The graph does not represent a normal curve since:
- No, because the graph has multiple peaks.
- No, because the graph approaches the X-axis as X increases and decreases without bound.
Graphically speaking, the probability density function of a normal distribution has the following characteristics:
- It has a single "peak" at a value of [tex]x[/tex] associated to the mean.
- The function is distributed symmetrically.
- The y-value of the function tends to be zero when [tex]x \to \pm \infty[/tex].
The curve presented in the image only observes the condition described in 2. Therefore, we conclude that correct choices are:
- No, because the graph has multiple peaks.
- No, because the graph approaches the X-axis as X increases and decreases without bound.
We kindly invite to check this question on normal curves: https://brainly.com/question/15992479
