In Exercises 5–8, determine whether the graph of the function ...

Question

In Exercises 5–8, determine whether the graph of the function is symmetric about the 𝔂-axis, the origin, or neither.

𝔂 = e⁻ˣ²

Accepted Answer

Welcome back, everyone. For the given function Y equals E to the negative X, is it symmetric about the Y axis, the origin, or neither? A says the function is symmetric only about the y axis. B, it's symmetric only about the origin. C about both the y axis and the origin, and the D about the y axis, neither symmetric about the Y axis nor the origin. Now, if we're going to figure this out, we need to ask ourselves, what do we know about functions that are symmetric about the Y axis and those that are symmetric about the origin. Well, let's start with the Y axis. Recall that a function is symmetric above the y axis. OK. Function is symmetric above the y axis. If F of negative X is equal to F of X or all values of X in the domain. So if we substitute negative X into FFX and it turns out to give us what FFX is, then that means it is symmetric about the Y axis. So let's go ahead and do that. No F of negative X would be equal toe negative negative X, and that is going to be E X E X is not the same as e negative X. Therefore, our function is not symmetric about the y axis, OK. Not symmetric about a y-axis. Now what about its symmetry about the origin? What do we know? Well, again, recall that a function is symmetric above the origin. Mhm. If F of negative X is equal to negative F of X for all values of X in the domain. Now we know that FFX equals E to the negative X. So, and we already know that FF negative X is E X. So what is negative FF X? Well, negative F of X would be equal to negative E to the negative X, and that is not equal to F of negative X, which is E to the X. Therefore, our function is not symmetric about the origin. So, let me just write that out here. Not symmetric about the origin. So what does that mean for us? Well, now we know that the function is neither symmetric above the y axis, neither is it symmetric about the origin. If we look back on our answer choices, that means D is the correct answer. Thanks a lot for watching everyone. I hope this video helped.

In Exercises 5–8, determine whether the graph of the function is symmetric about the 𝔂-axis, the origin, or neither.

𝔂 = e⁻ˣ²

Key Concepts

Symmetry about the y-axis

Symmetry about the origin

Exponential functions

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