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x ( x 1 ) 3 = 3 x ( x 1 )

So, both sides of the equation would be multiplied by 3 x ( x 1 ) . Leave the LCD in factored form, as this makes it easier to see how each denominator in the problem cancels out.

Another example is a problem with two denominators, such as x and x 2 + 2 x . Once the second denominator is factored as x 2 + 2 x = x ( x + 2 ) , there is a common factor of x in both denominators and the LCD is x ( x + 2 ) .

Sometimes we have a rational equation in the form of a proportion; that is, when one fraction equals another fraction and there are no other terms in the equation.

a b = c d

We can use another method of solving the equation without finding the LCD: cross-multiplication. We multiply terms by crossing over the equal sign.

Multiply a ( d ) and b ( c ) , which results in a d = b c .

Any solution that makes a denominator in the original expression equal zero must be excluded from the possibilities.

Rational equations

A rational equation    contains at least one rational expression where the variable appears in at least one of the denominators.

Given a rational equation, solve it.

  1. Factor all denominators in the equation.
  2. Find and exclude values that set each denominator equal to zero.
  3. Find the LCD.
  4. Multiply the whole equation by the LCD. If the LCD is correct, there will be no denominators left.
  5. Solve the remaining equation.
  6. Make sure to check solutions back in the original equations to avoid a solution producing zero in a denominator

Solving a rational equation without factoring

Solve the following rational equation:

2 x 3 2 = 7 2 x

We have three denominators: x , 2 , and 2 x . No factoring is required. The product of the first two denominators is equal to the third denominator, so, the LCD is 2 x . Only one value is excluded from a solution set, 0. Next, multiply the whole equation (both sides of the equal sign) by 2 x .

2 x [ 2 x 3 2 ] = [ 7 2 x ] 2 x 2 x ( 2 x ) 2 x ( 3 2 ) = ( 7 2 x ) 2 x Distribute  2 x . 2 ( 2 ) 3 x = 7 Denominators cancel out . 4 3 x = 7 −3 x = 3 x = −1 or { −1 }

The proposed solution is −1, which is not an excluded value, so the solution set contains one number, x = −1 , or { −1 } written in set notation.

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Solve the rational equation: 2 3 x = 1 4 1 6 x .

x = 10 3

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Solving a rational equation by factoring the denominator

Solve the following rational equation: 1 x = 1 10 3 4 x .

First find the common denominator. The three denominators in factored form are x , 10 = 2 5 , and 4 x = 2 2 x . The smallest expression that is divisible by each one of the denominators is 20 x . Only x = 0 is an excluded value. Multiply the whole equation by 20 x .

20 x ( 1 x ) = ( 1 10 3 4 x ) 20 x 20 = 2 x 15 35 = 2 x 35 2 = x

The solution is 35 2 .

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Solve the rational equation: 5 2 x + 3 4 x = 7 4 .

x = 1

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Solving rational equations with a binomial in the denominator

Solve the following rational equations and state the excluded values:

  1. 3 x 6 = 5 x
  2. x x 3 = 5 x 3 1 2
  3. x x 2 = 5 x 2 1 2
  1. The denominators x and x 6 have nothing in common. Therefore, the LCD is the product x ( x 6 ) . However, for this problem, we can cross-multiply.

    3 x 6 = 5 x 3 x = 5 ( x 6 ) Distribute . 3 x = 5 x 30 −2 x = −30 x = 15

    The solution is 15. The excluded values are 6 and 0.

  2. The LCD is 2 ( x 3 ) . Multiply both sides of the equation by 2 ( x 3 ) .

    2 ( x 3 ) [ x x 3 ] = [ 5 x 3 1 2 ] 2 ( x 3 ) 2 ( x 3 ) x x 3 = 2 ( x 3 ) 5 x 3 2 ( x 3 ) 2 2 x = 10 ( x 3 ) 2 x = 10 x + 3 2 x = 13 x 3 x = 13 x = 13 3

    The solution is 13 3 . The excluded value is 3.

  3. The least common denominator is 2 ( x 2 ) . Multiply both sides of the equation by x ( x 2 ) .

    2 ( x 2 ) [ x x 2 ] = [ 5 x 2 1 2 ] 2 ( x 2 ) 2 x = 10 ( x 2 ) 2 x = 12 x 3 x = 12 x = 4

    The solution is 4. The excluded value is 2.

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Practice Key Terms 7

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Source:  OpenStax, Algebra and trigonometry. OpenStax CNX. Nov 14, 2016 Download for free at https://legacy.cnx.org/content/col11758/1.6
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