Answer:
The answer is:
(a) [tex]NaCl(aq)+AgNO_3(aq) \rightarrow AgCl(r) +NaNO_3 (aq)[/tex]
(b) NaCl
(c) 0.211 g
Explanation:
Given:
The mass of NaCl,
= 0.0860 g
The molar mass of NaCl,
= 58.44 g/mol
The volume of [tex]AgNO_3[/tex],
= 30.0 ml
or,
= 0.030 L
Molarity of [tex]AgNO_3[/tex],
= 0.050 M
Moles of NaCl will be:
= [tex]\frac{Given \ mass}{Molar \ mass}[/tex]
= [tex]\frac{0.0860}{58.44}[/tex]
= [tex]0.00147 \ mol[/tex]
now,
Moles of [tex]AgNO_3[/tex] will be:
[tex]= Molarity\times Volume[/tex]
[tex]= 0.050\times 0.030[/tex]
[tex]=0.0015 \ mol[/tex]
(a)
The reaction is:
⇒ [tex]NaCl(aq)+AgNO_3(aq) \rightarrow AgCl(r) +NaNO_3 (aq)[/tex]
(b)
1 mole of NaCl react with,
= 1 mol of [tex]AgNO_3[/tex]
0.0015 mol [tex]AgNO_3[/tex] needs,
= [tex]0.00150 \ mol \ NaCl[/tex]
Available mol of NaCl < needed amount of NaCl
So,
The limiting reagent is "NaCl".
(c)
The precipitate formed,
= [tex]0.00147\times \frac{1}{1}\times \frac{143.32}{1}[/tex]
= [tex]0.211 \ g \ AgCl[/tex]
