• Best of luck to the class of 2024 for their HSC exams. You got this!
    Let us know your thoughts on the HSC exams here
  • YOU can help the next generation of students in the community!
    Share your trial papers and notes on our Notes & Resources page
MedVision ad

Mathematics Marathon (2 Viewers)

gurmies

Drover
Joined
Mar 20, 2008
Messages
1,209
Location
North Bondi
Gender
Male
HSC
2009
a^2 = b^2 + c^2 - 2bcCosA

25 = 75 + x^2 - (2)(5root3)(x)(root3/2)

25 = 75 + x^2 - 15x

x^2 - 15x + 50 = 0

(x-10)(x-5) = 0

x = 10 or/ x = 5

Find the derivative of root(sin2x)
 

shaon0

...
Joined
Mar 26, 2008
Messages
2,029
Location
Guess
Gender
Male
HSC
2009
a^2 = b^2 + c^2 - 2bcCosA

25 = 75 + x^2 - (2)(5root3)(x)(root3/2)

25 = 75 + x^2 - 15x

x^2 - 15x + 50 = 0

(x-10)(x-5) = 0

x = 10 or/ x = 5

Find the derivative of root(sin2x)
f(x)=sqrt(sin2x)
Let u=sin2x
f'(x)=cos(2x)/sqrt(sin2x)

Derive cot(arcsin(x))=sqrt(1-x^2)/x
Sorry, don't know if this is 2unit. but it's fairly short.
 
Last edited:

jet

Banned
Joined
Jan 4, 2007
Messages
3,148
Gender
Male
HSC
2009
Let theta = arcsin(x)

Hence sin(theta) = x/1

This leads to a right triangle with one side x, the hypotenuse 1 and the other side sqrt(1-x^2)

hence, cot(theta) = 1/tan(theta)
=sqrt(1-x^2)/x

Thats definitely not 2 unit.

How about:
The curve x^2/5 + y^2/17 = 10 in the first quadrant is rotated through the x-axis.
Find the volume of the solid of revolution created by this rotation.
 

shaon0

...
Joined
Mar 26, 2008
Messages
2,029
Location
Guess
Gender
Male
HSC
2009
Let theta = arcsin(x)

Hence sin(theta) = x/1

This leads to a right triangle with one side x, the hypotenuse 1 and the other side sqrt(1-x^2)

hence, cot(theta) = 1/tan(theta)
=sqrt(1-x^2)/x

Thats definitely not 2 unit.
Sorry about that.
My solution was:
Let u=arcsin(x)
and, cot(u)=cos(u)/sin(u).
cos(arcsin(x))/x=cot(arcsin(x))
Since, x=sin(u)
x^2=1-(cos(u))^2
cos(u)=sqrt(1-x^2)
Hence, cot(arcsin(x))=sqrt(1-x^2)/x

How about:
The curve x^2/5 + y^2/17 = 10 in the first quadrant is rotated through the x-axis.
Find the volume of the solid of revolution created by this rotation.
17x^2+5y^2=850
5y^2=850-17x^2
y^2=170-(17/5)x^2

V=pi S [limits: sqrt(5) to 0] y^2 dx
= pi S (170-(17/5)x^2) dx
= pi (70sqrt(5)-(17/15)sqrt(5)^3)
= 70(pi)sqrt(5)-(17pi/3)sqrt(5)
 
Last edited:

jet

Banned
Joined
Jan 4, 2007
Messages
3,148
Gender
Male
HSC
2009
17x^2+5y^2=850
5y^2=850-17x^2
y^2=170-(17/5)x^2

V=pi S [limits: sqrt(5) to 0] y^2 dx
= pi S (170-(17/5)x^2) dx
= pi (70sqrt(5)-(17/15)sqrt(5)^3)
= 70(pi)sqrt(5)-(17pi/3)sqrt(5)
You got the limits wrong. Its not the standard equation for an ellipse :p

Think like a 2 unit person.
 

shaon0

...
Joined
Mar 26, 2008
Messages
2,029
Location
Guess
Gender
Male
HSC
2009
You got the limits wrong. Its not the standard equation for an ellipse :p

Think like a 2 unit person.
17x^2+5y^2=850
5y^2=850-17x^2
y^2=170-(17/5)x^2

V=pi S [limits: sqrt(50) to 0] y^2 dx
= pi S (170-(17/5)x^2) dx
= pi (70sqrt(50)-(17/15)sqrt(50)^3)
= 350(pi)sqrt(2)-(850(pi)/3)sqrt(2) <-------- This part might be wrong because i cbf using a calculator.
 
