(1) `x^(2)-(sqrt(2)+1)x+sqrt(2)=0`

Solve by factorization: x^(2)-(sqrt(2)+1)x+sqrt(2)=0

Find the roots (if they exist) by completing the square: x^(2)-(sqrt(2)+1)x+sqrt(2)=0

10 Determine the roots of the following quadratic equation,if they exist,by the method of completing Square x^(2)-(sqrt(2)+1)x+sqrt(2)=0

Solve each of the following equations by using the method of completing the square: x^(2)-(sqrt(2)+1)x+sqrt(2)=0

State whether the following quadratic equations have two distinct real roots. Justicy your answer: sqrt(2)x^(2)-3/(sqrt(2))x+1/(sqrt(2))=0

Solve the following quadratic equations : x^(2)-(1+sqrt2)x+sqrt2=0

x^(2)-(sqrt(3)+1)x+sqrt(3)=0 2x^(2)+x-4=0

(x-sqrt(2))^(2)-sqrt(2)(x+1)=0

A solution of sin^-1 (1) -sin^-1 (sqrt(3)/x^2)- pi/6 =0 is (A) x=-sqrt(2) (B) x=sqrt(2) (C) x=2 (D) x= 1/sqrt(2)

Differentiate (sqrt(x^(2)+1)+sqrt(x^(2)-1))/(sqrt(x^(2)+1)-sqrt(x^(2)-1)) with respect to x: