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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 1 Bruce Mayer, PE Chabot College Mathematics Bruce Mayer, PE Licensed Electrical & Mechanical Engineer BMayer@ChabotCollege.edu Chabot Mathematics §6.4 Divide PolyNomials
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 2 Bruce Mayer, PE Chabot College Mathematics Review § Any QUESTIONS About §6.3 → Complex Rational Expressions Any QUESTIONS About HomeWork §6.3 → HW-25 6.3 MTH 55
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 3 Bruce Mayer, PE Chabot College Mathematics §6.4 Polynomial Division Dividing by a Monomial Dividing by a BiNomial Long Division
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 4 Bruce Mayer, PE Chabot College Mathematics Dividing by a Monomial To divide a polynomial by a monomial, divide each term by the monomial. EXAMPLE – Divide: x 5 + 24x 4 − 12x 3 by 6x Solution
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 5 Bruce Mayer, PE Chabot College Mathematics Example Monomial Division Divide: Solution:
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 6 Bruce Mayer, PE Chabot College Mathematics Dividing by a Binomial For divisors with more than one term, we use long division, much as we do in arithmetic. Polynomials are written in descending order and any missing terms in the dividend are written in, using 0 (zero) for the coefficients.
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 7 Bruce Mayer, PE Chabot College Mathematics Recall Arithmetic Long Division Recall Whole-No. Long Division Divide: Divisor Quotient Remainder Quotient 13 Divisor 12 Remainder 1 = Dividend = 157 + +
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 8 Bruce Mayer, PE Chabot College Mathematics Binomial Div. Step by Step Divide 2x³ + 3x² - x + 1 by x + 2 x + 2 is the divisor The quotient will be here. 2x³ + 3x² - x + 1 is the dividend Use an IDENTICAL Long Division process when dividing by BiNomials or Larger PolyNomials; e.g.;
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 9 Bruce Mayer, PE Chabot College Mathematics Binomial Div. Step by Step First divide the first term of the dividend, 2x³, by x (the first term of the divisor). This gives 2x². This will be the first term of the quotient.
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 10 Bruce Mayer, PE Chabot College Mathematics Binomial Div. Step by Step Now multiply (x+2) by 2x² and subtract
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 11 Bruce Mayer, PE Chabot College Mathematics Binomial Div. Step by Step Bring down the next term, -x.-x.
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 12 Bruce Mayer, PE Chabot College Mathematics Binomial Div. Step by Step Now divide –x², the first term of –x² - x, by x, the first term of the divisor which gives –x.–x.
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 13 Bruce Mayer, PE Chabot College Mathematics Binomial Div. Step by Step Multiply (x +2) by -x and subtract
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 14 Bruce Mayer, PE Chabot College Mathematics Binomial Div. Step by Step Bring down the next term, 1
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 15 Bruce Mayer, PE Chabot College Mathematics Binomial Div. Step by Step Divide x, the first term of x + 1, by x,x, the first term of the divisor which gives 1
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 16 Bruce Mayer, PE Chabot College Mathematics Binomial Div. Step by Step Multiply x + 2 by 1 and subtract
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 17 Bruce Mayer, PE Chabot College Mathematics Binomial Div. Step by Step The remainder is –1. The quotient is 2x² - x + 1
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 18 Bruce Mayer, PE Chabot College Mathematics Example BiNomial Division Divide x 2 + 7x + 12 by x + 3. Solution Subtract by changing signs and adding Multiply (x + 3) by x, using the distributive law
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 19 Bruce Mayer, PE Chabot College Mathematics Example BiNomial Division Solution – Cont. Subtract Multiply 4 by the divisor, x + 3, using the distributive law Bring Down the +12
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 20 Bruce Mayer, PE Chabot College Mathematics Example BiNomial Division Divide 15x 2 − 22x + 14 by (3x − 2) Solution The answer is 5x − 4 with R6. We can also write the answer as:
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 21 Bruce Mayer, PE Chabot College Mathematics Example BiNomial Division Divide x 5 − 3x 4 − 4x 2 + 10x by (x − 3) Solution The Result
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 22 Bruce Mayer, PE Chabot College Mathematics Divide 3x 2 − 4x − 15 by x − 3 SOLUTION: Place the TriNomial under the Long Division Sign and start the Reduction Process Divide 3x 2 by x: 3x 2 /x = 3x. Multiply x – 3 by 3x. Subtract by mentally changing signs and adding − 4x + 9x = 5x.
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 23 Bruce Mayer, PE Chabot College Mathematics Divide 3x 2 − 4x − 15 by x − 3 SOLUTION: next divide the leading term of this remainder, 5x, by the leading term of the divisor, x. Divide 5x by x: 5x/x = 5. Multiply x – 3 by 5. Subtract. Our remainder is now 0. CHECK: (x − 3)(3x + 5) = 3x 2 − 4x − 15 The quotient is 3x + 5.
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 24 Bruce Mayer, PE Chabot College Mathematics Formal Division Algorithm If a polynomial F(x) is divided by a polynomial D(x), with D(x) ≠ 0, there are unique polynomials Q(x) and R(x) such that F(x) = D(x) Q(x) + R(x) Dividend Divisor Quotient Remainder Either R(x) is the zero polynomial, or the degree of R(x) is LESS than the degree of D(x).
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 25 Bruce Mayer, PE Chabot College Mathematics PolyNomial Long Division 1.Write the terms in the dividend and the divisor in descending powers of the variable. 2.Insert terms with zero coefficients in the dividend for any missing powers of the variable 3.Divide the first terms in the dividend by the first terms in the divisor to obtain the first term in the quotient.
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 26 Bruce Mayer, PE Chabot College Mathematics PolyNomial Long Division 4.Multiply the divisor by the first term in the quotient, and subtract the product from the dividend. 5.Treat the remainder obtained in Step 4 as a new dividend, and repeat Steps 3 and 4. Continue this process until a remainder is obtained that is of lower degree than the divisor.
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 27 Bruce Mayer, PE Chabot College Mathematics Example TriNomial Division Divide SOLN
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 28 Bruce Mayer, PE Chabot College Mathematics Example TriNomial Division SOLN cont.
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 29 Bruce Mayer, PE Chabot College Mathematics Example TriNomial Division Divide The Quotient = The Remainder = Write the Result in Concise form:
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 30 Bruce Mayer, PE Chabot College Mathematics WhiteBoard Work Problems From §6.4 Exercise Set 30, 32, 40 BiNomial Division
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 31 Bruce Mayer, PE Chabot College Mathematics All Done for Today Polynomial Division in base2 From UC Berkeley Electrical-Engineering 122 Course
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 32 Bruce Mayer, PE Chabot College Mathematics Bruce Mayer, PE Licensed Electrical & Mechanical Engineer BMayer@ChabotCollege.edu Chabot Mathematics Appendix –
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 33 Bruce Mayer, PE Chabot College Mathematics Graph y = |x| Make T-table
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BMayer@ChabotCollege.edu MTH55_Lec-31_sec_6-3_Complex_Rationals.ppt 34 Bruce Mayer, PE Chabot College Mathematics
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