MedVision ad

Help With Domain and Range (1 Viewer)

nabzilla

Member
Joined
Jul 5, 2009
Messages
41
Location
Sydney
Gender
Female
HSC
2011
Can someone please explain how to find the domain and range of a function with some easy steps and examples?
 

ninetypercent

ninety ninety ninety
Joined
May 23, 2009
Messages
2,148
Location
Sydney
Gender
Female
HSC
2010
find out the values which x and y cannot be equal to and then exclude these values when you make your statement.

e.g. y = 1/x.

x cannot be equal to zero, since x = 0 will be undefined. so therefore, the domain is all real x values but x = 0

y cannot be equal to zero. If y = 0, then 0 = 1/x. 1= 0, which is false. so therefore, the range is all real y values but y = 0
 

addikaye03

The A-Team
Joined
Nov 16, 2006
Messages
1,267
Location
Albury-Wodonga, NSW
Gender
Male
HSC
2008
so i would write my answer as
domain: x>o
and
range: y>0
Well think logically.

x: All real x (x E R) but x=/=0 (check the graph, all values of x have a corresponding y-value except 0)

y: All real y (y E R) but y=/=0

This is because as the graph tends toward infinity, both positively and negatively, it tends towards zero but never reaches it.

x:>0 would mean that it is is in the first or fourth quadrant and y>0 would mean first quadrant.
Hence if we were to restrict the function y=1/x to the first quadrant then that would be the correct domain and range
 

Cazic

Member
Joined
Aug 26, 2009
Messages
166
Gender
Male
HSC
2011
A function sends one set of numbers to another set of numbers. We call these sets of numbers the domain and range respectively.

For example, the function f defined by the relation f(x) = x2 sends some numbers (the x's) to some new numbers (the f(x)'s, or y's if you like). Which x's is this function defined for? That is, what is its domain? Well, I'm pretty sure we can square any real number, so the function is defined for all real numbers, or equivalently, the domain of f is all real numbers (often denoted by blackboard bold R). Where does f send these real numbers then? That is, what is f's range? Well, 02 = 0, 12 = 1, 22 = 4, (-1)2 = 1, (-2)2 = 4, and so on. It looks like f sends all the real numbers to the non-negative real numbers. That is, the range of f is all non-negative real numbers, or {x in R : x greater than or equal to 0}.

You can apply the same ideas to the 1/x example already given.

Good luck.
 

nabzilla

Member
Joined
Jul 5, 2009
Messages
41
Location
Sydney
Gender
Female
HSC
2011
so if i had the question:
y= x^2-4

i would write my domain and range as:
Domain= all real values of x
Range= y is greater than or equal to -4

am i right?
 

Drongoski

Well-Known Member
Joined
Feb 22, 2009
Messages
4,255
Gender
Male
HSC
N/A
so if i had the question:
y= x^2-4

i would write my domain and range as:
Domain= all real values of x
Range= y is greater than or equal to -4

am i right?
Almost.

Domain: all real values

Range: all real values >= -4
 

stevenboh

New Member
Joined
Sep 16, 2009
Messages
13
Gender
Male
HSC
2010
man this is gonna confuse me.
in physics, we say that the range is the x value or how far a projectile is shot horzontilly.

but in maths, the range is the y value and is a vertical measurement.

GRRRRRRRRRRRRRRRRRRRR
 

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top