Zeros (Solutions) Real Zeros Rational or Irrational Zeros Complex Zeros Complex Number and its Conjugate

If the polynomial f(x) = a n x n + a n-1 x n a 1 x + a 0 has integer coefficients, then every rational zero of f(x) is of the form where p is a factor of the constant a 0 and q is a factor of the leading coefficient a n. p q

 If “q” is the leading coefficient and “p” is the constant term of a polynomial, then the only possible rational roots are + factors of “p” divided by + factors of “q”.  Example:  To find the POSSIBLE rational roots of f(x), we need the FACTORS of the leading coefficient (6 for this example) and the factors of the constant term (4, for this example). Possible rational roots are p q

 List all possible rational zeros of f(x) = x 3 + 2x 2 – 5x – 6.

 List all possible rational zeros of f(x) = 4x x 4 – x – 3.

 Use the calculator to identify possible p/q that result in a zero.  Remember: When dividing by x – c, if the remainder is 0 when using synthetic division, then c is a zero of the polynomial.

 Find all zeros of f(x) = x 3 + 8x x – 20.

1. List all possible rational zeros of the polynomial using the Rational Zero Theorem. 2. Use synthetic division on each possible rational zero and the polynomial until one gives a remainder of zero. This means you have found a zero, as well as a factor. 3. Write the polynomial as the product of this factor and the quotient. 4. Repeat procedure on the quotient until the quotient is quadratic. 5. Once the quotient is quadratic, factor or use the quadratic formula to find the remaining real and imaginary zeros.

 Find all zeros of f(x) = x 3 + x 2 - 5x – 2.

 An nth degree polynomial has a total of n zeros. Some may be rational, irrational or complex.  Because all coefficients are RATIONAL, irrational roots exist in pairs (both the irrational # and its conjugate). Complex roots also exist in pairs (both the complex # and its conjugate).  If a + bi is a root, a – bi is a root  If is a root, is a root.  NOTE: Sometimes it is helpful to graph the function and find the x-intercepts (zeros) to narrow down all the possible zeros.

 Solve: x 4 – 6x x x + 13 = 0.

 Complex zeros come in pairs as complex conjugates: a + bi, a – bi  Irrational zeros come in pairs.

Find a polynomial function (in factored form) of degree 3 with 2 and i as zeros.

Find a polynomial function (in factored form) of degree 3 with 2, -1, 1 as zeros.

Find a polynomial function (in factored form) of degree 5 with -1/2 as a zero with multiplicity 2, 0 as a zero of multiplicity 1, and 1 as a zero of multiplicity 2.

 Find a third-degree polynomial function f(x) with real coefficients that has -3 and i as zeros and such that f(1) = 8. Extra Fun!  Suppose that a polynomial function of degree 4 with rational coefficients has i and –3 +√3 as zeros. Find the other zero(s).