Functions and Graphs Flashcards
N
natural numbers {1,2,3,4,5…}
W
whole numbers {0,1,2,3,4…}
Z
integers {…-2,-1,0,1,2…}
Q
rational numbers eg -4, 1/3, 0.25, -1/3
R
real numbers (all points on the number line) eg -6, -1/2, root2, 1/12
set
a collection of objects (usually numbers)
elements
members of a set
subset
a set within a set
{}
empty set
:
such that
function definition
relates a set of inputs to a set of outputs, with each input related to exactly one output.
domain
set of inputs
range
set of outputs
restrictions on the domain
- denominator cannot equal zero
2. root has to greater than or equal to zero (not negative)
composite function
two functions ‘composed’ to form a new ‘composite function’
inverse function
reverses the effect of the original function (opposite)
inverse function steps
- replace f(x) with y
- swap x and y
- rearrange to y=
- use notation
y=a^x
passes through (0,1) and (1,a)
amplitude
half the vertical distance between crest and trough
frequency
how many in 360 degrees
y=asinbx+c
a=amplitude
b=frequency
c=shift up and down y-axis
d= shift along x-axis
steps for naming trig graph
- check shape (sine/cosine)
- check amplitude
- check frequency
- check shift
translation
moves every point on a graph a fixed distance in the same direction. the shape of the graph does not change.
y=f(x)+a
moves up or down (up +, down -)
y=f(x+a)
moves left or right (left +, right -)
y=-f(x)
reflected on x axis
y=f(-x)
reflected on y-axis
y=kf(x)
stretch or compress in y (stretch when >1, compress when <1)
y=f(kx)
stretch or compress in x (stretch when <1, compress when >1)
reflection
flips the graph about one of the axes
scaling
stretches or compresses the graph along one of the axes
