Bernoulli`s D.E. and Equations Reducible to Linear D.E.

Bernoulli's D.E. || Equations Reducible to Linear D.E.

Solution of Equation Reducable to linear equation

Polar substitution || Linear demand reducible to linear D.E.( Bernoulli's theorem)

Number of arbitrary constant in the general solution of a differential equation is equal to order of D.E.

Assertion: The general solution of ( dy ) /( dx) + y =1 is y e^x = e ^(X)+C Reason: The number of arbitrary constant in the general solution of the differential equation is equal to the order of D.E.

The standard unit circle satisfies the D.E.

Reducible To Linear Differential Equations

Differential Equation - Solution Of Differential Equation|Variable Separable Differential Equation - Type 2|Questions|Type 3 - Exact Differential|Questions|Homogeneous D.E.|Linear D.E.|Questions|Type 2 - Bernoulli D.E|Questions|OMR

Determine the order and degree of each of the following differential equation.State also whether they are linear or non-linear: (d^(3)x)/(dt^(3))+(d^(2)x)/(dt^(2))+((dx)/(dt))^(2)=e^(t)

Theory || Order and degree formation OF D.E. || Variable separable type D.E.