Let g(x)= {1 if x≥0
−1 if x

Question

Let g(x)= {1 if x≥0

−1 if x<0.

a. Write a formula for |g(x)|.

Accepted Answer

Hi, everyone, let's take a look at this practice problem. This problem says, let H of Y be a piecewise function defined as follows. H of Y is equal to 2 if Y is greater than 5, and minus 2 if Y is less than or equal to 5. Determine the value of the absolute value of H of Y. We're given 4 possible choices as our answers. For choice A, we have 5, for choice B, we have 0. for choice C, we have minus 2, and for choice D, we have 2. Now we're asked to determine the absolute value of H of Y. And so what we need to do is to take the absolute value of each piece of our piece-wise function. So we're gonna start off with the piece that has greater than 5. So in this case, the absolute value of H of Y. It's going to be equal to the absolute value of 2, since H of Y is equal to 2, that means the absolute value of H of Y is going to be equal to the absolute value of 2, which that is just going to be equal to 2. What is the same thing? Or less than or equal to 5. To the absolute value of H of Y. It's going to be equal to, and H of Y is equal to -2 in this case, or Y less than or equal to 5. And so this is going to be equal to the absolute value of -2, which when I take the absolute value of -2, this is just going to be equal to 2. So, in both cases, when Y is greater than 5, and Y is less than or equal to 5, our absolute value of H of Y is equal to 2. So, regardless of the value of Y, our absolute value of H of Y is going to be equal to 2. And so that is the answer that we're looking for. And so that actually corresponds to answer choice D. So, I hope that this explanation has been useful, and I'll see you in the next video.

Let g(x)= {1 if x≥0
−1 if x<0.

a. Write a formula for |g(x)|.

Key Concepts

Piecewise Functions

Absolute Value Function

Function Composition

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