LCM of Polynomials...2

sologuitar · 2023-10-03 16:53:44

Find the LCM of the given polynomial.

x^2 + 4x + 4, x^3 + 2x^2, (x + 2)^3

Bob · 2023-10-03 20:17:01

Hopefully you have done the earlier one by now so you have a good idea what to do.

(1) factorise all the expressions.
(2) build a new expression by including all the factors but leaving out repeats of common factors.

Post an attempt and I'll check it.

Bob

sologuitar · 2023-10-04 10:25:07

Bob wrote:

Hopefully you have done the earlier one by now so you have a good idea what to do.
(1) factorise all the expressions.
(2) build a new expression by including all the factors but leaving out repeats of common factors.
Post an attempt and I'll check it.
Bob

Let me see.

x^2 + 4x + 4, x^3 + 2x^2, (x + 2)^3

Factoring x^2 + 4x + 4, I get (x + 2)(x + 2).

Factoring x^3 + 2x^2, I get x^2(x + 2).

(x + 2)^3 = (x + 2)(x + 2)(x + 2).

From the first group, I take one (x + 2).

From the second group, I take x^2 and (x + 2).

From the third group, I take two (x + 2)(x + 2) because there are 3 of the same.

We put it all together.

My answer is (x + 2)(x^2)(x + 2)(x + 2)^2.

You say?

Bob · 2023-10-04 19:54:18

You've got too many (x+2).

sologuitar · 2023-10-05 04:00:38

Bob wrote:

You've got too many (x+2).

What about removing one (x + 2)?

(x + 2)(x^2)(x + 2)^2.

Bob · 2023-10-05 04:16:55

That's it! I would write like this: x^2(x+2)^3

Bob

sologuitar · 2023-10-05 05:57:36

Bob wrote:

That's it! I would write like this: x^2(x+2)^3
Bob

Very good. I will practice more of these LCM problems. I think they are very important.

Math Is Fun Forum

#1 2023-10-03 16:53:44

LCM of Polynomials...2

#2 2023-10-03 20:17:01

Re: LCM of Polynomials...2

#3 2023-10-04 10:25:07

Re: LCM of Polynomials...2

#4 2023-10-04 19:54:18

Re: LCM of Polynomials...2

#5 2023-10-05 04:00:38

Re: LCM of Polynomials...2

#6 2023-10-05 04:16:55

Re: LCM of Polynomials...2

#7 2023-10-05 05:57:36

Re: LCM of Polynomials...2

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