Missing details. Complete text is:"The following reaction has an activation energy of 262 kJ/mol:
C4H8(g) --> 2C2h4(g)
At 600.0 K the rate constant is 6.1× 10–8 s–1. What is the value of the rate constant at 785.0 K?"
To solve the exercise, we can use Arrhenius equation:
[tex]\ln( \frac{K_2}{K_1} ) = \frac{Ea}{R} ( \frac{1}{T_1}- \frac{1}{T_2} ) [/tex]
where K are the reaction rates, Ea is the activation energy, R=8.314 J/mol*K and T are the temperatures. Using T1=600 K and T2=785 K, and Ea=262 kJ/mol = 262000 J/mol, on the right side of the equation we have
[tex] \frac{Ea}{R}( \frac{1}{T_1}- \frac{1}{T_2} )=12.38 [/tex]
And so
[tex]\ln( \frac{K_2}{K_1})=12.38 [/tex]
And using [tex]K_1=6.1\cdot 10^{-8} s^{-1}[/tex] , we find K2:
[tex]K_2=K_1 e^{12.38}=0.0145 s^{-1}[/tex]
