Polynomial Help! (1 Viewer)

cyndix3 · Jan 27, 2011

Hi, having troubles solving this:

If the polynomial x³ + 3px² + 3qx + r = 0.
Show that the double roots must be (pq - r)/(2q - p²)

Thanx heaps in advance!

ohexploitable · Jan 27, 2011

Bored Of Fail 2 · Jan 27, 2011

ohexploitable said:
$\\P(x)=x^3+3px^2+3qx+r=0..........(1)\\P'(x)=3x^2+6px+3q=0..........(2)\\\\\text{from (2),}\\x^2=-2px-q..........(3)\\\\\text{subs. (3) into (1),}\\x(-2px-q)+3p(-2px-q)+3qx+r=0\\-2px^2-qx-6p^2x-3pq+3qx+r=0\\-2px^2-6p^2x+2qx-3pq+r=0..........(4)\\\\\text{subs. (3) into (4):}\\-2p(-2px-q)-6p^2x+2qx-3pq+r=0\\4p^2x+2pq-6p^2x+2qx-3pq+r=0\\-2p^2x+2qx-pq+r=0\\x(2q-2p^2)=pq-r\\x=\frac{pq-r}{2q-2p^2}\\\\\text{My answer is slightly different so I probably made a silly mistake somewhere, I can't be fucked to fix it though.}$

your working looks correct, cant find any algebra mistakes

jyu · Jan 27, 2011

your working ok, (pq - r)/(2(q - p²))

khfreakau · Jan 27, 2011

Algebra might get a little ugly, but what I'd do is sub (pq-r)/(2q-p^2) as x in each equation, and show that =0. By doing that, you're "showing" that it's a root of P(x) and P'(x). To be safe, I'd also sub it into P''(x) and show that it's not a root of that to show that it's definitely a double root. A more surefire method, imo.

cutemouse · Jan 27, 2011

khfreakau said:
Algebra might get a little ugly, but what I'd do is sub (pq-r)/(2q-p^2) as x in each equation, and show that =0. By doing that, you're "showing" that it's a root of P(x) and P'(x). To be safe, I'd also sub it into P''(x) and show that it's not a root of that to show that it's definitely a double root. A more surefire method, imo.

+1

ttrinix · Jan 27, 2011

khfreakau said:
Algebra might get a little ugly, but what I'd do is sub (pq-r)/(2q-p^2) as x in each equation, and show that =0. By doing that, you're "showing" that it's a root of P(x) and P'(x). To be safe, I'd also sub it into P''(x) and show that it's not a root of that to show that it's definitely a double root. A more surefire method, imo.

+1
Algebra bashing is only required if you need to "Find an expression for the double root"

ohexploitable · Jan 27, 2011

khfreakau said:
Algebra might get a little ugly, but what I'd do is sub (pq-r)/(2q-p^2) as x in each equation, and show that =0. By doing that, you're "showing" that it's a root of P(x) and P'(x). To be safe, I'd also sub it into P''(x) and show that it's not a root of that to show that it's definitely a double root. A more surefire method, imo.

jm01 said:
+1

ttrinix said:
+1
Algebra bashing is only required if you need to "Find an expression for the double root"

lol, have fun guys.

deterministic · Jan 28, 2011

Polynomial Help! (1 Viewer)

cyndix3

New Member

ohexploitable

hey

Bored Of Fail 2

Banned

jyu

Member

khfreakau

Member

cutemouse

Account Closed

ttrinix

Member

ohexploitable

hey

deterministic

Member

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