Mathematics: Please make sure the answer is correct

The prime polynomial or an irreducible polynomial is i.e., .Further explanation:In the question it is asked to choose the option which correctly signifies a prime polynomial.The options are as follows:Option A: Option B: Option C: Option D: A number which cannot be further factorized into the product of its factors is called a prime number. Just like a prime number there exists a prime polynomial.A prime polynomial is also called as an irreducible polynomial.An irreducible polynomial is a polynomial...

Please make sure the answer is correct

Ответ:

elie84

04.09.2020

Mathematics

The prime polynomial or an irreducible polynomial is $10x^{2}-4x+3x+6$ i.e., $\fbox{\begin\\\ \bf \text{option C}\\\end{minispace}}$ .

Further explanation:

In the question it is asked to choose the option which correctly signifies a prime polynomial.

The options are as follows:

Option A: $x^{3}+3x^{2}+2x+6$

Option B: $x^{3}+3x^{2}-2x-6$

Option C: $10x^{2}-5x+4x+6$

Option D: $10x^{2}-10x+6x-6$

A number which cannot be further factorized into the product of its factors is called a prime number. Just like a prime number there exists a prime polynomial.

A prime polynomial is also called as an irreducible polynomial.

An irreducible polynomial is a polynomial which cannot be expressed as product of its factors or a polynomial which cannot be factored into a polynomial of lower degree.

Option A:

In option A the polynomial is given as $x^{3}+3x^{2}+2x+6$ .

Consider the function as follows:

$F(x)= x^{3}+3x^{2}+2x+6$

Substitute for in the above equation.

$\begin{aligned}F(-3)&= (-3)^{3}+3(-3)^{2}+2(-3)+6\\&=-27+27-6+6\\&=0\end{aligned}$

Therefore, the value of F(-3) is .

As per the factor theorem (x+3) is a factor of the polynomial $x^{3}+3x^{2}+2x+6$ .

Therefore, the polynomial $x^{3}+3x^{2}+2x+6$ has a factor as (x+3) so, the polynomial given in the option A is not a prime polynomial.

This implies that option A is incorrect.

Option B:

In option B the polynomial is given as $x^{3}+3x^{2}-2x-6$ .

Consider the function as follows:

$F(x)= x^{3}+3x^{2}-2x-6$

Substitute for in the above equation.

$\begin{aligned}F(-3)&= (-3)^{3}+3(-3)^{2}-2(-3)-6\\&=-27+27+6-6\\&=0\end{aligned}$

Therefore, the value of F(-3) is .

As per the factor theorem (x+3) is a factor of the polynomial $x^{3}+3x^{2}-2x-6$ .

Therefore, the polynomial $x^{3}+3x^{2}-2x-6$ has a factor as (x+3) so, the polynomial given in the option B is not a prime polynomial.

This implies that option B is incorrect.

Option C:

In option C the polynomial is given as $10x^{2}-4x+3x+6$ .

Consider the function as follows:

$F(x)= 10x^{2}-4x+3x+6$

Simplify the above expression as follows:

$\begin{aligned}F(x)&= 10x^{2}-4x+3x+6\\&=10x^{2}-x+6\end{aligned}$

For the above function the degree or the highest power of the variable is . This implies that the above function is a quadratic function.

A quadratic function is a function in which the degree or the highest power of the variable is .

The general form of a quadratic function is as follows:

$\fbox{\begin\\\ \math F(x)=ax^{2}+bx+c\\\end{minispace}}$

The discriminant of the above function is calculated as follows:

$\fbox{\begin\\\ \math D=b^{2}-4ac\\\end{minispace}}$

The quadratic function obtained above is as follows:

$F(x)= 10x^{2}-x+6$

The discriminant of the above function is calculated as follows:

$\begin{aligned}D&=(-1)^{2}-(4\times 10\times 6)\\&=1-240\\&=-239\end{aligned}$

Since the discriminant is negative this means that there are no real roots of the function.

Since, the roots of the function are imaginary so, the function $F(x)= 10x^{2}-x+6$ does not have any factor which would give a real root.

From the above statement it is concluded that the polynomial $10x^{2}-x+6$ is a prime polynomial.

This implies that option C is correct.

Option D:

In option D the polynomial is given as $10x^{2}-10x+6x-6$ .

Consider the function as follows:

$F(x)= 10x^{2}-10x+6x-6$

Simplify the above expression as follows:

$\begin{aligned}F(x)&=10x^{2}-10x+6x-6\\&=10x(x-1)+6(x-1)\\&=(x-1)(10x+6)\end{aligned}$

From the above calculation it is concluded that the function $F(x)=10x^{2}-10x+6x-6$ is factored as (x-1)(10x+6) .

Therefore, the polynomial $10x^{2}-10x+6x-6$ in not a prime polynomial.

This implies that option D is incorrect.

Thus, the prime polynomial or an irreducible polynomial is $10x^{2}-4x+3x+6$ i.e., $\fbox{\begin\\\ \bf option C\\\end{minispace}}$ .

Learn more:

1.A problem on composite function

2.A problem to find radius and center of circle

3.A problem to determine intercepts of a line

Answer details:

Grade: High school

Subject: Mathematics

Chapter: Polynomial

Keywords: Polynomial, prime, prime polynomial, irreducible, irreducible polynomial, functions, factor, factor theorem, factorize, 10x2-5x+4x+6, quadratic, quadratic function, discriminant.

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