Last edited:

shaon0

...
Joined
Mar 26, 2008
Messages
2,029
Location
Guess
Gender
Male
HSC
2009
3x^9

Differentiate tan x°

By 1st principles?
d/dx(tan(x))= lim (h->0)(tan(x+h)-tan(x))/h
= lim (h->0)((tan(x)+tan(h)/1-tan(x)tan(h)-tan(x))/h
= lim (h->0)(tan(h)+(tan(x))^2*tan(h))/h
= lim (x->0)(tan(h)/h).lim (x->0)(1+(tan(x))^2)
= pi/180° (sec(x))^2
 
Last edited:

Kaatie

Member
Joined
Sep 25, 2007
Messages
452
Gender
Female
HSC
2009
no question again?

okay than heres an odd one:
The face of a 50c coin is a regular dodecagon. Show that its volume is approx 95.5% i.e. 3/pie of that of a circular coin of the same diameter and thickness
 

Kaatie

Member
Joined
Sep 25, 2007
Messages
452
Gender
Female
HSC
2009
if no one knows how to do it feel free to ask a new question
 

jet

Banned
Joined
Jan 4, 2007
Messages
3,148
Gender
Male
HSC
2009
Okay.
A dodecagon will have 12 isosceles triangles, with the two equal sides r and the other side b, and angles 30, 75 and 75.

By constructing the perpendicular height of length h from the base to the vertex at the centre, we have:
sin15 = (b/2)/r = b/2r
Hence, b = 2rsin15

Also, cos15 = h/r
h = rcos15

Now, the area of each triangle, a = 0.5 x 2rsin15 x rcos15
=r^2 sin15 cos15

Hence, the area of the dodecagon is A = 12r^2 sin15 cos 15, and the volume, V1 = 12r^2Tsin15 cos15 (thickness T)

For a circular coin, the volume is V = πr^2 T

Hence, the % Volume = V1/V x 100
= (12r^2 Tsin15 cos15)/(πr^2 T) x 100
=(1200sin15 cos15)/(π)
=95.493% as required.

Solve for x:
3^(2x + 1) - 180(3^x) + 729 = 0
 

bored.of.u

Member
Joined
Jul 21, 2008
Messages
236
Gender
Male
HSC
2010
Okay.
A dodecagon will have 12 isosceles triangles, with the two equal sides r and the other side b, and angles 30, 75 and 75.

By constructing the perpendicular height of length h from the base to the vertex at the centre, we have:
sin15 = (b/2)/r = b/2r
Hence, b = 2rsin15

Also, cos15 = h/r
h = rcos15

Now, the area of each triangle, a = 0.5 x 2rsin15 x rcos15
=r^2 sin15 cos15

Hence, the area of the dodecagon is A = 12r^2 sin15 cos 15, and the volume, V1 = 12r^2Tsin15 cos15 (thickness T)

For a circular coin, the volume is V = πr^2 T

Hence, the % Volume = V1/V x 100
= (12r^2 Tsin15 cos15)/(πr^2 T) x 100
=(1200sin15 cos15)/(π)
=95.493% as required.

Solve for x:
3^(2x + 1) - 180(3^x) + 729 = 0
here my solution:

3(3^2x) -180(3^x) +729 = 0
3(3^x)^2 - 180(3^x) + 729 = 0
so let, u = (3^x)
.: 3 u^2 - 180u + 729 =0
3[(u^2) -60u + 243] = 0
then using the quadratic formulae
im gonna speed up the process a little =D
u=(60+/- SQROOT 3600-972)/2
u=(60+/- SQROOT 2628)/2
u=30+/- SQROOT 657
so evaluating to 2dp
u = 55.63 and 4.36

am i right??

n heres my question:

solve for x:

tan^4 x - tan^3 x - 3tan^2 x + 3tan x = 0 for 0 x 360
 
Last edited:

gurmies

Drover
Joined
Mar 20, 2008
Messages
1,209
Location
North Bondi
Gender
Male
HSC
2009
here my solution:

3(3^2x) -180(3^x) +729 = 0
3(3^x)^2 - 180(3^x) + 729 = 0
so let, u = (3^x)
.: 3 u^2 - 180u + 729 =0
3[(u^2) -60u + 243] = 0
then using the quadratic formulae
im gonna speed up the process a little =D
u=(60+/- SQROOT 3600-972)/2
u=(60+/- SQROOT 2628)/2
u=30+/- SQROOT 657
so evaluating to 2dp
u = 55.63 and 4.36

am i right??

n heres my question:

solve for x:

tan^4 x - tan^3 x - 3tan^2 x + 3tan x = 0 for 0 x 360

You are correct but you would not get full marks, as the question said solve for x. You would have to proceed to use logarithms to solve 3^x = 55.63 and 4.36.

