4. Graphs and Transformations Flashcards
Order of an equation
The highest power of x
Shape of a positive cubic
Starts low, goes up, down again and all the way up
Shape of a negative cubic
Starts high, goes down, back up and then all the way down
Roots when axis is touched/crossed
When an axis is crossed, there is one root there, 2+ when it only touches at a point
How to sketch a cubic
Shape (+/- x^3)
Roots (Factorise)
y-intercept (Substitute x = 0)
When there are 3 equal roots in a cubic
The curve meets the x-axis once at the point of inflection, carries along the x-axis before rising/falling
If some of the roots are imaginary
Draw the same graph shape even if you don’t know where the curve is just only touching the x-axis at the real roots
To go from roots to equation
Multiply each (x - root) together If the y-intercepts aren't equal, multiply all by a factor so you have the correct y-intercept
Positive/negative quartic shape
Positive is like a w, negative like an m
Can have other shapes due to touching at repeated roots
How to sketch a quartic?
Shape (+/- x^4)
Roots (Factorise)
y-intercept (Substitute x = 0)
If there are two equal roots
The graph emerges on the same side of the axis as it arrived from
What to add on reciprocal graphs?
Dotted lines on the axes as they are asymptotes (lines the graph approaches but never touches)
Positive reciprocal
Curve on top-right and bottom left of graph
Negative reciprocal
Curves on top left and bottom right of graph
How to draw a reciprocal graph?
Use sign of a to locate curves and size to gauge steepness
Sketch the graph
Label points at x=1 and y=1 as guides
Draw dotted lines for asymptotes
