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  • We're asked to graph the circle.

  • And they give us this somewhat crazy looking equation.

  • And then we could graph it right over here.

  • And to graph a circle, you have to know where its center is,

  • and you have to know what its radius is.

  • So let me see if I can change that.

  • And you have to know what its radius is.

  • So what we need to do is put this in some form

  • where we can pick out its center and its radius.

  • Let me get my little scratch pad out and see if we can do that.

  • So this is that same equation.

  • And what I essentially want to do

  • is I want to complete the square in terms of x,

  • and complete the square in terms of y, to put it into a form

  • that we can recognize.

  • So first let's take all of the x terms.

  • So you have x squared and 4x on the left-hand side.

  • So I could rewrite this as x squared plus 4x.

  • And I'm going to put some parentheses around here,

  • because I'm going to complete the square.

  • And then I have my y terms.

  • I'll circle those in-- well, the red

  • looks too much like the purple.

  • I'll circle those in blue.

  • y squared and negative 4y.

  • So we have plus y squared minus 4y.

  • And then we have a minus 17.

  • And I'll just do that in a neutral color.

  • So minus 17 is equal to 0.

  • Now, what I want to do is make each

  • of these purple expressions perfect squares.

  • So how could I do that here?

  • Well, this would be a perfect square if I took half of this 4

  • and I squared it.

  • So if I made this plus 4, then this entire expression

  • would be x plus 2 squared.

  • And you can verify that if you like.

  • If you need to review on completing the square,

  • there's plenty of videos on Khan Academy on that.

  • All we did is we took half of this coefficient

  • and then squared it to get 4.

  • Half of 4 is 2, square it to get 4.

  • And that comes straight out of the idea if you take x plus 2

  • and square it, it's going to be x squared plus twice

  • the product of 2 and x, plus 2 squared.

  • Now, we can't just willy-nilly add a 4 here.

  • We had an equality before, and just adding a 4,

  • it wouldn't be equal anymore.

  • So if we want to maintain the equality,

  • we have to add 4 on the right-hand side as well.

  • Now, let's do the same thing for the y's.

  • Half of this coefficient right over here is a negative 2.

  • If we square negative 2, it becomes a positive 4.

  • We can't just do that on the left-hand side.

  • We have to do that on the right-hand side as well.

  • Now, what we have in blue becomes y minus 2 squared.

  • And of course, we have the minus 17.

  • But why don't we add 17 to both sides

  • as well to get rid of this minus 17 here?

  • So let's add 17 on the left and add 17 on the right.

  • So on the left, we're just left with these two expressions.

  • And on the right, we have 4 plus 4 plus 17.

  • Well, that's 8 plus 17, which is equal to 25.

  • Now, this is a form that we recognize.

  • If you have the form x minus a squared plus y minus b squared

  • is equal to r squared, we know that the center is at the point

  • a, b, essentially, the point that

  • makes both of these equal to 0.

  • And that the radius is going to be r.

  • So if we look over here, what is our a?

  • We have to be careful here.

  • Our a isn't 2.

  • Our a is negative 2. x minus negative 2 is equal to 2.

  • So the x-coordinate of our center

  • is going to be negative 2, and the y-coordinate of our center

  • is going to be 2.

  • Remember, we care about the x value that makes this 0,

  • and the y value that makes this 0.

  • So the center is negative 2, 2.

  • And this is the radius squared.

  • So the radius is equal to 5.

  • So let's go back to the exercise and actually plot this.

  • So it's negative 2, 2.

  • So our center is negative 2, 2.

  • So that's right over there.

  • X is negative 2, y is positive 2.

  • And the radius is 5.

  • So let's see, this would be 1, 2, 3, 4, 5.

  • So you have to go a little bit wider than this.

  • My pen is having trouble.

  • There you go.

  • 1, 2, 3, 4, 5.

  • Let's check our answer.

  • We got it right.

We're asked to graph the circle.

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A2 初級

補正方形寫方程的標準形式的圓|代數二|可汗學院 (Completing the square to write equation in standard form of a circle | Algebra II | Khan Academy)

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    onyi 發佈於 2021 年 01 月 14 日
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