Risposta:
#2/7#
Spiegazione:
Prendiamo, # A = (sqrt5 + sqrt3) / (+ sqrt3 sqrt3 + sqrt5) - (sqrt5-sqrt3) / (+ sqrt3 sqrt3-sqrt5) #
# = (Sqrt5 + sqrt3) / (+ 2sqrt3 sqrt5) - (sqrt5-sqrt3) / (2sqrt3-sqrt5) #
# = (Sqrt5 + sqrt3) / (+ 2sqrt3 sqrt5) - (sqrt5-sqrt3) / (2sqrt3-sqrt5) #
# = ((sqrt5 + sqrt3) (2sqrt3-sqrt5) - (sqrt5-sqrt3) (2sqrt3 + sqrt5)) / ((2sqrt3 + sqrt5) (2sqrt3-sqrt5) #
# = ((2sqrt15-5 + 2 * 3-sqrt15) - (2sqrt15 + 5-2 * 3-sqrt15)) / ((2sqrt3) ^ 2- (sqrt5) ^ 2) #
# = (cancel (2sqrt15) -5 + 2 * 3cancel (-sqrt15) - cancel (2sqrt15) -5 + 2 * 3 + cancel (sqrt15)) / (12-5) #
#=(-10+12)/7#
#=2/7#
Nota che, se nei denominatori lo sono
# (sqrt3 + sqrt (3 + sqrt5)) e (sqrt3 + sqrt (3-sqrt5)) #
allora la risposta cambierà.
