Chapter 2.3, Problem 37E

To determine

To write the function $f(x)=x^3-x^2-14x+11$ in the form of $f(x)=(x-k)q(x)+r(x)$ if the value of k is 4. Also, demonstrate $f(k)=r$ using a graph.

Answer to Problem 37E

  $f(x)=(x-4)(x^2+3x-2)+3$

Explanation of Solution

Given:

Function: $f(x)=x^3-x^2-14x+11$

Value of k: 4

Calculation:

1. Expressing given function in the form of $f(x)=(x-k)q(x)+r(x)$

To express the given function in the above form, divide the given function with $x-k=x-4$

  $\Rightarrow (x^3-x^2-14x+11)÷(x-4)$

Dividend: $x^3-x^2-14x+11$

Divisor: $x-4$

Step 1: Writing coefficients of polynomial from given dividend on the right side and constant term of given divisor with opposite sign of the constant on the left side.

  $\begin{array}{ccccc}4& 1& -1& -14& 11\\ & & & & \\ & & & & \end{array}$

Step 2: Now, adding terms in columns and multiplying the results by 4.

  $\begin{array}{ccccc}4& 1& -1& -14& 11\\ & & 4& 12& -8\\ & 1& 3& -2& \boxed{3}\end{array}\begin{array}{c}\\ \\ \leftarrow \text{Remainder}\end{array}$

So, quotient is $x^2+3x-2$ and remainder is 3.

Hence, $f(x)=(x-4)(x^2+3x-2)+3$

2. Demonstration of $f(4)=3$ using graph.

Calculation for graph:

Consider $f(x)=x^3-x^2-14x+11$

Values of x	Values of f (x)
0	11
1	-3
-1	23
2	-13
-2	27

By taking different values of x, the graph can be plotted.

Graph:

Interpretation:

  

By observing graph, the value of $f(k)=f(4)$ is equal to 3.

Therefore, $f(4)=3.$

Conclusion:

Therefore, the given function can be written as $f(x)=(x-4)(x^2+3x-2)+3$ .