Concept explainers
(a)
To calculate: An interval for the function
(b)
To calculate: An interval for the function
(c)
To calculate: An interval for the function
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Calculus (MindTap Course List)
- ProofProve Property 1 of Theorem 4.4.arrow_forwarda) Give an example of a function f : [−2, 3] → R which is not continuous at 1 but which is integrable b) Give an example of a function f : [−2, 2] → R which is not differentiable at −1 but which is continuous at −1 - please include all steps and working with explanationarrow_forward87. Analyzing a Critical Number A differentiable function $f$ has one critical number at $x=5$. Identify the relative extrema of $f$ at the critical number when $f^{\prime}(4)=-2.5$ and $f^{\prime}(6)=3$arrow_forward
- Mean Value Theorem. So I determined that this is continuous and differentiable at [1,7]. I just do not know how to find the numbers (c) that satisfy the conclusion of the mean value theorem. f(x)=1/x [1,7]arrow_forwardProof! Let X bearandomvariable and let g(x) be a no0negative function. Then for r>0,0, P [g(X) ≥ r] ≤ Eg(X)/rarrow_forward
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