Rate constant k varies with temperature by equation, log k `(min+^(-1))=5-(2000)/(T(K))` We can conclud:

Rate constant k varies with temperature by equation log k (min^(-1)) = log 5 - (2000 kcal)/(RT xx 2.303) . We can conclude that

Rate constant k of a reaction varies with temperature according to the equation logk = constant -E_a/(2.303R)(1/T) where E_a is the energy of activation for the reaction . When a graph is plotted for log k versus 1/T , a straight line with a slope - 6670 K is obtained. Calculate the energy of activation for this reaction

For an elementary reaction the variation of rate constant (k) with temperature is given by the following equation log_(10) k=5.4 -100/T Where, T is temperature on Kelvin scal and k is in terms of sec^(-1) Identify the incorrect options.

Rate constant k of a reaction varies with temperature according to the equation logk=" constant"-(E_(a))/(2.303).(1)/(T) where E_(a) is the energy of activation for the reaction. When a graph is plotted for log k versus 1//T , a straight line with a slope -6670 K is obtained. Calculate the energy of activation for this reaction. State the units (R=8.314" JK"^(-1)mol^(-1))