## Horizontal Bar Chart: Accuracy Improvement with SuperCorrect Across Topics ### Overview The image is a horizontal bar chart comparing the accuracy of a "Base LLM" (Large Language Model) and the improvement achieved by using "SuperCorrect" across different mathematical topics. The chart displays the accuracy on the x-axis and the topics on the y-axis. Each topic has two bars: a blue bar representing the Base LLM's accuracy and a green bar representing the additional accuracy gained with SuperCorrect. The percentage improvement is labeled at the end of each green bar. ### Components/Axes * **Title:** "Accuracy Improvement with SuperCorrect Across Topics" * **X-axis:** "Accuracy", ranging from 0.0 to 0.8 in increments of 0.2. * **Y-axis:** Mathematical topics: Precalculus, Prealgebra, Number Theory, Intermediate Algebra, Geometry, Counting & Probability, Algebra. * **Legend:** Located in the top-right corner: * Blue: "Base LLM" * Green: "SuperCorrect Improvement" ### Detailed Analysis The chart presents accuracy data for the Base LLM and the improvement gained by SuperCorrect across seven mathematical topics. * **Precalculus:** * Base LLM Accuracy: ~0.38 * SuperCorrect Improvement: +23.7% * Total Accuracy: ~0.62 * **Prealgebra:** * Base LLM Accuracy: ~0.78 * SuperCorrect Improvement: +5.4% * Total Accuracy: ~0.83 * **Number Theory:** * Base LLM Accuracy: ~0.42 * SuperCorrect Improvement: +21.5% * Total Accuracy: ~0.63 * **Intermediate Algebra:** * Base LLM Accuracy: ~0.38 * SuperCorrect Improvement: +21.0% * Total Accuracy: ~0.59 * **Geometry:** * Base LLM Accuracy: ~0.45 * SuperCorrect Improvement: +11.7% * Total Accuracy: ~0.57 * **Counting & Probability:** * Base LLM Accuracy: ~0.62 * SuperCorrect Improvement: +15.4% * Total Accuracy: ~0.77 * **Algebra:** * Base LLM Accuracy: ~0.72 * SuperCorrect Improvement: +12.5% * Total Accuracy: ~0.85 ### Key Observations * The Base LLM has the highest accuracy in Prealgebra and Algebra. * SuperCorrect provides the most significant improvement in Precalculus, followed by Number Theory and Intermediate Algebra. * SuperCorrect provides the least improvement in Prealgebra. ### Interpretation The chart demonstrates the effectiveness of the SuperCorrect method in improving the accuracy of a Base LLM across various mathematical topics. The improvement varies depending on the topic, suggesting that SuperCorrect is more beneficial for some areas than others. Precalculus, Number Theory, and Intermediate Algebra show the most substantial gains, indicating that the Base LLM struggles more with these topics and benefits significantly from the SuperCorrect enhancement. Conversely, Prealgebra and Algebra, which already have relatively high accuracy with the Base LLM, see smaller improvements. This suggests that SuperCorrect is particularly useful for topics where the initial accuracy of the LLM is lower.