HSC 2016 Maths Marathon (archive) (1 Viewer)

davidgoes4wce · Nov 6, 2015

Re: HSC 2016 2U Marathon

Rathin said:
my bad.

y ' = lim (h → 0) (f(x+h) - f(x)) / h
= lim (h → 0) (1/(x+h) - 1/x) / h
= lim (h → 0) (x/x(x+h) - (x + h)/x(x + h)) / h
= lim (h → 0) (-h / x(x + h)) / h
= lim (h → 0) -1 / x(x + h)
= 1/ x²

You forgot the negative in the last step

My attempt:

Green Yoda · Nov 7, 2015

Re: HSC 2016 2U Marathon

davidgoes4wce said:
You forgot the negative in the last step

My attempt:

Oh yeah shît, fixed it.

kawaiipotato · Nov 7, 2015

Re: HSC 2016 2U Marathon

Question :
$\sum_{k=0}^{80} \frac{1}{ \sqrt{k+1} + \sqrt {k}}$

leehuan · Nov 7, 2015

Re: HSC 2016 2U Marathon

kawaiipotato said:
Question :
$\lim_{n \rightarrow \infty} sum{k=0}{n} \frac{1}{\sqrt{k+1} - \frac{k}}$

Your question got a bit messed up.

$\lim _{ n\rightarrow \infty }{ \sum _{ k=0 }^{ n }{ \frac { 1 }{ \sqrt { k+1 } -\frac { k }{ ? } } } }$

Please fix

kawaiipotato · Nov 7, 2015

Re: HSC 2016 2U Marathon

leehuan said:
Your question got a bit messed up.

$\lim _{ n\rightarrow \infty }{ \sum _{ k=0 }^{ n }{ \frac { 1 }{ \sqrt { k+1 } -\frac { k }{ ? } } } }$

Please fix

Yep fixed it haha

InteGrand · Nov 7, 2015

Re: HSC 2016 2U Marathon

kawaiipotato said:
Question :
$\lim_{n \rightarrow \infty} \sum_{k=0}^{n} \frac{1}{ \sqrt{k+1} + \sqrt {k}}$

Are you sure you meant sum, or did you just mean limit of that expression? Because that sum clearly will not converge, as can be seen by using the integral test ( https://en.wikipedia.org/wiki/Integral_test_for_convergence ).

leehuan · Nov 7, 2015

Re: HSC 2016 2U Marathon

InteGrand said:
Are you sure you meant sum, or did you just mean limit of that expression? Because that sum clearly will not converge, as can be seen by using the integral test ( https://en.wikipedia.org/wiki/Integral_test_for_convergence ).

I remember the result for the nth partial sum and that definitely doesn't converge. Was wondering same

kawaiipotato · Nov 7, 2015

Re: HSC 2016 2U Marathon

InteGrand said:
Are you sure you meant sum, or did you just mean limit of that expression? Because that sum clearly will not converge, as can be seen by using the integral test ( https://en.wikipedia.org/wiki/Integral_test_for_convergence ).

Oops, yeah, changed n to 80

davidgoes4wce · Nov 8, 2015

Re: HSC 2016 2U Marathon

Find the volume of solid between the 2 curves rotated about the y-axis.

leehuan · Nov 8, 2015

Re: HSC 2016 2U Marathon

davidgoes4wce said:
Find the volume of solid between the 2 curves rotated about the y-axis.

Still an unanswered question though.

But nice, cause it's y-axis. To rearrange y=x^2-2x needs some very clever completing the square or the quad formula

sharoooooo · Nov 8, 2015

Re: HSC 2016 2U Marathon

Long time no maths gg
Can't finish it :/

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InteGrand · Nov 8, 2015

Re: HSC 2016 2U Marathon

davidgoes4wce said:
Find the volume of solid between the 2 curves rotated about the y-axis.

Is this from a 2U Paper/Textbook? If it's from 4U, you can easily do it using cylindrical shells.

leehuan · Nov 8, 2015

Re: HSC 2016 2U Marathon

$\\ $For the interested 2U student. this is the shells method done hastily like your normal method (actually referred to as discs/washers)$ \\V=2\pi \int _{ a }^{ b }{ xy \, dx } \\ V=2\pi \int _{ 0 }^{ 4 }{ x\left( 2x-\left( { x }^{ 2 }-2x \right) \right) dx } \\ =2\pi \int _{ 0 }^{ 4 }{ \left( 4{ x }^{ 2 }-{ x }^{ 3 } \right) dx } \\ =2\pi { \left[ \frac { 4{ x }^{ 3 } }{ 3 } -\frac { { x }^{ 4 } }{ 4 } \right] }_{ 0 }^{ 4 }\\ =\frac { 128\pi }{ 3 }$

RachelGreen · Nov 8, 2015

Re: HSC 2016 2U Marathon

What's the Shells Methods? Can you explain, just wondering

davidgoes4wce · Nov 8, 2015

Re: HSC 2016 2U Marathon

I like cylindrical shells but that was a long time ago in uni.

InteGrand · Nov 8, 2015

Re: HSC 2016 2U Marathon

RachelGreen said:
What's the Shells Methods? Can you explain, just wondering

It's a HSC 4U technique of calculating volumes. It's not required for 2U or 3U.

(You can find out about it here: http://www.stewartcalculus.com/data...texts/upfiles/3c3-Volums-CylinShells_Stu .pdf )

leehuan · Nov 8, 2015

Re: HSC 2016 2U Marathon

RachelGreen said:
What's the Shells Methods? Can you explain, just wondering

We maintain that y = f(x)
i.e. x is not a function of y

Just reiterating first that you'll see this later in 4U. But it's not in 2/3U.

Using the normal method, we rotate about the x-axis. i.e., we rotate perpendicular to y
Using shells, however, we rotate about the y-axis. i.e., we rotate parallel to y.
It's an alternative to rearranging y=f(x) to make x the subject

(Also, in 4U, you find you don't have to rotate about the coordinate axes. You can rotate about, say, the line x=-1/2).

(Sophisticated explanation - see above)

leehuan · Nov 8, 2015

Re: HSC 2016 2U Marathon

davidgoes4wce said:
I like cylindrical shells but that was a long time ago in uni.

If you go on to teaching 4u eventually, you will have to experience it again.

davidgoes4wce · Nov 8, 2015

Re: HSC 2016 2U Marathon

leehuan said:
If you go on to teaching 4u eventually, you will have to experience it again.

Sssshhhhh, don't tell everyone I want to be a teacher. I'm not that good yet

Glyde · Nov 8, 2015

HSC 2016 2U Marathon

Calculate the area between the curve (4-x^2)^(1/2) and the x-axis for the 1st quadrant only.

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