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数学 高校生

無限級数の範囲です。 検討の赤の下線部についてなのですが、例えばp=1の時発散してp=2のとき収束するのは、p=2の時の方が分母が大きくなるスピードが速いからなのですか? 違いを教えて欲しいです

kx +1 ① とする。 [1] n=1のとき 21/2=1+1/2=1/2 +1 よって, ① は成り立つ。 [2]=mmは自然数のとき、①が成り立つと仮定すると+1 「このとき 2m 2m+1 21-21+1 k=1 k k=1 k k=2+1k 1 2(+1) +2 +1 +2 +2 2" + + 2m+1 2+1+2+1+2+2 +......+ 1 >" +1 + pos.2" = m+1 +1 2 2m+1 2 ·2"= よって, n=m+1のときにも①は成り立つ。 1 2m +2m 2m+1=2m2=2"+2" 1 2+2+2 (2) 2m+k (k=1,2, 2m-1) [1] [2] から すべての自然数nについて ① は成り立つ。ちとする (2) S=1/2とおく。 n≧2" とすると, (1) から k=1k Sn m +1 k=1 k limS=∞ 2218 ここで,m→∞のときn→∞ で lim lim(+1)=00 2 m10 8 と したがっては発散する。 n=1 n 無限級数1/n の収束 発散について lan≦bn liman=8⇒limbn= (p.343②) 881 00-16 数列{an} が 0 に収束しなければ,無限級数 2 am は発散するが(p.61 基本事項2②),こ n=1 無限級数 46 の逆は成立しない。 上の (2) において lim -=0であることから,このことが確認できる。 ugu なお n' >1のとき収束, ≦1のとき発散することが知られている。 練習 上の例題の結果を用いて,無限級数方 は発散することを示せ。 p.81 EX 32 5

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英語 高校生

赤い下線のところがどういう構造になっているか分からないです、教えてくださいm(_ _)m

moving from " (1) 点) There are historians and others who would like to make a neat division between "historical facts" and "values." The trouble is that values even enter into deciding what count as facts-there is a big leap involved in 'raw data" to a judgement of fact. More important, one finds that the more complex and multi-levelled the history is, and the more important the issues it raises for today, the less it is possible to sustain a fact-value division. But this by no means implies that there has simply to be a conflict of prejudices and biases, as the data are manipulated to suit one worldview or another. What it does mean is that the self of the historian is an important factor. The historian is shaped by experiences, contexts, norms, values, and beliefs. When dealing with history, especially the sort of history that is of most significance in philosophy, that shaping is bound to be relevant. As far as possible it needs to be articulated and open to discussion. The best historians are well aware of this. They are alert to many dimensions of bias and to the endless (and therefore endlessly discussable) significance of their own horizons and presuppositions. A great deal can of course be learned from those who do not share our presuppositions. Our capacity to make wise, well-supported judgements in matters of historical fact and significance can only be formed over years of discussion with others, many of whom have very different horizons from our own. It is possible to I have a 12-year-old chess champion or mathematical or musical genius, but it is unimaginable that the world's greatest expert on Socrates could be that age. The difficulty is not just one of the time to assimilate information; it is (2)

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