How do you use synthetic division to divide $3x^3+4x^2-7x+1$ by $3x-2$ ?

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How do you use synthetic division to divide $3x^3+4x^2-7x+1$ by $3x-2$ ?

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Answer 1 · 2015-07-30T20:13:57

$color(red)((3x^3 +4x^2-7x+6)/(3x-2) = x^2+2x-1-1/(3x-2))$

Explanation:

We use a slightly modified table when the coefficient of $x$ does not equal $1$ . Note the extra lines.

Step 1. Write only the coefficients of $x$ in the dividend inside an upside-down division symbol.

$|3" "4" "-7" " " " "1$
$|color(white)(1)$
$stackrel("——————————————)$

Step 2. Put the divisor at the left.

$" "" "|3" "4" "-7" " " " "1$
$" "color(red)(2)color(white)(1)|$
$" "stackrel("——————————————)$

Step 3. Write the coefficient of $x$ below the division line

$" "" "|3" "4" "-7" " " " "1$
$" "2|" "color(white)(1)2 " "" "4" "-2$
$" "stackrel("——————————————)$
$" "color(white)(1)|$
$color(red)(/3)color(white)(1)|$

Step 4. Drop the first coefficient of the dividend below the division symbol.

$" "" "|3" "4" "-7" " " " "1$
$" "2|" "color(white)(1)2 " "" "4" "-2$
$" "stackrel("——————————————)$
$" "color(white)(1)|color(red)(3)$
$/3color(white)(1)|$

Step 5. Divide the dropped value by the coefficient of $x$ and place the result in the row below.

$" "" "|3" "4" "-7" " " " "1$
$" "2|" "color(white)(1)2 " "" "4" "-2$
$" "stackrel("——————————————)$
$" "" "|3$
$/3color(white)(1)|color(red)(1)$

Step 6. Multiply the result by the constant, and put the product in the next column.

$" "" "|3" "4" "-7" " " " "1$
$" "2|" "color(white)(1)color(red)(2)$
$" "stackrel("——————————————)$
$" "" "|3$
$/3color(white)(1)|1$

Step 7. Add down the column.

$" "" "|3" "4" "-7" " " " "1$
$" "2|" "color(white)(1)2$
$" "stackrel("——————————————)$
$" "" "|3" "color(red)(6)$
$/3color(white)(1)|1$

Step 8. Repeat Steps 5, 6, and 7 until you can go no farther.

$" "" "|3" "4" "-7" " " " "1$
$" "2|" "color(white)(1)2 " "" "4" "-2$
$" "stackrel("——————————————)$
$" "" "|3" "6" "-3" "color(red)(-1)$
$/3color(white)(1)|1" "2" "-1$

$(3x^3 +4x^2-7x+6)/(3x-2) = x^2+2x-1-1/(3x-2)$

Check:

$(3x-2)( x^2+2x-1-1/(3x-2)) = (3x-2)(x^2+2x-1)-1$

$= 3x^3+6x^2-3x-2x^2-4x+2-1 = 3x^3+4x^2-7x +1$

Answer 2 · 2015-07-30T23:23:02

$(3x^3+4x^2-7x+1) div (3x-2)$
$color(white)("XXXX")$ $= x^2+2x-1$ $color(white)("XXXX")$ Remainder: -1

Explanation:

Note that this is simply an alternate approach to Ernest Z's answer. Some people may find one approach easier to understand than the other.

Set up as standard long division:
enter image source here

$3x$ " goes into " $3x^3$ $color(white)("XXXX")$ $rarr x^2$ times:
enter image source here

Multiply $3x-2$ by $x^2$ and write the product below the line:
enter image source here

Subtract:
enter image source here

"Bring down" the $-7x$
enter image source here

$3x$ " goes into " $6x^2$ $color(white)("XXXX")$ $rarr 2x$ times
...and so on...
enter image source here

The Remainder of $(-1)$ may be simply noted as a remainder or written as a fraction $(-1/(3x-2))_$

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How do you use synthetic division to divide $3x^3+4x^2-7x+1$ by $3x-2$ ?

2 Answers

Explanation:

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