sqrt(x-1)=2-x One solution was found :                        x =  1.3820 Radical Equation entered :      √x-1 = 2-x Step by step solution : Step  1  :Isolate the square root on the left hand ...

Observe that if (3-x,x,\sqrt{9-x}) is an arithmetic progression then d=x-(3-x)=\sqrt{9-x}-x Solve this equation to obtain x=\frac{17}{9}. Finally, observe that d=\frac{7}{9} and so a_6=a_1+5d=3-x+5d=\frac{10}{9}+5\cdot\frac{7}{9}=5 ...

x=2,5 Explanation: To remove the square root, square both sides \displaystyle{x}-{1}={\left({x}-{3}\right)}^{{2}} Square the right side \displaystyle{\left({x}-{3}\right)}^{{2}}={\left({x}-{3}\right)}{\left({x}-{3}\right)}={x}^{{2}}-{3}{x}-{3}{x}+{9} ...

Alberto M. May 7, 2015 The extraneous solution is \displaystyle{x}={5} By squaring: \displaystyle{x}-{1}={x}^{{2}}-{14}{x}+{49}\Rightarrow{x}^{{2}}-{15}{x}+{50}={0} \displaystyle{x}_{{1}},{x}_{{2}}=\frac{{{15}\pm\sqrt{{{225}-{200}}}}}{{2}} ...

\sqrt{x-1}=x-m Squaring both sides (and unfortunately introducing an extraneous root) x-1 = (x-m)^2 0= -x +1 + x^2 -2xm + m^2 0 = x^2 - (2m+1) x + (m^2+1) So by the quadratic ...

See a solution process below: Explanation: First, subtract \displaystyle{\left({5}\right)} from each side of the equation to isolate the radical while keeping the equation balanced: \displaystyle\sqrt{{{x}-{2}}}+{5}-{\left({5}\right)}={6}-{\left({5}\right)} ...