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Polynomial Long Division

Step 2: Look at the first term on the outside and the inside Polynomial Long Division Divide : 2x3 + 5x2 - x + 6 by x + 3 Step 1: Write the problem using a division symbol

? Put 2x2 on the top Step 3:The outside term (x) was multiplied by (something) to equal (2x3), the inside term. We must figure out what that (something) was. x times (what?) = 2x3 2x2 Well, we started with one x and we ended up with x3, so we picked up two more x’s or x2. Also, we now have a 2 that we didn’t have before. So, the term we are looking for is 2x2

Be sure to change the signs of every term. - 2x3 + 6x2 The next step is subtraction so we have: -(2x3 + 6x2) = -2x3- 6x2 2x2 Multiply the term you just wrote on top by the outside terms. 2x2(x + 3) = 2x3 + 6x2 (This answer will be written in the next line, under the correct powers)

Subtract (The first terms should always cancel out) -2x3 - 6x2 Bring down the next term 2x2 - x - x - x2 Step 2: what did we multiply the outside term by to get the inside term. Step 3: Write this term on top Now we will repeat the whole process again. Step 1: look at the first terms

Subtract (The first terms should always cancel out) Be sure to change the signs of every term. -2x3 - 6x2 Bring down the next term + x2 + 3x 2x2 - x - x - x2 + 2x + 6 Step 4: Multiply this new term by the outside terms Step 5: Change the signs & write the answer under the current inside term

Subtract (The first terms should always cancel out) Be sure to change the signs of every term. -2x3 - 6x2 + x2 + 3x - 2x - 6 ANSWER IS ON TOP Repeat Steps 1-5 Step 1: Look at first terms Step 2: What did we multiply by? Step 3: Write this above the line Step 4: Multiply new term by outside terms Step 5: Change signs & subtract 2x2 - x + 2 - x - x2 + 2x + 6 0

PROBLEM: Terms out of descending order SOLUTION: Rearrange terms into descending order Polynomial Long Division Divide : 3x5 - 17x4 - 15x3 + 4x + 54x2 - 24 by x - 6

Step 2: Look at the first term on the outside and the inside Polynomial Long Division Divide : 3x5 - 17x4 - 15x3 + 54x2 + 4x - 24 by x - 6 Step 1: Write the problem using a division symbol

? Put 3x4 on the top Step 3:The outside term (x) was multiplied by (something) to equal (3x5), the inside term. We must figure out what that (something) was. x times (what?) = 3x5 3x4 Well, we started with one x and we ended up with x5, so we picked up four more x’s or x4. Also, we now have a 3 that we didn’t have before. So, the term we are looking for is 3x4

Multiply the term you just wrote on top by the outside terms. 3x4(x - 6) = 3x5 - 18x4 3x5 - 18x4 - + Be sure to change the signs of every term. 3x4 The next step is subtraction so we have: -(3x5 - 18x4) = -3x5+ 18x4

Subtract (The first terms should always cancel out) -3x5+ 18x4 Bring down the next term 3x4 + x3 - 15x3 + x4 Step 2: what did we multiply the outside term by to get the inside term. Step 3: Write this term on top Now we will repeat the whole process again. Step 1: look at the first terms

Subtract (The first terms should always cancel out) Be sure to change the signs of every term. -3x5+ 18x4 Bring down the next term - x4 + 6x3 Step 4: Multiply this new term by the outside terms Step 5: Change the signs & write the answer under the current inside term 3x4 + x3 - 15x3 + x4 - 9x3 + 54x2

Subtract (The first terms should always cancel out) -3x5+ 18x4 Bring down the next term - x4 + 6x3 - 9x3- 54x2 Be sure to change the signs of every term. Repeat Steps 1-5 Step 1: Look at first terms Step 2: What did we multiply by? Step 3: Write this above the line Step 4: Multiply new term by outside terms Step 5: Change signs & subtract 3x4 + x3 - 9x2 - 15x3 + x4 - 9x3 + 54x2 0x2 + 4x

Subtract (The first terms should always cancel out) -3x5+ 18x4 Bring down the next term - x4 + 6x3 - 9x3 - 54x2 Be sure to change the signs of every term. - 0x2 + 0x Repeat Steps 1-5 Step 1: Look at first terms Step 2: What did we multiply by? Step 3: Write this above the line Step 4: Multiply new term by outside terms Step 5: Change signs & subtract 3x4 + x3 - 9x2 + 0x - 15x3 + x4 - 9x3 + 54x2 + 0x2 + 4x + 4x - 24

Subtract (The first terms should always cancel out) -3x5+ 18x4 - x4 + 6x3 - 9x3 - 54x2 Be sure to change the signs of every term. - 4x+ 24 - 0x2 + 0x ANSWER IS ON TOP Repeat Steps 1-5 Step 1: Look at first terms Step 2: What did we multiply by? Step 3: Write this above the line Step 4: Multiply new term by outside terms Step 5: Change signs & subtract 3x4 + x3 - 9x2 + 0x + 4 - 15x3 + x4 - 9x3 + 54x2 + 0x2 + 4x + 4x - 24 0

The division problems we just worked ended with zero remainders. Now let’s work a problem that ends with a remainder that’s not a zero. We’ll also throw in a couple of fractions so you can see how they are handled.

Divide : 6x4 - 3x3 - x - 5 by 2x - 3 Polynomial Long Division Step 1: Write the problem using a division symbol This polynomial (inside) has a power missing (x2). This is a common occurrence in polynomial long division problems. Watch out for missing powers!

Divide : 6x4 - 3x3 - x - 5 by 2x - 3 SOLUTION: Insert the missing power with a zero coefficient Polynomial Long Division PROBLEM: Missing the x2 term

Divide : 6x4 - 3x3 - x - 5 by 2x - 3 Step 2: Look at the first term on the outside and the inside Polynomial Long Division Step 1: Write the problem using a division symbol

? Put 3x3 on the top Step 3:The outside term (x) was multiplied by (something) to equal (6x4), the inside term. We must figure out what that (something) was. x times (what?) = 6x4 3x3 Well, we started with one x and we ended up with x4, so we picked up three more x’s or x3. Also, the 2 changed into a 6, so we multiplied by 3. So, the term we are looking for is 3x3

- + Be sure to change the signs of every term. 6x4 - 9x3 Multiply the term you just wrote on top by the outside terms. 3x3(2x - 3) = 6x4 - 9x3 3x3 The next step is subtraction so we have: -(6x4 - 9x3) = - 6x4+ 9x3

Subtract (The first terms should always cancel out) -6x4 + 9x3 Bring down the next term 3x3 + 3x2 + 0x2 6x3 Step 2: what did we multiply the outside term by to get the inside term. Step 3: Write this term on top Now we will repeat the whole process again. Step 1: look at the first terms

Subtract (The first terms should always cancel out) Be sure to change the signs of every term. -6x4 + 9x3 Bring down the next term - 6x3 + 9x2 - x Step 4: Multiply this new term by the outside terms Step 5: Change the signs & write the answer under the current inside term 17 2 3x3 + 3x2 6x3 + 0x2 + 9x2

9 + x 2 Subtract (The first terms should always cancel out) -6x4 + 9x3 Bring down the next term Be sure to change the signs of every term. - 6x3 + 9x2 - x - 9x2+ x 27 17 2 2 Repeat Steps 1-5 Step 1: Look at first terms Step 2: What did we multiply by? Step 3: Write this above the line Step 4: Multiply new term by outside terms Step 5: Change signs & subtract 3x3 + 3x 6x3 + 0x2 + 9x2 5x - 5 If the coefficient of the outside term, 2x, does not go evenly into the coefficient of the inside term, 9x2, then the number that goes on top will be: (inside/outside)= 9/2

9 5 5 + + 2 2 2x-3 Subtract (The first terms should always cancel out) DIVISOR -6x4 + 9x3 Be sure to change the sign of every term. - 6x3 + 9x2 - x - 9x2+ x - 5x + 27 15 17 2 2 2 REMAINDER The remainder is written as a fraction. the remainder over the divisor (outside polynomial) Repeat Steps 1-5 Step 1: Look at first terms Step 2: What did we multiply by? Step 3: Write this above the line Step 4: Multiply new term by outside terms Step 5: Change signs & subtract ANSWER IS ON TOP 3x3 + 3x + x 6x3 + 0x2 + 9x2 5x - 5 5 No more terms to bring down, this (5) is the remainder

Answers: 1) 5x - 1 2) 6x + 5 3) 4x2 + 7x + 12 + 4) x2 - 2x - 7 5) 5x2 + 10x + 22 + Practice Problems: (Hit enter to see the answers) Divide using Polynomial Long Division 1) 15x2 + 22x - 5 by 3x + 5 2) 12x2 - 32x - 35 by 2x - 7 3) 4x3 - 2x - x2 + 6 by x - 2 4) 3x3 - 5x2 - 23x - 7 by 3x + 1 5) 5x3 + 2x - 3 by x - 2

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SLIDE SHOW INSTRUCTIONS This presentation is completely under your control.