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  • - [Instructor] Let's say that we wanted to multiply

  • five x squared and, I'll do this in purple,

  • three x to the fifth, what would this equal?

  • Pause this video and see if you can

  • reason through that a little bit.

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

  • And really, all we're going to do

  • is use properties of multiplication

  • and use properties of exponents

  • to essentially rewrite this expression.

  • So we can just view this,

  • if we're just multiplying a bunch of things,

  • it doesn't matter what order we multiply them in.

  • So you can just view this as five times x squared

  • times three times x to the fifth,

  • or we could multiply our five and three first,

  • so you could view this as five times three, times three,

  • times x squared, times x squared,

  • times x to the fifth, times x to the fifth.

  • And now what is five times three?

  • I think you know that, that is 15.

  • Now what is x squared times x to the fifth?

  • Now some of you might recognize

  • that exponent properties would come into play here.

  • If I'm multiplying two things like this,

  • so we have the some base and different exponents,

  • that this is going to be equal to x to the,

  • and we add these two exponents,

  • x to the two plus five power, or x to the seventh power.

  • If what I just did seems counterintuitive to you

  • I'll just remind you, what is x squared?

  • x squared is x times x.

  • And what is x to the fifth?

  • That is x times x times x times x times x.

  • And if you multiply them all together what do you get?

  • Well you got seven x's

  • and you multiply them all together

  • and that is x to the seventh.

  • And so there you have it,

  • five x squared times three x to the fifth

  • is 15x to the seventh power.

  • So the key is, is look at these coefficients,

  • look at these numbers, a five and a three, multiply those,

  • and then for any variable you have,

  • you have x here, so you have a common base,

  • then you can add those exponents,

  • and what we just did is known as multiplying monomials,

  • which sounds very fancy, but this is a monomial, monomial,

  • and in the future we'll do

  • multiplying things like polynomials

  • where we have multiple of these things added together.

  • But that's all it is, multiplying monomials.

  • Let's do one more example,

  • and let's use a different variable this time,

  • just to get some variety in there.

  • Let's say we wanna multiply the monomial

  • three t to the seventh power,

  • times another monomial negative four t.

  • Pause this video and see if you can work through that.

  • All right, so I'm gonna do this one a little bit faster.

  • I am going to look at the three and the negative four

  • and I'm gonna multiply those first,

  • and I'm going to get a negative 12.

  • And then if I were to want to multiply

  • the t to the seventh times t,

  • once again they're both the variable t as our base,

  • so that's going to be t to the seventh

  • times t to the first power, that's what t is,

  • that's going to be t to the seven plus one power,

  • or t to the eighth.

  • But there you go, we are done again,

  • we just multiplied another set of monomials.

- [Instructor] Let's say that we wanted to multiply

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B1 中級

単項式の掛け算|多項式算数|代数2|カーンアカデミー (Multiplying monomials | Polynomial arithmetic | Algebra 2 | Khan Academy)

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    林宜悉 に公開 2021 年 01 月 14 日
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