Author Topic: VCE Methods Question Thread! (Read 5782177 times) Tweet Share

lzxnl · « **Reply #2325 on:** August 01, 2013, 07:02:32 pm »

To find the mean? OK. Let's think about this from a common sense perspective. If we conducted this experiment 16 times, we would expect x to equal -2 4 times, to equal -1 once, to equal 0 3 times, to equal 1 twice, to equal 2 twice, to equal 3 once, and to equal 4 3 times.
What's the average of this? -2*4 + -1 + 0*3 + 1*2 + 2*2 + 3*1 + 4*3
= -8-1+2+4+3+12
= 12
So average is 12/16 = 0.75

I don't think the answer should be 0.5. It doesn't look like it.

Alwin · « **Reply #2326 on:** August 01, 2013, 07:28:24 pm »

Quote from: darklight on August 01, 2013, 05:08:03 pm

Can someone help me with part b) of this question? Thanks!

Original Questions

We have $f(x) = x^m e^{-nx+n}$ So,
$f'(x) = e^{n (1-x)} (m x^{m-1}-n x^m)$

For a tangent that passes through the origin, it must be in the form $y=kx$

The equation of any tangent to $f(x)$ at $(x_0,y_0)$ is given by:
$\begin{alignedat}{1}y-y_0 &= m (x - x_0) \\ \iff y &= [e^{n (1-x_0)} (m x_0^{m-1}-n x_0^m)](x-x_0) + y_0 \\ \text{also, } y_0 &= x_0^m e^{-nx_0+n} \\ y &= e^{n (1-x_0)} (m x_0^{m-1}-n x_0^m)(x-x_0) + x_0^m e^{-nx_0+n} \\ y &= e^{n (1-x_0)} (m x_0^{m-1}-n x_0^m)x- e^{n (1-x_0)} (m x_0^{m-1}-n x_0^m) x_0 + x_0^m e^{-nx_0+n} \\ \text{But since we require: } y&=kx, \\ - e^{n (1-x_0)} (m x_0^{m-1}-n x_0^m) x_0 + x_0^m e^{-n(x_0+1)} &= 0 \\ - e^{n (1-x_0)}( (m x_0^{m-1}-n x_0^m) x_0 - x_0^m) &= 0 \\ - e^{n (1-x_0)}(m x_0^{m}-n x_0^{m+1}- x_0^m) &= 0 \\ - e^{n (1-x_0)}(x_0^{m} (m-n x_0- 1) &= 0 \\ \Rightarrow m-n x_0- 1 =& 0 \\ x_0 &= \frac{-1+m}{n} \\ \text{ } \\ x_0 = \frac{-1+m}{n}, y_0 &= (\frac{-1+m}{n})^m e^{-n(\frac{-1+m}{n})+n} \\ \text{I've had enough of LaTexing for one post haha,}& \text{ I'll let you simplify that } \uparrow \text{ } :) \end{alignedat}$

I think I wayyy overcomplicated it, but thats one method haha

Quote from: nliu1995 on August 01, 2013, 07:02:32 pm

So average is 12/16 = 0.75

I get 0.75 too hmm

EDIT: Didn't read the question haha, added in the co-ordinate part

Jaswinder · « **Reply #2327 on:** August 01, 2013, 07:33:10 pm »

whoops sorry guys i meant median.
whats a good way of finding the median of that table

b^3 · « **Reply #2328 on:** August 01, 2013, 07:39:17 pm »

Add up the probabilities until you hit or exceed 0.5 (halfway probability wise through the distribution)
If you exceed 0.5 then the value of $x$ for which you exceed it on is the median.
If you hit 0.5 exactly, then average the two values of what you hit it with and the next value.

So in this case $\frac{1}{4}+\frac{1}{16}+\frac{3}{16}=\frac{1}{2}$ , so we 'hit' $0.5$ . We hit it with $0$ , so taking $0$ and the next value, $1$ .
So the median is $\frac{0+1}{2}=0.5$

arush002 · « **Reply #2329 on:** August 01, 2013, 09:55:38 pm »

Would be very grateful if someone could give me a hand with Chapter Review 12, Short Answer, Question 7. Usually pretty good with these types of questions but the f(3x) throws me off a little...

zvezda · « **Reply #2330 on:** August 01, 2013, 10:38:38 pm »

Quote from: arush002 on August 01, 2013, 09:55:38 pm

Would be very grateful if someone could give me a hand with Chapter Review 12, Short Answer, Question 7. Usually pretty good with these types of questions but the f(3x) throws me off a little...

