If the numerator of a fraction is increased by 10% and its denominator is diminished by 10%, then the fraction becomes 11/45. Find the original fraction.A2/3B1/5C4/5D2/5Answer: B. 1/5 Read Explanation: Let the original fraction be (xy)( \frac{x}{y} )(yx).After changes:Numerator increased by 10% → (1.1x)Denominator decreased by 10% → (0.9y)So new fraction:1.1x0.9y=1145\frac{1.1x}{0.9y} = \frac{11}{45}0.9y1.1x=4511Simplify:11x9y=1145\frac{11x}{9y} = \frac{11}{45}9y11x=4511Cancel 11:x9y=145\frac{x}{9y} = \frac{1}{45}9yx=451Cross multiply:45x=9y45x = 9y45x=9y⇒5x=y\Rightarrow 5x = y⇒5x=ySo,xy=x5x=15\frac{x}{y} = \frac{x}{5x} = \frac{1}{5}yx=5xx=51Final Answer: <b>(15)</b><b>( \frac{1}{5} )</b><b>(51)</b> Read more in App
