• 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

Australian Maths Competition (2 Viewers)

30june2016

Active Member
Joined
Jun 30, 2016
Messages
176
Location
オーストラリア
Gender
Female
HSC
2017
Uni Grad
2021
Would you need to know things such as modular arithmetic and geometric identities for the intermediate section? Especially for the last 5?

You never know, but for the Australian Intermediate Mathematics Olympiad (similar to AMC, but harder) a few years ago, we got asked a question that could be solved using modular arithmetic/bases etc
 
Last edited:

Mongoose528

Member
Joined
Jun 30, 2016
Messages
72
Location
WA
Gender
Male
HSC
2019
You never know, but for the Australian Intermediate Mathematics Olympiad (similar to AMC, but harder) a few years ago, we got asked a question that could be solved using modular arithmetic/bases etc
Would you have any tips for the amc (especially last 5) and aimo? Completing them both this year.
 

Mongoose528

Member
Joined
Jun 30, 2016
Messages
72
Location
WA
Gender
Male
HSC
2019
Terry has invented a new way to extend lists of numbers. To Terryfy a list such
as [1, 8] he creates two lists [2, 9] and [3, 10] where each term is one more than
the corresponding term in the previous list, and then joins the three lists together
to give [1, 8, 2, 9, 3, 10]. If he starts with a list containing one number [0] and
repeatedly Terryfies it he creates the list
[0, 1, 2, 1, 2, 3, 2, 3, 4, 1, 2, 3, 2, 3, 4, 3, 4, 5, 2, 3, 4, . . . ].

What is the 2012th number in this Terryfic list?
 

Mongoose528

Member
Joined
Jun 30, 2016
Messages
72
Location
WA
Gender
Male
HSC
2019
Continuing the Marathon:

1. A high school marching band can be arranged in a rectangular formation with exactly
three boys in each row and exactly five girls in each column. There are several sizes
of marching band for which this is possible. What is the sum of all such possible
sizes?

2. Around a circle, I place 64 equally
spaced points, so that there are
64×63÷2 = 2016 possible chords
between these points.
I draw some of these chords, but
each chord cannot cut across more
than one other chord.
What is the maximum number of
chords I can draw?

3. A symmetrical cross with equal arms has an area of 2016 cm2 and all sides of integer
length in centimetres. What is the smallest perimeter the cross can have, in
centimetres?
 

si2136

Well-Known Member
Joined
Jul 19, 2014
Messages
1,370
Gender
Undisclosed
HSC
N/A
The APMO papers are just freaking hard.

American papers have so much probability it's not funny
 

si2136

Well-Known Member
Joined
Jul 19, 2014
Messages
1,370
Gender
Undisclosed
HSC
N/A
3. A symmetrical cross with equal arms has an area of 2016 cm2 and all sides of integer
length in centimetres. What is the smallest perimeter the cross can have, in
centimetres?
Let x = Large Square
Let y = Small Square

Therefore 2016 = (x+2y)(x-2y)

Through trial and error, x+2y = 56, x-2y = 36.

Therefore 2x = 92.

Therefore the perimeter is 184cm.

NEW Q:

There are 42 Points P1, P2, P3, ....., P42, placed in order on a straight line so that each distance from Pi to P(i+1) is 1/i, where 1≤i≤41. What is the sum of the distances between every pair of these points?
 
Last edited:

Mongoose528

Member
Joined
Jun 30, 2016
Messages
72
Location
WA
Gender
Male
HSC
2019
Let x = Large Square
Let y = Small Square

Therefore 2016 = (x+2y)(x-2y)

Through trial and error, x+2y = 56, x-2y = 36.

Therefore 2x = 92.

Therefore the perimeter is 184cm.

NEW Q:

There are 42 Points P1, P2, P3, ....., P42, placed in order on a straight line so that each distance from Pi to P(i+1) is 1/i, where 1≤i≤41. What is the sum of the distances between every pair of these points?
Completed it for 1≤i≤2, 1≤i≤3 ... 1≤i≤5, and the answer was always a triangular number of n-1

For: 1≤i≤2, the sum of distances was 1

For: 1≤i≤3, the sum of distances was 3

For: 1≤i≤5, the sum of distances was 10

So for 1≤i≤42 the sum of distances will be 41*42/2 = 861

New Q: In a 3 × 3 grid of points, many triangles can be formed using 3 of the points as
vertices. Of all these possible triangles, how
many have all three sides of different lengths?
 
Last edited:

si2136

Well-Known Member
Joined
Jul 19, 2014
Messages
1,370
Gender
Undisclosed
HSC
N/A
@M: Is the answer 68 for the new q?

Is there a faster way to solve 3 system of lines with 4 unknowns than matrices?
 

dan964

what
Joined
Jun 3, 2014
Messages
3,479
Location
South of here
Gender
Male
HSC
2014
Uni Grad
2019
1 2 3
4 5 6
7 8 9

Note: you can only pick max of 2 points on any given line/diagonal. You must pick 3 points.

