카테고리 없음
Lewis Dot Structure Calculator Online
by troralnapertuma
2021. 1. 22.
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)
- A step-by-step explanation of how to draw the CaI2 Lewis Dot Structure.For CaI2 we have an ionic compound and we need to take that into account when we draw.
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Molar Mass, Molecular Weight and Elemental Composition Calculator
Molar mass of CH2ClCOO{-} lewis dot is 93.4896 g/mol Convert between CH2ClCOO{-}lewisdot weight and moles
Compound | Moles | Weight, g | CH2ClCOO{-}lewisdot |
Elemental composition of CH2ClCOO{-}lewisdot
Element | Symbol | Atomic weight | Atoms | Mass percent |
---|
Carbon | C | 12.0107 | 2 | 25.6942 | Hydrogen | H | 1.00794 | 2 | 2.1563 | Chlorine | Cl | 35.453 | 1 | 37.9219 | Oxygen | O | 15.9994 | 2 | 34.2271 |
Mass percent composition | Atomic percent composition |
Formula in Hill system is C2H2*ClO2 |
Computing molar mass (molar weight)To calculate molar mass of a chemical compound enter its formula and click 'Compute'. In chemical formula you may use: - Any chemical element. Capitalize the first letter in chemical symbol and use lower case for the remaining letters: Ca, Fe, Mg, Mn, S, O, H, C, N, Na, K, Cl, Al.
- Functional groups: D, Ph, Me, Et, Bu, AcAc, For, Ts, Tos, Bz, TMS, tBu, Bzl, Bn, Dmg
- parantesis () or brackets [].
- Common compound names.
Examples of molar mass computations: NaCl, Ca(OH)2, K4[Fe(CN)6], CuSO4*5H2O, water, nitric acid, potassium permanganate, ethanol, fructose. Molar mass calculator also displays common compound name, Hill formula, elemental composition, mass percent composition, atomic percent compositions and allows to convert from weight to number of moles and vice versa. Computing molecular weight (molecular mass) To calculate molecular weight of a chemical compound enter it's formula, specify its isotope mass number after each element in square brackets. Examples of molecular weight computations: C[14]O[16]2, S[34]O[16]2.
Definitions of molecular mass, molecular weight, molar mass and molar weight- Molecular mass (molecular weight) is the mass of one molecule of a substance and is expressed in the unified atomic mass units (u). (1 u is equal to 1/12 the mass of one atom of carbon-12)
- Molar mass (molar weight) is the mass of one mole of a substance and is expressed in g/mol.
Weights of atoms and isotopes are from NIST article. Give us feedback about your experience with Molecular Weight Calculator. Related: Molecular weights of amino acids
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Generating the Lewis dot Structure. To generate the Lewis dot structure, you have to follow the given steps: Find the total count of valence electrons to molecules. In this step, add the total count of valence electrons from all the atoms in a bit. Find the required count of.
Lewis Dot Structure Calculator Online Game
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Lewis Dot Structure Calculator Online Desmos
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)