Determine the interval(s) on which the following functions are...

Question

Determine the interval(s) on which the following functions are continuous. At which finite endpoints of the intervals of continuity is f continuous from the left or continuous from the right?

f(x)=(2x−3)^2/3

Accepted Answer

Hi everyone, let's take a look at this practice upon dealing with continuity. This problem says define the interval for the continuity of the function and also identify the endpoints for which the function is left continuous or right continuous. The function that we're given is G of X is equal to the quantity of 5 X minus 19 in quantity raised to the 2 divided by 3. We're given 4 possible choices as our answers. For choice A, we have the right open interval of 19 divided by 5 to infinity, and that is right continuous at 19 divided by 5. For choice B, we have the left open interval of minus infinity to 19 divided by 5, and that is left continuous at 19 divided by 5. For choice C, we have the right open interval of -19 divided by 5 to infinity, and that is right continuous at -19 divided by 5. And for choice D, we have the open interval from minus infinity to infinity, and that is continuous at all points. Now, we need to determine the interval of continuity for our function, and I notice that our function has a fractional power. And so what we're going to do is actually write that fractional power in terms of roots. And so we can rewrite G of X. As being equal to the cube root. Of the quantity Of 5 X minus 19 in quantity squared. And so now if I look at this function. Um, I actually have 3 types of function. I have a cube root function, I have a squared function, and then I have a linear function. Now our cube root is a continuous function over its entire domain, and its domain is the entire real line. Likewise, when I square a quantity, that function is um continuous on its domain, and its domain is the entire real line. And then finally, we have our linear function, the 5 X minus 19. And a linear function is continuous everywhere in this domain, and that domain in this case is the entire real line. So, GFX is a composition of three continuous functions, whose domain is the entire real line. And so that means its interval of continuity is going to be the entire real line. And we can write that in an interval notation as the open interval from minus infinity to infinity. So that's gonna be my interval of continuity. And this interval has no endpoints, so we don't really have any invoice end points to evaluate whether the function is left continuous or right continuous. That's because our function is continuous at all points on the real line. So, with that information, we can look at our answer choices, and the correct answer choice corresponds to answer choice D. So I hope that this explanation has been helpful, and I'll see you in the next video.

Determine the interval(s) on which the following functions are continuous. At which finite endpoints of the intervals of continuity is f continuous from the left or continuous from the right?

f(x)=(2x−3)^2/3

Key Concepts

Continuity of Functions

Endpoints of Intervals

Piecewise Functions and Roots

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