Step-by-step explanation:
To estimate how many degrees Celsius the temperature was increased, we can use the concept of the temperature dependence of reaction rates, which is described by the Arrhenius equation:
k = A * exp(-Ea / (RT))
where:
k = rate constant of the reaction
A = pre-exponential factor (a constant)
Ea = activation energy of the reaction
R = gas constant (8.314 J/(mol*K))
T = absolute temperature in Kelvin
Since we are interested in the change in temperature, we can use the ratio of the two given rates:
(rate2) / (rate1) = (exp(-Ea / (R * T2))) / (exp(-Ea / (R * T1)))
Since the activation energy (Ea) and the pre-exponential factor (A) are the same for both rates, they will cancel out when we take the ratio. Solving for the change in temperature (ΔT = T2 - T1):
(exp(-Ea / (R * T2))) / (exp(-Ea / (R * T1))) = (rate2) / (rate1)
Taking the natural logarithm of both sides:
ln((rate2) / (rate1)) = -Ea / (R * T2) + Ea / (R * T1)
Now, let's plug in the given values:
rate1 = 50 umol/s
rate2 = 200 umol/s
ln(200/50) = -Ea / (R * T2) + Ea / (R * T1)
ln(4) = Ea / (R * T1) - Ea / (R * T2)
Since ln(4) ≈ 1.3863, we can simplify:
1.3863 = Ea / (R * T1) - Ea / (R * T2)
Next, we need to make a good estimation for the ratio of initial temperature to final temperature (T1 / T2). Let's assume it's in the range of 0.5 to 0.9 (T1 is half to nearly the same as T2).
Let's take T1 / T2 = 0.7 as an example. Now we can solve for Ea:
1.3863 = Ea / (R * T1) - Ea / (R * 0.7 * T1)
1.3863 = Ea * (1 - 1/0.7)
1.3863 = Ea * 0.4286
Ea ≈ 1.3863 / 0.4286 ≈ 3.2334
Now, we can use the activation energy (Ea) to find the change in temperature (ΔT):
ΔT = T2 - T1 ≈ Ea * R ≈ 3.2334 * (8.314 J/(mol*K)) ≈ 26.91 K
Converting to Celsius:
ΔT ≈ 26.91°C
Since we assumed T1 / T2 = 0.7 for the estimation, the actual increase in temperature is approximately 26.91°C. Therefore, a good estimation of how many degrees Celsius the temperature was increased is 26.91°C.
Out of the given answer choices, the closest one to our estimation is:
C. 20 °C