MedVision ad

Mathematics Marathon HSC 09 (5 Viewers)

00iCon

Member
Joined
Feb 1, 2009
Messages
383
Location
ISS
Gender
Male
HSC
2009
Here's a big cup of harden the hell up:

Find the volume of the ellipsoidal solid given by 2x^2 + 4y^2 + z^2 = 16

First ever maths troll
64sqroot(2)(pi)/3
=94.7815...
DID IT IN ONE STEP!:cool:
 

hermand

je t'aime.
Joined
Aug 28, 2008
Messages
1,432
Gender
Female
HSC
2009
New question:

If dx/dt = 1/(x+4) and x =0 when t=0, find t when x =2








Q.
a. Find the limiting sum of the series in simplest form.
b. Why does this series have a limiting sum?
 
Last edited:

s2Vicki

[untitled]
Joined
Mar 17, 2008
Messages
45
Gender
Female
HSC
2009
Question:

Show that the maximum value of <a href="http://www.codecogs.com/eqnedit.php?latex=\frac{\ln x}{x}" target="_blank"><img src="http://latex.codecogs.com/gif.latex?\frac{\ln x}{x}" title="\frac{\ln x}{x}" /></a> is <a href="http://www.codecogs.com/eqnedit.php?latex=\frac{1}{e}" target="_blank"><img src="http://latex.codecogs.com/gif.latex?\frac{1}{e}" title="\frac{1}{e}" /></a>
 
Last edited:

xFusion

Member
Joined
Sep 28, 2008
Messages
161
Gender
Female
HSC
2009



Test for maximum in dy/dx



is maximum

p.s are you sure your question is correct? or did i do something wrong =/
Question:The rate of sales, R dollars per day of a certain australian company is given by R=2t +120, where t=time in days.
a)what is the rate of sales at the end of 10 days?
b)calculate total amount of sales in first 8 days
c) on what day will accumulated sales exceed $10000?
 
Last edited:

elmoateme

Member
Joined
Nov 24, 2008
Messages
67
Gender
Male
HSC
2010
You found the x value for which lnx/x is a maximum. To find that actual maximum value you need to sub x=e into the original equation. Doing that you get 1/e as required. =)

So yes you did it right, but you just didn't finish the question. Make sure you do in the HSC.
 

xFusion

Member
Joined
Sep 28, 2008
Messages
161
Gender
Female
HSC
2009
You found the x value for which lnx/x is a maximum. To find that actual maximum value you need to sub x=e into the original equation. Doing that you get 1/e as required. =)

So yes you did it right, but you just didn't finish the question. Make sure you do in the HSC.
OMG genius :p I couldn't think how to get 1/e. Im gonna rep you for that :)
anyhow loan repayment question..: Keirren borrows $150,000 on a 7.5% p/a interest, calculated at the end of each month after Keirren repays an amount.
a)How much is each monthly repayment if Keirren pays off the loan in 10 years.
b)How much would Keirren save if he pays off the loan in 5 years as opposed to 10 years.
 

addikaye03

The A-Team
Joined
Nov 16, 2006
Messages
1,267
Location
Albury-Wodonga, NSW
Gender
Male
HSC
2008
OMG genius :p I couldn't think how to get 1/e. Im gonna rep you for that :)
anyhow loan repayment question..: Keirren borrows $150,000 on a 7.5% p/a interest, calculated at the end of each month after Keirren repays an amount.
a)How much is each monthly repayment if Keirren pays off the loan in 10 years.
b)How much would Keirren save if he pays off the loan in 5 years as opposed to 10 years.
P=$150,000, I=0.075/12=1/160 (monthly interest), n=120 monthly repayments

i) A_1=P+I-M

=150000+150000(1/160)-M

=150000(1+1/160)-M

A_2=A1+A1(I)-M

=A1(1+1/160)-M

=[150000(1+1/160)-M](1+1/160)-M

=150000(1+1/160)^2-M(1+1/160)-M

=150000(1+1/160)^2-M[1+(1+1/160)]

A_3=A2(1+1/160)-M

=[150000(1+1/160)^2-M[1+(1+1/160)](1+1/160)-M

=150000(1+1/160)^3-M[1+(1+1/160)+(1+1/160)^2]

...

A_10=150000(1+1/160)^10-M[1+(1+1/160)+(1+1/160)^2+...+(1+1/160)^9]

After 10 years, A_10=0; a=1, r=(1+1/160)

M[(1+1/160)^9-1]/(1/160)=150000(1+1/160)^10

M=[1875(1+1/160)^10]/ 2[(1+1/160)^9 -1]

Don't have a calculator here atm, but that's the answer

ii) Where ever n=10, insert n=5. For the (n-1)term (ie. the 9) insert 4

Then minus it from i) to get difference

Enjoy, Addison
 

ktl_edwards

Member
Joined
Mar 27, 2009
Messages
35
Gender
Female
HSC
2009
a)
r=7.5%/12 n=12X10
=0.625% = 120
=1.00625

A1=150000X(1.00625)- M
A2= 150000.(1.00625)^2 - M(1+1.00625)
A120=150000.(1.00625)^120 - M (1+1.00625+....+1.00625^119)

S119=1.(1.00625^119 -1/0.00625)
= 175.8314

so M= 150000.(1.00625)^120 / 175.8314
= $1801.78

Total Payment = M x 120
=$216231.6

b) r=1.00625 n=60

A60=150000X 1.00625^60 - M (1+1.00625+...+1.00625^59)

S59= 1.( 1.00625^59 -1 /0.00625)

M= 150000.(1.00625)^60 / S59
= $3066.79

Total payment = M x 60
=$184005.73

so Kierren saved $216213.6 - $184005.73
= $32207.87
 

Users Who Are Viewing This Thread (Users: 0, Guests: 5)

Top