ACMMM020
recognise features of the graphs of \(x^2+y^2=r^2\) and \(\left(x-a\right)^2+\left(y-b\right)^2=r^2\), including their circular shapes, their centres and their radii
ACMMM020 | Content Descriptions | Unit 1 | Mathematical Methods | Mathematics | Senior secondary curriculum
ACMSM121
integrate expressions of the form \(\frac{\pm1}{\sqrt[{}]{a^2-x^2}}\) and \(\frac a{a^2+x^2}\)
ACMSM121 | Content Descriptions | Unit 4 | Specialist Mathematics | Mathematics | Senior secondary curriculum
ACMSM063
prove irrationality by contradiction for numbers such as \(\sqrt[{}]2\) and \(\log_25\)
ACMSM063 | Content Descriptions | Unit 2 | Specialist Mathematics | Mathematics | Senior secondary curriculum
ACMMM011
recognise features of the graph of the general quadratic \(y=ax^2+bx+c\)
ACMMM011 | Content Descriptions | Unit 1 | Mathematical Methods | Mathematics | Senior secondary curriculum
ACMSM067
define the imaginary number i as a root of the equation \(x^2=-1\)
ACMSM067 | Content Descriptions | Unit 2 | Specialist Mathematics | Mathematics | Senior secondary curriculum
ACMEM002
apply arithmetic operations according to their correct order
ACMEM002 | Content Descriptions | Unit 1 | Essential Mathematics | Mathematics | Senior secondary curriculum
ACMMM007
recognise features of the graphs of \(y=x^2\), \(y=a{(x-b)}^2+c\), and \(y=a\left(x-b\right)\left(x-c\right)\) including their parabolic nature, turning points, axes of symmetry and intercepts
ACMMM007 | Content Descriptions | Unit 1 | Mathematical Methods | Mathematics | Senior secondary curriculum
ACMSM131
examine slope (direction or gradient) fields of a first order differential equation
ACMSM131 | Content Descriptions | Unit 4 | Specialist Mathematics | Mathematics | Senior secondary curriculum
ACMGM082
apply Euler’s formula, \(v+f-e=2\), to solve problems relating to planar graphs.
ACMGM082 | Content Descriptions | Unit 3 | General Mathematics | Mathematics | Senior secondary curriculum
ACMMM021
recognise features of the graph of \(y^2=x\) including its parabolic shape and its axis of symmetry.
ACMMM021 | Content Descriptions | Unit 1 | Mathematical Methods | Mathematics | Senior secondary curriculum
ACMSM066
prove divisibility results, such as \(3^{2n+4}-2^{2n}\) is divisible by 5 for any positive integer n.
ACMSM066 | Content Descriptions | Unit 2 | Specialist Mathematics | Mathematics | Senior secondary curriculum
ACMSM065
prove results for sums, such as \(1+4+9\dots+n^2=\frac{n(n+1)(2n+1)}6\) for any positive integer n
ACMSM065 | Content Descriptions | Unit 2 | Specialist Mathematics | Mathematics | Senior secondary curriculum
ACEEA125
using teacher editing and conferencing including editing for word order, articles, prepositions and simple tenses.
ACEEA125 | Content Descriptions | Bridging Unit 1 | English as an Additional Language or Dialect | English | Senior secondary curriculum
ACMGM075
use a general first-order linear recurrence relation to generate the terms of a sequence and to display it in both tabular and graphical form
ACMGM075 | Content Descriptions | Unit 3 | General Mathematics | Mathematics | Senior secondary curriculum
ACSCH133
Designing chemical synthesis processes includes identifying reagents and reaction conditions in order to maximise yield and purity of product
ACSCH133 | Content Descriptions | Unit 4 | Chemistry | Science | Senior secondary curriculum
ACMSM036
When a secant (meeting the circle at \(A\) and \(B\)) and a tangent (meeting the circle at \(T\)) are drawn to a circle from an external point \(M\), the square of the length of the tangent equals the product of the lengths to the circle on the secant. …
ACMSM036 | Content Descriptions | Unit 1 | Specialist Mathematics | Mathematics | Senior secondary curriculum
ACMGM076
recognise that a sequence generated by a first-order linear recurrence relation can have a long term increasing, decreasing or steady-state solution
ACMGM076 | Content Descriptions | Unit 3 | General Mathematics | Mathematics | Senior secondary curriculum
ACHMH186
An overview, as background, of the nature of the world order at the end of World War II, colonialism in the Eastern communist bloc and Western capitalist bloc, and the emerging role of the United Nations
ACHMH186 | Content Descriptions | Unit 4: The Modern World since 1945 | Modern History | Humanities and Social Sciences | Senior secondary curriculum
ACHMH191
The changing nature of world order in the period 1989-2010, for example the peaceful reunification of Germany, the US as superpower, the exercise of military power, and economic influence
ACHMH191 | Content Descriptions | Unit 4: The Modern World since 1945 | Modern History | Humanities and Social Sciences | Senior secondary curriculum
ACMSM055
define and use basic linear transformations: dilations of the form \((\mathrm x,\mathrm y)\longrightarrow({\mathrm\lambda}_1\mathrm x,{\mathrm\lambda}_2\mathrm y)\) , rotations about the origin and reflection in a line which passes through the origin, …
ACMSM055 | Content Descriptions | Unit 2 | Specialist Mathematics | Mathematics | Senior secondary curriculum