Respuesta :
Answer:
1 9.9
2 4.95
3 12.375
Explanation:
To solve this problem, we basically need to write a balanced chemical equation:
Like all other hydrocarbons, benzene burns in oxygen to yield water and carbon iv oxide as the only products. A balanced chemical equation is given below:
2C6H6(l)+15O2(g)→12CO2(g)+6H2O(g)
Let’s now proceed to answer the questions.
A. Number of moles of carbon iv oxide produced
From the balanced chemical equation, we can see that one mole of benzene yielded 6 moles of carbon iv oxide.
This means 1.65 moles of benzene will yield: 6 * 1.65 = 9.9 moles of CO2
B. From the balanced equation, we can see that one mole of benzene yielded 3 moles of water. Hence, 1.65 moles will yield 1.65 * 3 = 4.95 moles of water
C. To find the number of moles of oxygen consumed, we can see that 2 moles of benzene consumed 15 moles of oxygen. 1.65 moles of benzene would thus consume 1.65 * 15/2moles = 12.375moles of oxygen
Answer:
A. 9.9 moles of CO2.
B. 4.95 moles of H2O.
C. 12.375 moles of O2
Explanation:
Step 1:
The equation for the reaction is given below:
C6H6 + O2 —> CO2 + H2O
Step 2:
Balancing the equation. This is illustrated below :
C6H6 + O2 —> CO2 + H2O
There are 6 atoms of C on the left side and 1 atom on the right side. It can be balance by putting 6 in front of CO2 as shown below:
C6H6 + O2 —> 6CO2 + H2O
There are 6 atoms of H on the left side and 2 atoms on the right side. It can be balance by putting 3 in front of H2O as shown below:
C6H6 + O2 —> 6CO2 + 3H2O
There are a total of 15 atoms of O on the right side and 2 atoms on the left side. It can be balance by putting 15/2 in front of O2 as shown below:
C6H6 + 15/2O2 —> 6CO2 + 3H2O
Multiply through by 2 to clear the fraction as shown below:
2C6H6 + 15O2 —> 12CO2 + 6H2O
Now the equation is balanced.
A. Step 3:
Determination of the moles of CO2 produced when 1.65 moles of C6H6 react with excess oxygen This is illustrated below:
2C6H6 + 15O2 —> 12CO2 + 6H2O
From the balanced equation above,
2 moles of C6H6 produced 12 moles of CO2.
Therefore, 1.65 moles of C6H6 will produce = (1.65x12)/2 = 9.9 moles of CO2.
B. Step 4:
Determination of the moles of H2O produced when 1.65 moles of C6H6 react with excess oxygen This is illustrated below:
2C6H6 + 15O2 —> 12CO2 + 6H2O
From the balanced equation above,
2 moles of C6H6 produced 6 moles of H2O.
Therefore, 1.65 moles of C6H6 will produce = (1.65x6)/2 = 4.95 moles of H2O.
C. Step 5:
Determination of the moles of O2 consumed during the reaction. This is illustrated below:
2C6H6 + 15O2 —> 12CO2 + 6H2O
From the balanced equation above,
2 moles of C6H6 consumed 15 moles of O2.
Therefore, 1.65 moles of C6H6 will consume = (1.65x15)/2 = 12.375 moles of O2
