HSC 2016 Maths Marathon (archive) (3 Viewers)

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davidgoes4wce

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Re: HSC 2016 2U Marathon

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:

 

leehuan

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Re: HSC 2016 2U Marathon

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

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Re: HSC 2016 2U Marathon


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

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RachelGreen

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Re: HSC 2016 2U Marathon

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

leehuan

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Re: HSC 2016 2U Marathon

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)
 
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Glyde

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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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