Let f(x)=x^{3}-6x^{2}-15x+23 a) Perform a full sign analysis

Douglas Kraatz

Douglas Kraatz

Answered question

2021-11-14

Let f(x)=x36x215x+23
a) Perform a full sign analysis on f(x): find its zeroes, and determine its sign on each interval.
b) Use the information in (2) to determine intervals of concave up / concave down for f.
c) Find the coordinates (x, y) of the inflection point(s) of f.
d) Find the absolute maximum and minimum values of f on the interval [0, 7]. Justify your answer with appropriate calculus work.

Answer & Explanation

Ruth Phillips

Ruth Phillips

Beginner2021-11-15Added 18 answers

Step 1
Given:
f(x)=x36x215x+23
f(x)=3x212x15
a) f(x)=6x12=0x=2
b) Concave up on interval (2, )
Concave dow on interval (, 2)
c) Cooedinate of inplection point (x, y)
F(2)=236×2215×2+23
=82430+23
=23
(x, y)=(2, 23)
d) F(x)=03x212x15=0x24x5=0
x2+x5x5=0
x(x+1)5(x+1)=0
(x+1)(x5)=0x=1 and x=5
F(1)=(1)36×(1)215×1+23
=16+15+23=31
F(5)=536×5215×5+23=12515075+23=77
F(7)=736×7215×7+23=343294105+23=33
F(0)=036×0215×0+23=0+0+0+23=23
Absolute maxima at x=1 and maximum volue is 31
Absolute minima at x=5 and minimum volue is 77

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