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  1. Fus Ro Dah

    Infinite Roots.

    Yep there are more... in fact it's an inequality.
  2. Fus Ro Dah

    Infinite Roots.

    Secretz :) If you want one, try the one I gave above!
  3. Fus Ro Dah

    Trigonometry

    1. \frac{1 - \frac{1}{\sqrt 2}}{1 + \frac{1}{\sqrt 2}} = \frac{\sqrt 2 - 1}{\sqrt 2 + 1} = \frac{(\sqrt 2 - 1)^2}{1} = 3 - 2 \sqrt 2 2. \frac{5}{\sin ^2 60} = \frac{5}{\frac{3}{4}} = \frac{20}{3} 3. \frac{2 - \sqrt 3}{\frac{1}{\cos ^2 45}} = \frac{2 - \sqrt 3}{2}}
  4. Fus Ro Dah

    Infinite Roots.

    \\ $Consider the function $ f(x) = \sqrt{x+a \sqrt x + b} + \sqrt x -c $ for some real constants $ a,b,c. $ For what values of $ a,b,c $ does the function have infinitely many roots?$
  5. Fus Ro Dah

    Greatest root.

    Oh sorry everyone! I made a typo, there should be a 4 in front.
  6. Fus Ro Dah

    Is anyone else struggling to stay focused...?

    I feel that way sometimes too. I just take 1 day off doing nothing but pure schlomping and the next day I feel ready to do work again.
  7. Fus Ro Dah

    Inequality.

    Not really. Most Extension 2 inequality questions are of 3 variables and can actually be defined to be P(a,b,c) or P(x,y,z). It doesn't affect the question at all, it's just a much shorter and easy way to refer to the expression instead of typing it all over again.
  8. Fus Ro Dah

    Greatest root.

    Yep, that would be right, but of course we would need to show that with working out and a bit of justification.
  9. Fus Ro Dah

    My teacher marked my maths exam wrong because she thinks my 'pi' looks like a 2

    Talk to Head Teacher and then Deputy if you can. If you have already demonstrated ability, then it is evident that you are not trying to 'scab marks'.
  10. Fus Ro Dah

    Triangles/Max-Min Question

    http://en.wikipedia.org/wiki/Degeneracy_(mathematics)
  11. Fus Ro Dah

    What do you plan to accomplish these holidays?

    I want to finish Prelim Chem and hopefully get an essay done for English by the end. And for Maths I'm hoping to be able to finish Fourier Series by then as well.
  12. Fus Ro Dah

    Greatest root.

    Yes, it is HSC material. The methodology is purely elementary. Suppose it's not HSC material, does that mean you simply ignore it? I would still do it to try to better myself overall.
  13. Fus Ro Dah

    Viscosity

    1. Acquire some sort of ramp, like a chopping board. 2. Have it slanted at a fixed angle. 3. Pour equal amounts of several fluids from the top at an equal height and measure the time it takes for the fluid to reach the bottom. Use water, honey, oil and a form of alcohol if you can, but then...
  14. Fus Ro Dah

    HSC 2012 MX1 Marathon #2 (archive)

    Re: HSC 2012 Marathon :) We can break the above series into two sub-series and use the limiting sum for each one.
  15. Fus Ro Dah

    Please help in solving...

    1. We can use basic Calculus. \\ \frac{df}{dy} = -2y + 4 $ and we let this be equal to 0 to acquire any stationary points. Solving this gives us $ y=2 $ and therefore the maximum value of the function $ f $ is $ f(2) = 17. $ We don't need to verify the nature of the stationary point because it...
  16. Fus Ro Dah

    Triangles/Max-Min Question

    The Gradient formula is \frac{y-y_1}{x-x_1} for some constants x_1 and y_1, which we will let be the coordinate given. The case when it passes through the origin contradicts what I said before about m<0.
  17. Fus Ro Dah

    Greatest root.

    \\ $Consider the polynomial $ P(x) = x^3 - 7x^2 + 14x -7 $, which has roots $ x_i $ for $ i=1,2,3. $ Show that $ \max (x_i) = 4 \cos ^2 \left ( \frac{\pi}{14} \right )
  18. Fus Ro Dah

    Please help in solving...

    Umm... are you sure you typed it out correctly? If the following is a function of y, then I presume -x^2 is constant. If so, then the greatest value of the function f(y) is infinity because we have a linear function, which is unbounded from above and below.
  19. Fus Ro Dah

    Trigonometry exact value

    Okay, tell me how to prove that tan(105) is -2-root3 as you said? Even OP's expression there is exact by your definition.
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