Answer:
rate of recrystallization = 4.99 × 10⁻³ min⁻¹
Explanation:
For Avrami equation:
[tex]y = 1-e ^{(-kt^n)} \\ \\ e^{(-kt^n)} = 1-y\\ \\ -kt^n = In(1-y) \\ \\ k = \dfrac{-In(1-y)}{t^n}[/tex]
To calculate the value of k which is a dependent variable for the above equation ; we have:
[tex]k = \dfrac{-In(1-0.40)}{200^{2.5}}[/tex]
[tex]k = 9.030 \times 10 ^{-7}[/tex]
The time needed for 50% transformation can be determined as follows:
[tex]y = 1-e ^{(-kt^n)} \\ \\ e^{(-kt^n)} = 1-y\\ \\ -kt^n = In(1-y) \\ \\ t =[ \dfrac{-In(1-y)}{k}]^{^{1/n}}[/tex]
[tex]t_{0.5} =[ \dfrac{-In(1-0.4)}{9.030 \times 10^{-7}}]^{^{1/2.5}}[/tex]
= 200.00183 min
The rate of reaction for Avrami equation is:
[tex]rate = \dfrac{1}{t_{0.5}}[/tex]
[tex]rate = \dfrac{1}{200.00183}[/tex]
rate = 0.00499 / min
rate of recrystallization = 4.99 × 10⁻³ min⁻¹
