21091686
Beschreibung
Mindmap von lizabeth rawson, aktualisiert more than 1 year ago
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Erstellt von lizabeth rawson
vor fast 6 Jahre
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harder graphs
- circle graphs with a centre of 0,0, the equation
for the circle and radius is x² + y² = r²
- k*x graphs, also seen as y = k*x, or y = k*-x (k being a positive number), are exponential graphs,
always above the x axis, and go through the point (0,1). if k>1 and the power is positive, the graph
curves upwards, if k is between 0 and 1, or the power is negative, the te graph curves backwards
- recriprocal graphs are y = A/x or xy = A. they
are the same basic shape as exponential,
but the negative ones are in opposite
quadrants. the two halves never touch, and
they don't exist for x=0. they're all
symmetrical about the lines y = x and y = -x
- there are sine waves and cos 'buckets'. the underlying shape is the
same, they both bounce between 1 and -1. the difference is that the sin
graph is shifter right by 90, compared to the cos graph. from 0 to 360,
you get one full period of the wave ( one peak and one trough), the
graphs repeat every 360. the equations for the are y = sin x and y = cos x.
- y = tan x is very different. it repeats every 180, and
it goes from - infinity to + infinity every time. tan x
is undefined at +/- 90, and +/- 270
Medienanhänge
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