MedVision ad

Polynomials Help (Relation of Roots) - Year 11 Maths Ext1 (1 Viewer)

Scrambled

Member
Joined
Sep 16, 2023
Messages
47
Location
Sydney
Gender
Male
HSC
2025
I’ve managed to find the root to the cubic equation, but not entirely sure how to show pr^3 - q^3s = 0 (got a bit lost in the working out). Any help would be appreciated!IMG_3495.jpegIMG_4278.jpeg
 

liamkk112

Well-Known Member
Joined
Mar 26, 2022
Messages
1,051
Gender
Female
HSC
2023
I’ve managed to find the root to the cubic equation, but not entirely sure how to show pr^3 - q^3s = 0 (got a bit lost in the working out). Any help would be appreciated!View attachment 43510View attachment 43508
well consider P(x) = px^3 +qx^2 + rx + s. Then, plug in a: you get p (-s/p) + q (-s/p)^(2/3) + r (-s/p)^(1/3) + s = 0. The s will cancel out, leaving you with
q ((s/p)^2)^(1/3) - r(s/p)^(1/3) = 0 by pulling out the minus sign. Thus q ((s/p)^2)^(1/3) = r (s/p)^(1/3) ;
cubing both sides gives q^3 (s/p)^2 = r^3 (s/p); so
q^3 (s/p) = r^3. from here the result is obvious
 

Scrambled

Member
Joined
Sep 16, 2023
Messages
47
Location
Sydney
Gender
Male
HSC
2025
well consider P(x) = px^3 +qx^2 + rx + s. Then, plug in a: you get p (-s/p) + q (-s/p)^(2/3) + r (-s/p)^(1/3) + s = 0. The s will cancel out, leaving you with
q ((s/p)^2)^(1/3) - r(s/p)^(1/3) = 0 by pulling out the minus sign. Thus q ((s/p)^2)^(1/3) = r (s/p)^(1/3) ;
cubing both sides gives q^3 (s/p)^2 = r^3 (s/p); so
q^3 (s/p) = r^3. from here the result is obvious
ohhhh thank youu!
 

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

Top