MCQMediumJEE 2026Buffer Solutions

JEE Chemistry 2026 Question with Solution

Which of the following mixture gives a buffer solution with pH=9.25\mathrm{pH} = 9.25?

Given: pKb(NH4OH)=4.75\mathrm{p}K_b(\mathrm{NH_4OH}) = 4.75

  • A

    0.2M NH4OH(0.5L)+0.1M HCl(0.5L)0.2\,M\ \mathrm{NH_4OH}\,(0.5\,L) + 0.1\,M\ \mathrm{HCl}\,(0.5\,L)

  • B

    0.4M NH4OH(1L)+0.1M HCl(1L)0.4\,M\ \mathrm{NH_4OH}\,(1\,L) + 0.1\,M\ \mathrm{HCl}\,(1\,L)

  • C

    0.2M NH4OH(0.4L)+0.1M HCl(1L)0.2\,M\ \mathrm{NH_4OH}\,(0.4\,L) + 0.1\,M\ \mathrm{HCl}\,(1\,L)

  • D

    0.5M NH4OH(0.2L)+0.2M HCl(0.5L)0.5\,M\ \mathrm{NH_4OH}\,(0.2\,L) + 0.2\,M\ \mathrm{HCl}\,(0.5\,L)

Answer

Correct answer:A

Step-by-step solution

Standard Method

Given: The required buffer has pH=9.25\mathrm{pH} = 9.25 and pKb(NH4OH)=4.75\mathrm{p}K_b(\mathrm{NH_4OH}) = 4.75.

Find: Which mixture gives this buffer solution.

Since the buffer consists of a weak base and its conjugate acid, we use the Henderson equation for basic buffer:

pOH=pKb+log([salt][base])\text{pOH} = \text{p}K_b + \log\left(\frac{[\text{salt}]}{[\text{base}]}\right)

Step 1: Calculate pOH.

pH=9.25pOH=149.25=4.75\text{pH} = 9.25 \Rightarrow \text{pOH} = 14 - 9.25 = 4.75

Step 2: Apply Henderson equation.

4.75=4.75+log([salt][base])4.75 = 4.75 + \log\left(\frac{[\text{salt}]}{[\text{base}]}\right)

So,

log([salt][base])=0\log\left(\frac{[\text{salt}]}{[\text{base}]}\right) = 0

Hence,

[salt][base]=1\frac{[\text{salt}]}{[\text{base}]} = 1

Thus, moles of NH4+\mathrm{NH_4^+} formed must equal the remaining moles of NH4OH\mathrm{NH_4OH}.

Step 3: Check option (A). Moles of NH4OH\mathrm{NH_4OH}:

0.2×0.5=0.1 mol0.2 \times 0.5 = 0.1 \text{ mol}

Moles of HCl\mathrm{HCl}:

0.1×0.5=0.05 mol0.1 \times 0.5 = 0.05 \text{ mol}

After neutralization:

Remaining NH4OH=0.05 mol,NH4+=0.05 mol\text{Remaining } \mathrm{NH_4OH} = 0.05 \text{ mol}, \quad \mathrm{NH_4^+} = 0.05 \text{ mol}

Therefore,

[salt][base]=1\frac{[\text{salt}]}{[\text{base}]} = 1

which gives the required pH.

Conclude: Option A forms a buffer of pH=9.25\mathrm{pH} = 9.25. The correct option is A.

Equal salt and base shortcut

Given: A basic buffer of NH4OH\mathrm{NH_4OH} and its salt is required to have pH=9.25\mathrm{pH} = 9.25.

Find: Which option gives equal conjugate acid and weak base.

For a basic buffer, when salt concentration equals base concentration,

pOH=pKb\text{pOH} = \text{p}K_b

So,

pH=14pKb=144.75=9.25\text{pH} = 14 - \text{p}K_b = 14 - 4.75 = 9.25

Therefore, we only need the option in which neutralization produces equal moles of NH4+\mathrm{NH_4^+} and remaining NH4OH\mathrm{NH_4OH}.

In option A:

  • initial NH4OH=0.1\mathrm{NH_4OH} = 0.1 mol
  • HCl=0.05\mathrm{HCl} = 0.05 mol
  • after reaction, 0.050.05 mol base remains and 0.050.05 mol salt forms

So the ratio is 1:11:1 and the correct option is A.

Common mistakes

  • Using the acidic buffer formula instead of the basic buffer formula is incorrect because the system contains a weak base and its conjugate acid. Use pOH=pKb+log([salt][base])\text{pOH} = \text{p}K_b + \log\left(\frac{[\text{salt}]}{[\text{base}]}\right) first, then convert to pH\mathrm{pH}.

  • Comparing concentrations before neutralization is wrong because HCl\mathrm{HCl} reacts with NH4OH\mathrm{NH_4OH} first. Always calculate moles reacted, then find the remaining base and the salt formed.

  • Assuming that equal initial volumes automatically give the required buffer is incorrect. The deciding factor is the ratio of moles of salt formed to moles of weak base left after neutralization, not volume alone.

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