “Excuse me, I like this jacket. May I try it ( 0 on 2 for ③ off ④ in (12) (13) そのスキャンダルの結果, 2人の大臣が辞任した。(中央大) The scandal ( O brought 2 led ③ took ④ made ) to the resignation of two ministers. (13) 2(14)1 ran ( ) one of my old friends on my way back home. (摂南大) 0 through ② out ③ away ④ into (14) _7 4

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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.

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