282,302 views
5 votes
5 votes
Below is the graph of a polynomial function with real coefficients. All local extrema of the function are shown in the graph.

Below is the graph of a polynomial function with real coefficients. All local extrema-example-1
Below is the graph of a polynomial function with real coefficients. All local extrema-example-1
Below is the graph of a polynomial function with real coefficients. All local extrema-example-2
User Umar Karimabadi
by
3.0k points

2 Answers

22 votes
22 votes

(a) The function is increasing over the intervals (-∞, -5), (-2, 2), and (6, ∞)

(b) The function has local minima at x = -2, 6.

(c) The sign of the function's leading coefficient is positive.

(d) A possibility for the degree of the function is 5.

Part a,

For any given function, y = f(x), if the output value is increasing when the input value is increased, then, the function is generally referred to as an increasing function.

By critically observing the graph of this polynomial function above, we can logically deduce that it is increasing over the following intervals;

increasing = (-∞, -5), (-2, 2), and (6, ∞).

Part b.

The local minimum refers to the x-value at which the derivative of a function gives the minimum output value. Hence, a local minima is a point that has the least y-value, compared to other surrounding points.

Therefore, this polynomial function has local minima at the following points;

(-2, -1) ⇒ x = -2

(6, -3) ⇒ x = 6.

Part c.

Since this polynomial function falls to the left and rise to the right, then it is an odd degree function with a positive leading coefficient.

Part d.

The degree of a polynomial function is the greatest exponent (leading coefficient) of each of its term. If an x-intercept passes through the x-axis, then the zeros has a multiplicity of 1.

Based on the graph, the x-intercepts are -6, -3.2, -0.8, 4, and 7.1, so a possibility for the degree of this function is 5.

User Ljuk
by
3.0k points
21 votes
21 votes

Given

A graph of a polynomial with the real coefficients.

To find:

a) The intervals in which the function is increasing is,


\begin{gathered} (-\infty,-5) \\ (-2,2) \\ (6,\infty) \end{gathered}

b) The value of x at which the unction has local minima.

From the graph shown in the figure, there is only one local minimum at x=-2.

c) The sign of the functions leading coefficient is positive.

Since the graph is moving upwards.

d) The degree of the function is 5.

User Sean Cogan
by
2.9k points