gaimfoundational.wordpress.com
11 – Trigonometric Functions | GAIM Foundational
https://gaimfoundational.wordpress.com/2011/12/07/11
It's GAIM time! Laquo; 10 – Trigonometric Functions. 12 – Trigonometric functions – graphing and solving equations. 11 – Trigonometric Functions. 111 Redefine trigonometric ratios using unit circle. Sine graph from the unit circle. 836) – this uses radians. The circular functions sine and cosine. 026) – this uses radians. 112 Trigonometric ratios for angles of any magnitude. All Stations To Central. 958) – 30 – 60 – 90, 45 – 45 – 90. 956) by the way the plural of radius is radii. Here is one (6.12).
gaimfoundational.wordpress.com
1 – Algebraic Expressions | GAIM Foundational
https://gaimfoundational.wordpress.com/2011/12/06/1
It's GAIM time! Laquo; 0 – Inequalities, Sets and Set Notation. 2 – Further Expressions. 1 – Algebraic Expressions. 11 Collection of like terms. 12 Expanding grouping symbols. Distributive law part 1. Distributive law part 2. Simplifying expressions with grouping symbols. 14 Square of a binomial. 15 Sum times difference. Difference of two squares. Multiplying and dividing starting with the basics. An example of dividing fractions. Absolute values and the number line. Raising to a power. From your own site.
gaimfoundational.wordpress.com
12 – Trigonometric functions – graphing and solving equations | GAIM Foundational
https://gaimfoundational.wordpress.com/2011/12/10/12
It's GAIM time! Laquo; 11 – Trigonometric Functions. 13 – Introduction to Differentiation. 12 – Trigonometric functions – graphing and solving equations. 121 Graphs of trig functions. Midline, amplitude, period. Phase/horizontal shift example 1. Phase/horizontal shift example 2. 122 Modelling using trig functions. 123 Equations involving trig ratios. Solving trigonometric equations worksheet with answers. Solving trig equations (basics). Solving trig equations (more complicated). You can leave a response.
gaim2.wordpress.com
A1 – Differential Equations 1 | GAIM 2
https://gaim2.wordpress.com/2011/12/08/al1
It's GAIM time! Laquo; C6 – Multivariable Calculus 6. A2 – Differential Equations 2. A1 – Differential Equations 1. Checking a solution 1. Checking a solution 2. Direction fields recall y’ is the gradient. Three videos and some exercises by Khan. Drawing a direction field and then following a solution curve. University of Newcastle Australia. This entry was posted on 08/12/2011, 6:50 am and is filed under Differential Equations. You can follow any responses to this entry through RSS 2.0.
gaimfoundational.wordpress.com
2 – Further Expressions | GAIM Foundational
https://gaimfoundational.wordpress.com/2011/12/06/2
It's GAIM time! Laquo; 1 – Algebraic Expressions. 3 – Equations. 2 – Further Expressions. I) common factors and grouping. Ii) difference of two squares. Difference of two squares. Quadratics with a leading 1. Quadratics with a common factor. Quadratics without a leading 1. Quadratics without a leading 1. Quadratics without a leading 1. 915) guess and check method. 22 Numerical and non-numerical substitutions into expressions. 23 Surds (believe it or not, these are called radicals in the US).
gaimfoundational.wordpress.com
17 – Some uses of differentiation | GAIM Foundational
https://gaimfoundational.wordpress.com/2011/12/10/17
It's GAIM time! Laquo; 16 – 2nd derivative test and inflection points. 18 – The reverse of differentiation. 17 – Some uses of differentiation. Curve sketching using calculus. 2031) – Khan. Summary of curve sketching part 1. 1000) – PatrickJMT. 805) – PatrickJMT. 172 Maximum and minimum problems (optimisation). University of Newcastle Australia. This entry was posted on 10/12/2011, 3:01 pm and is filed under Section 3 - Differentiation. You can follow any responses to this entry through RSS 2.0.
gaimfoundational.wordpress.com
16 – 2nd derivative test and inflection points | GAIM Foundational
https://gaimfoundational.wordpress.com/2011/12/10/16
It's GAIM time! Laquo; 15 – Stationary points. 17 – Some uses of differentiation. 16 – 2nd derivative test and inflection points. 161 Use of second derivative test. 853) please ignore his use of the word. And replace with it with. Using the second derivative test to determine nature of relative extrema (maximum/minimum). 8211; (8.41). 162 Points of inflexion/inflection. University of Newcastle Australia. This entry was posted on 10/12/2011, 2:49 pm and is filed under Section 3 - Differentiation.
gaimfoundational.wordpress.com
10 – Trigonometric Functions | GAIM Foundational
https://gaimfoundational.wordpress.com/2011/12/07/10
It's GAIM time! Laquo; 9 – Relations and functions finale. 11 – Trigonometric Functions. 10 – Trigonometric Functions. 101 Trigonometric ratios (angles less than 90 degrees) and the use of these ratios. Finding sides and angles in right angled triangles. Finding a side 1. 900) where the unknown is in the numerator. Finding a side 2. 759) where the unknown is in the denominator. Finding an angle given two sides. Angle of elevation and depression. Sin(x) = cos(90-x) (To be created? 103 Cosine and sine rules.
gaim2.wordpress.com
A3 – Differential Equations 3 | GAIM 2
https://gaim2.wordpress.com/2011/12/08/al3
It's GAIM time! Laquo; A2 – Differential Equations 2. A4 – Differential Equations 4. A3 – Differential Equations 3. 1209) – If you need more on this way of doing things try the two videos previous to this one on the Khan Academy. Integrating factor for linear DEs – multiplying a DE by an integrating factor makes the DE exact. Logistic equation and the analytic equation. Population growth using the logistic equation 1. Population growth using the logistic equation 2. University of Newcastle Australia.
gaim2310.wordpress.com
MVC Lectures 3 and 4 | GAIM 2310
https://gaim2310.wordpress.com/2015/07/30/mvc-2
It's GAIM time! Laquo; MVC Lectures 1 and 2. MVC Lectures 5 and 6. MVC Lectures 3 and 4. Basic 2D graphing using a table of values. More examples of eliminating the parameter. Basic 3D graphing using a table of values. Tangent line to a parametric curve. Properties of differentiation on vector valued functions. More examples of parametrising surfaces. Tangent and normal vectors of parametric surfaces. University of Newcastle Australia. You can follow any responses to this entry through RSS 2.0.