How to Find the Integral of 1/a arctan(u/a): Step-by-Step Guide

1/a arctan u/a +c

To find the integral of the expression 1/a arctan(u/a) + c, where u is a variable and a and c are constants, we can use the basic integration rules

To find the integral of the expression 1/a arctan(u/a) + c, where u is a variable and a and c are constants, we can use the basic integration rules.

First, let’s simplify the expression:

∫(1/a arctan(u/a)) du + c

Since arctan(u/a) is a function, we need to use the substitution method. Let’s assume that w = u/a, which means u = aw.

Differentiating both sides with respect to u gives us:

dw/du = 1/a

Now we need to substitute these values into the integral:

∫(1/a arctan(u/a)) du = ∫(1/a arctan(w)) a dw

Simplifying this further:

= ∫arctan(w) dw

The integral of arctan(w) can be found using integration by parts. Recall the formula:

∫u dv = uv – ∫v du

Here, let’s choose:

u = arctan(w) –> du = 1/(1+w^2) dw
dv = dw –> v = w

Applying the formula:

∫arctan(w) dw = w arctan(w) – ∫w/(1+w^2) dw

Now we can proceed with integrating the remaining term:

∫w/(1+w^2) dw

We can use another substitution to simplify this integral. Let’s assume z = 1 + w^2:

dz/dw = 2w –> dw = dz/(2w)

Substituting these values back into the integral:

∫w/(1+w^2) dw = ∫(1/2) dz/z

The integral becomes:

= (1/2) ln|z| + c’

Substituting back z = 1 + w^2:

= (1/2) ln|1+w^2| + c’

Now we can substitute w = u/a:

= (1/2) ln|1+(u/a)^2| + c’

Finally, we substitute back to our original variable u:

∫(1/a arctan(u/a)) du = (1/2) ln(1+(u/a)^2) + c’

Hence, the integral of 1/a arctan(u/a) du is (1/2) ln(1+(u/a)^2) + c’ where c’ represents the constant of integration.

More Answers:

Simplified Expression: ln|1 + tan(u)| – ln|cos(u)| + c
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Understanding the Properties and Behavior of the Arcsin Function for Evaluating the Expression arcsin(u/a) + c

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