Placeholder Image

字幕表 動画を再生する

  • - [Instructor] Let's say we wanna solve

  • the following equation for x.

  • We have x plus one over nine minus x is equal to 2/3.

  • Pause this video and see if you can try this

  • before we work through it together.

  • All right now let's work through this together.

  • Now, the first thing that we might wanna do,

  • there's several ways that you could approach this,

  • but the thing I like to do is

  • get rid of this x here in the denominator.

  • And the easiest way I can think of doing that,

  • is by multiplying both sides

  • of this equation by nine minus x.

  • Now, when you do that,

  • it's important that you then put the qualifier

  • that the x cannot be equal to the value

  • that would have made this denominator zero 'cause clearly

  • if somehow you do all this algebraic manipulation

  • and you got x is equal to nine

  • that still wouldn't be a valid solution

  • 'cause if you were to substitute nine

  • back into the original equation

  • you'd be dividing by zero in the denominator.

  • So, let's just put that right over here,

  • x cannot be equal to nine.

  • And so then, we can safely move ahead

  • with our algebraic manipulations.

  • So on the left-hand side,

  • as long as x does not equal nine, if we multiply,

  • and divided by nine minus x they cancel out,

  • and we'll just be left with an x plus one,

  • and on the right-hand side,

  • if you multiply 2/3 times nine minus x,

  • we get 2/3 times nine is six

  • and then 2/3 times negative x is negative 2/3 x

  • and once again, let's remind ourselves,

  • that x cannot be equal to nine.

  • And then we can get all of our x's on the same side

  • so let's out that on the left.

  • So let's add 2/3 x to both sides.

  • So plus 2/3, 2/3 x plus 2/3 x,

  • and then, what do we have?

  • Well, on the left-hand side we have one x

  • which is the same thing as 3/3 x plus 2/3 x

  • is going to give us 5/3 x plus one is equal to six,

  • and then these characters cancel out.

  • And then we can just subtract one from both sides,

  • and we get 5/3 x, 5/3 x is equal to five.

  • And then, last but not least,

  • we can multiply both sides of this equation,

  • times the reciprocal of 5/3

  • which is of course 3/5,

  • and I'm doing that

  • so I just have an x isolated on the left-hand side.

  • So times 3/5,

  • and we are left with 3/5 times 5/3

  • is of course equal to one.

  • So we're left with x is equal to five times 3/5 is three.

  • And so we're feeling pretty good about x equals three,

  • but we have to make sure that that's consistent

  • with our original expression.

  • Well if we look up here,

  • or if you substitute back x equals three,

  • you don't get a zero in the denominator,

  • x is not equal to nine.

  • X equals three is consistent with that.

  • So we should feel good about our solution.

  • If we did all this algebraic manipulation

  • and we get an x is equal to nine,

  • then that still wouldn't be a valid solution

  • because it would have made

  • the original expression on the left be undefined.

- [Instructor] Let's say we wanna solve

字幕と単語

ワンタップで英和辞典検索 単語をクリックすると、意味が表示されます

A2 初級

有理方程式入門|代数2|カーンアカデミー (Rational equations intro | Algebra 2 | Khan Academy)

  • 3 0
    林宜悉 に公開 2021 年 01 月 14 日
動画の中の単語