Let f (x) = (x2 − 25)2. Use the First or Second Derivative Test to find the relative extreme values for f. Identify the behavior of the tails of the function. Sketch the graph of the function and turn it in during your discussion section on the day this assignment is due. Insert the appropriate x-values and corresponding relative extreme values in the answer blanks, with the x-values in increasing order. Enter DNE in any unused answer blanks. Relative maximum value(s): f(___) = ____ f(___)= ____ Relative minimum value(s): f(___)= _____ f(___)= _____
Let f (x) = (x2 − 25)2. Use the First or Second Derivative Test to find the relative extreme values for f. Identify the behavior of the tails of the function. Sketch the graph of the function and turn it in during your discussion section on the day this assignment is due. Insert the appropriate x-values and corresponding relative extreme values in the answer blanks, with the x-values in increasing order. Enter DNE in any unused answer blanks. Relative maximum value(s): f(___) = ____ f(___)= ____ Relative minimum value(s): f(___)= _____ f(___)= _____
Let f (x) = (x2 − 25)2. Use the First or Second Derivative Test to find the relative extreme values for f. Identify the behavior of the tails of the function. Sketch the graph of the function and turn it in during your discussion section on the day this assignment is due. Insert the appropriate x-values and corresponding relative extreme values in the answer blanks, with the x-values in increasing order. Enter DNE in any unused answer blanks. Relative maximum value(s): f(___) = ____ f(___)= ____ Relative minimum value(s): f(___)= _____ f(___)= _____
Use the First or Second Derivative Test to find the relative extreme values for f. Identify the behavior of the tails of the function. Sketch the graph of the function and turn it in during your discussion section on the day this assignment is due.
Insert the appropriate x-values and corresponding relative extreme values in the answer blanks, with the x-values in increasing order. Enter DNE in any unused answer blanks.
Relative maximum value(s):
f(___) = ____
f(___)= ____
Relative minimum value(s):
f(___)= _____
f(___)= _____
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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