sqrt(2n+29)+3=n One solution was found :                        n = 10 Radical Equation entered :      √2n+29+3 = n Step by step solution : Step  1  :Isolate the square root on the left hand side ...

Suppose a solution exists. Then \sqrt a = c-\sqrt b a = c^2 + b -2\sqrt{b} \sqrt b = \frac{c^2+b-a}2 b=\left(\frac{c^2+b-a}2\right)^2 Which shows that either b is the square of some ...

The problem with your attempt is that you are assuming that K contains a square root of a for some a\in F which is not a square in F. This assumption is essentially what you're trying to ...

\displaystyle{5}\sqrt{{3}} Explanation: \displaystyle\sqrt{{12}}=\sqrt{{4}}\times\sqrt{{3}} = \displaystyle{2}\sqrt{{3}} So \displaystyle\sqrt{{12}}+{3}\sqrt{{3}}={2}\sqrt{{3}}+{3}\sqrt{{3}}={5}\sqrt{{3}}

sqrt(32000000)  Simplified Root :      4000 • sqrt(2)  Simplify :  sqrt(32000000)  Factor 32000000 into its prime factors            32000000 = 211 • 56  To simplify a square root, we extract ...

Let x = \sqrt{a} + \sqrt{b} and suppose x \in \Bbb Q. If a = b, then x = 2\sqrt{a}, so \sqrt{b} = \sqrt{a} = \frac{x}{2} \in \Bbb Q. Now suppose a \neq b. Then \frac{1}{x} = \frac{\sqrt{a} - \sqrt{b}}{a - b} \in \Bbb Q ...