   Chapter 6.1, Problem 47E

Chapter
Section
Textbook Problem

Finding a General Solution In Exercises 43-52, use integration to find a general solution of the differential equation. d y d x = sin 2 x

To determine

To calculate: The general solution of the differential equation dydx=sin2x by integration.

Explanation

Given:

The granted differential equation is dydx=sin2x

Formula used:

The integration of the sine function,

sinaxdx=1acosax+C

Calculation:

Consider the differential equation,

dydx=sin2xdy=sin2

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