Question 3.3.4: Finding a Polynomial Function That Satisfies Given Condition...

(a) These three zeros give x – (-1) = x + 1, x – 2, and x – 4 as factors of ƒ(x). Because ƒ(x) is to be of degree 3, these are the only possible factors by the number of zeros theorem. Therefore, ƒ(x) has the form

ƒ(x) = a(x + 1)(x – 2)(x – 4),        for some real number a.

To find a, use the fact that ƒ(1) = 3.

ƒ(1) = a(1 + 1)(1 – 2)(1 – 4)        Let x = 1.

3 = a(2)(-1)(-3)                          ƒ(1) = 3

3 = 6a                                       Multiply.

a =\frac{1}{2}                                       Divide by 6.

Thus,    ƒ(x) = \frac{1}{2} (x + 1)(x – 2)(x – 4)  ,  \text{Let}  a = \frac{1}{2}.

or,         ƒ(x) = \frac{1}{2} x³ – \frac{5}{2} x² + x + 4.    Multiply.

(b) The polynomial function ƒ(x) has the following form.

ƒ(x) = a(x + 2)(x + 2)(x + 2)         Factor theorem

ƒ(x) = a(x + 2)³                           (x + 2) is a factor three times.

To find a, use the fact that ƒ(-1) = 4.

ƒ(-1) = a(-1 + 2)³      Let x = -1.

4 = a(1)³                    ƒ(-1) = 4

a = 4                       Solve for a.

Thus,    ƒ(x) = 4(x + 2)³,

or,         ƒ(x)= 4x³ + 24x² + 48x + 32.       Multiply.