• Congratulations to the Class of 2024 on your results!
    Let us know how you went here
    Got a question about your uni preferences? Ask us here

An exponential question (1 Viewer)

Aerlinn

Member
Joined
Aug 29, 2006
Messages
194
Location
Oz
Gender
Female
HSC
2007
This equation: f(x)= (x-2)2^(x-1)
Says to state the equation of the horizontal asymptote.

How do I do I do this without using a calculator?
:wave:
 

ssglain

Member
Joined
Sep 18, 2006
Messages
445
Location
lost in a Calabi-Yau
Gender
Female
HSC
2007
Take limits?
as x -> infinity, f(x) -> infinity
as x -> - infinity, f(x) -> 0 from below
So x=0 is the horiz. asymptote.
 

haque

Member
Joined
Sep 2, 2006
Messages
426
Gender
Male
HSC
2006
y=0 is the horizontal asymptote which is seen from ssglain's reasoning.
 

Aerlinn

Member
Joined
Aug 29, 2006
Messages
194
Location
Oz
Gender
Female
HSC
2007
Ah... ok... can that be done algebraically?
 

haque

Member
Joined
Sep 2, 2006
Messages
426
Gender
Male
HSC
2006
yeah it can be shown algebraically-but in the hsc all we learn is tat exponential functions increase or decrease at a greater rate than linear functions.
However we could use L'Hopital's rule for indeterminate forms, in this case we can write it as -infinity/infinity so let
y=lim(xgoes to -infinity) (x-2)/2^(1-x)=lim(x to -infinity) 1/-ln2*2^(1-x) and as x goes to infinity the bottom expression's absolute value approaches infinity and the fraction is effectively zero. L'Hopital's rule isn't in the hsc thouhg.
 
Last edited:

Aerlinn

Member
Joined
Aug 29, 2006
Messages
194
Location
Oz
Gender
Female
HSC
2007
y=lim(xgoes to -infinity) (x-2)/2^1-x
Isn't that meant to be y=lim(xgoes to -infinity) (x-2)2^(1-x) ?
Multiplication, not division, and if you don't put brackets in it changes the equation... ^^
 

haque

Member
Joined
Sep 2, 2006
Messages
426
Gender
Male
HSC
2006
For L'Hopitals rule we express in the form of -infinity on infinty in this case so i've written (x-2) divided by 2^(1-x ) and then using the rule we differentiate "top and bottom individually". The expression (x-2)2^(1-x )isn't the same as (x-2)2^(x-1). I should have put brackets but forgot to in my haste-but my purpose was to convey the main idea on how it could have been done.
 
Last edited:

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

Top