CAT 2020 Slot 2 QA Question & Solution
AlgebraMedium
Question
if x and y are positive real numbers satisfying $x+y=102$, then the minimum possible valus of $2601(1+\frac{1}{x})(1+\frac{1}{y})$ is
Solution
Now we have $2601\left(1+\frac{1}{x}\right)\left(1+\frac{1}{y}\right)=2601\left(\frac{xy+y+x+1}{xy}\right)$
Now we know that x+y=102. Substituting it in the above equation
$2601\left(\frac{xy+y+x+1}{xy}\right)=2601\left(\frac{103}{xy}+1\right)$
Maximum value of xy can be found out by AM>= GM relationship
$\ \frac{\ x+y}{2}\ge\ \sqrt{xy}\ or\ \ \sqrt{\ xy}\le\ 51\ or\ xy\le\ 2601$
Hence the maximum value of "xy" is 2601. Substituting in the above equation we get
$2601\left(\ \frac{\ 103+2601}{2601}\right)=2704$