Question Details

Integrating factor of the differential equation dy/dx + y tan x – sec x = 0 is

Options

A

cos x

B

sec x

C

eᶜᵒˢ ˣ

D

eˢᵉᶜ ˣ

Correct Answer :

sec x

Solution :

The correct option is sec x.

To find the integrating factor of the given differential equation, we first write it in standard form.

The given first-order differential equation is:
dy dx + y tan x - sec x = 0

Rearranging the terms, we get:
dy dx + ( tan x ) y = sec x

This is a linear differential equation of the form:
dy dx + P ( x ) y = Q ( x )

By comparison, we identify the coefficient functions:
P ( x ) = tan x

The formula for the integrating factor (I.F.) is:
I.F. = e P ( x ) d x

Substituting P(x)=tanx into the formula:
I.F. = e tan x d x

Since the integration of the tangent function is given by:
tan x d x = ln | sec x |

We can substitute this back into the exponent:
I.F. = e ln | sec x |

Using the identity elnu=u, the expression simplifies to:
I.F. = sec x

Thus, the integrating factor is sec x.

Unlock Our Free Library

Access expert-curated educational resources and study materials—completely free.

Discover more resources

You may also like

Mock Tests

View All
  • JEE
  • intermediate
  • 3 hours
  • chemistry, mathematics, physics

  • JEE
  • intermediate
  • 3 hours
  • chemical engineering, mathematics, physics