239,135 views
44 votes
44 votes
Divide the polynomials.
Your answer should be a polynomial.
x² - 36
x − 6

User Eychu
by
3.0k points

2 Answers

9 votes
9 votes

Answer:

x + 6

Explanation:


(x^(2) -36)/(x-6)


((x+6)(x-6))/(x-6)

x + 6

User Yeldar Nurpeissov
by
2.8k points
16 votes
16 votes

Answer:

the answer to the division problem is `1x + 6` (a polynomial).

Explanation:

To divide polynomials, we use the long division method. Here's how we can divide x² - 36 by x - 6:

x² - 36 |

--------

x - 6

First, we divide the leading coefficient of the numerator (which is 1) by the leading coefficient of the denominator (which is 1).

We get 1 / 1 = 1 as the first coefficient of our quotient.

x² - 36 |

--------

x - 6

1

Then, we multiply the quotient by the denominator and subtract it from the numerator.

We get (1 * (x - 6)) = x - 6, and x² - 36 - (x - 6) = x² - x - 30.

x² - 36 |

--------

x - 6

1

x - 6

----------

x² - x - 30

We repeat the process, dividing the leading coefficient of the new numerator (which is 1) by the leading coefficient of the denominator (which is 1).

We get 1 / 1 = 1 as the next coefficient of our quotient.

x² - 36 |

--------

x - 6

1

x - 6

----------

x² - x - 30

1

We multiply the quotient by the denominator and subtract it from the numerator.

We get (1 * (x - 6)) = x - 6, and x² - x - 30 - (x - 6) = x² - 2x + 24.

x² - 36 |

--------

x - 6

1

x - 6

----------

x² - x - 30

1

x - 6

---------------

x² - 2x + 24

We repeat the process one more time, dividing the leading coefficient of the new numerator (which is 1) by the leading coefficient of the denominator (which is 1).

We get 1 / 1 = 1 as the next coefficient of our quotient.

x² - 36 |

--------

x - 6

1

x - 6

----------

x² - x - 30

1

x - 6

---------------

x² - 2x + 24

1

We multiply the quotient by the denominator and subtract it from the numerator.

We get (1 * (x - 6)) = x - 6, and x² - 2x + 24 - (x - 6) = x² - 3x + 18.

x² - 36 |

--------

x - 6

1

x - 6

----------

x² - x - 30

1

x - 6

---------------

x² - 2x + 24

1

x - 6

------------------

x² - 3x + 18

Since the degree of the new numerator is less than the degree of the denominator, we have found the complete quotient.

So, the quotient is `1x + 6`, and the remainder is `x² - 3x + 18`.

Therefore, the answer to the division problem is `1x + 6` (a polynomial).

User Roubachof
by
2.8k points