モル質量 of Beauvericin (C45H57N3O9) is 783.9488 g/mol
C45H57N3O9 の重量とモルの間で変換します
の元素組成 C45H57N3O9
元素 | 記号 | 原子量 | 原子 | 重量パーセント |
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炭素 | C | 12.0107 | 45 | 68.9435 | 水素 | H | 1.00794 | 57 | 7.3286 | 窒素 | N | 14.0067 | 3 | 5.3601 | 酸素 | O | 15.9994 | 9 | 18.3679 |
モル質量を段階的に計算する |
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まず、C45H57N3O9 内の各原子の数を計算します。
C: 45, H: 57, N: 3, O: 9
次に、周期表の各元素の原子量を調べます。
C: 12.0107, H: 1.00794, N: 14.0067, O: 15.9994
次に、原子数と原子量の積の合計を計算します。
モル質量 (C45H57N3O9) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(N) * Weight(N) + Count(O) * Weight(O) =
45 * 12.0107 + 57 * 1.00794 + 3 * 14.0067 + 9 * 15.9994 =
783.9488 g/mol
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化学構造 |
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![C45H57N3O9 - 化学構造](data:images/png;base64,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) 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関連化合物
ヒル方式による化学式 C45H57N3O9
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モル質量(molar mass)とモル重量(molar weight)の計算化合物のモル質量を計算するには、化合物の式を入力し、「計算」をクリックします。 入力には以下のものを使用できます:
- 任意の化学元素. 化学記号の最初の文字を大文字にし、残りの文字は小文字にます。 Ca, Fe, Mg, Mn, S, O, H, C, N, Na, K, Cl, Al.
- 官能基:D, Ph, Me, Et, Bu, AcAc, For, Tos, Bz, TMS, tBu, Bzl, Bn, Dmg
- 括弧 () または括弧 []。
- 化合物の慣用名.
モル質量の計算の例: NaCl, Ca(OH)2, K4[Fe(CN)6], CuSO4*5H2O, 硝酸, 過マンガン酸カリウム, エタノール, フルクトース, カフェイン, 水.
.モルマス計算機は、一般的な化合物名、ヒル式、元素組成、質量パーセント組成、原子パーセント組成を表示し、重量からモル数への変換とその逆が可能です。
分子量(molecular weight)と分子質量(molecular mass)の計算
化合物の分子量を計算するには、化合物の式を入力し、各元素の後に同位体の質量数を角括弧で囲んで指定します。
分子量計算の例:
C[14]O[16]2,
S[34]O[16]2.
定義
- 分子質量 (分子量) は、物質1分子の質量であり、統一原子質量単位(u)で表現されます。 (1 uは炭素12の1原子の質量の12分の1に等しい)
- モル質量は、物質の1モルの質量であり、g/molの単位で表されます。
- モルは、原子や分子などの非常に小さな実体を大量に測定するための標準的な科学単位です。 1 モルには正確に 6.022 × 10 23 個の粒子 (アボガドロ数) が含まれています。
モル質量を計算する手順
- 化合物を特定する:化合物の化学式を書き留めます。たとえば、水は H 2 O であり、2 つの水素原子と 1 つの酸素原子が含まれていることを意味します。
- 原子量を調べる:化合物に存在する各元素の原子量を調べます。原子質量は通常周期表に記載されており、原子質量単位 (amu) で表されます。
- 各元素のモル質量を計算します。各元素の原子質量に、化合物内のその元素の原子の数を掛けます。
- それらを加算します。ステップ 3 の結果を加算して、化合物の総モル質量を取得します。
例: モル質量の計算
二酸化炭素 (CO 2 ) のモル質量を計算してみましょう。
- 炭素 (C) の原子質量は約 12.01 amu です。
- 酸素 (O) の原子質量は約 16.00 amu です。
- CO 2には 1 つの炭素原子と 2 つの酸素原子があります。
- 二酸化炭素のモル質量は、12.01 + (2 × 16.00) = 44.01 g/mol です。
各原子量は NISTの記事を参照しています。 関連:アミノ酸の分子量 |