Take an equation of the form y=mx and graph it. Now, obviously theres a triangle thats formed between the line and the x-axis. Take this triangle and plot the coordinate (9, 9m). From here, 0.5 x base x height in order to find m. So then you have your equation. Apply dilation of 1/3 from y and find the image equation. The rest should be ok.

zvezda · « **Reply #2331 on:** August 01, 2013, 10:39:28 pm »

Hey,
Just have a question with q3 from exercise 15D of essentials.
Not sure how to go about it.
Help is appreciated

abcdqd · « **Reply #2332 on:** August 01, 2013, 11:22:06 pm »

Quote from: stankovic123 on August 01, 2013, 10:39:28 pm

Hey,
Just have a question with q3 from exercise 15D of essentials.
Not sure how to go about it.
Help is appreciated

you can just use cas, i didnt even know that it would work lol. we want pr(x=5)>0.25, so the minimum number of trials is given by pr(x=5)=0.25
$\textup{solve} (\binom{n}{5}\cdot (0.6)^5\cdot (0.4)^{n-5}=0.25,n)$ should give the answer

zvezda · « **Reply #2333 on:** August 01, 2013, 11:23:38 pm »

Quote from: abcdqd on August 01, 2013, 11:22:06 pm

you can just use cas, i didnt even know that it would work lol. we want pr(x=5)>0.25, so the minimum number of trials is given by pr(x=5)=0.25
$\textup{solve} (\binom{n}{5}\cdot (0.6)^5\cdot (0.4)^{n-5}=0.25,x)$ should give the answer

Yeah i tried that before and it didnt work hahah. Thanks anyway

Alwin · « **Reply #2334 on:** August 02, 2013, 09:04:24 pm »

Quote from: stankovic123 on August 01, 2013, 11:23:38 pm

Quote from: abcdqd on August 01, 2013, 11:22:06 pm
you can just use cas, i didnt even know that it would work lol. we want pr(x=5)>0.25, so the minimum number of trials is given by pr(x=5)=0.25
$\textup{solve} (\binom{n}{5}\cdot (0.6)^5\cdot (0.4)^{n-5}=0.25,n)$ should give the answer
Yeah i tried that before and it didnt work hahah. Thanks anyway

Hey, stankovic123! I dunno what CAS you're using, but I have the classpad
Last year, for some qs like that I had to graph the function and use Graph-solve to find x when y=0.25
Or, had to whip up a spread sheet, depending on whether my CAS felt like graphing it or not lol

I guess you have to use other numerical methods to solve it, if "solve" cas function doesn't work . . .

Stick · « **Reply #2335 on:** August 03, 2013, 03:21:12 pm »

Quote from: arush002 on August 01, 2013, 09:55:38 pm

Would be very grateful if someone could give me a hand with Chapter Review 12, Short Answer, Question 7. Usually pretty good with these types of questions but the f(3x) throws me off a little...

Quote from: stankovic123 on August 01, 2013, 10:38:38 pm

Take an equation of the form y=mx and graph it. Now, obviously theres a triangle thats formed between the line and the x-axis. Take this triangle and plot the coordinate (9, 9m). From here, 0.5 x base x height in order to find m. So then you have your equation. Apply dilation of 1/3 from y and find the image equation. The rest should be ok.

Is there an algebraic way of doing these sorts of problems? I thought applying transformations might work, but it didn't. Here's the question for anyone who doesn't have access to the textbook at this instant:

clıppy · « **Reply #2336 on:** August 03, 2013, 03:23:44 pm »

Just a quick question because I think i've forgotten how powers work.
Lets say I need to find the inverse of the equation:
$y=\frac{1}{\sqrt{x}} - 3$
I swap x and y, start moving things around and then get to this point:
$x+3=\frac{1}{\sqrt{y}}$
Which is equal to:
$x+3=y^{-1/2}$

Here is where I am lost on how it works. How do i make $x+3=y^{-1/2}$ into $(x+3)^{-2}=y$
I just can't remember how moving powers across equal signs work.

Jaswinder · « **Reply #2337 on:** August 03, 2013, 03:29:57 pm »

Quote from: Stick on August 03, 2013, 03:21:12 pm

Is there an algebraic way of doing these sorts of problems? I thought applying transformations might work, but it didn't. Here's the question for anyone who doesn't have access to the textbook at this instant:

(Image removed from quote.)

I get 5/3 as an answer for both of them. pree sure thats wrong :/ anyways

Christopher has five pairs of identical purple socks and three pairs of identical green socks. His socks are randomly mixed in his drawer. He takes two identical socks at random from the drawer in the dark. The probability that he obtains a matching pair is?

