" The area enclosed between the curves "...

" The area enclosed between the curves "y=ax^(2)" and "x=ay^(2)(a>0)" is "1" sq unit.If the value of "a" is "(3sqrt(3))/(lambda)" ,then the value of "lambda" is "

Similar Questions

Explore conceptually related problems

The area enclosed between the curves y=ax^(2) and x=ay^(2)(a gt 0) is 1 sq.unit. Then a =

The area enclosed between the curves y=ax^(2) and x=ay^(2) (where agt0 ) is 1 sq. units, then value of a is

If the area enclosed between the curves y=ax^(2) and x=ay^(2)(a>0) is 1 square unit, then find the value of a.

The area enclosed between the curves, y = ax^(2) and x = ay^(2) ( a gt 0) is 1 square units, then the value of a is

If the area enclosed between the curves y=a x^2 and x=a y^2(a >0) is 1 square unit, then find the value of a

Area enclosed between curves : y=ax^2 and x=ay^2 (a > 0) is 1 sq. unit, then a is :