몰 질량 of Emamectin (C49H75NO13) is 886.1187 g/mol
C49H75NO13 중량과 몰 사이의 변환
다음 물질의 원소 조성 C49H75NO13
요소 | 상징 | 원자량 | 원자 | 질량 비율 |
---|
탄소 | C | 12.0107 | 49 | 66.4160 | 수소 | H | 1.00794 | 75 | 8.5311 | 질소 | N | 14.0067 | 1 | 1.5807 | 산소 | O | 15.9994 | 13 | 23.4723 |
몰질량을 단계별로 계산하기 |
---|
먼저 C49H75NO13에 있는 각 원자의 수를 계산합니다.
C: 49, H: 75, N: 1, O: 13
그런 다음 주기율표 의 각 원소에 대한 원자량을 검색합니다.
C: 12.0107, H: 1.00794, N: 14.0067, O: 15.9994
이제 원자 수와 원자량의 곱의 합을 계산합니다.
몰 질량 (C49H75NO13) = ∑ Counti * Weighti =
Count(C) * Weight(C) + Count(H) * Weight(H) + Count(N) * Weight(N) + Count(O) * Weight(O) =
49 * 12.0107 + 75 * 1.00794 + 1 * 14.0067 + 13 * 15.9994 =
886.1187 g/mol
|
화학 구조 |
---|
![C49H75NO13 - 화학 구조](data:images/png;base64,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) |
모습 |
---|
에마멕틴 벤조에이트는 흰색 또는 희미한 노란색 분말입니다. |
관련 화합물
힐 시스템의 공식은 C49H75NO13
|
계산 몰 질량 (몰 중량)화합물의 몰 질량을 계산하려면 공식을 입력하고 '계산'을 클릭하세요. 화학식에서 당신은 다음과 같은 것들을 사용할 수 있습니다 :
- 어떤 화학 원소. 화학 기호의 첫 글자를 대문자로 하고 나머지 글자는 소문자를 사용합니다. Ca, Fe, Mg, Mn, S, O, H, C, N, Na, K, Cl, Al.
- 기능 그룹 :D, Ph, Me, Et, Bu, AcAc, For, Tos, Bz, TMS, tBu, Bzl, Bn, Dmg
- 괄호() 또는 대괄호 []입니다.
- 관용명
몰 질량 계산의 예 : NaCl, Ca(OH)2, K4[Fe(CN)6], CuSO4*5H2O, 질산, 과망간산 칼륨, 에탄올, 과당, 카페인, 물.
몰 질량 계산기는 또한 일반적인 화합물 이름, Hill 공식, 원소 구성, 질량 백분율 구성, 원자 백분율 구성을 표시하고 무게를 몰수로 또는 그 반대로 변환할 수 있습니다.
컴퓨팅 분자량 (분자량)
화합물의 분자량을 계산하려면 공식을 입력하고 각 원소 뒤에 동위원소 질량수를 대괄호 안에 지정하세요.
분자량 계산의 예 :
C[14]O[16]2,
S[34]O[16]2.
정의
- molecular_mass_def
- 몰질량은 (molar weight) 어떤 물질이 1몰 있을때의 질량을 이야기 하고 단위는 g/mol입니다.
- 두더지는 원자나 분자와 같은 매우 작은 물질을 대량으로 측정하기 위한 표준 과학 단위입니다. 1몰에는 정확히 6.022 ×10 23 입자(아보가드로 수)가 들어 있습니다.
몰 질량을 계산하는 단계
- 화합물 식별: 화합물의 화학식을 적습니다. 예를 들어, 물은 H 2 O입니다. 이는 수소 원자 2개와 산소 원자 1개를 포함한다는 의미입니다.
- 원자 질량 찾기: 화합물에 존재하는 각 원소의 원자 질량을 찾아보세요. 원자 질량은 일반적으로 주기율표에서 찾을 수 있으며 원자 질량 단위(amu)로 표시됩니다.
- 각 원소의 몰 질량을 계산합니다. 각 원소의 원자 질량에 화합물에 포함된 해당 원소의 원자 수를 곱합니다.
- 합산: 3단계의 결과를 더하여 화합물의 총 몰 질량을 구합니다.
예: 몰질량 계산
이산화탄소(CO 2 )의 몰질량을 계산해 보겠습니다.
- 탄소(C)의 원자 질량은 약 12.01 amu입니다.
- 산소(O)의 원자 질량은 약 16.00amu입니다.
- CO 2 에는 탄소 원자 1개와 산소 원자 2개가 있습니다.
- 이산화탄소의 몰 질량은 12.01 + (2 × 16.00) = 44.01 g/mol입니다.
각 원소와 동위원소의 질량을 NIST기사를 참조하십시오 href='http://physics.nist.gov/cgi-bin/Compositions/stand_alone.pl'> a> 관련 : 아미노산의 분자량 |