The order of the differential equation obtained by the elimination of arbitrary constants a,b,c from the equation ax + by + c = 0 is -

The differential equation obtained by eliminating. constants A and B from Ax^(2)+By^(2)=1 is -

The differential equation obtained by eliminating constants A and B from y=Ae^(2x)+Be^(-(x)/(2)) is -

Find the differential equation of y = Ax + (B)/(x) , where A and B are arbitrary constants .

Show that the differential equation (dy)/(dx) = y is formed by eliminating a and b from the relation y = ae^(b + x) .

Statement 1 : Order of a differential equation represents the number of arbitrary constants in the general solution. Statement 2 : Degree of a differential equation represents the number of family of curves. Which of the following Statement is/are are correct ?

The differential equation for the family of curve x^2+y^2-2a y=0, where a is an arbitrary constant, is

Show that the differential equation x (yy_(2) + y_(1)^(2)) = yy_(1) is formed by eliminating a, b and c from the relation ax^(2) + by^(2) + c = 0 . Justify why the eliminate is of the second order although the given relation involves three constants a, b and c .

In each of the Exercises 1 to 5, form a differential equation representing the given family of curves by eliminating arbitrary constants a and b. 1. (x)/(a) + (y)/(b) = 1

Differential equation of the family of curves v=A/r+B , where A and B are arbitrary constants, is

Form the differential equation representing the family of curves y = mx where, m is arbitrary constant.