Roots of Polynomials Flashcards
Symbols used for roots
α - alpha
β - beta
γ - gamma
δ - delta
Rules for quadratic roots
ax^2 + bx + c = 0
Sum of roots = -(b/a)
Sum of all possible products of pairs of roots = (c/a)
Sum of all possible products of triples of roots N/A
Rules for cubic roots
ax^3 + bx^2 + cx + d = 0
Sum of roots = -(b/a)
Sum of all possible products of pairs of roots = (c/a)
Sum of all possible products of triples of roots = -(d/a)
Rules for quartic roots
ax^4 + bx^3 + cx^2 + dx + e = 0
Sum of roots = -(b/a)
Sum of all possible products of pairs of roots = (c/a)
Sum of all possible products of triples of roots = -(d/a)
Sum of all possible products of quadruples of roots = (e/a)
1 1
– + –
α β
For a quadratic
Multiply the two to have a common denominator and add Will end up with: .α + β .-------- αβ
α^2 + β^2
For a quadratic
(α+β)^2 - 2αβ
The expansion of (α+β)^2 is α^2 + 2αβ + β^2
Expand and simplify the same way for any others
When you know α and β but not a,b and c in a quadratic
- Do α + β for -(b/a) and αβ for (c/a)
- Choose a value of a and find b and c for that a to find the ratio a:b:c (Use a = 1)
- Write as ax^2 + bx + c = 0
- Multiply a, b and c by the highest denominator to get integers and that equals zero
1 1 1
– + – + –
α β γ
αβγ
1 1 1 1
– + – + – + –
α β γ 𝛿
αβγ𝛿
How to go from polynomial with roots αβγ𝛿 to the new quadratic formed when the new roots are those changed in the same way
Let x = the symbols w = the change to each root with x Rearrange to find x Substitute in place of x in the given polynomial Leave in terms of w
α^3 + β^3 + γ^3
(α + β + γ)^3 - 3(α + β + γ)(αβ + αγ + βγ) + 3(αβγ)
