COMEDK · Maths · 28. Indefinite Integration
Integral of \(\int \dfrac{d x}{x^{2}\left[1+x^{4}\right]^{3 / 4}}\).
- A \(-4\left(x^{1 / 4}+1\right)^{1 / 4}+C\)
- B \(4\left(x^{1 / 4}+1\right)^{1 / 4}+C\)
- C \(4\left(x^{4}+1\right)^{1 / 4}+C\)
- D None of these
Answer & Solution
Correct Answer
(D) None of these
Step-by-step Solution
Detailed explanation
Let \(I = \int \dfrac{dx}{x^2(1+x^4)^{3/4}}\). Factor out \(x^4\) from the term in the bracket: \(I = \int \dfrac{dx}{x^2 [x^4(x^{-4} + 1)]^{3/4}} = \int \dfrac{dx}{x^2 \cdot x^3 (x^{-4} + 1)^{3/4}} = \int \dfrac{dx}{x^5 (x^{-4} + 1)^{3/4}}\). Let \(u = x^{-4} + 1\). Then…
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