In a first order decomposition reaction, the time taken for the decomposition of reactant to one fourth and one eighth of its initial concentration are and (s), respectively. The ratio will be:
- A
- B
- C
- D
In a first order decomposition reaction, the time taken for the decomposition of reactant to one fourth and one eighth of its initial concentration are and (s), respectively. The ratio will be:
Correct answer:C
Standard Method
Given: A first order decomposition reaction reaches of its initial concentration in time and of its initial concentration in time .
Find: The ratio .
For a first-order reaction,
For , the remaining concentration is of the initial concentration, so
For , the remaining concentration is of the initial concentration, so
Therefore,
Using
and
we get
Therefore, the correct option is C.
Half-life Observation
Given: The reactant follows first-order kinetics.
Find: The ratio when the concentration becomes and of the initial value.
In a first-order reaction, equal half-lives are observed.
So,
Hence,
Therefore, the correct option is C.
Confusing decomposition to one fourth with one fourth decomposed is incorrect. The question states the remaining concentration is or of the initial amount. Use and , not or .
Using a zero-order or second-order rate expression is wrong because the reaction is explicitly first order. The correct relation is
Use the first-order integrated rate law or the half-life idea.
Taking the ratio as instead of reverses and . Write each time expression separately first, then form carefully.
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