Form the D.E corresponding to `y = cx-2c^2` where c is a parameter.

Form the differential equation corresponding to y=cx-2c^(2) , where c is a parameter.

Form the differential equation corresponding to y=cx-2c^(2) , where c is a parameter.

Find the order of the differential equation corresponding to (i) y = c(x-c)^(2) where c is an arbitrary constant. (ii) y = Ae^(x) + Be^(3x) + Ce^(5x) where A, B, C are arbitrary constant. (iii) xy = c e^(x) + b e^(-x) + x^(2) where b, c are arbitrary constants. (iv) The family of all circles in the xy-plane with centre at the origin.

Form the differential equations the family of curves y = cx + c - c^(2) where c is a parameter.

Form the differential equations corresponding to the family of curves. (i) y = c(x-2c) where c is a parameter. (ii) y = a cos 3x + b sin 3x where a, b are parameters. (iii) y = a cos x + b sin x where a, b are parameters. (iv) y = a e^(x) + b e^(-x) where a, b are parameters.

Find the order of the differential equation corresponding to y=c(x-c)^(2) , where c is an arbitrary constant.

Form the differential equation corresponding to y=A cos 3x+B sin 3x, where A and B are parameters.

Find the locus of point (ct,(c)/(t)) where t is a parameter.

The order degree of the D.E. corres ponding to the family of curve y = a(x+a)^(2) where a is an arbitrary constant is

The differential equation representing the family of curves y^(2) = 2c (x + sqrtc) , where c gt 0 is a parameter, is of order and degree as follows.