Respuesta :
Answer : The percent yield is, 83.51 %
Solution : Given,
Mass of Zn = 5.00 g
Mass of [tex]AgNO_3[/tex] = 25.00 g
Molar mass of Zn = 65.38 g/mole
Molar mass of [tex]AgNO_3[/tex] = 168.97 g/mole
Molar mass of Ag = 107.87 g/mole
First we have to calculate the moles of Zn and [tex]AgNO_3[/tex].
[tex]\text{ Moles of }Zn=\frac{\text{ Mass of }Zn}{\text{ Molar mass of }Zn}=\frac{5.00g}{65.38g/mole}=0.0765moles[/tex]
[tex]\text{ Moles of }AgNO_3=\frac{\text{ Mass of }AgNO_3}{\text{ Molar mass of }AgNO_3}=\frac{25.00g}{168.97g/mole}=0.1479moles[/tex]
Now we have to calculate the limiting and excess reagent.
The balanced chemical reaction is,
[tex]Zn+2AgNO_3\rightarrow Zn(NO_3)_2+2Ag[/tex]
From the balanced reaction we conclude that
As, 2 mole of [tex]AgNO_3[/tex] react with 1 mole of [tex]Zn[/tex]
So, 0.1479 moles of [tex]AgNO_3[/tex] react with [tex]\frac{0.1479}{2}=0.07395[/tex] moles of [tex]Zn[/tex]
From this we conclude that, [tex]Zn[/tex] is an excess reagent because the given moles are greater than the required moles and [tex]AgNO_3[/tex] is a limiting reagent and it limits the formation of product.
Now we have to calculate the moles of [tex]Ag[/tex]
From the reaction, we conclude that
As, 2 mole of [tex]AgNO_3[/tex] react to give 2 mole of [tex]Ag[/tex]
So, 0.1479 moles of [tex]AgNO_3[/tex] react to give 0.1479 moles of [tex]Ag[/tex]
Now we have to calculate the mass of [tex]Ag[/tex]
[tex]\text{ Mass of }Ag=\text{ Moles of }Ag\times \text{ Molar mass of }Ag[/tex]
[tex]\text{ Mass of }Ag=(0.1479moles)\times (107.87g/mole)=15.95g[/tex]
Theoretical yield of [tex]Ag[/tex] = 15.95 g
Experimental yield of [tex]Ag[/tex] = 13.32 g
Now we have to calculate the percent yield.
[tex]\% \text{ yield}=\frac{\text{ Experimental yield of }Ag}{\text{ Theretical yield of }Ag}\times 100[/tex]
[tex]\% \text{ yield}=\frac{13.32g}{15.95g}\times 100=83.51\%[/tex]
Therefore, the percent yield is, 83.51 %
