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1/x=2/(x+6)
We move all terms to the left:
1/x-(2/(x+6))=0
Domain of the equation: x!=0
x∈R
Domain of the equation: (x+6))!=0We calculate fractions
x∈R
(1*(x+6)))/7x^2+(-(2*x)/7x^2=0
We add all the numbers together, and all the variables
(1*(x+6)))/7x^2+(-(+2x)/7x^2=0
We calculate fractions
((1*(x+6)))*7x^2)/(7x^2+(*7x^2)+(-(+2x)*7x^2)/(7x^2+(*7x^2)=0
We calculate terms in parentheses: +(-(+2x)*7x^2)/(7x^2+(*7x^2), so:We get rid of parentheses
-(+2x)*7x^2)/(7x^2+(*7x^2
We multiply all the terms by the denominator
-(+2x)*7x^2)+((*7x^2)*(7x^2
Back to the equation:
+(-(+2x)*7x^2)+((*7x^2)*(7x^2)
((1*(x+6)))*7x^2)/(7x^2+*7x^2+(-(+2x)*7x^2)+((*7x^2)*7x^2=0
We multiply all the terms by the denominator
((1*(x+6)))*7x^2)+(*7x^2)*(7x^2+((-(+2x)*7x^2))*(7x^2+(((*7x^2)*7x^2)*(7x^2=0
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