Expected grams of aluminum oxide product from the given masses of reactants are 18.93 g.
What is aluminum?Aluminum is chemical element with symbol Al and atomic number is 13.
4Al + 3O₂ → 2Al₂O₃
10 g Al × 1 mol Al / 26.98 g Al = 0.371 mol Al
4 g O₂ × 1 mol O₂ / 32.00 g O₂ = 0.125 mol O₂
We determine the limiting reactant by comparing the mole ratios of aluminum and oxygen in the balanced equation and reactant that produces smaller amount of product is limiting reactant. In this case, aluminum is the limiting reactant because it produces only 0.1855 moles of aluminum oxide, which is less than the 0.25 moles of aluminum oxide produced by the oxygen:
0.371 mol Al × 2 mol Al₂O₃ / 4 mol Al = 0.1855 mol Al₂O₃
0.125 mol O₂ × 2 mol Al₂O₃ / 3 mol O2 = 0.2083 mol Al₂O₃
0.1855 mol Al₂O₃ × 101.96 g/mol = 18.93 g Al₂O₃
Therefore, expected grams of aluminum oxide product from the given masses of reactants are 18.93 g.
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a 1.25 g sample of co2 is contained in a 750. ml flask at 22.5 c. what is the pressure of the gas, in atm?
The pressure of gas is 1.05 atm when a 1.25 g sample of CO₂ is contained in a 750ml flask at 22.5°C.
Molecular weight of CO₂ is 1.25g ,Volume of CO₂ is 750ml,Temperature of CO₂ is 22.5°C and the gas constant is 0.08206 L atm/mol K.
Using the ideal gas law equation the pressure is found to be 1.05 atm.
To calculate the pressure of the gas, we can use the ideal gas law equation: [tex]PV=nRT[/tex]
Where P is the pressure, V is the volume, n is the number of moles, R is the gas constant, and T is the temperature in Kelvin.
First, we need to convert the volume to liters by dividing by 1000: 750 ml = 0.75 L.
Next, we need to calculate the number of moles of CO₂ present in the flask. We can use the molecular weight of CO₂ to convert from grams to moles:
[tex]1.25 * (1 /44.01 ) = 0.0284 mol[/tex]
Now we can plug in the values into the ideal gas law equation:
[tex]PV=nRT[/tex]
[tex]P * 0.75 L = 0.0284 mol * 0.08206 L*atm/mol*K * (22.5 + 273.15) K[/tex]
Simplifying and solving for P, we get:
[tex]P = (0.0284 * 0.08206 * 295.65) / 0.75 = 1.05 atm[/tex]
Therefore, the pressure of the gas in the flask is 1.05 atm.
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