$9\sqrt{x}$=$\sqrt{12}+\sqrt{147}$ , then x=

$9\sqrt{x}$=$\sqrt{12}+\sqrt{147}$ , then x=
1). 5
2). 3
3). 2
4). 4

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1. Simplify : $\frac{(1.5)^{3} + (4.7)^{3} + (3.8)^{3} -3\times 1.5\times 4.7\times 3.8}{(1.5)^{2} + (4.7)^{2} + (3.8)^{2} -1.5\times 4.7 - 4.7\times 3.8 - 3.8\times 15}$

2. $9\sqrt{x}$=$\sqrt{12}+\sqrt{147}$ , then x=

3. If $\sqrt{33}$ = 5.745. then the value of $\sqrt{\frac{3}{11}}$ is approximately

4. If $2^{x-1}+2^{x+1}$ = 320, then the value of x is

5. The greatest number among $\sqrt[3]{2}$ , $\sqrt{3}$ ,$\sqrt[3]{5}$,and 1.5 is :

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7. $\frac{3+\sqrt{6}}{5\sqrt{3}-2\sqrt{12}-\sqrt{32}+\sqrt{50}}$ is equal to

8. The value of the expression $\sqrt{6+\sqrt{6+\sqrt{6+....upto...}}}$ is :

9. $(36)^{\frac{1}{6}}$ is equal to :

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