For your question:

tan^4(x) - tan^3(x) - 3tan^2(x) + 3tan(x) = 0

tan^3(x)[tan(x) - 1] -3tan(x)[tan(x) - 1] = 0

[tan(x) - 1][tan^3(x) - 3tan(x)] = 0

tan(x)[tan(x) - 1][tan^2(x) - 3] = 0

tan(x)[tan(x) - 1][tan(x) - √3][tan(x) + √3] = 0

tan(x) = 0

tan (x) = 1

tan(x) = √3


tan(x) = -√3

x = 0, 180, 360, 45, 225, 60, 240, 120, 300

Prove that the parabolas y = 2x^2 - 6x + 7 and y = x^2 - 2x + 3 touch eachother and find the co-ordinates of the point of contact (Fitzpatrick 2 Unit)

 

jet

Banned
Joined
Jan 4, 2007
Messages
3,148
Gender
Male
HSC
2009
Whoops, sorry. The question is meant to be
3^(2x + 2) - 108(3^x) + 729 = 0
 

bored of sc

Active Member
Joined
Nov 10, 2007
Messages
2,314
Gender
Male
HSC
2009
Solve for x:
3^(2x + 2) - 180(3^x) + 729 = 0
32x+2-180*3x+729 = 0
32x*9-180*3x+729 = 0
9(3x)2-180(3x)+729 = 0
Let 3x = m
9m2-180m+729 = 0
m2-20m+81 = 0
m = [20+sqrt(202-4*1*81)]/2
= [20+sqrt(76)]/2
= [20+2*sqrt(19)]/2
= 10+sqrt(19)
3x = m
3x = 10+sqrt(19)
x = log3[10+sqrt(19)]

Not sure since I haven't done the logarithms unit yet.
 

Nevermore

Godlike
Joined
Nov 4, 2008
Messages
35
Gender
Male
HSC
2009
32x+2-180*3x+729 = 0
32x*9-180*3x+729 = 0
9(3x)2-180(3x)+729 = 0
Let 3x = m
9m2-180m+729 = 0
m2-20m+81 = 0
m = [20+sqrt(202-4*1*81)]/2
= [20+sqrt(76)]/2
= [20+2*sqrt(19)]/2
= 10+sqrt(19)
3x = m
3x = 10+sqrt(19)
x = log3[10+sqrt(19)]

Not sure since I haven't done the logarithms unit yet.
starting from 3^x = 10+sqrt(19)
log[3^x] = log[10+sqrt(19)]
x log 3 = log[10+sqrt(19)]

x = (log 3 / log[10+sqrt(19)])
 

bored of sc

Active Member
Joined
Nov 10, 2007
Messages
2,314
Gender
Male
HSC
2009
New question: If there are 100,000 people doing the HSC in the year 2100 and you achieve a UAI of 95 which places you in the top 8% of those completing the HSC, how many people dropped out in year 10? I hope that makes sense and isn't flawed.
 

Nevermore

Godlike
Joined
Nov 4, 2008
Messages
35
Gender
Male
HSC
2009
New question: If there are 100,000 people doing the HSC in the year 2100 and you achieve a UAI of 95 which places you in the top 8% of those completing the HSC, how many people dropped out in year 10? I hope that makes sense and isn't flawed.
from the problem, this equation is formed


5000
-------------- = 0.08
100000 - x

after solving for x

the answer is 37,500
 
Last edited:

Nevermore

Godlike
Joined
Nov 4, 2008
Messages
35
Gender
Male
HSC
2009
Now here is my question :)

In a class of 28 students, students must choose to study at least one of the following languages - French, German.

22 study french and 18 study german, what is the probability of choosing a student who studies both languages?
 

Users Who Are Viewing This Thread (Users: 0, Guests: 2)

Top