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Topic 1.14Math AA HL24 flashcards

De Moivre & roots (HL only)

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Card 1 of 241.14.1
1.14.1
Question

If a real-coefficient polynomial has root a + bi, what else is a root?

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All Flashcards in Topic 1.14

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1.14.18 cards

Card 1concept
Question

If a real-coefficient polynomial has root a + bi, what else is a root?

Answer

Its conjugate a − bi — complex roots come in conjugate pairs.

Card 2formula
Question

What real quadratic has roots a ± bi?

Answer

z² − 2az + (a² + b²) (middle term −sum, constant = product).

Card 3concept
Question

How do you finish a polynomial given one complex root?

Answer

Write the conjugate, form their real quadratic, divide it out, then solve what's left.

Card 4concept
Question

Why does the conjugate-pair rule need real coefficients?

Answer

The proof relies on conjugating the whole equation; with real coefficients the equation is unchanged, forcing the conjugate to be a root.

Card 5concept
Question

Another root if 2 + i is a root (real coefficients)?

Answer

2 − i.

Card 6concept
Question

Real quadratic with roots 1 ± 2i?

Answer

z² − 2z + 5 (sum 2, product 5).

Card 7concept
Question

Can a real cubic have exactly two real roots and one complex root?

Answer

No — complex roots come in pairs, so a cubic has either 3 real roots or 1 real + a conjugate pair.

Card 8concept
Question

Roots of z³ − 3z² + 7z − 5 given 1 + 2i is one?

Answer

1 + 2i, 1 − 2i, 1.

1.14.28 cards

Card 9formula
Question

State De Moivre's theorem.

Answer

(r cisθ)ⁿ = rⁿ cis(nθ) — power the modulus, multiply the argument by n.

Card 10concept
Question

How do you raise a complex number to a power?

Answer

Convert to polar form, apply De Moivre (rⁿ, nθ), then convert back if needed.

Card 11concept
Question

Why convert to polar before powering?

Answer

De Moivre only applies to polar/exponential form; powering a + bi directly means a messy binomial expansion.

Card 12concept
Question

(1 + i)⁸ = ?

Answer

(√2 cis(π/4))⁸ = (√2)⁸ cis(2π) = 16.

Card 13concept
Question

(√3 + i)⁶ = ?

Answer

(2 cis(π/6))⁶ = 2⁶ cis(π) = −64.

Card 14formula
Question

De Moivre in exponential form?

Answer

(r e^(iθ))ⁿ = rⁿ e^(inθ) — same idea via index laws.

Card 15concept
Question

Common De Moivre mistake?

Answer

Multiplying r by n instead of powering it (it's rⁿ), or forgetting to multiply the angle by n.

Card 16concept
Question

(1 − i)⁴ = ?

Answer

(√2 cis(−π/4))⁴ = 4 cis(−π) = −4.

1.14.38 cards

Card 17concept
Question

How many nth-roots does a non-zero complex number have?

Answer

Exactly n distinct nth-roots.

Card 18concept
Question

Where do the nth-roots sit on an Argand diagram?

Answer

On a circle of radius R^(1/n), equally spaced 2π/n apart (a regular n-gon).

Card 19formula
Question

Formula for the nth-roots of R cisφ?

Answer

z_k = R^(1/n) cis((φ + 2πk)/n) for k = 0, 1, …, n − 1.

Card 20concept
Question

How do you get all the roots once you have one?

Answer

Keep adding 2π/n to the argument until you have n of them.

Card 21concept
Question

The three cube roots of 1?

Answer

1, cis(2π/3) = −½ + (√3/2)i, cis(4π/3) = −½ − (√3/2)i.

Card 22concept
Question

Cube roots of 8?

Answer

2, −1 + √3 i, −1 − √3 i (modulus 2, spaced 120°).

Card 23concept
Question

What modulus do all the nth-roots share?

Answer

R^(1/n), where R is the modulus of the original number.

Card 24concept
Question

Why do the roots form a regular polygon?

Answer

They share the same modulus (so lie on a circle) and are equally spaced 2π/n apart.

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IB Math AA HL Topic 1.14 Flashcards | De Moivre & roots (HL only) | Aimnova | Aimnova