Pick (1) as a fixed point:
Pick (5) = 2,3,4,6,7,8 = 6
Remove (5), Pick (9) = 2,3,4,6,7,8 = 6
Remove (9), Pick (2) = 4,6,7,8 = 4 or Pick (3) = 4,6,7,8 = 4
Remove (2,3), Pick (4) = 6,8 = 2 or Pick (7) = 6,8 = 2
Remove (4,7), Pick (6) = 8, = 1
= 25


Remove (1), Pick (9) as a fixed point
Pick (5) = 2,3,4,6,7,8 = 6
Remove (5), Pick (3) = 2,4,7,8 = 4 or Pick (6) = 2,4,7,8 = 4
Remove (3,6), Pick (7) = 2,4 = 2 or Pick (8) = 2,4 = 2
Remove (7,8), Pick (2) = 4, = 1
= 19

Remove (9), Pick (3) as a fixed point
Pick (5) = 2,4,6,8 = 4
Remove (5), Pick (7) = 2,4,6,8 = 4
Remove (7), Pick (2) = 4,6,8 = 3
Remove (2), Pick (4) = 6,8 = 2
Remove (4), Pick (6) = 8, = 1
= 14

Remove (3), Pick (7) as a fixed point
Pick (5) = 2,4,6,8 = 4
Remove (5), Pick (2) = 4,6,8 = 3
Remove (2), Pick (4) = 6,8 = 2
Remove (4), Pick (6) = 8, = 1
= 10

Remove (7), Pick (2) as a fixed point
Pick (5) = 4,6 = 2
Remove (5), Pick (4) = 6,8 = 2
Remove (4), Pick (6) = 8, = 1
= 5

Remove (2), Pick (8) as a fixed point
Pick (5) = 4,6 = 2
Remove (5), Pick (4) = 6, = 1
= 3

Remove (8), note that only (4,5,6) remain which no valid triangles can be formed.



1 2 3
4 5 6
7 8 9

Pick (1) as a fixed point:
Pick (5) = 6,8 = 2
Remove (5), Pick (9) = 2,4,6,8 = 4
Remove (9), Pick (2) = 6,7,8 = 3 or Pick (3) = 4,6 = 2
Remove (2,3), Pick (4) = 6,8 = 2 or Pick (7) = 8, = 1
= 14


Remove (1), Pick (9) as a fixed point
Pick (5) = 2,4 = 2
Remove (5), Pick (3) = 2,8 = 2 or Pick (6) = 2,4,7 = 3
Remove (3,6), Pick (7) = 4, = 1 or Pick (8) = 2,4 = 2
= 10

Remove (9), Pick (3) as a fixed point
Pick (5) = 4,8 = 2
Remove (5), Pick (7) = 2,4,6,8 = 4
Remove (7), Pick (2) = 4,8 = 2
Remove (2), Pick (4) = 6, = 1
Remove (4), Pick (6) = 8, = 1
= 10

Remove (3), Pick (7) as a fixed point
Pick (5) = 2,6 = 2
Remove (5), Pick (2) = 4,8 = 2
Remove (2), Pick (4) = 6, = 1
Remove (4), Pick (6) = 8, = 1
= 6

Note no scalene triangles remain


Total of triangles = 76
Total of scalene triangles = 40
 

Mongoose528

Member
Joined
Jun 30, 2016
Messages
72
Location
WA
Gender
Male
HSC
2019
Thought this was a good question:

A regular octahedron has eight triangular faces and all sides the same length. A portion of a regular octahedron of volume 120 cm^3 consists of that part of it which is closer to the top vertex than to any other one. In the diagram, the outside part of this volume is shown shaded, and it extends down to the centre of the octahedron.
What is the volume, in cubic centimetres, of this unusually shaped portion?

29.JPG
 
Last edited:

Mongoose528

Member
Joined
Jun 30, 2016
Messages
72
Location
WA
Gender
Male
HSC
2019
Yep, I saw that

x^2-8x = 1001y^2

x(x-8) = 1001y^2

So for x+y to be at a minimum, we had to have y as low as possible.

So I substituted y values from 1 onwards until I got a result that worked, Y=3, X=99

(99*91 = 1001*3^2)
 

Mongoose528

Member
Joined
Jun 30, 2016
Messages
72
Location
WA
Gender
Male
HSC
2019
NEW Q: Thanom has a roll of paper consisting of a very long sheet of thin paper tightly rolled around a cylindrical tube. Initially, the diameter of the roll is 12 cm and the diameter of the tube is 4 cm. After Thanom uses half of the paper, the diameter of the remaining roll is closest to what value? (Round to nearest 0.5)
 

1729

Active Member
Joined
Jan 8, 2017
Messages
199
Location
Sydney
Gender
Male
HSC
2018
NEW Q: Thanom has a roll of paper consisting of a very long sheet of thin paper tightly rolled around a cylindrical tube. Initially, the diameter of the roll is 12 cm and the diameter of the tube is 4 cm. After Thanom uses half of the paper, the diameter of the remaining roll is closest to what value? (Round to nearest 0.5)
Is the answer 9 cm?

(I did it by finding the area of the annulus which represents the length of the paper, so I halved this area since half the paper was used and then found the new diameter which gives such area)
 
Last edited:

Mongoose528

Member
Joined
Jun 30, 2016
Messages
72
Location
WA
Gender
Male
HSC
2019
Is the answer 9 cm?

(I did it by finding the area of the annulus which represents the length of the paper, so I halved this area since half the paper was used and then found the new diameter which gives such area)
Yeah this is right. Could you see what part of my working out is wrong please:

Area of roll = pi*r^2 = 36pi (diameter = 12)

Area of tube = pi*r^2 = 4pi (diameter = 4)

Area of annulus = 32pi

After half has been used: 16pi

Which gives us a radius of 4cm and a diameter of 8cm.

This is incorrect though but could someone please tell me why.
 

jathu123

Active Member
Joined
Apr 21, 2015
Messages
357
Location
Sydney
Gender
Male
HSC
2017
Yeah this is right. Could you see what part of my working out is wrong please:

Area of roll = pi*r^2 = 36pi (diameter = 12)

Area of tube = pi*r^2 = 4pi (diameter = 4)

Area of annulus = 32pi

After half has been used: 16pi

Which gives us a radius of 4cm and a diameter of 8cm.

This is incorrect though but could someone please tell me why.

http://imgur.com/a/uDxq1

you found the diameter of a circle with area 16pi, not the diameter of the tube
 

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

Top