   Chapter 12, Problem 31RE ### Mathematical Applications for the ...

11th Edition
Ronald J. Harshbarger + 1 other
ISBN: 9781305108042

#### Solutions

Chapter
Section ### Mathematical Applications for the ...

11th Edition
Ronald J. Harshbarger + 1 other
ISBN: 9781305108042
Textbook Problem

# In Problems 27-32, find the general solution to each differential equation. 31.   d y d t = x e y

To determine

To calculate: The general solution to the differential equation, dydx=xey.

Explanation

Given Information:

The provided differential equation is, dydx=xey.

Formula used:

The differential equation can be equivalently expressed as,

g(y)dy=f(x)dx

So, the equation is separable. So, integrate the above equation on both sides,

g(y)dy=f(x)dx

Calculation:

Consider the provided differential equation,

dydx=xey

The equation is in separable form

### Still sussing out bartleby?

Check out a sample textbook solution.

See a sample solution

#### The Solution to Your Study Problems

Bartleby provides explanations to thousands of textbook problems written by our experts, many with advanced degrees!

Get Started 