Respuesta :
Answer:
14.4 g of [tex]CO_{2}[/tex] can be produced.
Explanation:
Balanced equation: [tex]2C_{4}H_{10}+13O_{2}\rightarrow 8CO_{2}+10H_{2}O[/tex]
Molar mass (g/mol)
[tex]C_{4}H_{10}[/tex] 58.12
[tex]O_{2}[/tex] 32
[tex]CO_{2}[/tex] 44.01
So, 9.60 g of [tex]C_{4}H_{10}[/tex] = [tex]\frac{9.60}{58.12}mol=0.165mol[/tex]
17.0 g of [tex]O_{2}[/tex] = [tex]\frac{17.0}{32}mol=0.531mol[/tex]
According to balanced equation-
2 moles of [tex]C_{4}H_{10}[/tex] produce 8 moles of [tex]CO_{2}[/tex]
So, 0.165 moles of [tex]C_{4}H_{10}[/tex] produce [tex](\frac{8}{2}\times 0.165)mol[/tex] of [tex]CO_{2}[/tex] or 0.660 moles of [tex]CO_{2}[/tex]
13 moles of [tex]O_{2}[/tex] produce 8 moles of [tex]CO_{2}[/tex]
So, 0.531 moles of [tex]O_{2}[/tex] produce [tex](\frac{8}{13}\times 0.531)moles[/tex] of [tex]CO_{2}[/tex] or 0.327 moles of [tex]CO_{2}[/tex]
As least number of moles of [tex]CO_{2}[/tex] are produced from [tex]O_{2}[/tex] therefore [tex]O_{2}[/tex] is the limiting reagent.
So, maximum amount of [tex]CO_{2}[/tex] that can be formed = 0.327 moles
= [tex](0.327\times 44.01)g[/tex]
= 14.4 g
