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Mathematics
The value of ∫ limits (dx/x2(x4+1)3/4) is
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Q. The value of $\int \limits \frac {dx}{x^2(x^4+1)^{3/4}}$ is
JEE Main
JEE Main 2015
Integrals
A
$\bigg (\frac {x^4+1}{x^4}\bigg )^\frac {1}{4}+ c $
26%
B
$(x^4+1)^\frac {1}{4}+c$
26%
C
$-(x^4+1)^\frac {1}{4}+c$
6%
D
$- \bigg (\frac {x^4+1}{x^4} \bigg )^ \frac {1}{4}+c$
43%
Solution:
$\int \limits \frac {dx}{x^2(x^4+1)^{3/4}}= \int \limits \frac {dx}{x^5 \bigg (1+ \frac {1}{x^4} \bigg )^{3/4}} $
put $1+ \frac {1}{x^4}=t^4 \Rightarrow \frac {-4}{x^5}dx=4t^3dt \Rightarrow \frac {dx}{x^5}=-t^3dt$
Hence, the integral becomes
$\int \limits \frac {-t^3dt}{t^3}=- \int \limits dt=-t+c=- \bigg (1+ \frac {1}{x^4} \bigg )^{1/4}+ c$