Evaluate the following [tex][\frac{9}{2.6}-\frac{2.5^{2} }{2.5} ] ^{2}[/tex][tex][[\frac{3x^{a}y^{b}} {-3x^{a} y^{b} } ]^{3} ] ^{2}[/tex]

(a) [tex][\frac{9}{2.6}  - \frac{2.5^{2} }{2.5} ]^{2}[/tex]Answer: [tex][\frac{9}{2.6}  - \frac{2.5^{2} }{2.5} ]^{2}[/tex]= [tex][\frac{9}{2.6}  - \frac{2.5*2.5 }{2.5} ]^{2}[/tex]= [tex][\frac{9}{2.6}  - \frac{2.5}{1} ]^{2}[/tex]*canceling 2.5 in numerator and denominator* [tex]= [\frac{9-(2.5)(2.6)}{2.6} ]^2\\*Using L.C.M of 2.6 and 1 which comes out to be '2.6'= [\frac{9-(6.5)}{2.6} ]^2\\= [\frac{2.5}{2.6} ]^2\\*multiplying and dividing by '10'= [\frac{2.5*10}{2.6*10} ]^2\\= [\frac{25}{26} ]^2\\= \frac{25^2}{26^2}\\= \frac{625}{676}\\= 0.925[/tex]Properties used:Cancellation property of fractionsLeast Common Multiplier(LCM)The least or smallest common multiple of any two or more given natural numbers are termed as LCM. For example, LCM of 10, 15, and 20 is 60.(b) [tex] [[\frac{3x^{a}y^{b}} {-3x^{a} y^{b} } ]^{3}    ] ^{2} [/tex]Answer:[tex][[\frac{3x^{a}y^{b}} {-3x^{a} y^{b} } ]^{3}] ^{2}\\[/tex]*using [tex][x^{a}]^b = x^{ab}[/tex]*[tex]= [\frac{3x^{3a}y^{3b}} {-3x^{3a} y^{3b} }] ^{2}[/tex]        *Again, using [tex][x^{a}]^b = x^{ab}[/tex]*[tex]= \frac{3x^{2*3a}y^{2*3b}} {-3x^{2*3a} y^{2*3b} }  \\= (-1)\frac{3x^{6a}y^{6b}} {3x^{6a} y^{6b} }\\[\tex]*taking -1 common, denominator and numerator are equal*[tex]= -(1)\frac{1}{1}\\= -1[/tex]Property used: 'Power of a power'We can raise a power to a power(x^2)4=(x⋅x)⋅(x⋅x)⋅(x⋅x)⋅(x⋅x)=x^8This is called the power of a power property and says that to find a power of a power you just have to multiply the exponents.