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Add sub polynomials

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This document provides instruction on adding, subtracting, and finding the degree of polynomials. It includes examples of combining like terms, arranging polynomials in ascending and descending order, finding the degree of monomials and polynomials, and solving problems involving adding and subtracting polynomials. The objectives are for students to be able to find the degree of a polynomial, arrange terms in ascending or descending order, and add and subtract polynomials.

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Bell work 8-21-12 2330 342 xyyxyx ≒ ( )222 2 xyx 3 34 2 3 xy yx )323(4)432(3 22 + xyxxyx )142(3)473( + baba Simplify Simplify
Objectives The student will be able to: 1. find the degree of a polynomial. 2. arrange the terms of a polynomial in ascending or descending order. SOL: none Designed by Skip Tyler, Varina High School
What does each prefix mean? mono one bi two tri three
What about poly? one or more A polynomial is a monomial or a sum/difference of monomials. Important Note!! An expression is not a polynomial if there is a variable in the denominator.
State whether each expression is a polynomial. If it is, identify it. 1) 7y - 3x + 4 trinomial 2) 10x3 yz2 monomial 3) not a polynomial 2 5 7 2 y y +
The degree of a monomial is the sum of the exponents of the variables. Find the degree of each monomial. 1) 5x2 2 2) 4a4 b3 c 8 3) -3 0
To find the degree of a polynomial, find the largest degree of the terms. 1) 8x2 - 2x + 7 Degrees: 2 1 0 Which is biggest? 2 is the degree! 2) y7 + 6y4 + 3x4 m4 Degrees: 7 4 8 8 is the degree!
Find the degree of x5 x3 y2 + 4 1. 0 2. 2 3. 3 4. 5 5. 10
A polynomial is normally put in ascending or descending order. What is ascending order? Going from small to big exponents. What is descending order? Going from big to small exponents.
Put in descending order: 1) 8x - 3x2 + x4 - 4 x4 - 3x2 + 8x - 4 2) Put in descending order in terms of x: 12x2 y3 - 6x3 y2 + 3y - 2x -6x3 y2 + 12x2 y3 - 2x + 3y
3) Put in ascending order in terms of y: 12x2 y3 - 6x3 y2 + 3y - 2x -2x + 3y - 6x3 y2 + 12x2 y3 4) Put in ascending order: 5a3 - 3 + 2a - a2 -3 + 2a - a2 + 5a3
Write in ascending order in terms of y: x4 x3 y2 + 4xy 2x2 y3 1. x4 + 4xy x3 y2 2x2 y3 2. 2x2 y3 x3 y2 + 4xy + x4 3. x4 x3 y2 2x2 y3 + 4xy 4. 4xy 2x2 y3 x3 y2 + x4
Objectives The student will be able to: 1. add and subtract polynomials. SOL: A.11 Designed by Skip Tyler, Varina High School
1. Add the following polynomials: (9y - 7x + 15a) + (-3y + 8x - 8a) Group your like terms. 9y - 3y - 7x + 8x + 15a - 8a 6y + x + 7a
Combine your like terms. 3a2 + 3ab + 4ab - b2 + 6b2 3a2 + 7ab + 5b2 2. Add the following polynomials: (3a2 + 3ab - b2 ) + (4ab + 6b2 )
Line up your like terms. 4x2 - 2xy + 3y2 + -3x2 - xy + 2y2 _________________________ x2 - 3xy + 5y2 3. Add the following polynomials using column form: (4x2 - 2xy + 3y2 ) + (-3x2 - xy + 2y2 )
Rewrite subtraction as adding the opposite. (9y - 7x + 15a) + (+ 3y - 8x + 8a) Group the like terms. 9y + 3y - 7x - 8x + 15a + 8a 12y - 15x + 23a 4. Subtract the following polynomials: (9y - 7x + 15a) - (-3y + 8x - 8a)
Rewrite subtraction as adding the opposite. (7a - 10b) + (- 3a - 4b) Group the like terms. 7a - 3a - 10b - 4b 4a - 14b 5. Subtract the following polynomials: (7a - 10b) - (3a + 4b)
Line up your like terms and add the opposite. 4x2 - 2xy + 3y2 + (+ 3x2 + xy - 2y2 ) -------------------------------------- 7x2 - xy + y2 6. Subtract the following polynomials using column form: (4x2 - 2xy + 3y2 ) - (-3x2 - xy + 2y2 )
Find the sum or difference. (5a 3b) + (2a + 6b) 1. 3a 9b 2. 3a + 3b 3. 7a + 3b 4. 7a 3b
Find the sum or difference. (5a 3b) (2a + 6b) 1. 3a 9b 2. 3a + 3b 3. 7a + 3b 4. 7a 9b
yx 43 + yx 5 The measures of two sides of a triangle are given. If P is the perimeter, and , find the measure of the third side. yxP 510 +=

