Lesson 12

Polynomial Division (Part 1)

  • Let’s learn a way to divide polynomials.

12.1: Notice and Wonder: A Different Use for Diagrams

What do you notice? What do you wonder?

A. \((x-3)(x+5)=x^2+2x-15\)

\(x\) 5
\(x\) \(x^2\) \(5x\)
-3 \(\text-3x\) -15

B. \((x-1)(x^2+3x-4)=x^3+2x^2-7x+4\)

\(x^2\) \(3x\) -4
\(x\) \(x^3\) \(3x^2\) \(\text-4x\)
-1 \(\text-x^2\) \(\text-3x\) +4

C. \((x-2)(?)=(x^3 - x^2 - 4x + 4)\)

                                           
\(x\) \(x^3\)
-2

 

12.2: Factoring with Diagrams

Priya wants to sketch a graph of the polynomial \(f\) defined by \(f(x)=x^3 + 5x^2 + 2x - 8\). She knows \(f(1)=0\), so she suspects that \((x-1)\) could be a factor of \(x^3 + 5x^2 + 2x - 8\) and writes \(\displaystyle (x^3 + 5x^2 + 2x - 8) = (x - 1)(?x^2 + ?x + ?)\) and draws a diagram.

                                           
\(x\) \(x^3\)    
-1      
  1. Finish Priya’s diagram.
  2. Write \(f(x)\) as the product of \((x-1)\) and another factor.
  3. Write \(f(x)\) as the product of three linear factors.
  4. Make a sketch of \(y=f(x)\).
Blank x y coordinate plane, no grid. Horizontal axis from negative 10 to 8 by 2’s.

 

12.3: More Factoring with Diagrams

Here are some polynomial functions with known factors. Rewrite each polynomial as a product of linear factors. Note: you may not need to use all the columns in each diagram. For some problems, you may need to make another diagram.

  1. \(A(x)=x^3 - 7x^2 - 16x + 112\), \((x-7)\)

      \(x^2\)                                                        
    \(x\) \(x^3\) 0      
    -7 \(\text-7x^2\)        
  2. \(B(x)=2x^3 - x^2 - 27x + 36\), \(\left(x-\frac32\right)\)

      \(2x^2\)                                                              
    \(x\) \(2x^3\) \(2x^2\)      
    \(\text-\frac32\) \(\text-3x^2\)        
  3. \(C(x)=x^3 - 3x^2 - 13x + 15\), \((x+3)\)

                                                                           
    \(x\)          
    3          
  4. \(D(x)=x^4 - 13x^2 + 36\), \((x-2)\), \((x+2)\)

    (Hint: \(x^4 - 13x^2 + 36 = x^4 +0x^3 - 13x^2 +0x + 36\))

                                                                                       
               
               
  5. \(F(x)=4x^4 - 15x^3 - 48x^2 + 109x + 30\), \((x-5)\), \((x-2)\), \((x+3)\)

                                                                                       
               
               


A diagram can also be used to divide polynomials even when a factor is not linear. Suppose we know \((x^2-2x+5)\) is a factor of \(x^4+x^3-5x^2+23x-20\). We could write \((x^4+x^3-5x^2+23x-20)=(x^2-2x+5)(?x^2+?x+?)\). Make a diagram and find the missing factor.

Summary

What are some things that could be true about the polynomial function defined by \(p(x) = x^3 -5x^2 - 2x + 24\) if we know \(p(\text-2)=0\)? If we think about the graph of the polynomial, the point \((\text-2,0)\) must be on the graph as a horizontal intercept. If we think about the expression written in factored form, \((x+2)\) could be one of the factors, since \(x+2=0\) when \(x=\text-2\). How can we figure out whether \((x+2)\) actually is a factor?

Well, if we assume \((x+2)\) is a factor, there is some other polynomial \(q(x)=ax^2+bx+c\) where \(a\), \(b\), and \(c\) are real numbers and \(p(x)=(x+2)q(x)\). (Can you see why \(q(x)\) has to have a degree of 2?) In the past, we have done things like expand \((x+2)(ax^2+bx+c)\) to find \(p(x)\). Since we already know the expression for \(p(x)\), we can instead work out the values of \(a\), \(b\), and \(c\) by thinking through the calculation.

One way to organize our thinking is to use a diagram. We first fill in \((x+2)\) and the leading term of \(p(x)\), \(x^3\). From this start, we see the leading term of \(q(x)\) must be \(x^2\), meaning \(a=1\), since \(x \boldcdot x^2 = x^3\).

\(x^2\)     
\(x\) \(x^3\)
+2

We then fill in the rest of the diagram using similar thinking and paying close attention to the signs of each term. For example, we put in a \(2x^2\) in the bottom left cell because that’s the product of \(2\) and \(x^2\). But that means we need to have a \(\text-7x^2\) in the middle cell of the middle row, since that’s the only other place we will get an \(x^2\) term, and we need to get \(\text-5x^2\) once all the terms are collected. Continuing in this way, we get the completed table:

\(x^2\) \(\text-7x\) +12
\(x\) \(x^3\) \(\text-7x^2\) \(+12x\)
+2 \(+2x^2\) \(\text-14x\) +24

Collecting all the terms in the interior of the diagram, we see that \(x^3-5x^2-2x+24=(x+2)(x^2-7x+12)\), so \(q(x) = x^2-7x+12\). Notice that the 24 in the bottom right was exactly what we needed, and it’s how we know that \((x+2)\) is a factor of \(p(x)\). In a future lesson, we will see why this happened. With a bit more factoring, we can say that \(p(x) = (x+2)(x-3)(x-4)\).

Glossary Entries

  • end behavior

    How the outputs of a function change as we look at input values further and further from 0.

    This function shows different end behavior in the positive and negative directions. In the positive direction the values get larger and larger. In the negative direction the values get closer and closer to -3.

  • multiplicity

    The power to which a factor occurs in the factored form of a polynomial. For example, in the polynomial \((x-1)^2(x+3)\), the factor \(x-1\) has multiplicity 2 and the factor \(x+3\) has multiplicity 1.