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geometric sequence
- Thread starter waski
- Start date
Solve the first one for y and sub into the second:
\(\displaystyle \L\\y=16-x\)
This gives:
\(\displaystyle \L\\\frac{1}{x}+\frac{1}{16-x}=\frac{1}{3}\)
Now, it'll be good practice to solve this yourself.
Your LCD is 3x(16-x)
\(\displaystyle \L\\3\not{x}(16-x)\frac{1}{\not{x}}+3x\sout{(16-x)}\frac{1}{\sout{16-x}}=\not{3}x(16-x)\frac{1}{\not{3}}\)
Now finish. You'll have a quadratic that is easily factorable or solvable by the quadratic formula.
\(\displaystyle \L\\y=16-x\)
This gives:
\(\displaystyle \L\\\frac{1}{x}+\frac{1}{16-x}=\frac{1}{3}\)
Now, it'll be good practice to solve this yourself.
Your LCD is 3x(16-x)
\(\displaystyle \L\\3\not{x}(16-x)\frac{1}{\not{x}}+3x\sout{(16-x)}\frac{1}{\sout{16-x}}=\not{3}x(16-x)\frac{1}{\not{3}}\)
Now finish. You'll have a quadratic that is easily factorable or solvable by the quadratic formula.