What is the differential equation detected by the elimination of the arbitrary constant "K" from the equation `y=(x+K)e^(-4)`

Write the differential equation obtained by eliminating the arbitrary constant C in the equation x^(2)-y^(2)=C^(2)

Write the differential equation obtained eliminating the arbitrary constant C in the equation xy=C^(2) .

The elimination of the arbitrary constant k from the equation y=(x+k)e^(-x) gives the differential equation

Obtain the differential equation by eliminating the arbitrary constants from the following equation : y = c_(1) e^(2 x) + c_(2) e^(-2x).

Form the differential equations by eliminating the arbitrary constants from the following equations : 1. (1) xy = Ae^(x) + Be^(-x) + x^(2) (2) y= e^(-x) (A cos 2x + B sin 2x)

The differential equation by eliminating the arbitrary constant from the equation xy=ae^(x)+be^(-x)+x^(2) is xy_(2)+ky_(1)-xy=k then k=

Find the differential equation by eliminating arbitrary constants from the relation y = (c_(1) + c_(2)x)e^(x)

Obtion the differential equation by elininating arbitrary constants A, B from the equation - y=A cos (logx)+B sin (logx)

from the differential equation by eliminating the arbitrary constants from the following equations : (1) y= e^(x) (A cos x + B sin x)

Find the differential equation by eliminating arbitrary constants from the relation x ^(2) + y ^(2) = 2ax