1.2 Functions (polynomial) (cloned)

Achievable AMC 8

1. Algebra (cloned)

Our AMC 8 course has been archived and is not available for purchase. Existing subscribers retain access. Please contact support for alternatives.

Functions (polynomial) (cloned)

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Polynomial functions

Are you good enough with polynomial functions to do great on the AMC?

In order to answer “yes,” you should be able to do any of the following when needed, without any hints or prompting:

create Pascal’s triangle from memory
explain how it relates to binomials
explain what a root of a polynomial is
state and explain the Rational Root Theorem
divide polynomials (e.g. using synthetic division)
write and explain de Moivre’s theorem

A bit of background info

There isn’t enough time and space here to explain all of the above topics, but there is enough time and space to at least introduce them, so that’s what I’ll do here.

Definitions

Pascal’s triangle: An arrangement of numbers into a particular two-dimension pattern with a few important properties, including these:

It’s organized into rows
Each row can be calculated easily from the row above it
There are an infinite number of rows
It gives answers to many important mathematical questions, including “what are the coefficients of the expansion of $(x + y)^{n}$ ?”, no matter how big $n$ is

A root of a polynomial: Also known as a “zero,” this is a number that can be plugged in for $x$ in a polynomial expression such that the value of the whole polynomial will then be zero
The Rational Root Theorem: This theorem, which you can look up by name, allows you to look at a polynomial and narrow down your search for possible roots to a very small number of possible options, at least one of which is then guaranteed to work.
Synthetic division: Sometimes also known as synthetic substitution, this is a technique for dividing one polynomial by hand, but without writing any of the unnecessary details of the process along the way, thus speeding up the process by a factor of three or so as compared to regular long division
de Moivre’s theorem: A technique for easily calculating square roots and higher-order roots of complex numbers, by first converting the numbers to geometric representations that follow certain easy-to-work-with rules

A few notes on the above definitions:

For the Rational Root Theorem, Brilliant’s explanation and example are a good place to start

For de Moivre’s Theorem, AoPS’s statement of the theorem is helpful, but not their proof; their discussion of complex numbers, especially the sections on Operations and Alternate Forms, may be necessary to understand the statement.

For synthetic division, start with Purple Math then turn to YouTube here and here.

Example problems

Given that the fourth row of Pascal’s Triangle is $14641$ , write out the expansion of $(x + y)^{4}$ , without doing any multiplying. Finally, briefly explain the connection here.

(spoiler)

The expansion of $(x + y)^{4}$ is $x^{4} + 4 x^{3} y + 6 x^{2} y^{2} + 4 x y^{3} + y^{4}$ .

If you write it as $1 x^{4} + 4 x^{3} y + 6 x^{2} y^{2} + 4 x y^{3} + 1 y^{4}$ (i.e. writing out the “ $1$ ” coefficients in the first and last terms), then you can see that the fourth row of the Triangle gives the coefficients for the terms in the expansion of $(x + y)^{4}$ .

That’s because each row of the triangle is made from the row above it, in more or less the same way that each $(x + y)^{n}$ is made from the $(x + y)^{n - 1}$ “above” it.

What are the six (complex) sixth roots of $1$ ?

(spoiler)

One of them is $1$ , since $1^{6} = 1$ . Another is $- 1$ , since $(- 1)^{6} = 1$ . That’s good, but not good enough, I’m afraid.

For full credit here, you also need to know:

…that all six roots have magnitude $1$
…and that they are spaced evenly around the pole/origin
…and that they are therefore all equal to $1 c i s (k)$ for all $k$ s that are multiples of $60$ degrees or $π /3$ radians
…and that the imaginary ones are therefore $\pm \frac{1}{2} \pm \frac{i 3}{2}$

What to do

If you knew that, then this section should be easy for you. Click “complete” below, and we’ll add all the relevant quizzes to your deck. Then, during your short daily practice, we’ll occasionally quiz you on this knowledge in a way that etch it into your memory for good.
If you weren’t so sure, then you can still click “complete” below, and add it to your quizzes, but I recommend against adding anything else for today. Instead, work with these new cards for today, and consider adding more fresh knowledge tomorrow.

Now continue onto your drills by clicking Quizzes in the menu on your left.

