How do you solve 1/x+1/(x+3)=2?

1 Answer
mason m
Dec 20, 2016

x=-1+-sqrt(5/2).

Explanation:

To add fractions, we need to find a common denominator. For example, to do 1/3+1/5, we would multiply 1/3 by 5/5 to get 5/15 and 1/5 by 3/3 to get 3/15, then add them to get 8/15.

Similarly, 1/x=1/x*(x+3)/(x+3)=(x+3)/(x(x+3)).

1/(x+3)=1/(x+3)*x/x=x/(x(x+3)).

So 1/x+1/(x+3)=(x+3)/(x(x+3))+x/(x(x+3))=(2x+3)/(x(x+3)).

So now we have (2x+3)/(x(x+3))=2.

Multiply both sides by x(x+3) to get 2x+3=2x(x+3).

Expand the right side to get 2x+3=2x^2+6x.

Rearrange terms to get 2x^2+4x-3=0.

This is a quadratic equation with solutions x=-1+-sqrt(5/2).

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