In this problem, we must analyze the behaviour of the function:
[tex]f(x)=(x+2)^2\cdot(x-1)^2.[/tex]
(a) Plotting the function, we get the following graph:
We see that the end behaviour of function is: rises on both sides.
(b) By looking at the expression of the polynomial f(x), we see that it has:
• a zero at x = -2 with multiplicity 2,
,
• a zero at x = 1 with multiplicity 2.
The graph a polynomial has the following behaviour according to its zeros:
Using this data, we conclude that the function:
• do not cross the x-axis,
,
• touches but do not cross the x-axis at x = -2, 1.
(c) The y-intercept is the value of y = f(0), the value of f(x) when x = 0:
[tex]f(0)=(0+2)^2\cdot(0-1)^2=4\cdot1=4.[/tex]
(d) The function has:
• zeros of order two at x = -2 and x = 1, so it touches but does not cross the a-axis there,
,
• y-intercept at y = 4.
The graph of the function and the x-intercept and y-intercept points is:
Answer
(a) rises on both sides
(b)
• do not cross the x-axis
,
• touches but do not cross the x-axis at x = ,-2, 1
(c) y-intercept = 4