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Add sub polynomials

  • 1. Bell work 8-21-12 2330 342 xyyxyx ≒ ( )222 2 xyx 3 34 2 3 xy yx )323(4)432(3 22 + xyxxyx )142(3)473( + baba Simplify Simplify
  • 2. Objectives The student will be able to: 1. find the degree of a polynomial. 2. arrange the terms of a polynomial in ascending or descending order. SOL: none Designed by Skip Tyler, Varina High School
  • 3. What does each prefix mean? mono one bi two tri three
  • 4. What about poly? one or more A polynomial is a monomial or a sum/difference of monomials. Important Note!! An expression is not a polynomial if there is a variable in the denominator.
  • 5. State whether each expression is a polynomial. If it is, identify it. 1) 7y - 3x + 4 trinomial 2) 10x3 yz2 monomial 3) not a polynomial 2 5 7 2 y y +
  • 6. The degree of a monomial is the sum of the exponents of the variables. Find the degree of each monomial. 1) 5x2 2 2) 4a4 b3 c 8 3) -3 0
  • 7. To find the degree of a polynomial, find the largest degree of the terms. 1) 8x2 - 2x + 7 Degrees: 2 1 0 Which is biggest? 2 is the degree! 2) y7 + 6y4 + 3x4 m4 Degrees: 7 4 8 8 is the degree!
  • 8. Find the degree of x5 x3 y2 + 4 1. 0 2. 2 3. 3 4. 5 5. 10
  • 9. A polynomial is normally put in ascending or descending order. What is ascending order? Going from small to big exponents. What is descending order? Going from big to small exponents.
  • 10. Put in descending order: 1) 8x - 3x2 + x4 - 4 x4 - 3x2 + 8x - 4 2) Put in descending order in terms of x: 12x2 y3 - 6x3 y2 + 3y - 2x -6x3 y2 + 12x2 y3 - 2x + 3y
  • 11. 3) Put in ascending order in terms of y: 12x2 y3 - 6x3 y2 + 3y - 2x -2x + 3y - 6x3 y2 + 12x2 y3 4) Put in ascending order: 5a3 - 3 + 2a - a2 -3 + 2a - a2 + 5a3
  • 12. Write in ascending order in terms of y: x4 x3 y2 + 4xy 2x2 y3 1. x4 + 4xy x3 y2 2x2 y3 2. 2x2 y3 x3 y2 + 4xy + x4 3. x4 x3 y2 2x2 y3 + 4xy 4. 4xy 2x2 y3 x3 y2 + x4
  • 13. Objectives The student will be able to: 1. add and subtract polynomials. SOL: A.11 Designed by Skip Tyler, Varina High School
  • 14. 1. Add the following polynomials: (9y - 7x + 15a) + (-3y + 8x - 8a) Group your like terms. 9y - 3y - 7x + 8x + 15a - 8a 6y + x + 7a
  • 15. Combine your like terms. 3a2 + 3ab + 4ab - b2 + 6b2 3a2 + 7ab + 5b2 2. Add the following polynomials: (3a2 + 3ab - b2 ) + (4ab + 6b2 )
  • 16. Line up your like terms. 4x2 - 2xy + 3y2 + -3x2 - xy + 2y2 _________________________ x2 - 3xy + 5y2 3. Add the following polynomials using column form: (4x2 - 2xy + 3y2 ) + (-3x2 - xy + 2y2 )
  • 17. Rewrite subtraction as adding the opposite. (9y - 7x + 15a) + (+ 3y - 8x + 8a) Group the like terms. 9y + 3y - 7x - 8x + 15a + 8a 12y - 15x + 23a 4. Subtract the following polynomials: (9y - 7x + 15a) - (-3y + 8x - 8a)
  • 18. Rewrite subtraction as adding the opposite. (7a - 10b) + (- 3a - 4b) Group the like terms. 7a - 3a - 10b - 4b 4a - 14b 5. Subtract the following polynomials: (7a - 10b) - (3a + 4b)
  • 19. Line up your like terms and add the opposite. 4x2 - 2xy + 3y2 + (+ 3x2 + xy - 2y2 ) -------------------------------------- 7x2 - xy + y2 6. Subtract the following polynomials using column form: (4x2 - 2xy + 3y2 ) - (-3x2 - xy + 2y2 )
  • 20. Find the sum or difference. (5a 3b) + (2a + 6b) 1. 3a 9b 2. 3a + 3b 3. 7a + 3b 4. 7a 3b
  • 21. Find the sum or difference. (5a 3b) (2a + 6b) 1. 3a 9b 2. 3a + 3b 3. 7a + 3b 4. 7a 9b
  • 22. yx 43 + yx 5 The measures of two sides of a triangle are given. If P is the perimeter, and , find the measure of the third side. yxP 510 +=