POLYNOMIALS – Monomial Times a Polynomial When multiplying a monomial and a polynomial, multiply the monomial by EACH term in the polynomial. It’s called.
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POLYNOMIALS – Monomial Times a Polynomial
When multiplying a monomial and a polynomial, multiply the monomial by EACH term in the polynomial. It’s called the Distributive Property.
POLYNOMIALS – Monomial Times a Polynomial
When multiplying a monomial and a polynomial, multiply the monomial by EACH term in the polynomial. It’s called the Distributive Property.
Distributive Property xazyxa
POLYNOMIALS – Monomial Times a Polynomial
When multiplying a monomial and a polynomial, multiply the monomial by EACH term in the polynomial. It’s called the Distributive Property.
Distributive Property yaxazyxa
POLYNOMIALS – Monomial Times a Polynomial
When multiplying a monomial and a polynomial, multiply the monomial by EACH term in the polynomial. It’s called the Distributive Property.
Distributive Property zayaxazyxa
POLYNOMIALS – Monomial Times a Polynomial
When multiplying a monomial and a polynomial, multiply the monomial by EACH term in the polynomial. It’s called the Distributive Property.
EXAMPLE # 1 : 84 xx
POLYNOMIALS – Monomial Times a Polynomial
When multiplying a monomial and a polynomial, multiply the monomial by EACH term in the polynomial. It’s called the Distributive Property.
EXAMPLE # 1 : xxxx 484
Use the distributive property…
POLYNOMIALS – Monomial Times a Polynomial
When multiplying a monomial and a polynomial, multiply the monomial by EACH term in the polynomial. It’s called the Distributive Property.
EXAMPLE # 1 : 84484 xxxxx
Use the distributive property…
POLYNOMIALS – Monomial Times a Polynomial
When multiplying a monomial and a polynomial, multiply the monomial by EACH term in the polynomial. It’s called the Distributive Property.
EXAMPLE # 1 : 84484 xxxxx
Now separate numbers and variables and multiply.Don’t forget to ADD exponents when multiplying like variables. Variables that are “by themselves” are attached and “come along for the ride”…
POLYNOMIALS – Monomial Times a Polynomial
When multiplying a monomial and a polynomial, multiply the monomial by EACH term in the polynomial. It’s called the Distributive Property.
EXAMPLE # 1 : 84484 xxxxx
POLYNOMIALS – Monomial Times a Polynomial
When multiplying a monomial and a polynomial, multiply the monomial by EACH term in the polynomial. It’s called the Distributive Property.
EXAMPLE # 2 : 222 532 bbaaba
POLYNOMIALS – Monomial Times a Polynomial
When multiplying a monomial and a polynomial, multiply the monomial by EACH term in the polynomial. It’s called the Distributive Property.
EXAMPLE # 2 : 222 532 bbaaba
- Distributive property
POLYNOMIALS – Monomial Times a Polynomial
When multiplying a monomial and a polynomial, multiply the monomial by EACH term in the polynomial. It’s called the Distributive Property.
EXAMPLE # 2 : 222 532 bbaaba
Now separate numbers and variables…
POLYNOMIALS – Monomial Times a Polynomial
When multiplying a monomial and a polynomial, multiply the monomial by EACH term in the polynomial. It’s called the Distributive Property.
EXAMPLE # 2 : 222 532 bbaaba
Now multiply…
POLYNOMIALS – Monomial Times a Polynomial
When multiplying a monomial and a polynomial, multiply the monomial by EACH term in the polynomial. It’s called the Distributive Property.
EXAMPLE # 2 : 222 532 bbaaba
Now multiply…
POLYNOMIALS – Monomial Times a Polynomial
In some cases, the distributive property might have to be applied several times. You could have monomials multiplied by binomials separated by addition / subtraction. Once an addition or subtraction sign is inserted, the distributive property stops at the sign. Then the next monomial is distributed into the next polynomial.
EXAMPLE # 3 : 1372 22 mmmm
POLYNOMIALS – Monomial Times a Polynomial
In some cases, the distributive property might have to be applied several times. You could have monomials multiplied by binomials separated by addition / subtraction. Once an addition or subtraction sign is inserted, the distributive property stops at the sign. Then the next monomial is distributed into the next polynomial.
EXAMPLE # 3 : 1372 22 mmmm
Use the distributive property…
22mm
POLYNOMIALS – Monomial Times a Polynomial
In some cases, the distributive property might have to be applied several times. You could have monomials multiplied by binomials separated by addition / subtraction. Once an addition or subtraction sign is inserted, the distributive property stops at the sign. Then the next monomial is distributed into the next polynomial.
EXAMPLE # 3 : 1372 22 mmmm
Use the distributive property…
72 2 mmm
POLYNOMIALS – Monomial Times a Polynomial
In some cases, the distributive property might have to be applied several times. You could have monomials multiplied by binomials separated by addition / subtraction. Once an addition or subtraction sign is inserted, the distributive property stops at the sign. Then the next monomial is distributed into the next polynomial.
EXAMPLE # 3 : 1372 22 mmmm
Notice now we are distributing the next monomial…
mmmmm 372 22
POLYNOMIALS – Monomial Times a Polynomial
In some cases, the distributive property might have to be applied several times. You could have monomials multiplied by binomials separated by addition / subtraction. Once an addition or subtraction sign is inserted, the distributive property stops at the sign. Then the next monomial is distributed into the next polynomial.
EXAMPLE # 3 : 1372 22 mmmm
Notice now we are distributing the next monomial…
1372 222 mmmmmm
POLYNOMIALS – Monomial Times a Polynomial
In some cases, the distributive property might have to be applied several times. You could have monomials multiplied by binomials separated by addition / subtraction. Once an addition or subtraction sign is inserted, the distributive property stops at the sign. Then the next monomial is distributed into the next polynomial.
EXAMPLE # 3 : 1372 22 mmmm
Multiply and apply your exponent rule…
1372 222 mmmmmm
21221 372 mmmm
POLYNOMIALS – Monomial Times a Polynomial
In some cases, the distributive property might have to be applied several times. You could have monomials multiplied by binomials separated by addition / subtraction. Once an addition or subtraction sign is inserted, the distributive property stops at the sign. Then the next monomial is distributed into the next polynomial.
EXAMPLE # 3 : 1372 22 mmmm
1372 222 mmmmmm
21221 372 mmmm
233 372 mmmm
POLYNOMIALS – Monomial Times a Polynomial
In some cases, the distributive property might have to be applied several times. You could have monomials multiplied by binomials separated by addition / subtraction. Once an addition or subtraction sign is inserted, the distributive property stops at the sign. Then the next monomial is distributed into the next polynomial.
EXAMPLE # 3 : 1372 22 mmmm
1372 222 mmmmmm
21221 372 mmmm
233 372 mmmm
mmm 723 Combine like terms and write answer in descending order of exponents……
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