Locate and classify all extrema in the graph. (By classifying the extrema, we mean listing whether each extremum is a relative or absolute maximum or minimum.) Also, locate any stationary points that are not relative extrema. (Order your answers from smallest to largest x.) f has a relative maximum at (x, y)= (_______________) f has a absolute minimum at (x, y)= (_______________) f has a no extremum at (x, y)= (_______________)
Locate and classify all extrema in the graph. (By classifying the extrema, we mean listing whether each extremum is a relative or absolute maximum or minimum.) Also, locate any stationary points that are not relative extrema. (Order your answers from smallest to largest x.) f has a relative maximum at (x, y)= (_______________) f has a absolute minimum at (x, y)= (_______________) f has a no extremum at (x, y)= (_______________)
Locate and classify all extrema in the graph. (By classifying the extrema, we mean listing whether each extremum is a relative or absolute maximum or minimum.) Also, locate any stationary points that are not relative extrema. (Order your answers from smallest to largest x.) f has a relative maximum at (x, y)= (_______________) f has a absolute minimum at (x, y)= (_______________) f has a no extremum at (x, y)= (_______________)
Locate and classify all extrema in the graph. (By classifying the extrema, we mean listing whether each extremum is a relative or absolute maximum or minimum.) Also, locate any stationary points that are not relative extrema. (Order your answers from smallest to largest x.)
f has a relative maximum at (x, y)= (_______________)
f has a absolute minimum at (x, y)= (_______________)
f has a no extremum at (x, y)= (_______________)
Formula Formula A function f(x) attains a local maximum at x=a , if there exists a neighborhood (a−δ,a+δ) of a such that, f(x)<f(a), ∀ x∈(a−δ,a+δ),x≠a f(x)−f(a)<0, ∀ x∈(a−δ,a+δ),x≠a In such case, f(a) attains a local maximum value f(x) at x=a .
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