Polynomial Inequalities
How do I solve polynomial inequalities?
- STEP 1: Rearrange the inequality so that one of the sides is equal to zero
- For example: P(x) ≤ 0
- STEP 2: Find the roots of the polynomial
- You can do this by factorising or using GDC to solve P(x) = 0
- STEP 3: Choose one of the following methods:
- Graph method
- Sketch a graph of the polynomial (with or without a GDC)
- Choose the intervals for x corresponding to the sections of the graph that satisfy the inequality
- For example: for P(x) ≤ 0 you would want the sections below the x-axis
- Sign table method
- If you are unsure how to sketch a polynomial graph then this method is best
- Split the real numbers into the possible intervals using the roots
- If the roots are a and b then the intervals would be x<a, a<x<b, x>b
- Test a value from each interval using the inequality
- Choose a value within an interval and substitute into P(x) to determine if it is positive or negative
- Alternatively if the polynomial is factorised you can determine the sign of each factor in each interval
- An odd number of negative factors in an interval will mean the polynomial is negative on that interval
- If the value satisfies the inequality then that interval is part of the solution
Exam Tip
- In exams most solutions will be intervals but some could be a single point
- For example: Solution to is
Worked example
Solve the inequality using an algebraic method.