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  • The function, f of x is equal to 6x squared plus 18x plus 12

  • over x squared minus 4, is not defined

  • at x is equal to positive or negative 2.

  • And we see why that is, if x is equal to positive or negative 2

  • then x squared is going to be equal to positive 4,

  • and 4 minus 4 is 0, and then we're

  • going to have a 0 in the denominator.

  • And that's not defined.

  • We don't know what that happens when you divide-- well we've

  • never defined what happens when you divide by 0.

  • So they say, what value should be assigned to f of negative 2

  • to make f of x continuous at that point?

  • So to think about that, let's try

  • to actually simplify f of x.

  • So f of x-- I'll just rewrite it-- is equal to-- Actually let

  • me just start simplifying right from the get go.

  • So in the numerator I can factor out a 6

  • out of every one of those terms.

  • So it's 6 times x squared plus 3x

  • plus 2 over-- and the denominator, this

  • is a difference of squares.

  • This is x plus 2 times x minus 2.

  • And then we can factor this expression up here.

  • So this is going to be equal to 6 times--

  • let me do it a different color.

  • So we think of two numbers and if I take their product

  • I get 2.

  • If I take their sum I get 3.

  • The most obvious one is 2 and 1.

  • So this is 6 times x plus 2 times x plus 1.

  • When you take the product there you'll

  • get x squared plus 3x plus 2, and then all

  • of that over x plus 2 times x minus 2.

  • Now, if we know that x does not equal negative 2.

  • Then we can divide both the numerator and the denominator

  • by x plus 2.

  • The reason why I'm making that constraint

  • is that if x were to be equal to negative 2

  • then x plus 2 is going to be equal to 0.

  • And you won't be able to do that.

  • You can't.

  • We don't know what it means divide something by 0.

  • So we could say that this is going

  • to be equal to-- so we can divide the numerator

  • and denominator by x plus 2 but we have to assume that x is not

  • equal to negative 2.

  • So this is equal to 6 times-- we're going divided by x plus 2

  • in the numerator, x plus 2 in the denominator--

  • so it's going to be 6 times x plus 1 over x minus 2.

  • And we have to put the constraint here

  • because now we've changed it.

  • Now this expression over here is actually

  • defined at x equals negative 2.

  • But in order to be equivalent to the original function

  • we have to constrain it.

  • So we will say for x not equal to negative 2.

  • And it's also obvious that x can't be equal to 2 here.

  • This one also isn't defined at positive 2

  • because you're dividing by 0.

  • So you could say, for x does not equal to positive or negative

  • 2 if you want to make it very explicit.

  • But they ask us, what could we assign f of negative 2

  • to make the function continuous at the point?

  • Well the function is completely equivalent to this expression

  • except that the function is not defined at x equals negative 2.

  • So that's why we have to put that constraint here

  • if we wanted this to be the same thing as our original function.

  • But if we wanted to re-engineer the function so it

  • is continuous at that point then we just

  • have to set f of x equal to whatever this expression would

  • have been when x is equal to negative 2.

  • So let's think about that.

  • Let's think about that.

  • So 6 times negative 2 plus 1 over negative 2 minus 2

  • is equal to-- this is 6 times negative 1.

  • So it's negative 6 over negative 4, which is equal to 3/2.

  • So if we redefine f of x, if we say f of x is equal to 6x

  • squared plus 18x plus 12 over x squared minus 4.

  • For x not equal positive or negative

  • 2, and it's equal to 3/2 for x equals negative 2.

  • Now this function is going to be the exact same thing

  • as this right over here.

  • This f of x, this new one.

  • This new definition-- this extended definition

  • of our original one-- is now equivalent to this expression,

  • is equal to 6 times x plus 1 over x minus 2.

  • But just to answer their question,

  • what value should be assigned to f of negative 2

  • to make f of x continuous to that point?

  • Well f of x should be-- or f of negative 2 should be 3/2.

The function, f of x is equal to 6x squared plus 18x plus 12

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A2 初級

Defining a function at a point to make it continuous | Limits | Differential Calculus | Khan Academy

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    yukang920108 に公開 2022 年 07 月 05 日
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