How do you solve #\sqrt { 7u + 6} = \sqrt { 5u + 16}#?
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#sqrt (7 u + 6) = sqrt (5 u + 16)#
square both sides
#(sqrt (7 u + 6))^2 = (sqrt (5 u + 16))^2#
#7 u + 6 = 5 u + 16#
move #5 u# to left hand side and #6# to right hand side
#7 u - 5 u = 16 - 6#
#2 u = 10#
divide both sides with #2#
#(2 u)/2 = 10/2#
#u = 5#
#color(blue)(sqrt(7u+6)=sqrt(5u+16)#
To find the value of #u#, we need to isolate it. We should balance both sides (applying same operations)
Square both sides to remove the radical signs
#rarr(sqrt(7u+6))^color(red)(2)=(sqrt(5u+16))^color(red)(2)#
#rarr7u+6=5u+16#
Subtract #6# both sides
#rarr7u+6-color(red)(6)=5u+16-color(red)(6)#
#rarr7u=5u+10#
Subtract #5u# both sides
#rarr7u-color(red)(5u)=5u+10-color(red)(5)#
#rarr2u=10#
Divide both sides by #2#
#rarr(cancel2u)/(color(red)(cancel2))=10/(color(red)(2))#
#color(green)(rArru=5#
Hope this helps! :)
