Year 11 Ext Math 1 Question (1 Viewer)

Octogonagal

New Member
Joined
Aug 9, 2022
Messages
1
Gender
Male
HSC
2023
Question is; A polynomial P(x) of degree 4 is known to have zeroes 2 and -2

a) Write an expression for P(x)
b) Given that P(0)=4 and P(1)=-3, find a further expression for P(x)
c) Solve P(x) = 0

No one has any idea how to do it
 
Last edited:

d1zzyohs

Active Member
Joined
Feb 22, 2021
Messages
149
Location
Sydney
Gender
Male
HSC
2022
maybe i'm dumb; but i think there's not enough information.
 
Last edited:

Gtsh

Member
Joined
Jun 22, 2021
Messages
55
Gender
Female
HSC
2023
Could u do P(X)=(x-2)(x+2)(x+a)(x+b)
Sub is P(0) and P(1) to get two simultaneous equations to find the values for a and b
Not sure if it will work though
 

d1zzyohs

Active Member
Joined
Feb 22, 2021
Messages
149
Location
Sydney
Gender
Male
HSC
2022
Could u do P(X)=(x-2)(x+2)(x+a)(x+b)
Sub is P(0) and P(1) to get two simultaneous equations to find the values for a and b
Not sure if it will work though
You would need the extra info that the polynomial is monic - which is why I said we need more info.
If this was given; your method would work :)
 

Deem_Skills

Member
Joined
Jul 13, 2022
Messages
71
Gender
Male
HSC
2024
Question is; A polynomial P(x) of degree 4 is known to have zeroes 2 and -2

a) Write an expression for P(x)
b) Given that P(0)=4 and P(1)=-3, find a further expression for P(x)
c) Solve P(x) = 0

No one has any idea how to do it
a) P(x) = a(x+2)(x-2)(x+b)(x+c)
not sure for b and c cause like d1zzy mentioned there isnt enough info to get a b and c (i think)
 

fx82au

Active Member
Joined
Nov 1, 2021
Messages
173
Gender
Male
HSC
2023
yeah defo missing some information. does it mention if there are any double roots?
 

Unknown_Xp998

New Member
Joined
Nov 28, 2020
Messages
1
Gender
Male
HSC
2022
Given that the polynomial is degree 4, without loss of generality we can assume that it is monic, as the leading coefficient has no bearing on the roots of P(x):

a) P(x) = (x-2)(x+2)(x^2 +bx + c) [Since we know that the polynomial is degree 4]
b) Now P(0) = (0-2)(0+2)(0^2 + b(0) + c) = 4
(-4)(c) = 4
c = -1

And P(1) = (1-2)(1+2)(1^2+b(1) + c) = -3
(-3)(1 + b -1) = -3
b = 1
P(x) = (x-2)(x+2)(x^2 + x -1)

c) P(x) = (x-2)(x+2)(x^2 + x -1) = 0
x = ±2, (-1 ± sqrt5)/2 [from solving x^2 + x -1 = 0 via the quadratic formula]
 

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

Top