$\sqrt{12+\sqrt{12+\sqrt{12+.....}}}$ is equal to
$\sqrt{12+\sqrt{12+\sqrt{12+.....}}}$ is equal to
1). 3
2). 4
3). 6
4). 2
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Other Questions
1. $(0.04)^{-(1.5)}$ is equal to
2. $(\sqrt{8}-\sqrt{4}-\sqrt{2})$ equals :
3. $\frac{0.3555\times 0.5555\times 2.025}{0.225\times 1.7775\times 02222}$ is equal to :
4. Evaluate : $\frac{\sqrt{24}+\sqrt{6}}{\sqrt{24}-\sqrt{6}}$
5. If x= $1+\sqrt{2}+\sqrt{3}$ then the value of $\left(x+\frac{1}{x-1}\right)$ is
6. The greatest among the numbers $\sqrt{2}$ ,$\sqrt[3]{3}$ , $\sqrt[4]{5}$ , $\sqrt[6]{6}$ is :
7. Among $\sqrt{2}$ ,$\sqrt[3]{3}$ , $\sqrt[4]{5}$ , $\sqrt[3]{2}$, which one is greatest
8. Given that $\sqrt{5}$ =2.236 and $\sqrt{3}$ =1.732, the value of $\frac{1}{\sqrt{5}+\sqrt{3}}$ is
9. The approximate value of $\frac{3\sqrt{12}}{2\sqrt{28}}+\frac{2\sqrt{21}}{\sqrt{98}}$ is :
10. The greatest among the numbers $\sqrt[4]{3}$,$\sqrt[5]{4}$,$\sqrt[10]{12}$,1 is