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Suggested: sqrt(2)^sqrt(2) - sqrt(1-y^2)dx-sqrt(1-x^2)dy=0 - if y=log(x+sqrt(1+x^(2))) prove that (dy)/(dx)=(1)/(log(x+sqrt(1+x^(2))))*(1)/(sqrt(1+x^(2))) - a quadratic polynomial having zeroes sqrt(5/2) and sqrt(5/2) is - (sqrt(5) + sqrt(2)) ^ 2 - the imaginary part of (3+2 sqrt(-54))^((1)/(2))-(3-2 sqrt(-54))^((1)/(2)) can be - find the value of sqrt(1/2x) * sqrt(1/2x) - the number of real roots of the equation sqrt(x^(2)-4x+3)+sqrt(x^(2)-9)=sqrt(4x^(2)-14x+6) is - sqrt 2 to the power of sqrt 2 - tan^(-1)(sqrt(1+x^(2))+sqrt(1-x^(2)))/(sqrt(1+x^(2))-sqrt(1-x^(2))) - (sqrt(3) - sqrt(2))/(sqrt(3) + sqrt(2)) - sqrt(2)^sqrt(2)               

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