Advantage Pac Polynomials
Assuming Advantage Pac is plugged in…
Finds all roots, including complex ones.
To save the discovered roots in registers
RT to do the solve SET FLAG 0606R24 upwardsREAL and IMAGINARYR24 = REAL root 1R25 = IMAG root 1R26 = REAL root 2R27 = IMAG root 2To find the roots of a simple quadratic (with 2 real roots)
x2 - 3x + 2 = 0
DEGREE=?2 R/Sa2=?x21 R/Sa1=?x3 CHS R/Sa0=?2 R/SFX RT NEWFX = Function value at your choice of xRT = Root(s) of the entered polynomialNEW = Enter a new polynomialRT BROOT = 2.0000ROOT = 1.0000
The roots of our quadratic are 2 and 1
Either press TAN (J) to get the menu, and then NEW (LN) or XEQ PLY again
4x4 - 8x3 - 13x2 - 10x + 22 = 0
This should have 4 roots, and most likely some will be complex.
DEGREE=?4 R/Sa4=?4 R/Sa3=?8CHSR/Sa2=?13 CHSR/Sa1=?10 CHSR/Sa0=?22R/SFX RT NEWRT BRoots are displayed:
U = -1.0000V = 1.0000U = -1.0000V = -1.0000ROOT = 3.1180ROOT = 0.8820FX RT NEWThe 4 roots are
-1 + j 1 -1 - j 1 3.1180 0.8820
If x is the cube root of minus 8 then x3 = -8 and as a polynomial x3 + 8 = 0
Simply use 0 as the coefficient of X2 and x
Degree=? 3 R/Sa3=? 1 R/Sa2=? 0 R/Sa1=? 0 R/Sa0=? 8 R/SRT BROOT = -2.0000 R/SU = 1.0000 R/S V = 1.7321U = 1.0000 R/S V = -1.7321 2.0000 1 + j 1.7321 1 - j 1.7321 — John Pumford-Green 26/01/26 09:55 GMT