How do I prove that functions increase? (1 Viewer)

jks22

Member
Joined
Jan 18, 2022
Messages
66
Gender
Male
HSC
2022
f(x) = -3/x, so f'(x) = 3/x^2 but how do I prove that it increases within its domain?
 

Lith_30

o_o
Joined
Jun 27, 2021
Messages
158
Location
somewhere
Gender
Male
HSC
2022
Uni Grad
2025
Since the derivative is for all real x, since square numbers are positive and .

Therefore for all values of x within the domain of would be increasing.
 

jks22

Member
Joined
Jan 18, 2022
Messages
66
Gender
Male
HSC
2022
Since the derivative is for all real x, since square numbers are positive and .

Therefore for all values of x within the domain of would be increasing.
Thanks appreciate it! So if I prove it's always positive, can I say that a function is always increasing?
 

5uckerberg

Well-Known Member
Joined
Oct 15, 2021
Messages
562
Gender
Male
HSC
2018
Thanks appreciate it! So if I prove it's always positive, can I say that a function is always increasing?
Yes because once you have found the minimum turning point the function will only increase from the minimum turning point. If there is something lower than the minimum turning point you need to go back and check your calculations because there might be something lower.
 

Lith_30

o_o
Joined
Jun 27, 2021
Messages
158
Location
somewhere
Gender
Male
HSC
2022
Uni Grad
2025
Yes because once you have found the minimum turning point the function will only increase from the minimum turning point. If there is something lower than the minimum turning point you need to go back and check your calculations because there might be something lower.
But for this specific question there is no minimum turning point, cause .
 

5uckerberg

Well-Known Member
Joined
Oct 15, 2021
Messages
562
Gender
Male
HSC
2018
Well, since then the function is always increasing. Since you are doing Mathematics Advanced this concept will be a very useful one in the topic that many HSC candidates struggle with Cumulative Density Function found in the last chapter. Keep this question in your back pocket it may come in handy.
 

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

Top