Respuesta :
Answer : The final temperature of the water is, [tex]22.5166^oC[/tex]
Explanation : Given,
Mass of benzene = 8.600 g
Molar mass of benzene = 78 g/mole
First we have to calculate the moles of benzene.
[tex]\text{Moles of benzene}=\frac{\text{Mass of benzene}}{\text{Molar mass of benzene}}=\frac{8.600g}{78g/mol}=0.1103mole[/tex]
Now we have to calculate the energy of combustion.
The given balanced chemical reaction is:
[tex]2C_6H_6(l)+15O_2(g)\rightarrow 12CO_2(g)+6H_2O(l)+6542 kJ[/tex]
According to reaction,
As, 2 moles of benzene gives 6542 kJ of energy on combustion.
So, 0.1103 mole of benzene gives [tex]\frac{6542 kJ}{2}\times 0.1103=360.7913kJ[/tex] of energy on combustion.
Now we have to calculate the final temperature of the water.
Formula used : [tex]q_w=m_w\times c_w\times \Delta T=m_w\times c_w\times (T_{final}-T_{initial})[/tex]
where,
[tex]q_w[/tex] = heat released = 360.7913 kJ = 36079.13 J
[tex]m_w[/tex] = mass of water = 5691 g
[tex]c_w[/tex] = specific heat of water= [tex]4.18J/g^oC[/tex]
[tex]T_{final}[/tex] = final temperature = ?
[tex]T_{initial}[/tex] = initial temperature = [tex]21^oC[/tex]
Now put all the given values in the above formula, we get:
[tex]36079.13J=5691g\times 4.18J/g^oC\times (T_{final}-21^oC)[/tex]
[tex]T_{final}=22.5166^oC[/tex]
Therefore, the final temperature of the water is, [tex]22.5166^oC[/tex]
