Rational and Complex Roots in Polynomials

Describing the process of polynomial division

Explaining the occurrence of roots in pairs

Understanding the relationship between roots and coefficients

Identifying the degree of polynomials

Coefficients are irrational numbers

Coefficients are complex numbers

All coefficients are whole numbers

Coefficients are ratios or fractions, including integers

Rational coefficients ensure all roots are rational

Rational coefficients allow for irrational roots in conjugate pairs

Rational coefficients prevent complex roots

Rational coefficients ensure all roots are complex

There is no other root

There is a root of the form a - b

There is a root of the form a + b

There is a root of the form a - √b

The polynomial has no other roots

The polynomial has a rational root

The polynomial has a complex root

The polynomial has another irrational root in conjugate form

a + √b

a - b

a - √b

a + b

Pairs of roots that are identical

Pairs of roots that are opposites

Pairs of roots that differ only by the sign of the square root or imaginary part

Pairs of roots that are both rational

Imaginary numbers are always irrational

Imaginary numbers occur in conjugate pairs in polynomials with real coefficients

Imaginary numbers are always rational

Imaginary numbers are not related to the theorem

They are always irrational

They are always rational

They occur in conjugate pairs

They always occur as single roots

a - bi

a + b

a - b

a + bi