Stationary points and nature of calculus question, please help! (1 Viewer)

Carrotsticks · Jan 26, 2012

bleakarcher said:
What else could it imply?

I'm guessing you're asking for other examples where the double derivative and first derivative is equal to 0, but not necessarily a HPOI.

The most obvious example is:

$P(x)=(x-x_1)^n + k $ for some $ \begin{cases} n \in 2m, m \in \mathbb{N} $ if $ n>0 \\ n \in \mathbb{Z^{-}} $ if $ n<0 \end{cases}$

We have to consider whether the highest order of the polynomial is odd/even when it comes to analysing HPOI.

For example, the curve...

$y=x^{3}$

... has f'(x) and f''(x) = 0 at the origin, but there IS in fact a HPOI there, as opposed to another curve like:

$y=x^4$

Another example is from a question I posted earlier in the Extension 2 Marathon regarding the curve:

$y=x^{n} ln \left (x^{n} \right)$

Although as n approaches infinity, the stationary point and point of inflexion converge to the same fixed point, the limiting case is most certainly not a HPOI.

SpiralFlex · Jan 26, 2012

bleakarcher said:
True, how come its not a minimum then?

EDIT: i screwed up guys sorry lol. i learnt something from spiral.

Don't you learn a lot when you see my awesome super saiyan mode (V4)?

Carrotsticks · Jan 26, 2012

SpiralFlex said:
$y=64-(x-1)^6$

One example mainly multiple roots in the form $(x-\alpha)^n+C$

Where n is an integer greater than or equal to 3. Not necessarily a horizontal point of inflexion will occur when both first and second derivative equals to zero.

A horizontal point of inflexion will occur when n is odd.

SpiralFlex · Jan 26, 2012

Carrotsticks said:
A horizontal point of inflexion will occur when n is odd.

Yeah I should have said EVEN integer.

bleakarcher · Jan 26, 2012

God, I love this forum. Love ya Spiral, love ya Carrotsticks. got a lot of respect for you guys.

Annum · Feb 23, 2012

Is it possible to have three stationary points? Im getting three different stationay points, and honestly havnt come across a question that involves three different stationary points. thanks

nightweaver066 · Feb 23, 2012

Annum said:
Is it possible to have three stationary points? Im getting three different stationay points, and honestly havnt come across a question that involves three different stationary points. thanks

Yes.

Carrotsticks · Feb 23, 2012

Annum said:
Is it possible to have three stationary points? Im getting three different stationay points, and honestly havnt come across a question that involves three different stationary points. thanks

A polynomial of nth degree can have at most n-1 stationary points.

Annum · Feb 24, 2012

The area of a rectangle is 70m^2. Show that the perimeter of the rectangle is given by p=2x+140/x

Can anyone help me with this please?

SpiralFlex · Feb 24, 2012

I see no pretty diagrams!

$Let the lengths and widths be x and y.$

$xy=70$

$y=\frac{70}{x}$

$P=2x+2y$

$\therefore P=\frac{140}{x}+2x$

Annum · Feb 24, 2012

Thankyou, i feel bad that your always helping me with my math questions

Annum · Feb 24, 2012

when finding stationary points and testing its nature, is it possible to get both as 'horizontal point of inflextion' for both points because thats what im getting for this one
y= x^3/3 - x^2 - 8x + 11
Its telling me to use the first derivative to determine its nature
for the stationary points im getting (4, -15 2/3) and (-2, 20 1/3)

I really hope you can help me thanks.

Carrotsticks · Feb 24, 2012

Annum said:
when finding stationary points and testing its nature, is it possible to get both as 'horizontal point of inflextion' for both points because thats what im getting for this one
y= x^3/3 - x^2 - 8x + 11
Its telling me to use the first derivative to determine its nature
for the stationary points im getting (4, -15 2/3) and (-2, 20 1/3)

I really hope you can help me thanks.

Think about it this way... the cubic you have there has degree 3. Thus, it has '2 tokens'.

One stationary point costs 1 token.

One horizontal point of inflexion costs 2 tokens.

Hence the cubic can only have at most 1 horizontal point of inflexion, or two stationary points.

Timske · Feb 24, 2012

Annum said:
when finding stationary points and testing its nature, is it possible to get both as 'horizontal point of inflextion' for both points because thats what im getting for this one
y= x^3/3 - x^2 - 8x + 11
Its telling me to use the first derivative to determine its nature
for the stationary points im getting (4, -15 2/3) and (-2, 20 1/3)

I really hope you can help me thanks.

you shouldnt get 2 Horizontal point of inflexion

MIN @ (4, -15 2/3) and MAX @ (-2, 20 1/3)

u can sub in x values in f'(x) to the left and right of 4 and - 2 to determine if its increasing or decreasing on both sides

Remember f ' (x) < 0 its decreasing and if f ' (x) is > 0 its increasing

f ' (x) = x^2 - 2x - 8
x values to the left and right of 4 are 3 and 5, sub those in f'(x)
youll find its decreasing at 3 and increasing at 5 so therefore its a min

Annum · Feb 25, 2012

thankyou i understand it now

Timske said:
you shouldnt get 2 Horizontal point of inflexion

MIN @ (4, -15 2/3) and MAX @ (-2, 20 1/3)

u can sub in x values in f'(x) to the left and right of 4 and - 2 to determine if its increasing or decreasing on both sides

Remember f ' (x) < 0 its decreasing and if f ' (x) is > 0 its increasing

f ' (x) = x^2 - 2x - 8
x values to the left and right of 4 are 3 and 5, sub those in f'(x)
youll find its decreasing at 3 and increasing at 5 so therefore its a min

Stationary points and nature of calculus question, please help! (1 Viewer)

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