\displaystyle{x}=-{20} \displaystyle{y}=-{9} Explanation: The given equations are \displaystyle\frac{{1}}{{2}}{x}={y}-{1} \displaystyle-{x}+{3}{y}=-{7} From \displaystyle\frac{{1}}{{2}}{x}={y}-{1} ...

-10x+7y=-70*(-6)/7 Geometric figure: Straight Line   Slope = 2.857/2.000 = 1.429   x-intercept = 60/-10 = 6/-1 = -6.00000   y-intercept = 60/7 = 8.57143 Reformatting the input : Changes ...

If we put no constraint on x, y, and z apart from x, y, z positive and x+y+z=1, then indeed your calculation, and the one by Patrick Da Silva, show that the minimum value is 8, ...

Simplifying we get 7xy -5y-19x=7=0 Multiplying by 7 49xy-133x-35y-49=0 7x(7y-19)-5(7y-19)=144 (7x-5)(7y-19)=144 all the factors of 144 will not yield solution. Considering 7x-5=2 and 7y-19=72 we ...

See a solution process below: Explanation: To be able to add and subtract the fractions in the numerator and denominator of the main term we need to have each fraction over a common denominator. \displaystyle\frac{{{\left(\frac{{x}}{{x}}\times\frac{{1}}{{y}}\right)}-{\left(\frac{{y}}{{y}}\times\frac{{1}}{{x}}\right)}}}{{{\left(\frac{{x}}{{x}}\times\frac{{1}}{{y}}\right)}+{\left(\frac{{y}}{{y}}\times\frac{{1}}{{x}}\right)}}}\Rightarrow ...

\displaystyle\frac{{\frac{{x}}{{y}}-\frac{{y}}{{x}}}}{{\frac{{1}}{{y}}-\frac{{1}}{{x}}}}={x}+{y} with exclusions \displaystyle{x}\ne{0} , \displaystyle{y}\ne{0} , \displaystyle{x}\ne{y} ...