A) 75
B) 96
C) 60
D) 84
Correct Answer: D
Solution :
Key concept In the given problem we have provided practical yield of\[MgO\]. For calculation of percentage yield of\[MgO\], we need theoretical yield of\[MgO\]. For this we shall use mole concept. \[MgC{{O}_{3}}(s)\xrightarrow{\,}MgO(s)+C{{O}_{2}}(g)\,\] ?(i) Moles of \[MgC{{O}_{3}}\] \[\text{=}\frac{\text{weight m gram}}{\,\text{Molecular weight}}\] \[=\frac{20}{84}=0.238mol\] From Eq. (i) 1 mole of \[MgC{{O}_{3}}\] gives = 1 mol \[MgO\] \[\therefore \] 0.238 mole \[MgC{{O}_{3}}\] will give = 0.238 mol \[MgO\] \[=0.238\times 40\,g\,=9.52g\,MgO\] Now, practical yield of \[MgO=8\,g\] \[\therefore \] \[%\text{purity=}\frac{8}{9.52}\therefore 100=84%\] Alternate, \[\underset{84g}{\mathop{MgC{{O}_{3}}}}\,\xrightarrow{\,}\underset{40g}{\mathop{MgO}}\,+C{{O}_{2}}\] \[\therefore \,\,\,8\,\,g\,MgO\] will be form from \[\frac{84}{5}g\] \[\therefore \] % purity = \[\frac{84}{2}\times \frac{100}{20}=84%\]You need to login to perform this action.
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