Respuesta :
Answer: It takes 193000 seconds to plate out exactly 1.00 mol of nickel metal, assuming 100 percent current efficiency.
Explanation:
1 electron carry charge=[tex]1.6\times 10^{-19}C[/tex]
1 mole of electrons contain= electrons
Thus 1 mole of electrons carry charge=[tex]\frac{1.6\times 10^{-19}}{1}\times 6.023\times 10^{23}=96500C=1 Faraday[/tex]
[tex]Ni(NO_3)_2\rightarrow Ni^{2+}+2NO_3^-[/tex]
[tex]Ni^{2+}+2e^-\rightarrow Ni[/tex]
[tex]96500\times 2=193000Coloumb[/tex] of electricity deposits 1.00 mole of nickel
[tex]Q=I\times t[/tex]
where Q= quantity of electricity in coloumbs = 193000 C
I = current in amperes = 1.00 A
t= time in seconds = ?
[tex]193000=1.00A\times t[/tex]
[tex]t=193000s[/tex]
Thus it takes 193000 seconds to plate out exactly 1.00 mol of nickel metal, assuming 100 percent current efficiency.
Answer:
time required is 193000 s
Explanation:
[tex]Ni^{2+}(aq)+2e^- \rightarrow Ni(s)[/tex]
From the above it is clear that for plating out 1 atom of Ni, 2 electrons are needed.
Therefore, for plating out 1 mol of nickel metal, 2 mols of electrons are needed.
Charge of 1 mol of electron = 96500 C = 1 Faraday
Therefore, charge of 2 moles of electron = 2 × 96500
= 193,000 C
Relation between current, charge and time is as follows:
Q = I × t
193000 = 1.00 × t
t = 193000 s
