Question: Consider the absolute value function g(x) = |x|. Does this satisfy the conditions for the Intermediate Value Theorem? Show that there is no tangent that

Consider the absolute value function g(x) = |x|. Does this satisfy the conditions for the Intermediate Value Theorem? Show that there is no tangent that matches the slope of the secant connecting x = -1 and x = 2.
Check whether the Intermediate Value Theorem and Mean Value Theorem fail in the above case where the function is not continuous.

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