The secret is that \sqrt{16x} is equivalent to \sqrt{16} \cdot \sqrt{x}. Once you break that down, then the equation becomes a more manageable solve: \sqrt{x} + 6 = \sqrt{16x} \sqrt{x} + 6 = \sqrt{16}\cdot\sqrt{x} ...

x+2-2*sqrt(x+3)=0 One solution was found :                        x = -1.3028 Radical Equation entered :      x+2-2+√x+3 = 0 Step by step solution : Step  1  :Isolate the square root on the left ...

sqrt(3x-13)+1=x  No solutions exist Radical Equation entered :      √3x-13+1 = x Step by step solution : Step  1  :Isolate the square root on the left hand side :      Original equation ...

A first step would be to get \sqrt{3x - 15} isolated on one side, which makes everything easier to work with. x - 5 = \sqrt{3x - 15} Either both sides are equal to zero, or neither is equal ...

\displaystyle{D}_{{f}}={x}\ge{3} \displaystyle{R}_{{f}}=-\sqrt{{6}}\le{f{{\left({x}\right)}}}{<}{0} Explanation: In order to find the domain and range, we need to find the values of \displaystyle{x} ...

x=sqrt(4x-15)+3 Two solutions were found :       x = 4       x = 6 Radical Equation entered :      x = √4x-15+3 Step by step solution : Step  1  :Isolate the square root on the left hand side ...