Hey guys, do you know any Rational Expressions that when multiplied you can get the product x+2/x-1? If so, can you tell me, please I need it. . Created by KeonJace. Math

Find any two rational expressions that when multiplied you can get this product:(x - 3)/(x-1) and (x + 2)/(x - 3)If you want a product of two fractions to be a/b then 'a' must be a factor in the numerator of one of them, and 'b' must be a factor in the denominator of one of them.______________________________________'a' and 'b' are already in the numerator and denominator of a/b,so we can choose the other fraction to be something has a value of 1 such as c/c.(a/b)(c/c) = (ac)/(bc) = a/bThe intermediate product (before we reduce the result) has a numerator of 'ac' and a denominator of 'bc'.We can split those into two parts however we like.For example we can be the same result by multiplying...(a/c)(c/b) = (ac)/(bc) = a/bSo, a simple answer to your question could be...______________________________________The idea is multiply the given result by 1 in some form. The form can be as complicated as you like, and its factors can be grouped anyway you like.______________________________________

x-1? If so, can you tell me, please I need it. ...

Mathematocion

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$\huge\bold\red{{Question:}}$

Find any two rational expressions that when multiplied you can get this product:

$\frac{x + 2}{x - 1}$

$\huge\bold\red{{Answer:}}$

(x - 3)/(x-1) and (x + 2)/(x - 3)

If you want a product of two fractions to be a/b then 'a' must be a factor in the numerator of one of them, and 'b' must be a factor in the denominator of one of them.

______________________________________

'a' and 'b' are already in the numerator and denominator of a/b,so we can choose the other fraction to be something has a value of 1 such as c/c.

(a/b)(c/c) = (ac)/(bc) = a/b

The intermediate product (before we reduce the result) has a numerator of 'ac' and a denominator of 'bc'.We can split those into two parts however we like.For example we can be the same result by multiplying...

(a/c)(c/b) = (ac)/(bc) = a/b

So, a simple answer to your question could be...

$\binom{x - 3}{ x - 1} \times \binom{ x + 2}{ x - 3} = \frac{ x + 1}{x - 1}$

______________________________________

The idea is multiply the given result by 1 in some form. The form can be as complicated as you like, and its factors can be grouped anyway you like.

______________________________________

$\small\bold\red{{StrawHatPiratesSquad}}$

Mathematocion i hope it will helped , my friend !

Fredplays10 how long did you work on this

KeonJace Maraming² salamat pre!

Mathematocion Welcome!

Fredplays10 online kq pala eh

Fredplays10 patulong

Mathematocion If you have any math question , feel free to ask me , ma friend !

KeonJace ✨✨

Fredplays10 keonjace

Fredplays10 patulong sa filipino

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