Author Topic: iamdan08's spec questions (Read 11355 times) Tweet Share

kamil9876 · « **Reply #45 on:** June 10, 2009, 05:52:42 pm »

Q3.)

$\frac{dV}{dt}=\frac{dV}{dt}_{in}-\frac{dV}{dt}_{out}$
$\frac{dV}{dt}=Q-10 000$

$V=\frac{1}{3}h\pi r^2$

however $\frac{h}{r}=\frac{6}{2}=3$ (this can be verified by looking at similair triangles if you take a slice of the cone by cutting along a diameter)

$V=\frac{1}{27}\pi h^3$
$\frac{dV}{dh}=\frac{1}{9}\pi h^2$

$\frac{dV}{dh}\frac{dh}{dt}=\frac{dV}{dt}$
$ \frac{1}{9}\pi h^2 \frac{dh}{dt}=(Q-10 000)$

now sub in $\frac{dh}{dt}=20, h=200$ (I worked in cm for everything, hence the answer for Q will be in $cm^3/min$ )

kamil9876 · « **Reply #46 on:** June 10, 2009, 06:14:32 pm »

q6.) i think you mean $y=\sqrt{9-x^2}$

We can take a shortcut in this problem by stating that if one of the co-ordinates of the biggest rectangle are (x,y) then there must be another one that is (-x,y). Hence the problem can be reduced to just by limiting ourselves to the first quadrant only and doubling our area because of symmetry about y axis. We will call this half Area $A$ :

$A=xy$
$ y=\sqrt{9-x^2}$
$A=x\sqrt{9-x^2}$
$A=\sqrt{9x^2-x^4}$ (yeah you could've used the product rule but I'm too lazy to use it)
$\frac{dA}{dx}=\frac{1}{2}\frac{(18x-4x^3)}{\sqrt{9x^2-x^4}}$

We require:

$\frac{dA}{dx}=0$
$\therefore 0=18x-4x^3$
$0=x(9-2x^2)$
0=x cannot be the case because there is no such rectangle:

$9-2x^2=0$
$x=\frac{3\sqrt{2}}{2}$ since we limited ourselves to the first quadrant.

To prove that this is indeed the maximum: We can say that for x=0 and x=3 our area is zero. If our x value is any number between 0 and 3 then our area is positive, our Area function is continous and differentiable and therefore by Rolle's Theorem (://en.wikipedia.org/wiki/Rolle%27s_theorem) (Or common sense if you like) THere must be at least one maximum turning point on the interval (0,3) and we found that this can only occur at $x=\frac{3\sqrt{2}}{2}$ , hence by deduction it is the maximum.

Note: that last paragraph is probably not completely required for specialist maths but I guess you will slowly get used to providing more rigorous proofs as you continue mathematics.

Oh and yeah, just sub in $x=\frac{3\sqrt{2}}{2}$ into our Area function and double the value. Make sure to answer the question, that advice is applicable to any course

iamdan08 · « **Reply #47 on:** June 11, 2009, 09:09:49 am »

WOW!!!! Thanks heaappssss! I really appreciate the work you did. That helps a lot!!! Thank you!!

iamdan08 · « **Reply #48 on:** June 11, 2009, 11:34:07 am »

Ok a few more questions:

Find the solution to:

$\frac{dx}{dt}=\frac{x}{t(t+1)}$ , $x(1)=1$

I cant seem to anti-dif it properly.

And also, i was sick on the day we did these in lectires so i'm not sure how to do them:

Find the roots of the given equations:

$z^3$ =1 and $z^6=-64$

and

Find the roots of the follo0wing polynomials, using the complex exponential and roots of unity where necessary.

$z^4+4z^2+4=0$

and

$(z+i)^5 - (z-i)^5=0$

Mao · « **Reply #49 on:** June 11, 2009, 12:14:37 pm »

Mao · « **Reply #50 on:** June 11, 2009, 12:59:08 pm »

Mao · « **Reply #51 on:** June 11, 2009, 01:12:09 pm »

$\begin{align*} z^4 + 4z^2 + 4 &= 0 \\ z^2 & = \frac{-4 \pm \sqrt{16-16}}{2} \\ z^2 & = -2\\ r^2cis(2\theta) & = \left\{ 2cis \pi, 2cis 3\pi \right\} \\ r & = \sqrt{2}\\ \theta & = \left\{ \frac{\pi}{2}, \frac{3\pi}{2}\right\} \\ z & = \left\{ \sqrt{2}cis\left(\frac{\pi}{2}\right), \sqrt{2}cis\left(-\frac{\pi}{2}\right) \right\}\\ \end{align*}$ .

and the last question is quite tricky, so I shall just tackle it with brute force
$\begin{align*} (z+i)^5 - (z-i)^5 &= 0 \\ (z^5 + 5iz^4 - 10z^3 - 10iz^2 +5z + i) - (z^5 -5iz^4 -10z^3 +10iz^2 +5z -i) &= 0 \\ (10i)z^4- (20i)z^2 + 2i & = 0 \\ 5z^4 - 10z^2 + 1 & = 0 \\ z^2 & = \frac{1 \pm \sqrt{100-20}}{2}\\ z^2 & = \frac{1 \pm 4\sqrt{5}}{2} \\ \end{align*}$
which yields 2 real solutions, 2 imaginary solutions..

chassaostrich · « **Reply #52 on:** June 12, 2009, 01:58:02 pm »

Mao the order of the equation is 5, so you have ommitted the trivial solution z = 0+0i. chassostrich

chassaostrich · « **Reply #53 on:** June 12, 2009, 02:00:35 pm »

Whoops forget the nonsense from chassostrich. z = 0 does not work. chassaostrich with sauce on his face.

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