Answer:
Average slope =-242
c=6.67
Step-by-step explanation:
We are given that a function
[tex]f(x)=-2x^3+2 x^2-2 x+2[/tex] and interval (4,9)
We have to find the average slope of the given function and value of c in the given interval.
Using mean value theorem
[tex]{f(b)-f(a)}{b-a}=f'(c)[/tex]
a=4 and b=9
[tex]f(9)=-2(9)^3+2(9)^2-2(9)+2[/tex]
f(9)=-1312
[tex]f(4)=-2(4)^3+2(4)^2-2(4)+2[/tex]
[tex] f(4)=-128+32-8+2=-102[/tex]
Substitute the values then we get
[tex]f'(c)=\frac{f(9)-f(4)}{9-4}=\frac{-1312+102}{5}=-242[/tex]
Hence, the average value of slope is -242.
We know that f'(c)=-242
[tex]f'(x)=-6x^2+4x-2[/tex]
Substitute x=c
Then [tex]f'(c)=-6c^2+4c-2[/tex]
[tex]-6 c^2+4 c-2=-242[/tex]
[tex] -3 c^2+ 2c -1=-121[/tex]
Dividing on both sides by 2
[tex] 3c^2-2c+1-121=0[/tex]
[tex] 3c^2-2 c-120=0[/tex]
[tex]3c^2-20c+18c-120=0[/tex]
[tex](3c-20)(c+6)=0[/tex]
[tex] 3c=20[/tex] and [tex]c+6=0[/tex]
[tex]c=\frac{20}{3}[/tex] and c=-6 It is not possible because it does not lie in the given interval
Therefore,c=6.67 lie in the given interval
