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- Kronecker too wished to arithmetize analysis. Kronecker也愿意地把分析算術(shù)化。
- Let us restate the assertions above as a theorem. 我們把上述的斷言重新表述為一個(gè)定理。
- The second proof of Theorem 26 is due to James. 定理26的第二個(gè)證明屬于詹姆斯。
- Theorem g is called binomial theorem. 定理g稱(chēng)為二項式定理。
- This completes the proof of the convexity theorem. 這就完成了凸定理的證明。
- This calculation illustrates the theorem. 這個(gè)計算說(shuō)明了這樣一個(gè)定理。
- This function is also known as the Kronecker Delta function. 該函數也稱(chēng)為Kronecker Delta函數。
- We call this principle a rule and not a theorem. 我們稱(chēng)這個(gè)法則為原理而不稱(chēng)為定理。
- We have thus arrived at the very important theorem. 這樣我們就得了一條很重要的法則。
- The theorem may be explained as follows. 這條原理可以這樣來(lái)闡述。
- This method helps to obtain a remarkable theorem. 這一方法有助于得出一著(zhù)名的定理。
- His theorem can be translated into simple terms. 他的定理可用更簡(jiǎn)單的術(shù)語(yǔ)來(lái)解釋。
- Theorem 2 ABd method is absolutely stable. 定理4 PAEI方法在M‘/2范數意義下是絕對穩定的.
- The main results are theorem 5 anc theorem 9 . 主要結果是定理5和定理9,宅是文[4]的繼續。
- This is the "Kos theorem" Wu edition. 這是 “科斯定理”的張五常版。
- Poynting's Theorem and the Poynting Vector S. 波印廷定理及波印廷向量S。
- Two fomes of STOLZ theorem are given and extend. 給出STOLZ定理的兩種形式并把它們進(jìn)行了推廣,討論了它們的應用。
- A three critical point theorem is proved. 證明了一個(gè)三臨界點(diǎn)定理。
- Leopold Kronecker",,"God made the integers;all else is the work of man. ";"上帝創(chuàng )造了整數;其它一切都是人造的.
- Characteristic polynomial, Cayley-Hamilton theorem. 特征多項式和那個(gè)定理。