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general solutions of trig equations general solutions of trig equations xsin general solutions of trig equations xsin 0x general solutions of trig equations…
1. general solutions oftrig equations 2. general solutions oftrig equationssin x 3. general solutions oftrig equationssin xx0 4. general solutions oftrig…
1. the slope (gradient) 2. the slope (gradient) 3. the slope (gradient) y x 4. the slope (gradient) l y x 5. the slope (gradient) l y x 6. the slope (gradient) l y x 7. the…
combinations combinations a combination is a set of objects where the order that they are arranged is not important. combinations a combination is a set of objects where…
the slope (gradient) the slope (gradient) vertical rise(1) horizontal run m the slope (gradient) vertical rise(1) horizontal run m y x the slope (gradient) vertical…
combinations combinations a combination is a set of objects where the order that they are arranged is not important. combinations a combination is a set of objects where…
the slope (gradient) the slope (gradient) vertical rise(1) horizontal run m the slope (gradient) vertical rise(1) horizontal run m y x the slope (gradient) vertical…
1. permutations not all differentcase 3: ordered sets of n objects, 2. permutations not all differentcase 3: ordered sets of n objects,(i.e. some of the objects are the same)…
1. the basic counting principle 2. the basic counting principleif one event can happen in m different ways and after this anotherevent can happen in n different ways, then…
1. point slope formula 2. point slope formula 3. point slope formula e.g. (i) find the equation of the line passing through (–3,4) and (2,–6) 4. point slope formula e.g.…
1. inverse functions 2. inverse functionsif y = f(x) is a function, then for each x in the domain, there is amaximum of one y value. 3. inverse functionsif y = f(x) is a…
1. equation of lines(linear function) 2. equation of lines(linear function) all straight lines can be written in the form; 3. equation of lines(linear function) all straight…
the basic counting principle the basic counting principle if one event can happen in m different ways and after this another event can happen in n different ways, then the…
case 3: ordered sets of n objects, not all different permutations case 3: ordered sets of n objects, not all different (i.e. some of the objects are the same) permutations…
1. inverse functions 2. inverse functionsif y = f(x) is a function, then for each x in the domain, there is amaximum of one y value. 3. inverse functionsif y = f(x) is a…
1. coordinate geometry 2. coordinate geometry distance formula 3. coordinate geometry distance formula( x2 − x1 ) + ( y2 − y1 ) 2 2d= 4. coordinate geometry distance…
1. probability & counting techniques2007 extension 1 hsc q5b)mr and mrs roberts and their four children go to the theatre. they arerandomly allocated six adjacent seats…
1. graphing inverse trig functions 2. graphing inversetrig functions xe.g i y 5 sin1 3 3. graphing inversetrig functionsxe.g i y 5 sin 1 3domain:…
1. probability & counting techniques2007 extension 1 hsc q5b)mr and mrs roberts and their four children go to the theatre. they arerandomly allocated six adjacent seats…
1. graphing inverse trig functions 2. graphing inversetrig functions xe.g i y 5 sin1 3 3. graphing inversetrig functionsxe.g i y 5 sin 1 3domain:…