The greatest number among $\sqrt[3]{2}$ , $\sqrt{3}$ ,$\sqrt[3]{5}$,and 1.5 is :
1). $\sqrt[3]{2}$
2). $\sqrt[3]{5}$
3). $\sqrt{3}$
4). 1.5
1. Find the simplest value of $2\sqrt{50}+\sqrt{18}-\sqrt{72}$ (given $\sqrt{2} $= 1.414)
3. $\frac{(2.3)^{3} + 0.027}{(2.3)^{2} - 0.69 + 0.09}$ is equal to :
4. $4^{61}+4^{62}+4^{63}+4^{64}$ is divisible by
5. Simplify : $\left(\frac{\frac{3}{2+\sqrt{3}}-\frac{2}{2-\sqrt{3}}}{2-5\sqrt{3}}\right)$
6. $(\sqrt{8}-\sqrt{4}-\sqrt{2})$ equals :
7. The value of $\sqrt{\frac{(\sqrt{12}-\sqrt{8})(\sqrt{3}+\sqrt{2})}{5+\sqrt{24}}}$ is :
8. Simplify ; $\left[\sqrt[3]{\sqrt[6]{5^{9}}}\right]^{4}$
9. Solve for x: $3^{x}-3^{x-1}$ = 486.
10. Which of the foUowing Is the largest number $\sqrt{2}$,$\sqrt[3]{3}$,$\sqrt[4]{4}$, $\sqrt[6]{6}$ ,