The sum of the intercepts made on the axes of coordinates by any tangent to the curve ` sqrt(x)+sqrt(y)=sqrt(a)` is equal toA. 2aB. aC. `(a)/(2)`D. none of these

The sum of the intercepts made on the axes of coordinates by any tange

1.	The sum of the intercepts made on the axes of coordinates by any tangent to the curve ` sqrt(x)+sqrt(y)=sqrt(a)` is equal toA. 2aB. aC. `(a)/(2)`D. none of these
Answer» Correct Answer - B Let P`(x_(1),y_(1))` be a point on the curve ` sqrt(x)+sqrt(y)=sqrt(a). ` Then, ` sqrt(x_(1))+sqrt(y_(1))=sqrt(a) " "...(i)` Now, ` sqrt(x)+sqrt(y)=sqrt(a)` ` rArr (1)/(2sqrt(x))+(1)/(2sqrt(y)) (dy)/(dx)=0 rArr (dy)/(dx) = -(sqrt(y))/(sqrt(x)) rArr ((dy)/(dx))_(P)=-sqrt((y_(1))/(x_(1)))` The equation of the tangent to the given curve at point `P(x_(1),y_(1))` is ` y-y_(1)=-sqrt((y_(1))/(x_(1)))(x-x_(1)) ` ` rArr (x)/(sqrt(x_(1)))+(y)/(sqrt(y_(1))) = sqrt(x_(1))+ sqrt(y_(1)) rArr (x)/(sqrt(x_(1))) + (y)/(sqrt(y_(1)))=sqrt(a) ` [Using (i)] This cuts the coordinate axes at `A(sqrt(ax_(1)),0)` and `B(0, sqrt(ay_(1)))` ` therefore OA+OB= sqrt(ax_(1))+sqrt(ay_(1))=sqrt(a)(sqrt(x_(1))+sqrt(y_(1)))= sqrt(a) xx sqrt(a)=a. `

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The sum of the intercepts made on the axes of coordinates by any tangent to the curve ` sqrt(x)+sqrt(y)=sqrt(a)` is equal toA. 2aB. aC. `(a)/(2)`D. none of these

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