Suppose g(x) = {x^2−5x if x≤−1
ax^...

Question

Suppose g(x) = {x^2−5x if x≤−1

ax^3−7 if x>−1.

Determine a value of the constant a for which lim x→−1 g(x) exists and state the value of the limit, if possible.

Accepted Answer

Hello there. Today we're gonna solve the following practice problem together. So, first off, let us read the problem and highlight all the key pieces of information that we need to use in order to solve this problem. Consider the function HF X defined as follows. HF X is equal to the curly bracket of X2 + 4 X, if X is less than or equal to -2. And be multiplied by X to the 3 + 2, if X is greater than -2, calculate the value of the constant B for which the limit which is evaluated as X approaching -2 of H of X exists, and also evaluate the value of the limit. Awesome. So it appears for this particular problem, we're asked to solve for two separate answers. We're trying to figure out the value of our constant B for this particular problem. So that's our first answer. What is the value of B? And we're also trying to figure out the Value of the limit. So we're going to be evaluating the limit to try to figure out what its value is. So with that in mind, let's read off our multiple choice sensors to see what our final answer pair might be, noting that we'll say an answer for B equals some value first, and then we'll say the limit is equal to some value second. So A is 3/4 and 0, B is 4 and 0. C is 3/4 and -4. And D is 4 and 4. OK. So, first off, in order to solve this problem, we need to recall that we need to identify the two parts of the piece-wise function of HFX. So meaning we need to note that for when X is less than or equal to -2, we need to note that H of X is going to be equal to X2 + 4 X, and we need to note that for X is greater than -2, we need to note that H of X will be equal to B multiplied by X to the power of 3 plus. 2, so it's gonna be B multiplied by X to the power of 3 plus 2. Fantastic. So now, our next step is we need to ensure that the limit as X approaches -2 of HF X exists, we need to focus our attention on the left hand limit and the right hand, so we need to focus on the left hand limit and the right hand limit as X approaches -2 in order for it to, so these need to be equal. So in order for the limit as X approaches -2 of H of X to exist, the left hand limit and this right hand limit as X approaches -2, have to be equal to each other. So, we'll call this left limit, so LL, so the left hand limit LL. Is the limit as X approaches -2 from the left. That's what the negative negative sign and the power means. So the limit as X approaches -2 from the left of H of X, this will be equal to the limit, the limit as X approaches -2, so X approaches -2. Of X2. Plus 4 X, fantastic. And secondly, for the right hand limit, which we'll call RL, so the righthand limit, so RL, right hand limit. So this is where you have to focus on the limit as X approaches -2 from the right, because that's what the positive sign and the and the power means. So this positive sign and the power means that we're approaching from the right, whereas the negative symbol means it's approaching from the left. So the limit as X approaches -2 from the right of H of X is going to be equal to the limit, as X approaches -2 of B multiplied by X to the power of 3 + 2. Fantastic. So now, our next step is we need to calculate the left hand limit. So we need to, and I'll write this in red, we need to substitute that X equals -2. Into our expression of X2 + 4 X, fantastic. So when we do that, we will get that the limit as X approaches -2 of X2 + 4 X is equal to when we plug in our known variables, -2 to the power of 2. Plus or multiplied by -2. Which is equal to, let me plug that into our calculator, -4. Awesome. So our next step now, since we solved for our left-hand limit, is we need to set our right hand limit equal to the left hand limit and solve for the numerical value of B. So meaning, so let's make a little note of this in red, so we're substituting in X equals -2. Into our expression of B multiplied by X to the power of 3 + 2. Awesome. So let me do that, we will find that the limit, so we're gonna be taking the limit as X approaches -2 of B multiplied by X to the power of 3 + 2 is equal to B multiplied by -2 to the power of 3. Plus 2, which is equal to -8 multiplied by B. Plus 2. So now we need to set the limits equal to each other, so we need to say -8. B + 2, so -8 B plus. 2 is equal to -4. So now we need to isolate and solve for B. So when we rearrange this equation to isolate and solve for B, so we do a little bit of algebra, when we get B all by itself, you will find that B, our constant, is gonna be equal to 3/4, and that's it. That is our final answer. For our constant be. Hooray, we did it. So now our next step and our final step is we need to state the value of the limit. So since the left hand limit and the right hand limit are equal, that will mean, and let's write this in blue, that the limit As X approaches -2, of H of X will be equal to -4, so that is our final answer for the limit is -4. Awesome. So to quickly recap here, the value for the constant B is 3/4, and the value of the limit is going to be -4, and this corresponds with multiple choice answer letter C, which once again is B equals 3/4. And the limit is equal to -4. Thank you so much for watching. Hopefully that helped, and I can't wait to see you in the next video. Bye.

Suppose g(x) = {x^2−5x if x≤−1
ax^3−7 if x>−1.
Determine a value of the constant a for which lim x→−1 g(x) exists and state the value of the limit, if possible.

Key Concepts

Limit of a Function

Piecewise Functions

Continuity at a Point

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