Question

What will be the value of w, x, y, z respectively in balanced net equation for the following reaction in basic solution :
$wT{l}_2{O}_3\left(s\right)+xN{H}_{2}OH\left(aq\right)\to yTlOH\left(s\right)+z{N}_2\left(g\right)$

• A. 1, 4, 2, 2
• B. 4, 3, 2, 1
• C. 2, 3, 4, 1
• D. 1, 4, 3, 2

Answer 1

The correct option is A 1, 4, 2, 2

Steps for Balancing redox reactions:

• Identify the oxidation and reduction halves.
• Find the oxidising and reducing agent.
• Find the n-factor of oxidising and reducing agents.
• Cross multiply the oxidising and reducing agent with the n-factor of each other.
• Balance the atoms other than oxygen and hydrogen.
• Balance oxygen atoms.
• Balance hydrogen atoms.

For basic medium:
If x oxygens are less on one side than the other side add x $H_{2}O$ units to that side. As soon as we add x $H_{2}O$ units for balancing oxygen, we add generally 2x (or whatever suitable) $H^{+}$ ions on the opposite side to balance hydrogen.Then after that we add equal (equal to number of $H^{+}$ added) number of $O{H}^{-}$ ions to the both sides and combine $H^{+}$ and $O{H}^{-}$ ions to form $H_{2}O$. Then we cancel $H_{2}O$ which is common to both sides and which can be eliminated thus finally $O{H}^{-}$ is left on one side and the equation is balanced. Then we can verify whether the equation is balanced or not by checking the balance of charge on both sides.

formula used for the n-factor calculation,
$n_f=(|O.S{.}_{Product}-O.S{.}_{Reactant}|\times \text{number of atoms}$


Taking the raw form of given equation and following the above mentioned steps:
$T{l}_2{O}_3\left(s\right)+N{H}_{2}OH\left(aq\right)\to TlOH\left(s\right)+N_2\left(g\right)$

Oxidation state of Tl in $T{l}_2{O}_3=+3$
Oxidation state of Tl in $TlOH=+1$
Oxidation state of N in $N{H}_{2}OH=-1$
Oxidation state of N in $N_2=0$

Cleary, $N$ is undergoing oxidation and $Tl$ is undergoing reduction.

using the formula of n-factor given above,
$n_f$ of $T{l}_2{O}_3=4$
$n_f$ of $N{H}_{2}OH=1$

Cross multiplying these with $n_f$ of each other.
we get,
$T{l}_2{O}_3\left(s\right)+4N{H}_{2}OH\left(aq\right)\to TlOH\left(s\right)+N_2\left(g\right)$

Balancing the elements other than oxygen and hydrogen on both sides,
$T{l}_2{O}_3\left(s\right)+4N{H}_{2}OH\left(aq\right)\to 2TlOH\left(s\right)+2N_2\left(g\right)$

Adding the $H_{2}O$ to balance the oxygen,

As the LHS of the equation contains 7 oxygens while RHS contains only 2 oxygens, adding 5 $H_{2}O$ to RHS.

$T{l}_2{O}_3\left(s\right)+4N{H}_{2}OH\left(aq\right)\to 2TlOH\left(s\right)+2N_2\left(g\right)+5H_{2}O$

After this when we observe the equation is balanced already. No need to follow the further steps.

So, the value of w, x, y, z is 1, 4, 2, 2 respectively.