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Sketch the graph of the polynomial function. Use synthetic division and the remainder theorem to find the zeros.

Sketch the graph of the polynomial function. Use synthetic division and the remainder-example-1
User Jan Salawa
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1 Answer

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GIVEN:

We are given the following polynomial;


f(x)=x^4-2x^3-25x^2+2x+24

Required;

We are required to sketch the graph of the function. Also, to use the synthetic division and the remainder theorem to find the zeros.

Step-by-step solution;

We shall begin by sketching a graph of the polynomial function.

From the graph of this polynomial, we can see that there are four points where the graph crosses the x-axis. These are the zeros of the function. One of the zeros is at the point;


(-1,0)

That is, where x = -1, and y = 0.

We shall take this factor and divide the polynomial by this factor.

The step by step procedure is shown below;

Now we have the coefficients of the quotient as follows;


1,-3,-22,24

That means the quotient is;


x^3-3x^2-22x+24

We can also divide this by (x - 1) and we'll have;

We now have the coefficients of the quotient after dividing a second time and these are;


x^2-2x-24

The remaining two factors are the factors of the quadratic expression we just arrived at.

We can factorize this and we'll have;


\begin{gathered} x^2-2x-24 \\ \\ x^2+4x-6x-24 \\ \\ (x^2+4x)-(6x+24) \\ \\ x(x+4)-6(x+4) \\ \\ (x-6)(x+4) \end{gathered}

The zeros of this polynomial therefore are;


\begin{gathered} f(x)=x^4-2x^3-25x^2+2x+24 \\ \\ f(x)=(x+1)(x-1)(x-6)(x+4) \\ \\ Where\text{ }f(x)=0: \\ \\ (x+1)(x-1)(x-6)(x+4)=0 \end{gathered}

Therefore;

ANSWER:


\begin{gathered} x+1=0,\text{ }x=-1 \\ \\ x-1=0,\text{ }x=1 \\ \\ x-6=0,\text{ }x=6 \\ \\ x+4=0,\text{ }x=-4 \end{gathered}

Sketch the graph of the polynomial function. Use synthetic division and the remainder-example-1
Sketch the graph of the polynomial function. Use synthetic division and the remainder-example-2
User Paul Bellora
by
2.1k points
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