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7

THE ROOTS, OR ZEROS,
OF A POLYNOMIAL

The polynomial equation


IN THIS TOPIC we will present the basics of drawing a graph.


1.  What is a polynomial equation?

It is a polynomial set equal to 0.  P(x) = 0.

Example.  P(x) = 5x³ − 4x² + 7x − 8 = 0


2.  What do we mean by a root, or zero, of a polynomial?

It is a solution to the polynomial equation, P(x) = 0.

That is, the number r is a root of a polynomial P(x)  if and only if
P(r) = 0.

Example 1.   Let P(x) = 5x³ − 4x² + 7x − 8.  Then a root of that polynomial is 1, because

  P(1)  =  5· 1³ − 4· 1² + 7· 1 − 8
 
   =  5 − 4 + 7 − 8
 
   =  0

It is traditional to speak of a root of a polynomial.  Of a function in general, we speak of a zero.

Example 2.   The roots of this quadratic

x² −x − 6 = (x + 2)(x − 3)

are −2 and 3.  Those are the values of x that will make the polynomial equal to 0.


3.  What are the x-intercept and y-intercept of a graph?

The x- and y-intercepts.

The x-intercept is that value of x where the graph crosses or touches the x-axis.  At the x-intercept -- on the x-axis --
y = 0.

The y-intercept is that value of y where the graph crosses the y-axis.  At the y-intercept, x = 0.


4.  What is the relationship between the root of a polynomial

4.   and the x-intercepts of its graph?

The roots are the x-intercepts!

The roots are the x-intercepts.

The roots of  x² −x − 6  are −2 and 3.  Therefore, the graph of

y = x² −x − 6

will have the value 0 -- it will cross the x-axis -- at −2 and 3.

5.  How do we find the x-intercepts of the graph of any function
5.   y = f(x)?

Solve the equation, f(x) = 0.

Problem 1.

a)  Find the root of the polynomial 2x + 10.

We must solve the equation, 2x + 10 = 0. The solution is
x = −5.

b)  Where is the x-intercept of the graph of  y = 2x + 10?

At x = −5.   The x-intercept is the root.


Problem 2.

a)  If a product of factors is 0 -- if ab = 0 -- then what may we conclude
a)  about the factors a, b ?

Either a = 0, or b = 0.

b)  Name the roots of this polynomial:

f(x) = (x + 4)(x + 2)(x − 1)

−4,  −2,  1.

c)  Sketch the graph of f(x).  That is, sketch a continuous curve and show
c)  its x-intercepts.

The x-intercepts are the roots.

The x-intercepts are the roots.

As for the y-intercept, it is the value of y when x = 0.  Therefore, the y-intercept of a polynomial is simply the constant term, which is the product of the constant terms of all the factors. (See Topic 6, Example 10.)

As for finding the turning points, that hill and valley, that will have to wait for calculus.


Next Topic:  The slope of a straight line


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