multiplying by a monomial be able to multiply two monomials or a monomial and a polynomial
DESCRIPTION
FHSPolynomials3 Multiplying Monomials Unlike adding and subtracting, you can multiply any two monomials, even if they are not like terms. Simply multiply the coefficients together, and add the exponents of each set of different variables. Examples: (4 x 2 )( - 5 x 4 ) = (2 x 2 y )(3 x 4 y 2 ) = - 20 x 6 6 x 6 y 3 (4 2 )(4 4 ) = ( x 2 )( x 4 y 5 ) = 4 6 x 6 y 5TRANSCRIPT
Multiplying by a Monomial
Be able to multiply two monomials or a monomial and a polynomial
FHS Polynomials 2
Property 1 of Exponents
• Let’s look at an example that demonstrates how this property ____________ works:
• We have the problem: • According to the property we should be able
to find the answer this way:• We know that and
• Which gives us the same answer. 2 3 5a a a aa a a a
2a a a
2 3a a
m n m na a a
2 2 53 3a a a a 3a a a a
FHS Polynomials 3
Multiplying Monomials
• Unlike adding and subtracting, you can multiply any two monomials, even if they are not like terms.
• Simply multiply the coefficients together, and add the exponents of each set of different variables.
• Examples: (4x2)(-5x4) = (2x2y)(3x4y2) =
-20x6 6x6y3
(42)(44) = (x2)(x4y5) =
46 x6y5
FHS Polynomials 4
Multiplying a Polynomial by a Monomial
• To multiply a polynomial by a monomial, you must multiply each term in the polynomial by the monomial. For example:
1. 4(q – 5) multiply both q and 5 by the 4 4 · q – 4 · 5 = 2. (–5x)(5x – 4) = 3. (–3p2)(11p2 + 6pq + 12q2) =
4q – 20–25x2 + 20x
–33p4 – 18p3q – 36p2q2
FHS Polynomials 5
Problems from WS 3
1.
2.
11.
12.
15.
3x y
2 2a a
2 2e f e f
3 213 2mn m n
2 27 2x x xy y