(sqrt(8)-sqrt(2))(sqrt(8)+sqrt(2))...

(sqrt(8)-sqrt(2))(sqrt(8)+sqrt(2))

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Explore conceptually related problems

(sqrt(8)+sqrt(3))/(sqrt(8)-sqrt(3))+ (sqrt(8)-sqrt(3))/(sqrt(8)+sqrt(3))

The following are the steps involved in finding the value of x-y from (sqrt(8)-sqrt(5))/(sqrt(8)+sqrt(5))=x-ysqrt(40) . Arrange them in sequential order. (A) (13-2sqrt(40))/(8-5)=x-ysqrt(40) (B) ((sqrt(8))^(2)+(sqrt(5))^(2)-2(sqrt(8))(sqrt(5)))/((sqrt(8))^(2)-(sqrt(5))^(2))=x-ysqrt(40) (C) x-y=(11)/(3) (D) x=(13)/(3) and y=(2)/(3) (E) ((sqrt(8)-sqrt(5))(sqrt(8)-sqrt(5)))/((sqrt(8)+sqrt(5))(sqrt(8)-sqrt(5)))=x-ysqrt(40)

The simplest form of (sqrt(8+sqrt28)-sqrt(8-sqrt(28)))/(sqrt(8+sqrt(28))+sqrt(8-sqrt(28)))

(sqrt(2)-sqrt(8))/(sqrt(2)+sqrt(8))

The value of sqrt(( sqrt(12) -sqrt(8))(sqrt(3)+sqrt(2))/(5+sqrt(24)) is

a=3(sqrt(8+2sqrt(7))-sqrt(8-2sqrt(7))),b=sqrt(((42)(30)+(36))) then the value of log _(a)b is equal to

2sqrt(8)+5sqrt(32)

(sqrt(8)-sqrt(2))(sqrt(8)+sqrt(2))

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