2 Answers

Mslot · Answer 1 · 2020-10-13T06:50:19+0000

Answer:

The fourth graph (see attachment)

Explanation:

The function
$f(x)=0.03x^2*{(x^2-25)}$ represents a polinomial of grade 4, which means that it has four roots. The roots of a function are those values that make the function equal to zero.
In this particular case, the function f(x) equals zero
$0.03x^2*{(x^2-25)}\\$ =0 in two cases: 1) When the term
, which only happens if x=0; or 2) when
, which can happend if x=5 or if x=-5 (because the product of two negative numbers is possitive).
Then, the function graph must show that, f(x) passes trough zero when x=0 (first case) or when x=5 or x=-5 (second case).The only graph that shows that is the one indicated.
To verify that the function is well depicted, you can replace any specific value of x (for example x=2) in the equation
$f(x)=0.03(2)^2*{(2^2-25)}$ , an see if the graph shows the correct value of f(x) given x, that in this case it is goint to be f(2)=-2.57.

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