Pascal’s triangle

Organized into rows, each built from the previous
Infinite rows; used for binomial coefficients
Coefficients in $(x + y)^{n}$ expansion given by $n$ th row

Roots of a polynomial

Root (zero): value of $x$ making polynomial equal zero
Roots may be real or complex

Rational Root Theorem

Narrows possible rational roots of a polynomial
Possible roots: $\pm$ (factors of constant term)/(factors of leading coefficient)

Synthetic division

Shortcut for dividing polynomials by linear factors
Faster and simpler than long division

de Moivre’s theorem

Calculates powers and roots of complex numbers
Uses polar (trigonometric) form: $(r cis θ)^{n} = r^{n} cis (n θ)$

Binomial expansion example

Coefficients from Pascal’s triangle
$(x + y)^{4} = x^{4} + 4 x^{3} y + 6 x^{2} y^{2} + 4 x y^{3} + y^{4}$

Complex roots of unity

$n$ th roots of $1$ spaced evenly on unit circle
For $n = 6$ : all roots have magnitude $1$ , angles multiples of $6 0^{\circ}$ or $π /3$ radians

Functions (polynomial) (cloned)

Polynomial functions

Are you good enough with polynomial functions to do great on the AMC?

In order to answer “yes,” you should be able to do any of the following when needed, without any hints or prompting:

create Pascal’s triangle from memory
explain how it relates to binomials
explain what a root of a polynomial is
state and explain the Rational Root Theorem
divide polynomials (e.g. using synthetic division)
write and explain de Moivre’s theorem

A bit of background info

There isn’t enough time and space here to explain all of the above topics, but there is enough time and space to at least introduce them, so that’s what I’ll do here.

Definitions

Pascal’s triangle: An arrangement of numbers into a particular two-dimension pattern with a few important properties, including these:

It’s organized into rows
Each row can be calculated easily from the row above it
There are an infinite number of rows
It gives answers to many important mathematical questions, including “what are the coefficients of the expansion of $(x + y)^{n}$ ?”, no matter how big $n$ is

A root of a polynomial: Also known as a “zero,” this is a number that can be plugged in for $x$ in a polynomial expression such that the value of the whole polynomial will then be zero
The Rational Root Theorem: This theorem, which you can look up by name, allows you to look at a polynomial and narrow down your search for possible roots to a very small number of possible options, at least one of which is then guaranteed to work.
Synthetic division: Sometimes also known as synthetic substitution, this is a technique for dividing one polynomial by hand, but without writing any of the unnecessary details of the process along the way, thus speeding up the process by a factor of three or so as compared to regular long division
de Moivre’s theorem: A technique for easily calculating square roots and higher-order roots of complex numbers, by first converting the numbers to geometric representations that follow certain easy-to-work-with rules

A few notes on the above definitions:

For the Rational Root Theorem, Brilliant’s explanation and example are a good place to start

For synthetic division, start with Purple Math then turn to YouTube here and here.

Example problems

Given that the fourth row of Pascal’s Triangle is $14641$ , write out the expansion of $(x + y)^{4}$ , without doing any multiplying. Finally, briefly explain the connection here.

(spoiler)

The expansion of $(x + y)^{4}$ is $x^{4} + 4 x^{3} y + 6 x^{2} y^{2} + 4 x y^{3} + y^{4}$ .

That’s because each row of the triangle is made from the row above it, in more or less the same way that each $(x + y)^{n}$ is made from the $(x + y)^{n - 1}$ “above” it.

What are the six (complex) sixth roots of $1$ ?

(spoiler)

One of them is $1$ , since $1^{6} = 1$ . Another is $- 1$ , since $(- 1)^{6} = 1$ . That’s good, but not good enough, I’m afraid.

For full credit here, you also need to know:

…that all six roots have magnitude $1$
…and that they are spaced evenly around the pole/origin
…and that they are therefore all equal to $1 c i s (k)$ for all $k$ s that are multiples of $60$ degrees or $π /3$ radians
…and that the imaginary ones are therefore $\pm \frac{1}{2} \pm \frac{i 3}{2}$

What to do

If you knew that, then this section should be easy for you. Click “complete” below, and we’ll add all the relevant quizzes to your deck. Then, during your short daily practice, we’ll occasionally quiz you on this knowledge in a way that etch it into your memory for good.
If you weren’t so sure, then you can still click “complete” below, and add it to your quizzes, but I recommend against adding anything else for today. Instead, work with these new cards for today, and consider adding more fresh knowledge tomorrow.

Now continue onto your drills by clicking Quizzes in the menu on your left.

Achievable AMC 8

1. Algebra (cloned)

Our AMC 8 course has been archived and is not available for purchase. Existing subscribers retain access. Please contact support for alternatives.

Functions (polynomial) (cloned)

5 min read

Font

Discuss

Feedback

Polynomial functions

Are you good enough with polynomial functions to do great on the AMC?

In order to answer “yes,” you should be able to do any of the following when needed, without any hints or prompting:

create Pascal’s triangle from memory
explain how it relates to binomials
explain what a root of a polynomial is
state and explain the Rational Root Theorem
divide polynomials (e.g. using synthetic division)
write and explain de Moivre’s theorem

A bit of background info

There isn’t enough time and space here to explain all of the above topics, but there is enough time and space to at least introduce them, so that’s what I’ll do here.

Definitions

Pascal’s triangle: An arrangement of numbers into a particular two-dimension pattern with a few important properties, including these:

It’s organized into rows
Each row can be calculated easily from the row above it
There are an infinite number of rows
It gives answers to many important mathematical questions, including “what are the coefficients of the expansion of $(x + y)^{n}$ ?”, no matter how big $n$ is

A root of a polynomial: Also known as a “zero,” this is a number that can be plugged in for $x$ in a polynomial expression such that the value of the whole polynomial will then be zero
The Rational Root Theorem: This theorem, which you can look up by name, allows you to look at a polynomial and narrow down your search for possible roots to a very small number of possible options, at least one of which is then guaranteed to work.
Synthetic division: Sometimes also known as synthetic substitution, this is a technique for dividing one polynomial by hand, but without writing any of the unnecessary details of the process along the way, thus speeding up the process by a factor of three or so as compared to regular long division
de Moivre’s theorem: A technique for easily calculating square roots and higher-order roots of complex numbers, by first converting the numbers to geometric representations that follow certain easy-to-work-with rules

A few notes on the above definitions:

For the Rational Root Theorem, Brilliant’s explanation and example are a good place to start

For synthetic division, start with Purple Math then turn to YouTube here and here.

Example problems

Given that the fourth row of Pascal’s Triangle is $14641$ , write out the expansion of $(x + y)^{4}$ , without doing any multiplying. Finally, briefly explain the connection here.

(spoiler)

The expansion of $(x + y)^{4}$ is $x^{4} + 4 x^{3} y + 6 x^{2} y^{2} + 4 x y^{3} + y^{4}$ .

That’s because each row of the triangle is made from the row above it, in more or less the same way that each $(x + y)^{n}$ is made from the $(x + y)^{n - 1}$ “above” it.

What are the six (complex) sixth roots of $1$ ?

(spoiler)

One of them is $1$ , since $1^{6} = 1$ . Another is $- 1$ , since $(- 1)^{6} = 1$ . That’s good, but not good enough, I’m afraid.

For full credit here, you also need to know:

…that all six roots have magnitude $1$
…and that they are spaced evenly around the pole/origin
…and that they are therefore all equal to $1 c i s (k)$ for all $k$ s that are multiples of $60$ degrees or $π /3$ radians
…and that the imaginary ones are therefore $\pm \frac{1}{2} \pm \frac{i 3}{2}$

What to do

If you knew that, then this section should be easy for you. Click “complete” below, and we’ll add all the relevant quizzes to your deck. Then, during your short daily practice, we’ll occasionally quiz you on this knowledge in a way that etch it into your memory for good.
If you weren’t so sure, then you can still click “complete” below, and add it to your quizzes, but I recommend against adding anything else for today. Instead, work with these new cards for today, and consider adding more fresh knowledge tomorrow.

Now continue onto your drills by clicking Quizzes in the menu on your left.

