Critical Number Problem - # 3

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Jason76

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\(\displaystyle f(x) = (x^{2} - 1)^{3}\) on interval \(\displaystyle [-1,4]\)

\(\displaystyle f'(x) = (u)^{2} 2x\)

\(\displaystyle f'(x) = (x^{2} - 1)^{2} 2x\)

a. \(\displaystyle (x^{2} - 1)^{2} = 0\)

\(\displaystyle x^{2} = 1\)

\(\displaystyle x = \pm \sqrt{1}\)

b. \(\displaystyle 2x = 0\)

\(\displaystyle x = 0\)
 
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Jason76 said:
\(\displaystyle f(x) = (x^{2} - 1)^{3}\) on interval \(\displaystyle [-1,4]\)

\(\displaystyle f'(x) = (u)^{2} 2x\)..........................Incorrect

\(\displaystyle f'(x) = (x^{2} - 1)^{2} 2x\)

a. \(\displaystyle (x^{2} - 1)^{2} = 0\)

\(\displaystyle x^{2} = 1\)

\(\displaystyle x = \pm \sqrt{1}\)

b. \(\displaystyle 2x = 0\)

\(\displaystyle x = 0\)
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Subhotosh Khan said:
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Click to expand...

:D corrected

\(\displaystyle f(x) = (x^{2} - 1)^{3}\) on interval \(\displaystyle [-1,4]\)

\(\displaystyle f'(x) = 3(u)^{2} 2x\)

\(\displaystyle f'(x) = (x^{2} - 1)^{2} 6x\)

a. \(\displaystyle (x^{2} - 1)^{2} = 0\)

\(\displaystyle x^{2} = 1\)

\(\displaystyle x = \pm \sqrt{1}\)

b. \(\displaystyle 6x = 0\)

\(\displaystyle x = 0\)
 
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Jason76 said:
:D corrected

\(\displaystyle f(x) = (x^{2} - 1)^{3}\) on interval \(\displaystyle [-1,4]\)

\(\displaystyle f'(x) = 3(u)^{2} 2x\)

\(\displaystyle f'(x) = (x^{2} - 1)^{2} 6x\)

a. \(\displaystyle (x^{2} - 1)^{2} = 0\)

\(\displaystyle x^{2} = 1\)

\(\displaystyle x = \pm \sqrt{1}\) = ± 1

b. \(\displaystyle 6x = 0\)

\(\displaystyle x = 0\)
Click to expand...
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\(\displaystyle f(x) = (x^{2} - 1)^{3}\) on interval \(\displaystyle [-1,4]\)

The computer says \(\displaystyle -1\) is the min (I guessed it), but my calculations don't seem to get it. :confused:

\(\displaystyle f(-1) = ((-1)^{2} - 1)^{3} = 0\)

\(\displaystyle f(0) = ((0)^{2} - 1)^{3} = 1\) Is this \(\displaystyle -1\):confused:

\(\displaystyle f(1) = ((1)^{2} - 1)^{3} = 0\)


\(\displaystyle f(4) = ((4)^{2} - 1)^{3} = 3375\) Max
 
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Jason76 said:
\(\displaystyle f(x) = (x^{2} - 1)^{3}\) on interval \(\displaystyle [-1,4]\)

The computer says \(\displaystyle -1\) is the min (I guessed it), but my calculations don't seem to get it. :confused:

\(\displaystyle f(-1) = ((-1)^{2} - 1)^{3} = 0\)

\(\displaystyle f(0) = ((0)^{2} - 1)^{3} = 1\) Is this -1 :confused:\(\displaystyle \ \ \ \ \)That does equal -1.

\(\displaystyle f(1) = ((1)^{2} - 1)^{3} = 0\) \(\displaystyle f(4) = ((4)^{2} - 1)^{3} = 3375\) Max
Click to expand...
.
 
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