SOLUTION: The question is: For all x > 0 and y > 0, the radical expression {{{ ( sqrt(x) ) / ( 3 * sqrt(x) - sqrt(y) ) }}} or "[ sqrt(x) ] / [ (3) * sqrt(x) - sqrt(y) ]" is equivalent t

Algebra ->  Radicals -> SOLUTION: The question is: For all x > 0 and y > 0, the radical expression {{{ ( sqrt(x) ) / ( 3 * sqrt(x) - sqrt(y) ) }}} or "[ sqrt(x) ] / [ (3) * sqrt(x) - sqrt(y) ]" is equivalent t      Log On


   

Question 93986: The question is:
For all x > 0 and y > 0, the radical expression +%28+sqrt%28x%29+%29+%2F+%28+3+%2A+sqrt%28x%29+-+sqrt%28y%29+%29+ or "[ sqrt(x) ] / [ (3) * sqrt(x) - sqrt(y) ]" is equivalent to:
The answer is:
%28+%28+3+%2A+x+%2B+sqrt%28xy%29+%29+%2F+%28+9x+-+y%29+%29 "[ 3x + sqrt(xy) ] / [9x - y]"
How did they get this answer?
Answer by jim_thompson5910(35256) About Me  (Show Source):
You can put this solution on YOUR website!
+%28+sqrt%28x%29+%29+%2F+%28+3+%2A+sqrt%28x%29+-+sqrt%28y%29+%29+ Start with the given expression


Multiply the fraction by %28+3+%2A+sqrt%28x%29+%2B+sqrt%28y%29+%29%2F%28+3+%2A+sqrt%28x%29+%2B+sqrt%28y%29+%29 (which is a form of 1). This will rationalize the denominator.


Combine the fractions



Foil the denominator



Multiply %283+%2A+sqrt%28x%29%29%283+%2A+sqrt%28x%29%29 to get 9x and multiply -%28sqrt%28y%29%29%28sqrt%28y%29%29 to get -y



Notice the common root terms in the denominator add and cancel to zero


%28+%28+sqrt%28x%29+%29%28+3+%2A+sqrt%28x%29+%2B+sqrt%28y%29+%29+%2F+%28+9x+-+y%29+%29 Simplify



Distribute sqrt%28x%29 in the numerator


%28+%28+3+%2A+x+%2B+sqrt%28xy%29+%29+%2F+%28+9x+-+y%29+%29 Multiply and combine the root terms



So +%28+sqrt%28x%29+%29+%2F+%28+3+%2A+sqrt%28x%29+-+sqrt%28y%29+%29+ is equivalent to %28+%28+3+%2A+x+%2B+sqrt%28xy%29+%29+%2F+%28+9x+-+y%29+%29