• Congratulations to the Class of 2024 on your results!
    Let us know how you went here
    Got a question about your uni preferences? Ask us here

Halp with math1001 sample quiz!!! (1 Viewer)

OzKo

Retired
Joined
Jul 17, 2007
Messages
9,892
Gender
Male
HSC
2009
Uni Grad
2013
Which questions were you having trouble with exactly?

Also, it is best for you to tell us why you're confused so we can help fix that too. If we just blindly throw answers at you, you won't learn much at all.
If you actually read the instructions, there is a list of tutorial questions related to the quiz. If you know how to do the questions, then the quiz should be simpler.

You're not going to learn much if we just give you the solutions, so you're better off attempting it, looking at which ones you get wrong, and then asking us for help from there.
Please rephrase your request.
 

LookingAtYOU

New Member
Joined
Mar 22, 2012
Messages
21
Gender
Male
HSC
2011
Pls, can somebody show me how to do Q4 and Q14? (Show me steps/working out)
My test is next week and im stumped on these questions...

Many thanks!
 

zxreth

Member
Joined
Oct 11, 2009
Messages
775
Gender
Male
HSC
2011
Pls, can somebody show me how to do Q4 and Q14? (Show me steps/working out)
My test is next week and im stumped on these questions...

Many thanks!
Question 4: convert to polar form so you get sqrt(2)cis(pi/4) then use de moivres theorem, so that you get (sqrt(2))^6 cis(6pi/4), then simplify for answer.

With question 14, i'd appreciate some help too.
 

funnytomato

Active Member
Joined
Jan 21, 2011
Messages
847
Gender
Male
HSC
2010
Pls, can somebody show me how to do Q4 and Q14? (Show me steps/working out)
My test is next week and im stumped on these questions...

Many thanks!
Q14

the way to find critical point for this question is similar to that for function of 1 variable( i.e. where f'(x)=0 ),
since the function has more than just one variable, you'll need to find its Partial Derivatives
find the x and y partial derivatives by regarding y and x as constants , respectively

the critical point is where both x and y partials are 0
so you'd need to solve:
df/dx=...=0
and df/dy=...=0
simultaneously
(the 'd' is meant to be the 'backwards 6 d')

and then you can get the coordinates of the critical point
 
Last edited:

Carrotsticks

Retired
Joined
Jun 29, 2009
Messages
9,494
Gender
Undisclosed
HSC
N/A


Isn't a critical point just like finding a horizontal point of inflexion?

I'll totes get onto it when I get home.
Not necessarily. We have other types of critical points too.
 

funnytomato

Active Member
Joined
Jan 21, 2011
Messages
847
Gender
Male
HSC
2010
For question 10, do you just substitute (0,0) to the equation z = e^(x+y) - 2 ? If not, how do you approach the question?

yes

z = e^(0+0) - 2 = -1 is the minimum for the given domain
 

LookingAtYOU

New Member
Joined
Mar 22, 2012
Messages
21
Gender
Male
HSC
2011
Hey Carrotsticks, you seem like a really good maths person!
Could you help me out with Q's 2,4,6,8 ?
I'm really struggling with this unit because I only took up 2Unit maths in highschool.
 

LookingAtYOU

New Member
Joined
Mar 22, 2012
Messages
21
Gender
Male
HSC
2011
Pls reply ASAP as I have my quiz coming up on Tuesday!!!

Thank you
 

Riproot

Addiction Psychiatrist
Joined
Nov 10, 2009
Messages
8,228
Location
I don’t see how that’s any of your business…
Gender
Male
HSC
2011
Uni Grad
2017
Just solve Q2 and it's I'm pretty sure.

Oh wait, you have answers.

Pretty much just find cos(pi/6) and sin(pi/6)

Then times by (2 + i)

So



and solve from there(?)

(That doesn't look right. I need to do this on paper.)
 
Last edited:

Riproot

Addiction Psychiatrist
Joined
Nov 10, 2009
Messages
8,228
Location
I don’t see how that’s any of your business…
Gender
Male
HSC
2011
Uni Grad
2017
Riproot, your taking the ADV math units right?
Yep, but I think I'm in the bottom half of the pack. lol (I get the first quiz marks for MATH1901 on Monday)

Okay. I got it.

Just take the modulus of (2 + i) and (cos(pi/6) - isin(pi/6)) and times them together.

(2 + i) = Rcis(theta)




Then the modulus of the other one is 1 because it is already in cos(theta) + isin(theta) form and R = 1.

Therefore,
 

LookingAtYOU

New Member
Joined
Mar 22, 2012
Messages
21
Gender
Male
HSC
2011
Wait, how do you find the modulus of (cos(pi/6) - isin(pi/6))?
 

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top