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Published byDeborah Jefferson Modified over 9 years ago
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Plowing Through Sec. 2.4b with Two New Topics: Synthetic Division Rational Zeros Theorem
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Synthetic Division Synthetic Division is a shortcut method for the division of a polynomial by a linear divisor, x – k. Notes: This technique works only when dividing by a linear polynomial… It is essentially a “collapsed” version of the long division we practiced last class…
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Synthetic Division – Examples: Evaluate the quotient: 32–3–5–12 2340 6912 Coefficients of dividend: Zero of divisor: Remainder Quotient
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Synthetic Division – Examples: Divide by and write a summary statement in fraction form. –210–23–3 1–22–1–1 –24–42 Verify Graphically?
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Rational Zeros Theorem Real zeros of polynomial functions are either rational zeros or irrational zeros. Examples: The function has rational zeros –3/2 and 3/2 The function has irrational zeros – 2 and 2
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Rational Zeros Theorem Suppose f is a polynomial function of degree n > 1 of the form with every coefficient an integer and. If x = p /q is a rational zero of f, where p and q have no common integer factors other than 1, then p is an integer factor of the constant coefficient, and q is an integer factor of the leading coefficient.
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RZT – Examples: Find the rational zeros of The leading and constant coefficients are both 1!!! The only possible rational zeros are 1 and –1…check them out: So f has no rational zeros!!! (verify graphically?)
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RZT – Examples: Find the rational zeros of Potential Rational Zeros: Factors of –2 Factors of 3 Graph the function to narrow the search… Good candidates: 1, – 2, possibly –1/3 or –2/3 Begin checking these zeros, using synthetic division…
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RZT – Examples: Find the rational zeros of 134–5–2 372 3720 Because the remainder is zero, x – 1 is a factor of f(x)!!! Now, factor the remaining quadratic… The rational zeros are 1, –1/3, and –2
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RZT – Examples: Find the polynomial function with leading coefficient 2 that has degree 3, with –1, 3, and –5 as zeros. First, write the polynomial in factored form: Then expand into standard form:
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RZT – Examples: Using only algebraic methods, find the cubic function with the given table of values. Check with a calculator graph. x–2–115 f(x) 0 2400 (x + 2), (x – 1), and (x – 5) must be factors… But we also have :
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A New Use for Synthetic Division in Sec. 2.4: Upper and Lower Bounds
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What are they??? A number k is an upper bound for the real zeros of f if f (x) is never zero when x is greater than k. A number k is a lower bound for the real zeros of f if f (x) is never zero when x is less than k.
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Let’s see them graphically: c d c is a lower bound and d is an upper bound for the real zeros of f
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Upper and Lower Bound Tests for Real Zeros Let f be a polynomial function of degree n > 1 with a positive leading coefficient. Suppose f (x) is divided by x – k using synthetic division. If k > 0 and every number in the last line is nonnegative (positive or zero), then k is an upper bound for the real zeros of f. If k < 0 and the numbers in the last line are alternately nonnegative and nonpositive, then k is a lower bound for the real zeros of f.
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Cool Practice Problems!!! Prove that all of the real zeros of the given function must lie in the interval [–2, 5]. The function has a positive leading coefficient, so we employ our new test with –2 and 5: 52–7–8148 101535245 23749253 –22–7–8148 –422–2828 2–1114–1436 This last line is all positive!!! This last line has alternating signs!!! 5 is an upper bound –2 is a lower bound Let’s check these results graphically…
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Cool Practice Problems!!! Find all of the real zeros of the given function. From the last example, we know that all of the rational zeros must lie on the interval [–2, 5]. Next, use the Rational Zero Theorem…potential rational zeros: Factors of 8 Factors of 2 Look at the graph to find likely candidates:Let’s try 4 and –1/2
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Cool Practice Problems!!! Find all of the real zeros of the given function. 42–7–8148 84–16–8 21–4–20 –1/221–4–2 –102 20–40
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Cool Practice Problems!!! Find all of the real zeros of the given function. The zeros of f are the rational numbers 4 and –1/2 and the irrational numbers are – 2 and 2
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Cool Practice Problems!!! Prove that all of the real zeros of the given function lie in the interval [0, 1], and find them. Check our potential bounds: 01000–31 0000 10 0 0–31 0 is a lower bound!!! –6 0 11000–31 10 7 78 1 is an upper bound!!! –6 8 2
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Cool Practice Problems!!! Prove that all of the real zeros of the given function lie in the interval [0, 1], and find them. Possible rational zeros: Check the graph (with 0 < x < 1) to select likely candidates… The function has no rational zeros on the interval!!! Lone Real Zero: 0.951 Are there any zeros???
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