Discussion Week 12 ~ Must post first. Subscribe Discussion Week 12 In section 4.1, we learned of the conditions of the Extreme Value Theorem, which guarantee the existence of an absolute maximum and absolute minimum value under the given conditions. Consider a function on a closed interval, meaning the end points of the interval are included in the function values. Give an example of a function on a closed interval which does not obtain an absolute minimum. Explain why this function does not violate the outcome of the Extreme Value Theorem. The example function can be a function formula or a graph of a function (graphed with technology or sketched by hand). Grading: /12 /4 points for the example function with the described features (1=function does not represent the described 2=lacking two or more features. 3=lacking one feature. 4=all features are shown.) 14 poi Ir explanation of the why the function does not violate the Extreme Value