Question

For a first order reaction A → Products, initial concentration of A is 0.1 M, which becomes 0.001M after 5 minutes. Rate constant for the reaction in min^-1 is

• A. 1.3818
• B. 0.4606
• C. 0.9212
• D. 0.2303

Answer 1

The Correct Option is C

For a first-order reaction, the rate constant \( k \) can be calculated using the formula for first-order kinetics: \[ k = \frac{1}{t} \ln\left(\frac{[A]_0}{[A]}\right) \] where \([A]_0\) is the initial concentration, \([A]\) is the concentration at time \( t \), and \( \ln \) denotes the natural logarithm. Given: \([A]_0 = 0.1 \, \text{M}\), \([A] = 0.001 \, \text{M}\), and \( t = 5 \, \text{min} \).

Apply the values to the formula: \[ k = \frac{1}{5} \ln\left(\frac{0.1}{0.001}\right) \]

Simplify the fraction in logarithm: \[ \frac{0.1}{0.001} = 100 \] Hence, \[ k = \frac{1}{5} \ln(100) \]

Calculate the natural logarithm: \[ \ln(100) \approx 4.6052 \]

Substitute back: \[ k = \frac{1}{5} \times 4.6052 = 0.9210 \, \text{min}^{-1} \]

The rate constant \( k \) for this reaction is approximately \(0.9212 \, \text{min}^{-1}\).