Question:
$ \int \frac{x^3dx}{1+x^4} $ equals
$ \int \frac{x^3dx}{1+x^4} $ equals
Updated On: Jun 14, 2022
- $ log (x^4+1) +C $
- $ \frac{1}{4} log (x^4+1)+C $
- $ \frac{1}{2} log (x^4 +1) +C $
- $ None\, of\, these $
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The Correct Option is A
Solution and Explanation
Let $I = \int \frac{x^3}{1+x^4} dx \,\,...(i)$
Again, let $ 1 + x^4 = t$
$\Rightarrow 4x^3 \,dx = dt $
$\Rightarrow x^3 \,dx = \frac{1}{4} dt$
On putting these values in E $(i)$, we get
$I = \frac{1}{4} \int \frac{dt}{t}$
$ =\frac{1}{4} log \,t +C$
$\Rightarrow I = \frac{1}{4} log (1 + x^2) + C $ [From E $(i)$]
Again, let $ 1 + x^4 = t$
$\Rightarrow 4x^3 \,dx = dt $
$\Rightarrow x^3 \,dx = \frac{1}{4} dt$
On putting these values in E $(i)$, we get
$I = \frac{1}{4} \int \frac{dt}{t}$
$ =\frac{1}{4} log \,t +C$
$\Rightarrow I = \frac{1}{4} log (1 + x^2) + C $ [From E $(i)$]
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Concepts Used:
Integrals of Some Particular Functions
There are many important integration formulas which are applied to integrate many other standard integrals. In this article, we will take a look at the integrals of these particular functions and see how they are used in several other standard integrals.
Integrals of Some Particular Functions:
- ∫1/(x2 – a2) dx = (1/2a) log|(x – a)/(x + a)| + C
- ∫1/(a2 – x2) dx = (1/2a) log|(a + x)/(a – x)| + C
- ∫1/(x2 + a2) dx = (1/a) tan-1(x/a) + C
- ∫1/√(x2 – a2) dx = log|x + √(x2 – a2)| + C
- ∫1/√(a2 – x2) dx = sin-1(x/a) + C
- ∫1/√(x2 + a2) dx = log|x + √(x2 + a2)| + C
These are tabulated below along with the meaning of each part.
