Maxwell Boltzmann Distribution: Pogil Answer Key Extension Questions
"A catalyst does not alter the Maxwell-Boltzmann distribution (the curve does not change). It lowers the activation energy threshold, so a larger fraction of the existing molecules have sufficient energy to react. Temperature changes the shape of the distribution curve itself." Part 4: Common Extension Question 3 – Fractional Distribution Calculations Question: Given that the fraction of molecules with kinetic energy greater than (E_a) is roughly ( e^-E_a / RT ), explain why a reaction with (E_a = 50 \text kJ/mol) proceeds very slowly at 300K but rapidly at 400K. (Use (R = 8.314 \text J/mol·K)). Answer Key Reasoning Students must perform a qualitative calculation to see the exponential effect.
"The fraction of molecules with sufficient energy is exquisitely sensitive to temperature because (E_a / RT) appears in the exponent. A 100K increase reduces the exponent magnitude, yielding a 150-fold increase in reactive collisions." Part 5: Common Extension Question 4 – Isotopes and Effusion Question: Consider two isotopes: (^235\textUF_6) and (^238\textUF_6) at the same temperature. Draw their M-B distributions. Why is the difference in average speeds small, but the difference in effusion rates significant? Answer Key Reasoning This connects the M-B distribution to Graham's Law of Effusion. (Use (R = 8
Even though the temperature increased by only 100K, the reaction rate is 150 times faster . The M-B extension question forces students to realize that kinetic energy distributions are mercilessly exponential. A 100K increase reduces the exponent magnitude, yielding
No, the shape does not change.
Use this guide to facilitate discussion, not just to provide answers. The power of POGIL is in the argument—let the students defend why the tail matters more than the peak. (Use (R = 8
The difference is small (only ~0.4% per step), yet uranium enrichment works. This is because the extension question highlights repetitive separation . After thousands of stages, the tiny M-B difference in the tail of the distribution allows significant enrichment.