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)=√x^2−3x+2

Accepted Answer

Hi everyone, let's take a look at this practice problem dealing with continuity. This problem says find the interval of continuity for the function. Also identify the endpoints for which the function is left continuous or right continuous. And we're given the function G of X is equal to the square root of the quantity of X2 minus 31 X plus 240. We're given 4 possible choices as our answers. For choice A, we have the left open interval of minus infinity to 15, and it's left continuous at 15. For choice B, we have the right open interval of 16 to infinity, and that is right continuous at 16. For choice C, we have the left open interval of minus infinity 215 union with the right open interval of 16 to infinity, and it is right continuous at 15 and left continuous at 16. And for choice D, we have the left open interval of minus infinity 215, union with the right open interval of 16 to infinity, and it is right continuous at 16 and left continuous at 15. So, in order for us to determine the interval of continuity for a function, we need to actually determine the domain at which this function is defined. And so, in order for the function to be defined, we need the polynomial underneath the square root sign to be greater than or equal to zero, because we need a positive quantity underneath the radical in order for the function to be defined. So that means that the quantity of X2 minus 31 X. Plus 240 has to be greater than or equal to 0. Now, we can actually factor this polynomial, and doing so, we'll get the quantity of X minus 15. In quantity, multiplied by the quantity of X minus 16 in quantity, that has to be greater than or equal to 0. This gives us two critical points. One at X equals to 15, and another at X equals to 16. So we need to look at the infos that are bounded by these two critical points. So the first interval that we're going to look at is going to be the open interval, going from minus infinity to 15. And in this interval, we'll actually look at our two factors multiplied together and determine whether it's a positive or negative quantity. So in order for the function to be defined on this interval, it needs to be a positive quantity. So we're gonna have the factor of X minus 15. And that quantity is multiplied by the factor of X minus 16. Now, in this case, in this interval, X is always going to be less than 15. So, our first term is always going to be negative. As well as our second term. So that means overall, I'll have a negative multiplied by a negative number, which gives me a positive number. So this means that this quantity is always going to be greater than 0. Now, for our next interval, it's going to be the open interval from 15 to 16. Again, we'll look at our two factors. So we'll have the quantity of X minus 15. In quantity multiplied by the quantity of X minus 16 in quantity. Now, in this case, X is going to be greater than 15, so our first term, our first factor there, X minus 15 is going to be always positive. But our second factor, the X minus 16, is always going to be negative, since X is always going to be less than 16. So here I have a positive value multiplied by negative value, that'll give me a negative number, so this quantity is always less than 0. And then for the final open interval, it's gonna be from 16 to infinity. And again, we'll look at our two factors, so we'll have the quantity of X minus 15. In quantity, multiplied by the quantity of X minus 16. In Quanti And here, X is always going to be greater than 16. So my first factor, the X minus 15, is going to be positive, as well as our second factor X minus 16 is going to be positive. So overall, when I multiply these two values together, I'll have a positive quantity, so this is going to be greater than 0. So the two domains. That I can have my function be defined one, it's going to be the open interval going from minus infinity to 15, as well as the open interval going from 16 to infinity. The open interval from 15 to 16 is not valid. Now, I need to include my critical points as the end points, and in this case, those, when I plug in the values for my two endpoints, the 15 and the 16, um, are polynomial value weights to 0, which is a valid point for our function. So that means that we can write our domain to be the left open interval from minus infinity to 15. Union with the right open interval. Of 16 to infinity. And so here we've actually included the points X equals 15 and X equal to 16 in our intervals. And so this will be the domain of our function, and our function is continuous on this domain, since we have the uh square root of an even polynomial. So, therefore, that's always going to be continuous on the domain. So this is our interval of continuity. Now we need to determine whether the endpoints are left continuous or right continuous. And so we're gonna look at X equal to 15 1st. And in this case, X equal to 15 is going to be left continuous. And that's because our function. is defined and continuous. To the left of X equal to 15. And likewise, if we look at X equal to 16, This endpoint is going to be right continuous. That's because the function. is defined and continuous to the right of X equal to 16. So those are the continuities for our two endpoints. And now that we have all this information, we can look at our answer choices. And if we look at our answer choices, it appears that the correct answer choice is answer choice D. So, I hope that this explanation has been useful, 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)=√x^2−3x+2

Key Concepts

Continuity of Functions

Finding Intervals of Continuity

One-Sided Limits

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