Show that the tangent at `P(x_(1),y_(1))` on the curve `sqrt(x)+sqrt(y)=sqrt(a) " is " x""x_(1)^((-1)/2)+yy_(1)^((-1)/2)=a^(1/2)`

Solve sqrt(3x+1)-sqrt(x-1)=2 .

At the point (x_(1),y_(1)) on the curve x^(3)+y^(3)=3axy show that the tangent is (x_(1)^(2)-ay_(1))x+(y_(1)^(2)-ax_(1))y=ax_(1)y_(1)

Area of the triangle formed by the tangent, normal at (1, 1) on the curve sqrt(x)+sqrt(y)=2 and the x axis is

Show that : Lt_(x to 0)(sqrt(1+x)-sqrt(1+x^(2)))/(sqrt(1+x^(2))-sqrt(1-x))=1

underset(x to 0)"Lt" (sqrt(1+x^(2))-sqrt(1-x+x^(2)))/(3^(x)-1)=

y = sqrt(1 + x^(2)) : y' = (xy)/(1 + x^(2))

Let f(x) = (sqrt(x - 2 sqrt(x - 1)))/(sqrt(x - 1) - 1)x , then

IF sqrt((x)/(1-x))+sqrt((1-x)/(x)) =2 (1)/(6) then x=

Simplify the following (sqrt(x+1) + sqrt(x-1))^(6) +(sqrt(x+1) - sqrt(x-1))^(6)