$f (x) = 6 x^{5}$ has a maximum at x = 0.

True

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False

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Solution

The correct option is B
False

If f(x) has derivative upto nth order and $f^{'} (c) = f ” (c) . . f^{n - 1} (c) = 0$ , then

A) n is even, $f^{n} (c) < 0 => x = c$ is a point of maximum.

B) n is even, $f^{n} (c) > 0 => x = c$ is a point of minimum.

C) n is odd, $f^{n} (c) < 0 => f (x)$ is decreasing about $x = c$

D) n is odd, $f^{n} (c) > 0 => f (x)$ is increasing about $x = c$

So, we will differentiate until we get a non-zero value at $x = 0$

$f (x) = 6 x^{5}$

$f^{'} (x) = 30 x^{4}$

$f^{'} (0) = 0$

$f ” (x) = 120 x^{3}$

$f ” (0) = 0$

$f ”^{'} (x) = f^{3} (x) = 360 x^{2}$

$f^{3} (0) = 0$

$f ” ” (x) = f^{4} (x) = 720 x$

$f^{4} (x) = 0$

$f ” ”^{'} (x) = f^{5} (x) = 720$

$f^{5} (0) = 720$

which is non –zero.

So, we get n = 5, which is odd.

n is odd,n is odd, $f^{n} (c) > 0 => f (x)$ is increasing about $x = c$

That is f(x) is increasing at $x = 0.$ It does not have a maximum or minimum at $x = 0$

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f(x)=6x5 has a maximum at x = 0.

$f (x) = 6 x^{5}$ has a maximum at x = 0.