\displaystyle{r}={3} Explanation: Isolate the \displaystyle{r} terms on one side of the equation and the constants on the other side of the equation while keeping the equation balanced: \displaystyle{16}-{2}{r}+{2}{r}-{1}={3}{r}+{2}{r}+{1}-{1} ...

See the entire solution process below: Explanation: First, we can factor each term as: \displaystyle{\left({5}\times{1}\right)}{a}+{\left({5}\times{2}\right)}{b}-{\left({5}\times{5}\right)}{c} ...

\displaystyle{a}=-{\left(\frac{{3}}{{4}}\right)} Explanation: \displaystyle{5}{a}+{12}={6}-{3}{a} \displaystyle{5}{a}+{3}{a}=-{12}+{6} Rearranging like terms together. \displaystyle{8}{a}=-{6} ...

Ray class field modulo \mathfrak{m} is the maximal abelian extension of conductor \mathfrak{m}. The ray class field of conductor m=1 is the Hilbert Class field. In particular Hilbert Class field ...

Pairs (a,b) with a+b = 210 and \gcd(a,b)=1 are equivalent to pairs (a,b) with a+b=210 and \gcd(a,a+b) = \gcd(a,210) = 1, since \gcd(x,y) = \gcd(x,x+y) in general. There are \phi(210) ...

As a counterexample for odd length, 121 and 131 are relatively prime. More generally, 1...121...1 and 1...131...1 will always be relatively prime, since their difference will be of the ...