I keep getting 13/28, however the answer is 1/2 :s

lzxnl · « **Reply #2338 on:** August 03, 2013, 03:37:01 pm »

Quote from: Stick on August 03, 2013, 03:21:12 pm

Is there an algebraic way of doing these sorts of problems? I thought applying transformations might work, but it didn't. Here's the question for anyone who doesn't have access to the textbook at this instant:

(Image removed from quote.)

I would look at it this way. What have you done to get from f(x) to f(3x)? The integration bounds are equivalent as they have been dilated too. To get from f(x) to f(3x), you have to dilate from the y axis by a factor of 1/3. This means that your area is going to be shrunk. Draw it out if you need to. Translations don't affect the area, for obvious reasons.

Quote from: Jaswinder on August 03, 2013, 03:29:57 pm

I get 5/3 as an answer for both of them. pree sure thats wrong :/ anyways

Christopher has five pairs of identical purple socks and three pairs of identical green socks. His socks are randomly mixed in his drawer. He takes two identical socks at random from the drawer in the dark. The probability that he obtains a matching pair is?

I keep getting 13/28, however the answer is 1/2 :s

I'm happy with 5/3 for both of them.
OK, so how can he get a matching pair? Either he takes two green or two purple.
He has TEN purple socks as it says five pairs, and he has SIX green socks.
How does he take two green socks? 16 socks in total, 6 socks, so 6/16*5/15 = 6/16*1/3 = 1/8
How can he take two purple socks? 16 socks in total, 10 socks, so 10/16*9/15 = 5/8*3/5 = 3/8
Sum the probabilities to get 1/2

I think you might have done this:
Five purple socks, three green socks
Probability is 5/8*4/7 + 3/8*2/7 = (20+6)/56 = 13/28.
The question says pairs of socks, not socks.

Quote from: clippy on August 03, 2013, 03:23:44 pm

Just a quick question because I think i've forgotten how powers work.
Lets say I need to find the inverse of the equation:
$y=\frac{1}{\sqrt{x}} - 3$
I swap x and y, start moving things around and then get to this point:
$x+3=\frac{1}{\sqrt{y}}$
Which is equal to:
$x+3=y^{-1/2}$

Here is where I am lost on how it works. How do i make $x+3=y^{-1/2}$ into $(x+3)^{-2}=y$
I just can't remember how moving powers across equal signs work.

Ok. (x+3) = y^-1/2
Square both sides
(x+3)^2 = y^(-1/2*2) = y^-1
Reciprocal
(x+3)^-2 = y

Just remember what the domain and range of this thing is.

Alwin · « **Reply #2339 on:** August 03, 2013, 03:48:13 pm »

Quote from: Stick on August 03, 2013, 03:21:12 pm

Is there an algebraic way of doing these sorts of problems? I thought applying transformations might work, but it didn't. Here's the question for anyone who doesn't have access to the textbook at this instant:

Original Question

I see in your signature that you do spesh Stick, so a hint for the algebraic way is substitution

for a, let u=3x, then you have to change the terminal

for b, i'll also show a non spesh way of doing it for those of you not doing spesh
$\begin{alignedat}{1} \text{let } f(x) &= \frac{5}{3} \\ \text{Clearly } \int_1^4 f(x)dx &= \int_1^4 \frac{5}{3} dx = 5 \\ \therefore \int_0^1 f(3x+1)dx &= \int_0^1 \frac{5}{3} dx = \frac{5}{3} \end{alignedat}$

and nliu's gone and answered the rest while I was LaTexing

The only think I would add is:

Quote from: nliu1995 on August 03, 2013, 03:37:01 pm

Translations don't affect the area, for obvious reasons.

Consider f(x) + 1 nliu

Search the forums now!

We have moved!

Author Topic: VCE Methods Question Thread! (Read 5782177 times) Tweet Share

lzxnl

Re: VCE Methods Question Thread!

Alwin

Re: VCE Methods Question Thread!

Jaswinder

Re: VCE Methods Question Thread!

b^3

Re: VCE Methods Question Thread!

arush002

Re: VCE Methods Question Thread!

zvezda

Re: VCE Methods Question Thread!

zvezda

Re: VCE Methods Question Thread!

abcdqd

Re: VCE Methods Question Thread!

zvezda

Re: VCE Methods Question Thread!

Alwin

Re: VCE Methods Question Thread!

Stick

Re: VCE Methods Question Thread!

clıppy

Re: VCE Methods Question Thread!

Jaswinder

Re: VCE Methods Question Thread!

lzxnl

Re: VCE Methods Question Thread!

Alwin

Re: VCE Methods Question Thread!

Recent Posts

User:
Password: