Find Lowest Order Polynomial Given Solution

All Algebra II Resources

x^5+x^3+x^2+x+1

What is the degree of the polynomial?

Correct answer:

Explanation:

The degree is the highest exponent value of the variables in the polynomial.

Here, the highest exponent is x⁵, so the degree is 5.

Consider the equation $14x^{4} +Ax^{3}+Bx^{2}+Cx+6 = 0$ .

According to the Rational Zeroes Theorem, if A,B,C are all integers, then, regardless of their values, which of the followingcannot be a solution to the equation?

Correct answer:

$x=\frac{10}{3}$

Explanation:

By the Rational Zeroes Theorem, any rational solution must be a factor of the constant, 6, divided by the factor of the leading coefficient, 14.

Four of the answer choices have this characteristic:

$3 = 3 \div 1$

$\frac{1}{2} = 1\div 2$

$\frac{6}{7} = 6 \div 7$

$\frac{3}{14} =3 \div14$

$\frac{10}{3}$ is in lowest terms, and 3 is not a factor of 14. It is therefore the correct answer.

Create a cubic function that has roots at x=2,-3,0 .

Correct answer:

f(x)=x^3+x^2-6x

Explanation:

x=0, x=2, x=-3

This can be written as:

x=0, x-2=0, x+3=0

Multiply the terms together:

f(x)= x(x-2)(x+3)

Multiply the first two terms:

f(x)=(x^2-2x)(x+3),

FOIL:

f(x)= x^3+3x^2-2x^2-6x

Combine like terms:

f(x)=x^3+x^2-6x

Write a function in standard form with zeroes at -1, 2, and i.

Correct answer:

f(x) =x^4-x^3-x^2-x-2

Explanation:

from the zeroes given and the Fundamental Theorem of Algebra we know:

f(x) =(x+1)(x-2)(x+i)(x-i)

use FOIL method to obtain:

f(x)=(x^2-x-2)(x^2-i^2)

f(x)=(x^2-x-2)(x^2+1)

Distribute:

f(x)=(x^4-x^3-2x^2)+(x^2-x-2)

Simplify:

f(x)=x^4-x^3-x^2-x-2

Find a polynomial function P(x) of the lowest order possible such that two of the roots of the function are:

x = 1+3i

x = 1

Correct answer:

P(x)=x^3 -3x^2+12x-10

Explanation:

Find a polynomial function P(x) of the lowest order possible such that two of the roots of the function are:

x = 1+3i

x = 1

Recall that by roots of a polynomial we are referring to values of such that P(x)=0 .

Because one of the roots given is a complex number, we know there must be a second root that is the complex conjugate of the given root. This is x = 1-3i .

Because x = 1 is a root, the unknown function P(x) must have a factor (x-1)

The other roots are complex numbers, so there must be a quadratic factor.

To find the quadratic factor start with the value for one of the complex roots:

x = 1+3i

Isolate the imaginary term onto one side and square,

(x-1)^2=9i^2

Expand the left side, and note on the right side the i^2 factor reduces as follows:

$i^2 = i i =\sqrt{-1}\sqrt{-1}=-1$

So now we have,

x^2 -2x+1 = 9(-1)

x^2 -2x+10 =0

The quadratic factor for P(x) is therefore (x^2-2x+10) . Combining this with the (x-1) factor give a factored expression for the desired function:

P(x)=(x-1)(x^2-2x+10)

Now we carry out the multiplication to write the final form of P(x) ,

P(x)=(x^3 -2x^2 +10x)+(-x^2+2x-10)

P(x)=x^3 -3x^2+12x-10

Which of the following equations represents a quadratic with zeros at x=7 and x=-3 and that passes through point (0,-63) ?

Correct answer:

3x^2-12x-63=0

Explanation:

When you're writing a quadratic having been given its zeros, the best place to start is by setting aside the coefficient and first putting together a simple, factored quadratic that would satisfy those zeros. Here with zeros at 7 and -3, that would be:

(x-7)(x+3)=0

If you then expand that quadratic, you have:

x^2-4x-21=0

Of course, that's just one possible quadratic that satisfies those zeros, and your job is to find THE quadratic that satisfies those zeroes AND passes through (0, -63). And clearly here if you plug in x=0 to the quadratic you would not get y=-63 . So your next step is to determine the coefficient. You can do that by setting the value of the coefficient as:

a(x^2-4x-21)=-63

And then plugging in x=0 since you know that when x=0, y=-63 .

a(0^2-4(0)-21)=-63

So a(-21)=-63

Meaning that a=3 . You can then multiply the original quadratic by 3 to get:

3x^2-12x-63=0

Write a quadratic function with zeroes -2 and 8. Write your answer using the variablex and in standard form with a leading coefficient of 1.

Correct answer:

f(x)=x^2-6x-16

Explanation:

A quadratic function takes the form f(x)=ax^2+bx+c where x is a variable and a, b, and c are coefficients. Equations of this nature can be factored, and then each factor can be set equal to zero and then solved to find the roots of the equation. This problem asks you to take that idea, but work through it in reverse. To solve it, begin with:

x=-2 and x=8

Get everyone on one side of the equation:

x+2 and x-8

These are the factors of the equation. Put them together, and then multiply them to get:

(x+2)(x-8)=x^2-8x+2x-16=x^2-6x-16

Therefore, the solution to this question is

f(x)=x^2-6x-16

Which of the following equations represents a quadratic equations with zeros at x=3 and x=-6 , and that passes through point (2,-24) ?

Correct answer:

3x^2+9x-54=0

Explanation:

When finding the equation of a quadratic from its zeros, the natural first step is to recreate the factored form of a simple quadratic with those zeros. Putting aside the coefficient, a quadratic with zeros at 3 and -6 would factor to:

(x-3)(x+6)=0

So you know that a possible quadratic for these zeros would be:

x^2+3x-18=0

Now you need to determine the coefficient of the quadratic, and that's where the point (2, -24) comes in. That means that if you plug in x=2 , the result of the quadratic will be -24. So you can set up the equation:

a(x^2+3x-18)=-24 , where is the coefficient you're solving for. And you know that this is true when x=2 so if you plug in 2, you can solve for:

a(2^2+3(2)-18)=-24

This means that:

a(4+6-18)=-24

So:

-8a=-24

And therefore a=3 . When you then distribute that coefficient of 3 across the entire quadratic:

3(x^2+3x-18)

So:

3x^2+9x-54=0

Which of the following represents a quadratic equation with its zeros at x=4 and x=5 ?

Correct answer:

x^2-9x+20=0

Explanation:

The important first step of creating a quadratic equation from its zeros is knowing what a zero really is. A zero of a quadratic (or polynomial) is an x-coordinate at which the y-coordinate is equal to 0.

We find that algebraically by factoring quadratics into the form, and then setting equal to and, because in each of those cases and entire parenthetical term would equal 0, and anything times 0 equals 0.

Here the question gives you a head start: we know that the numbers 4 and 5 can go in the and spots, because if so we'll have found our zeros. So we can set up the equation:

This satisfies the requirements of zeros, but now we need to expand this equation using FOIL to turn it into a proper quadratic. That means that our quadratic is:

And when we combine like terms it's:

x^2-9x+20=0

Which of the following equations belongs to a quadratic with zeros at x = 2 and x = 7?

Correct answer:

2x^2 +28 = 18x

Explanation:

The answer is 2x^2 +28 = 18x .

A quadratic with zeros at x = 2 and x = 7 would factor to a(x - 2)(x - 7) = 0 , where it is important to recognize that a is the coefficient. So while you might be looking to simply expand to x^2 -9x + 14 = 0 , note that none of the options with a simple x^2 term (and not 2x^2 ) directly equal that simple quadratic when set to 0.

However, if you multiply x^2 - 9x + 14 = 0 by 2, you get 2x^2 - 18x + 28 = 0 . That's a simple addition of 18x to both sides of the equation to get to the correct answer: 2x^2 + 28 = 18x .

All Algebra II Resources

Report an issue with this question

If you've found an issue with this question, please let us know. With the help of the community we can continue to improve our educational resources.

DMCA Complaint

If you believe that content available by means of the Website (as defined in our Terms of Service) infringes one or more of your copyrights, please notify us by providing a written notice ("Infringement Notice") containing the information described below to the designated agent listed below. If Varsity Tutors takes action in response to an Infringement Notice, it will make a good faith attempt to contact the party that made such content available by means of the most recent email address, if any, provided by such party to Varsity Tutors.

Your Infringement Notice may be forwarded to the party that made the content available or to third parties such as ChillingEffects.org.

Please be advised that you will be liable for damages (including costs and attorneys' fees) if you materially misrepresent that a product or activity is infringing your copyrights. Thus, if you are not sure content located on or linked-to by the Website infringes your copyright, you should consider first contacting an attorney.

Please follow these steps to file a notice:

You must include the following:

A physical or electronic signature of the copyright owner or a person authorized to act on their behalf; An identification of the copyright claimed to have been infringed; A description of the nature and exact location of the content that you claim to infringe your copyright, in \ sufficient detail to permit Varsity Tutors to find and positively identify that content; for example we require a link to the specific question (not just the name of the question) that contains the content and a description of which specific portion of the question – an image, a link, the text, etc – your complaint refers to; Your name, address, telephone number and email address; and A statement by you: (a) that you believe in good faith that the use of the content that you claim to infringe your copyright is not authorized by law, or by the copyright owner or such owner's agent; (b) that all of the information contained in your Infringement Notice is accurate, and (c) under penalty of perjury, that you are either the copyright owner or a person authorized to act on their behalf.

Send your complaint to our designated agent at:

Charles Cohn Varsity Tutors LLC
101 S. Hanley Rd, Suite 300
St. Louis, MO 63105

Or fill out the form below:

Find Lowest Order Polynomial Given Solution

Source: https://www.varsitytutors.com/algebra_ii-help/write-a-polynomial-function-from-its-zeros

Sorenson Guir1996

Find Lowest Order Polynomial Given Solution

All Algebra II Resources

All Algebra II Resources

Report an issue with this question

DMCA Complaint

Menu Halaman Statis