Respuesta :
Answer:
68.6 % of the compound is carbon
Explanation:
Step 1: Data given
Mass of 7.40 mg = 0.0074 grams
Mass of carbon dioxide = 18.6 mg = 0.0186 grams
Molar mass CO2 = 44.01 g/mol
Step 2: Calculate moles CO2
Moles CO2 = mass CO2 / molar mass CO2
Moles CO2 = 0.0186 grams / 44.01 g/mol
Moles CO2 = 4.23*10^-4 moles
Step 3: Calculate moles C
For 1 mol CO2 we have 1 mol C
For 4.23*10^-4 moles CO2 we have 4.23*10^-4 moles C
Step 4: Calculate mass C
Mass C = 4.23*10^-4 moles * 12.01 g/mol
Mass C = 0.00508 grams
Step 5: calculate the mass percentage of carbon
% C= (0.00508 grams / 0.0074 grams ) * 100 %
% C = 68.6 %
68.6 % of the compound is carbon
Answer: The mass percent of carbon in sample is 68.51 %
Explanation:
We are given:
Mass of [tex]CO_2=18.6mg=0.0186g[/tex]
For calculating the mass of carbon:
In 44 g of carbon dioxide, 12 g of carbon is contained.
So, in 0.0186 g of carbon dioxide, [tex]\frac{12}{44}\times 0.0186=0.00507=5.07mg[/tex] of carbon will be contained.
To calculate the mass percentage of carbon in sample, we use the equation:
[tex]\text{Mass percent of carbon}=\frac{\text{Mass of carbon}}{\text{Mass of sample}}\times 100[/tex]
Mass of carbon = 5.07 mg
Mass of sample = 7.40 mg
Putting values in above equation, we get:
[tex]\text{Mass percent of carbon}=\frac{5.07mg}{7.40mg}\times 100=68.51\%[/tex]
Hence, the mass percent of carbon in sample is 68.51 %
