addition: 5/x + 3/x+2 = -6/x(x+2)
- Thread starter BB
- Start date
Re: addition
Hello, BB!
Be careful! . . . You're making all kinds of errors . . .
Note that: \(\displaystyle \,x\,\neq\,0\) and \(\displaystyle x\,\neq\,-2\)
Multiply both sides by the common denominator: \(\displaystyle \:x(x\,+\,2)\) . . . Write it out!
. . \(\displaystyle \L x(x\,+\,2)\cdot\frac{5}{x}\,+\,x(x\,+\,2)\cdot\frac{3}{x\,+\,2} \;=\;x(x\,+\,2)\cdot\frac{-6}{x(x\,+\,2)\)
Reduce carefully:
. . \(\displaystyle \L \not{x}(x\,+\,2)\cdot\frac{5}{\not{x}}\,+\,x(\sout{x\,+\,2})\cdot\frac{3}{\sout{x\,+\,2}} \;=\;\not{x}(\sout{x\,+\,2})\cdot\frac{-6}{\not{x}(\sout{x\,+\,2})\)
And we get: \(\displaystyle \L\:5(x\,+\,2)\,+\,3x\;=\;-6\)
This simplifies to: \(\displaystyle \L\:8x\:=\:-16\;\;\Rightarrow\;\;x\:=\:-2\)
But \(\displaystyle x\,=\,-2\) cannot be a solution.
. . Therefore, this equation has no solution.
Hello, BB!
Be careful! . . . You're making all kinds of errors . . .
Note that: \(\displaystyle \,x\,\neq\,0\) and \(\displaystyle x\,\neq\,-2\)
Multiply both sides by the common denominator: \(\displaystyle \:x(x\,+\,2)\) . . . Write it out!
. . \(\displaystyle \L x(x\,+\,2)\cdot\frac{5}{x}\,+\,x(x\,+\,2)\cdot\frac{3}{x\,+\,2} \;=\;x(x\,+\,2)\cdot\frac{-6}{x(x\,+\,2)\)
Reduce carefully:
. . \(\displaystyle \L \not{x}(x\,+\,2)\cdot\frac{5}{\not{x}}\,+\,x(\sout{x\,+\,2})\cdot\frac{3}{\sout{x\,+\,2}} \;=\;\not{x}(\sout{x\,+\,2})\cdot\frac{-6}{\not{x}(\sout{x\,+\,2})\)
And we get: \(\displaystyle \L\:5(x\,+\,2)\,+\,3x\;=\;-6\)
This simplifies to: \(\displaystyle \L\:8x\:=\:-16\;\;\Rightarrow\;\;x\:=\:-2\)
But \(\displaystyle x\,=\,-2\) cannot be a solution.
. . Therefore, this equation has no solution.