Multiplying and Factoring Polynomials
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Transcript of Multiplying and Factoring Polynomials
Multiplying and Factoring Polynomials
Tuesday, October 29, 2013
Performing operations
• Remember, to add polynomials, you combine like terms.
• To subtract polynomials, you add the opposite.
• So, how do you multiply polynomials???
How do I multiply monomials?
• When multiplying, multiply the constants, then the variables.
• Remember to use the laws of exponents (when multiplying you add the exponents).
• Ex: 2x2 * 5x3 = 10x5
How do I multiply a monomial and a polynomial?
• To multiply a monomial and a polynomial, you simply distribute.
• Ex: 2x2 (3x3 – 4x2 + x – 5) 6x5 – 8x4 + 2x3 – 10x2
How do I multiply a binomial by a binomial?
• FOIL – multiply first, outside, inside, then last (basically distribute)
• Box it – draw a box, put the numbers in, multiply and add like terms.
How do I multiply a polynomial by a polynomial?
• 1) Distribute 2) Line up your like terms 3) Add• Or… Box itEx: (2x2 – 3x + 4) (x4 + 2x3 – 4x – 3) 2x6 + 4x5 – 8x3 – 6x2 – 3x5 – 6x4 + 12x2 + 9x + 4x4 + 8x3 – 16x – 12 2x6 + x5 – 2x4 + 6x2 – 7x – 12
Classwork
• 1. 5(x +2)• 2. -2x2 (-2 + 6xy)• 3. (x + 2) (x + 5)• 4. (3x + 10) (2x – 5)• 5. (x + 2) (x2 + 5x + 6)• *Bonus* • (x2 – 2x + 1) (x2 + 5x + 6)
Uncover the mystery of factoring complex
trinomials!
Tic-Tac-But No ToePart 1: In the following tic tac’s there are four numbers. Find the relationship that the two numbers on the right have with the two
numbers on the left.
1. What did you find?2. Did it follow the pattern every time?
-90 10
1 -9
-30 -6
-1 5
-36 -6
0 6
120 30
34 4
-72 24
21 -3
36 -6
-12 -6
-81 9
0 -9
-24 -6
-10 -4
-49 7
0 -7
16 4
8 4
-6 -3
-1 2
49 -7
-14 -7
Tic-Tac-But No ToePart 2: Use your discoveries from Part 1 to complete
the following Tic Tac’s. 9
10
18
9
16
-10
6
7
4
-5
45
14
6
-5
-3
-2
72
-38
-6
-5
-72
-1
-36
5
-35
2
-15
2
-22
9
3. Did your discovery work in every case?
4. Can you give any explanation for this?
Finally! Factoring with a Frenzy!
Arrange the expression in descending (or ascending) order. ax2 + bx + c = 0
Be sure the leading coefficient is positive. Factor out the GCF, if necessary. Multiply the coefficients “a” and “c” and put
the result in quadrant II of the Tic Tac. Put the coefficient “b” in quadrant III of the Tic
Tac. Play the game! Just like the previous
problems. (Find the relationship!)
Once you have completed your Tic Tac–
WHERE’S the ANSWER?Use the “a” coefficient as the numerator of
two fractions. Use the results in quadrants I and IV as the two denominators.
Reduce the fractions. The numerator is your coefficient for x in your
binominal and the denominator is the constant term.
EXAMPLE: If you get the fractions ½ and -3/5, your answer would be (x + 2) (3x – 5).
EXAMPLESX2 – X - 12
-12 ?
-1 ?What 2 numbers complete the Tic Tac?
-12 3
-1 -4
Since a = 1, put a 1 in for the numerator in two fractions.
You found 3 and -4. These are the denominators for the two fractions. Your fractions are 1/3 and –1/4
Your answer is (x + 3) (x – 4).
EXAMPLES3X2 + 5X = 12
-36 ?
5 ?
What 2 numbers complete the Tic Tac?
-36 9
5 -4
Since a = 3, put a 3 in for the numerator in two fractions.You found 9 and -4. These are the denominators for the two fractions. Your fractions are 3/9 = 1/3 and –3/4
Your answer is (x + 3) (3x – 4).
*Remember to re-write in standard form 3X2 + 5X - 12
EXAMPLES2X2 + 8X - 64
-32 ?
4 ?What 2 numbers complete the Tic Tac?
-32 8
4 -4
Since a = 1, put a 1 in for the numerator in two fractions.You found 8 and -4. These are the denominators for the two fractions. Your fractions are 1/8 and –1/4.
Your answer is 2 (x + 8) (x – 4).
*Remember that sometimes a GCF should be factored out before beginning. 2(X2 + 4X – 32)
EXAMPLES1/2X2 + 1/2X - 6
-12 ?
1 ?What 2 numbers complete the Tic Tac?
-12 -3
1 4
Since a = 1, put a 1 in for the numerator in two fractions.You found -3 and 4. These are the denominators for the two fractions. Your fractions are –1/3 and 1/4.
Your answer is ½ (x – 3) (x + 4).
*Remember that sometimes a GCF should be factored out before beginning. 1/2(X2 + X – 12)
Classwork
• 1. b2 + 8b + 7• 2. m2 + m – 90• 3. n2 – 10n + 9• 4. k2 – 13k + 40• 5. 2p2 + 2p – 4• *Bonus*• 7a2 + 53a + 28
Homework
•Multiplying Binomials (Factoring Trinomials) Square Puzzle
Exit Ticket
•Do you prefer the FOIL or Box method for multiplying binomials? Why?