Topic: U4L5 Remainder and Factor Theorems EQ: Can I correctly apply the Remainder and Factor Theorems to help me factor higher order polynomials?
Remainder Theorem If a polynomial f(x) is divided by x – a, the remainder is the same as finding f(a) dividendquotient divisor remainder Synthetic substitution – using synthetic division to evaluate a function
Find the remainder when is divided by Find f(4) for the given function
Factor Theorem x-a is a factor of f(x) if the remainder is zero Use this theorem to factor polynomial functions Do synthetic division with the given factor and then factor the polynomial
Zeros, Roots and Factors c is a zero of f(x) x-c is a factor of f(x) c is a root or solution of f(x)=0 If c is a real number then (c, 0) is an intercept of the graph of f(x)
Fundamental Theorem of Algebra Every polynomial equation with degree greater than zero has at least one root in the set of complex numbers A polynomial of degree n has exactly n roots in the set of complex numbers
To find ALL the zeros: Use your calculator to find any integer solutions in the table Use the integer solutions to perform synthetic division and reduce the polynomial down to one that can be solved by factoring or completing the square. All imaginary solutions come in conjugate pairs; (a+bi) and (a-bi)
Examples: Find ALL the zeros
Write the polynomial with the given solutions:
Write the polynomial: