Let u_1, u_2, u_3, u_4 be four distinct positive numbers. For any p, q \in \mathbb{R} and \epsilon > 0, let V(p,q), V_\epsilon(p,q) be the region \begin{align} \Omega(p,q) &= \left\{ (x_1, x_2, x_3, x_4 ) \in [0,\infty)^4 : \sum_{k=1}^4 x_k \le p, \sum_{k=1}^4 u_k x_k \le q \right\}\\ \Omega_\epsilon(p,q) &= \left\{ (x_1, x_2, x_3, x_4 ) \in [0,\infty)^4 : \left| \sum_{k=1}^4 x_k - p \right| < \epsilon, \left|\sum_{k=1}^4 u_k x_k - q \right| < \epsilon\right\} \end{align} ...

\displaystyle{b}={4} Explanation: Step 1) Expand the term in parenthesis: \displaystyle{\left({1.5}\cdot{b}\right)}+{\left({1.5}\cdot{6}\right)}+{9}={24} \displaystyle{1.5}{b}+{9}+{9}={24} ...

(255/100)d=(1785/100) One solution was found :                   d = 7 Reformatting the input : Changes made to your input should not affect the solution: (1): "17.85" was replaced by "(1785/100)". ...

If you use units (the exchange rate is R = 1.5 \ / 1£ and the additional cost is A = 4.5£), you will see that the correct formula is D = R (C - A) . In words, from the paid amount C (the cost), the bank keeps the additional cost ...

Consider the last digit of 2x^2 depending on the last nonzero digit of x and you'll discover that 2x^2 can never be the tail of a square, because it will end in 20\dots0 or 80\dots0 or 500\dots0 ...

To the best of my knowledge, if you are testing H_0: \rho = 0 against H_0: \rho \neq 0 then you should check both sides against the thresholds, i.e., 3.5 for positive auto-correlation and 4-3.5 ...