In Exercises 1–30, find the domain of each function. h(x) = √(x −...

Question

In Exercises 1–30, find the domain of each function. h(x) = √(x −2)+ √(x +3)

Accepted Answer

Welcome back. I'm so glad you're here. We are given this function F of X equals the square root of X minus 11 plus the square root of X plus 11? We are asked to find the domain. Well, we have a couple of domain restrictions here and we know that anything inside the radical must be greater than or equal to zero. So let's set what's inside both radicals greater than or equal to zero. So we have X minus 11 is greater than or equal to zero and X plus 11 is greater than or equal to zero. And we'll do this math to get X by itself. So for X minus 11 that's going to be X is greater than or equal to 11 and for X plus 11 is greater than or equal to zero. Will subtract 11 from both sides and we get X is greater than or equal to negative 11. Well, interesting. Let's draw this out on a number line. So if we're going from negative infinity all the way up to infinity we have a zero somewhere in the middle and X has to be greater than or equal to 11. Okay, so let's say that that's here. Here's 11. I'm going to put in a filled in circle to say it could be equal to but it's greater than or equal to. So we're heading up to positive infinity. There's one of them An x must be greater than or equal to negative 11. Alright, -11 is down here. We'll fill this in and it's got to be greater than or equal to that. Okay, well which line wins here? Well let's think about this. If the negative 11 if it could be greater than or equal to negative 11, that means we could substitute any number from here in for X. So let's just choose zero because zero is pretty easy. And then up here in our function, if we substitute in zero we would have the square root of zero minus 11 plus the squared of zero plus 11. And look 0 -11. That's the square root of a negative number. And that is imaginary. We don't want imaginary numbers for our domain for X. So this one on the right supersedes this one wins. And so it's going to be X. Must be greater than or equal to positive 11. How do we express that interval notation? Will we use a bracket to express that? It could be 11 because it's greater than or equal to. So it bracket 11 comma and then it can go all the way up to infinity. And we close infinity with a parentheses because we can never quite obtain infinity. We look at our answer choices in this matches. Answer choice B. Well done. We'll catch you on the next one

In Exercises 1–30, find the domain of each function. h(x) = √(x −2)+ √(x +3)

Key Concepts

Domain of a Function

Square Root Function

Inequalities

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