\displaystyle{x}\le{96} Explanation: \displaystyle\frac{{x}}{{4}}-{8}\le{16} First, let's add 8 to both sides of the inequality: \displaystyle\frac{{x}}{{4}}\le{24} Now, let's ...

\displaystyle{x}\le-{28} Explanation: The issue in this example is the fact that the x-term is negative. In working with inequalities, if you divide or multiply by a negative number, the ...

\displaystyle{x}\le{8} Explanation: Solve the equation the same way as a linear equation except at any stage if you multiply by a negative change the sign around. So.. \displaystyle\frac{{{x}-{2}}}{{2}}\le{3} ...

x ≤ 27 Explanation: collect variable to one side of the inequality and numbers to the other. Follow the same method as used in solving equations \displaystyle\frac{{x}}{{3}}≤{14}-{5} # x/3 ≤ 9 ...

Take f(x)=x/2 and \alpha=3/4, the statement is not true. Can you double check that this is indeed the question asked?

If you want Max, x-y>0, you want Min,x-y<0 for Max: x-y \le |x-y| \le|x|+|y| your process can go on: x^2+1\ge 2|x|,y^2+1\ge2|y| \implies x^4+y^4+6\ge 4(|x|+|y|)\implies \dfrac{x-y}{x^4+y^4+6} \le \dfrac{1}{4} ...