How do you simplify #(1+1/x)/(5-1/y)#?

1 Answer

#(1+1/x)/(5-1/y)=(y(x+1))/(x(5y-1))=(xy+y)/(5xy-x)#

Explanation:

This is a complex fraction

#(1+1/x)/(5-1/y)#

Determine the correct LCD for the expression at the numerator and the denominator which are x and y respectively

#(1+1/x)/(5-1/y)=((x+1)/x)/((5y-1)/y)=(x+1)/xdiv (5y-1)/y=(x+1)/x*y/(5y-1)#

#(1+1/x)/(5-1/y)=(y(x+1))/(x(5y-1))=(xy+y)/(5xy-x)#

God bless....I hope the explanation is useful.