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Use long division to find the quotient [tex]\( Q(x) \)[/tex] and the remainder [tex]\( R(x) \)[/tex] when [tex]\( P(x) \)[/tex] is divided by [tex]\( d(x) \)[/tex]. Express [tex]\( P(x) \)[/tex] in the form [tex]\( d(x) \cdot Q(x) + R(x) \)[/tex].

Given:
[tex]\[
\begin{array}{l}
P(x) = x^3 + 5x^2 - 10x + 114 \\
d(x) = x + 8
\end{array}
\][/tex]

[tex]\[
P(x) = (x + 8)(\square) + \square
\][/tex]

Sagot :

GinnyAnsweridn
To find the quotient [tex]\( Q(x) \)[/tex] and the remainder [tex]\( R(x) \)[/tex] when [tex]\( P(x) = x^3 + 5x^2 - 10x + 114 \)[/tex] is divided by [tex]\( d(x) = x + 8 \)[/tex], we use polynomial long division. Here's the detailed step-by-step solution:

1. Set up the division:

We divide [tex]\( x^3 + 5x^2 - 10x + 114 \)[/tex] by [tex]\( x + 8 \)[/tex].

2. Divide the leading term of the dividend by the leading term of the divisor:

[tex]\[ \frac{x^3}{x} = x^2 \][/tex]

So, the first term of the quotient is [tex]\( x^2 \)[/tex].

3. Multiply the entire divisor by this term [tex]\( x^2 \)[/tex]:

[tex]\[ (x + 8)x^2 = x^3 + 8x^2 \][/tex]

4. Subtract this product from the original polynomial [tex]\( P(x) \)[/tex]:

[tex]\[ (x^3 + 5x^2 - 10x + 114) - (x^3 + 8x^2) = -3x^2 - 10x + 114 \][/tex]

5. Repeat the process with the new polynomial [tex]\( -3x^2 - 10x + 114 \)[/tex]:

* Divide the leading term of the new polynomial by the leading term of the divisor:

[tex]\[ \frac{-3x^2}{x} = -3x \][/tex]

So, the next term of the quotient is [tex]\(-3x\)[/tex].

* Multiply the divisor by [tex]\(-3x\)[/tex]:

[tex]\[ (x + 8)(-3x) = -3x^2 - 24x \][/tex]

* Subtract this product from the new polynomial:

[tex]\[ (-3x^2 - 10x + 114) - (-3x^2 - 24x) = 14x + 114 \][/tex]

6. Repeat the process again with the new polynomial [tex]\( 14x + 114 \)[/tex]:

* Divide the leading term of the new polynomial by the leading term of the divisor:

[tex]\[ \frac{14x}{x} = 14 \][/tex]

So, the next term of the quotient is [tex]\( 14 \)[/tex].

* Multiply the divisor by [tex]\( 14 \)[/tex]:

[tex]\[ (x + 8)(14) = 14x + 112 \][/tex]

* Subtract this product from the new polynomial:

[tex]\[ (14x + 114) - (14x + 112) = 2 \][/tex]

7. Stop the division as the degree of the remainder [tex]\( 2 \)[/tex] is less than the degree of the divisor [tex]\( x + 8 \)[/tex].

Therefore, the quotient [tex]\( Q(x) \)[/tex] is:

[tex]\[ Q(x) = x^2 - 3x + 14 \][/tex]

And the remainder [tex]\( R(x) \)[/tex] is:

[tex]\[ R(x) = 2 \][/tex]

Finally, we express [tex]\( P(x) \)[/tex] in the form [tex]\( d(x) \cdot Q(x) + R(x) \)[/tex]:

[tex]\[ P(x) = (x + 8)(x^2 - 3x + 14) + 2 \][/tex]

So the completed form is:

[tex]\[ P(x) = (x + 8) \cdot (x^2 - 3x + 14) + 2 \][/tex]
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