This problem contains two questions that need to be solved for: order of the differential equation and whether it is linear or nonlinear.

To determine the order of the differential equation, look for the highest derivative in the equation.

For this particular function recall that,

therefore the highest derivative is three which makes the equation a third ordered differential equation.

The second part of this problem is to determine if the equation is linear or nonlinear. For a differential equation to be linear two characteristics must hold true:

1. The dependent variableand all its derivatives have a power involving one.

2. The coefficients depend on the independent variable.

Looking at the given function,

it is seen that all the variableand all its derivatives have a power involving one and all the coefficients depend ontherefore, this differential equation is linear.

To answer this problem completely, the differential equation is a linear, third ordered equation.

By the cauchy-peano theorem, for, as long asis continuous on a closed rectangle around our starting point, we have local existence. All three functions are continuous everywhere, so they enjoy local existence at every starting point.

We can show that the solutions to differential equations are unique by showing thatis Lipschitz continuous in y. Ifis continuous, then this will suffice to show the Lipschitz continuity.

Note that the first and third equations are continuous for all y and t, but that the second is not continuous when. More concretely, when, both the equationand the equationwould satisfy the differential equation.

This problem contains two questions that need to be solved for: order of the differential equation and whether it is linear or nonlinear.

To determine the order of the differential equation, look for the highest derivative in the equation.

For this particular function recall that,

therefore the highest derivative is three which makes the equation a third ordered differential equation.

The second part of this problem is to determine if the equation is linear or nonlinear. For a differential equation to be linear two characteristics must hold true:

1. The dependent variableand all its derivatives have a power involving one.

2. The coefficients depend on the independent variable.

Looking at the given function,

it is seen that all the variableand all its derivatives have a power involving one and all the coefficients depend ontherefore, this differential equation is linear.

To answer this problem completely, the differential equation is a linear, third ordered equation.

By definition, an autonomous differential equation does not depend explicitly on the independent variable. An autonomous differential equation will take the form

This problem contains two questions that need to be solved for: order of the differential equation and whether it is linear or nonlinear.

To determine the order of the differential equation, look for the highest derivative in the equation.

For this particular function recall that,

therefore the highest derivative is three which makes the equation a third ordered differential equation.

The second part of this problem is to determine if the equation is linear or nonlinear. For a differential equation to be linear two characteristics must hold true:

1. The dependent variableand all its derivatives have a power involving one.

2. The coefficients depend on the independent variable.

Looking at the given function,

it is seen that all the variableand all its derivatives have a power involving one and all the coefficients depend ontherefore, this differential equation is linear.

To answer this problem completely, the differential equation is a linear, third ordered equation.

This equation is third order since that is the highest order derivative present in the equation.

This is equation in linear becauseand derivatives appear to the first power only.anddo not affect the linearity.