Which one of the #sqrt17-sqrt12# and #sqrt11-sqrt6# is greater?

1 Answer
Jun 8, 2017

#sqrt17-sqrt12 < sqrt11-sqrt6# and hence #sqrt11-sqrt6# is greater.

Explanation:

Let us consider #sqrt17+sqrt6# and #sqrt11+sqrt12# for comparison.

Well we just square both of them and we get

#(sqrt17+sqrt6)^2=(sqrt17)^2+2xxsqrt17xxsqrt6+(sqrt6)^2#

= #17+6+2sqrt102=23+sqrt102#

and #(sqrt11+sqrt12)^2=(sqrt11)^2+2xxsqrt11xxsqrt12+(sqrt12)^2#

= #11+12+2sqrt132=23+2sqrt132#

As #(sqrt17+sqrt6)^2 < (sqrt11+sqrt12)^2#,

we have #sqrt17+sqrt6 < sqrt11+sqrt12#

and hence transposing #sqrt6# to right and #sqrt12# to left

#sqrt17-sqrt12 < sqrt11-sqrt6# and hence #sqrt11-sqrt6# is greater.