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प्रश्न
`int(logx)^2dx` equals ______.
विकल्प
(x logx)2 – 2x logx + 2x + c
x(logx)2 – 2x logx + 2x + c
x(logx)2 + 2x logx + 2x + c
x(logx)2 + 2x logx – 2x + c
MCQ
रिक्त स्थान भरें
उत्तर
`int(logx)^2dx` equals `underlinebb(x(log x)^2 - 2x log x + 2x + c)`.
Explanation:
I = `int1.(logx)^2dx` ...[Using by parts]
Take 1 as the second function then,
I = `x(logx)^2 - intx.(2logx)/xdx`
= `x(logx)^2 - 2intlogxdx`
Again by parts
I = `x(logx)^2 - 2[xlogx - intx. 1/x dx]`
= x(logx)2 – 2x logx + 2x + c
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