`y^(2)= (x +c)^(3)`

The differential equation representing the family of curves y^(2)=2c(x+c^(2//3)) , where c is a positive parameter, is of

The differential equation representing the family of curves y^(2) = 2c (x +c^(2//3)) , where c is a positive parameter , is of

What are the order and degree respectively of the differential equation whose solution is y = c x + c^(2) - 3c^(3//2) + 2 , where c is a parameter ?

Form the differential equation of the family of curves represented c(y+c)^(2)=x^(3), where is a parameter.

The following are the steps involved in factorizing 64 x^(6) -y^(6) . Arrange them in sequential order (A) {(2x)^(3) + y^(3)} {(2x)^(3) - y^(3)} (B) (8x^(3))^(2) - (y^(3))^(2) (C) (8x^(3) + y^(3)) (8x^(3) -y^(3)) (D) (2x + y) (4x^(2) -2xy + y^(2)) (2x - y) (4x^(2) + 2xy + y^(2))

If 2x^(2)y and 3xy^(2) denote the length and breadth of a rectangle,then its area is 6xy(b)6x^(2)y^(2)(c)6x^(3)y^(3)(d)x^(3)y^(3)

The order and degree of the differential equation, whose solution represents the family c(y+c)^(2)=x^(3) are (where c is a parameter )

Factorise 25x^(2) - 30xy + 9y^(2) . The following steps are involved in solving the above problem . Arrange them in sequential order . (A) (5x - 3y)^(2) " " [ because a^(2) - 2b + b^(2) = (a-b)^(2)] (B) (5x)^(2) - 30xy + (3y)^(2) = (5x)^(2) - 2(5x)(3y) + (3y)^(2) (C) (5x - 3y) (5x - 3y)