If $${{\text{5}}^{\left( {x + 3} \right)}}{\text{ = 2}}{{\text{5}}^{(3x - 4)}}$$ then the value of x is = ?
Q.10.
$$\frac{{{2^{n + 4}} - 2\left( {{2^n}} \right)}}{{2\left( {{2^{n + 3}}} \right)}}$$ when simplified is = ?
Q.11.
If $$a = \frac{{\sqrt 5 + 1}}{{\sqrt 5 - 1}}$$ and $$b{\text{ = }}\frac{{\sqrt 5 - 1}}{{\sqrt 5 + 1}}$$ then the value of $$\left( {\frac{{{a^2} + ab + {b^2}}}{{{a^2} - ab + {b^2}}}} \right)$$ is = ?
Q.12.
Given that $$\sqrt 5 $$ = 2.236 and $$\sqrt 3 $$ = 1.732, then the value of
$$\frac{1}{{\sqrt 5 + \sqrt 3 }}{\text{ is = ?}}$$
Q.13.
If $${\left( {\frac{3}{5}} \right)^3}{\left( {\frac{3}{5}} \right)^{ - 6}} = {\left( {\frac{3}{5}} \right)^{2x - 1}}$$ then x is equal to ?
Q.14.
If $${\text{5}}\sqrt 5 \times {5^3} \div {5^{ - \frac{3}{2}}}{\text{ = }}{{\text{5}}^{a + 2}}$$ then the value of a is = ?
Q.15.
Simplified from of $${\left[ {{{\left( {\root 5 \of {{x^{ - \frac{3}{5}}}} } \right)}^{ - \frac{5}{3}}}} \right]^5}$$ is = ?
Q.16.
What will come in place of both the question marks in the following question :
$$\frac{{{{\left( ? \right)}^{\frac{2}{3}}}}}{{42}} = \frac{5}{{{{\left( ? \right)}^{\frac{1}{3}}}}}$$
Q.17.
The value of $${\left( {\frac{{32}}{{243}}} \right)^{ - \frac{4}{5}}}$$ is = ?
Q.18.
$$\frac{{12}}{{3 + \sqrt 5 + 2\sqrt 2 }}$$ is equal to = ?
Q.19.
The simplified form of $$\frac{2}{{\sqrt 7 + \sqrt 5 }} + $$ $$\frac{7}{{\sqrt {12} - \sqrt 5 }} - $$ $$\frac{5}{{\sqrt {12} - \sqrt 7 }}$$ is = ?
Q.20.
Find the value of x in the expression :
$$\root 4 \of {3x + 1} = 2$$
Q.21.
The value of $${{\text{5}}^{\frac{1}{4}}} \times {\left( {125} \right)^{0.25}}$$ is = ?
Q.22.
The value of $${\text{2}}{{\text{7}}^{ - \frac{2}{3}}}$$ lies between = ?
Q.23.
The value of $$\frac{1}{{\sqrt {3.25} + \sqrt {2.25} }}$$ $$ +\, \frac{1}{{\sqrt {4.25} + \sqrt {3.25} }}$$ $$ +\, \frac{1}{{\sqrt {5.25} + \sqrt {4.25} }}$$ $$ +\, \frac{1}{{\sqrt {6.25} + \sqrt {5.25} }}$$   is = ?