Pascal’s triangle

Organized into rows, each built from the previous
Infinite rows; used for binomial coefficients
Coefficients in $(x + y)^{n}$ expansion given by $n$ th row

Roots of a polynomial

Root (zero): value of $x$ making polynomial equal zero
Roots may be real or complex

Rational Root Theorem

Narrows possible rational roots of a polynomial
Possible roots: $\pm$ (factors of constant term)/(factors of leading coefficient)

Synthetic division

Shortcut for dividing polynomials by linear factors
Faster and simpler than long division

de Moivre’s theorem

Calculates powers and roots of complex numbers
Uses polar (trigonometric) form: $(r cis θ)^{n} = r^{n} cis (n θ)$

Binomial expansion example

Coefficients from Pascal’s triangle
$(x + y)^{4} = x^{4} + 4 x^{3} y + 6 x^{2} y^{2} + 4 x y^{3} + y^{4}$

Complex roots of unity

$n$ th roots of $1$ spaced evenly on unit circle
For $n = 6$ : all roots have magnitude $1$ , angles multiples of $6 0^{\circ}$ or $π /3$ radians

Functions (polynomial) (cloned)

Polynomial functions

Are you good enough with polynomial functions to do great on the AMC?

In order to answer “yes,” you should be able to do any of the following when needed, without any hints or prompting:

create Pascal’s triangle from memory
explain how it relates to binomials
explain what a root of a polynomial is
state and explain the Rational Root Theorem
divide polynomials (e.g. using synthetic division)
write and explain de Moivre’s theorem

A bit of background info

There isn’t enough time and space here to explain all of the above topics, but there is enough time and space to at least introduce them, so that’s what I’ll do here.

Definitions

Pascal’s triangle: An arrangement of numbers into a particular two-dimension pattern with a few important properties, including these:

It’s organized into rows
Each row can be calculated easily from the row above it
There are an infinite number of rows
It gives answers to many important mathematical questions, including “what are the coefficients of the expansion of $(x + y)^{n}$ ?”, no matter how big $n$ is

A root of a polynomial: Also known as a “zero,” this is a number that can be plugged in for $x$ in a polynomial expression such that the value of the whole polynomial will then be zero
The Rational Root Theorem: This theorem, which you can look up by name, allows you to look at a polynomial and narrow down your search for possible roots to a very small number of possible options, at least one of which is then guaranteed to work.
Synthetic division: Sometimes also known as synthetic substitution, this is a technique for dividing one polynomial by hand, but without writing any of the unnecessary details of the process along the way, thus speeding up the process by a factor of three or so as compared to regular long division
de Moivre’s theorem: A technique for easily calculating square roots and higher-order roots of complex numbers, by first converting the numbers to geometric representations that follow certain easy-to-work-with rules

A few notes on the above definitions:

For the Rational Root Theorem, Brilliant’s explanation and example are a good place to start

For synthetic division, start with Purple Math then turn to YouTube here and here.

Example problems

Given that the fourth row of Pascal’s Triangle is $14641$ , write out the expansion of $(x + y)^{4}$ , without doing any multiplying. Finally, briefly explain the connection here.

(spoiler)

The expansion of $(x + y)^{4}$ is $x^{4} + 4 x^{3} y + 6 x^{2} y^{2} + 4 x y^{3} + y^{4}$ .

That’s because each row of the triangle is made from the row above it, in more or less the same way that each $(x + y)^{n}$ is made from the $(x + y)^{n - 1}$ “above” it.

What are the six (complex) sixth roots of $1$ ?

(spoiler)

One of them is $1$ , since $1^{6} = 1$ . Another is $- 1$ , since $(- 1)^{6} = 1$ . That’s good, but not good enough, I’m afraid.

For full credit here, you also need to know:

…that all six roots have magnitude $1$
…and that they are spaced evenly around the pole/origin
…and that they are therefore all equal to $1 c i s (k)$ for all $k$ s that are multiples of $60$ degrees or $π /3$ radians
…and that the imaginary ones are therefore $\pm \frac{1}{2} \pm \frac{i 3}{2}$

What to do

If you knew that, then this section should be easy for you. Click “complete” below, and we’ll add all the relevant quizzes to your deck. Then, during your short daily practice, we’ll occasionally quiz you on this knowledge in a way that etch it into your memory for good.
If you weren’t so sure, then you can still click “complete” below, and add it to your quizzes, but I recommend against adding anything else for today. Instead, work with these new cards for today, and consider adding more fresh knowledge tomorrow.

Now continue onto your drills by clicking Quizzes in the menu on your left.