MedVision ad

inv functions question from 2004 3U HSC paper (1 Viewer)

gamja

Active Member
Joined
Dec 14, 2022
Messages
117
Gender
Undisclosed
HSC
2023
Q5b of the above hsc paper:
- The graphs of y=f(x) [1672655424016.png for x>=0] and y=invf(x) [which I calculated to be 1672655519062.png]meet at exactly one point P. Let α be the x-coordinate of P. Explain why α is a root of the equation

x^3 +x -1 = 0.

I let both function formulae equal each other and squared them and eventually came out with a long 5-th degree polynomial. Any ideas? (much appreciated :)
 

Nedom

Member
Joined
Oct 2, 2022
Messages
60
Gender
Male
HSC
2022
Don't equations and their inverse intercept at y=x. (I don't even know if that's relevant, just something to consider). Then you could just find the root of the equation. Then equate, huzzah.
 

Nedom

Member
Joined
Oct 2, 2022
Messages
60
Gender
Male
HSC
2022
Wait lmao, it's so ez. I am so stupid. If you equate the f(x) and y =x, you rearrange you get the equation, and that gives the answer. LMAO, too rusty at maths.
(So same thing as I said before, but you don't need to solve for the root of the equation, it's unneccessary)
(Didn't actually try it so my first response is half-assed, don't worry about that one)
 

gamja

Active Member
Joined
Dec 14, 2022
Messages
117
Gender
Undisclosed
HSC
2023
Wait lmao, it's so ez. I am so stupid. If you equate the f(x) and y =x, you rearrange you get the equation, and that gives the answer. LMAO, too rusty at maths.
(So same thing as I said before, but you don't need to solve for the root of the equation, it's unneccessary)
(Didn't actually try it so my first response is half-assed, don't worry about that one)
very true [highkey embarrassing that i forgot the y=x rule omg] thank you
 

Average Boreduser

Rising Renewal
Joined
Jun 28, 2022
Messages
3,159
Location
Somewhere
Gender
Female
HSC
2026
Q5b of the above hsc paper:
- The graphs of y=f(x) [View attachment 37328 for x>=0] and y=invf(x) [which I calculated to be View attachment 37329]meet at exactly one point P. Let α be the x-coordinate of P. Explain why α is a root of the equation

x^3 +x -1 = 0.

I let both function formulae equal each other and squared them and eventually came out with a long 5-th degree polynomial. Any ideas? (much appreciated :)
Bro why u doing 2004 3u questions lmfao that literally 2 decades old
 

gamja

Active Member
Joined
Dec 14, 2022
Messages
117
Gender
Undisclosed
HSC
2023
Bro why u doing 2004 3u questions lmfao that literally 2 decades old
just going thru 3u revision across entire syllabus starting from FWWF lol probably the last opportunity i have to do that as well
 

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,391
Gender
Male
HSC
2006
Bro why u doing 2004 3u questions lmfao that literally 2 decades old
FYI the 2022 Maths Ext2 HSC had a question that was almost identical to one in the 2005 Maths Ext2 HSC. Just sayin…
 

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

Top