モル質量 of C60H94N16O16S2 (NR58-3.14.3) is 1359.6160 g/mol
C60H94N16O16S2 の重量とモルの間で変換します
の元素組成 C60H94N16O16S2
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 | 60 | 53.0033 | 水素 | H | 1.00794 | 94 | 6.9686 | 窒素 | N | 14.0067 | 16 | 16.4831 | 酸素 | O | 15.9994 | 16 | 18.8281 | 硫黄 | S | 32.065 | 2 | 4.7168 |
モル質量を段階的に計算する |
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まず、C60H94N16O16S2 内の各原子の数を計算します。
C: 60, H: 94, N: 16, O: 16, S: 2
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, S: 32.065
次に、原子数と原子量の積の合計を計算します。
モル質量 (C60H94N16O16S2) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(N) * Weight(N) + Count(O) * Weight(O) + Count(S) * Weight(S) =
60 * 12.0107 + 94 * 1.00794 + 16 * 14.0067 + 16 * 15.9994 + 2 * 32.065 =
1359.6160 g/mol
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化学構造 |
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![C60H94N16O16S2 - 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 C60H94N16O16S2
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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 |