twansadrown
New Member
- Joined
- May 25, 2004
- Messages
- 2
- Gender
- Undisclosed
- HSC
- N/A
Hi guys, if any of you guys who have done math1131 can help that would be great. Long story short i finished hsc 7 years ago with top marks for 2u and 3u maths. finished a 6 year degree and realised wasn't for me.
Thus it comes to me enrolling at unsw for engineering and one of my subs is math1131. I havnt touched maths in 7 years and was wondering what subjects in 3u and 4u i should revise and learn in the next 2 weeks before the semester starts.
I am going to list the topics via the hsc syllabus. I would be a great help if you could copy and past which ones i should or should not revise/learn to prepare myself for maths1131.
I got these topics from excel books. If any of you guys think i shouldnt revise and just wait for uni also let me know. i had my fair share of past university work so i know how much work is expected to be put in for a pass upto a HD. my aim is to hit the distinctions with my subjects so i will be putting alot of work into studying this subject aswell as my others. Thanks for the help again if you can
3unit
1. Real number system
1.1. SURDS
1.2. Absolute Values and Inequalities
2. Plane Geometry: Circles
3.Trigonometry
4.Trigonometric equations
5.Mathematical induction
6.Differentiation and integration
7.Integration- substitution method
8.Coordinate Geometry
9.Polynomials
10.Inverse Functions
11. Applications of calculus to the physical world
12. The binomial theorem
13. Permutations, combinations and binomials probabilities
4Unit
1. Curve sketching
2. Integration
2.1.Integration by substitution
2.2 .Integration by Parts
2.3 Trigonometric Integral
2.4 using t=tan(x/2)
2.5 Reduction formulas
2.6 Trigonometric Substitution
2.7 Rational Functions
2.8 Partial fractions
2.9 completing the square
2.10. Integration by special properties
3. Volumes
3.1 Volumes of revolution
3.2 Method of slicing
3.3 Shell Method
4. Complex numbers
4.1 Algebra of complex numbers
4.2 argand diagram
4.3 Powers of complex numbers: De Moivre's Theorem
4.4 Roots of complex numbers: square roots
4.5 Properties of complex numbers
4.6 The complex roots of unity
4.7 Factorisation of complex numbers
4.8 Geometric Representation of complex numbers
4.9. Locus problems
5. Polynomials
5.1 Factor theorem
5.2 Theory of equation
6. Conic sections
6.1 parabola
6.2 circles
6.3 the ellipse
6.4 the hyperbola
6.5 rectangular hyperbola
7. Resisted motion
8. Circular motion
Thus it comes to me enrolling at unsw for engineering and one of my subs is math1131. I havnt touched maths in 7 years and was wondering what subjects in 3u and 4u i should revise and learn in the next 2 weeks before the semester starts.
I am going to list the topics via the hsc syllabus. I would be a great help if you could copy and past which ones i should or should not revise/learn to prepare myself for maths1131.
I got these topics from excel books. If any of you guys think i shouldnt revise and just wait for uni also let me know. i had my fair share of past university work so i know how much work is expected to be put in for a pass upto a HD. my aim is to hit the distinctions with my subjects so i will be putting alot of work into studying this subject aswell as my others. Thanks for the help again if you can
3unit
1. Real number system
1.1. SURDS
1.2. Absolute Values and Inequalities
2. Plane Geometry: Circles
3.Trigonometry
4.Trigonometric equations
5.Mathematical induction
6.Differentiation and integration
7.Integration- substitution method
8.Coordinate Geometry
9.Polynomials
10.Inverse Functions
11. Applications of calculus to the physical world
12. The binomial theorem
13. Permutations, combinations and binomials probabilities
4Unit
1. Curve sketching
2. Integration
2.1.Integration by substitution
2.2 .Integration by Parts
2.3 Trigonometric Integral
2.4 using t=tan(x/2)
2.5 Reduction formulas
2.6 Trigonometric Substitution
2.7 Rational Functions
2.8 Partial fractions
2.9 completing the square
2.10. Integration by special properties
3. Volumes
3.1 Volumes of revolution
3.2 Method of slicing
3.3 Shell Method
4. Complex numbers
4.1 Algebra of complex numbers
4.2 argand diagram
4.3 Powers of complex numbers: De Moivre's Theorem
4.4 Roots of complex numbers: square roots
4.5 Properties of complex numbers
4.6 The complex roots of unity
4.7 Factorisation of complex numbers
4.8 Geometric Representation of complex numbers
4.9. Locus problems
5. Polynomials
5.1 Factor theorem
5.2 Theory of equation
6. Conic sections
6.1 parabola
6.2 circles
6.3 the ellipse
6.4 the hyperbola
6.5 rectangular hyperbola
7. Resisted motion
8. Circular motion
