integral of x log x dx
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it can be integrated by using integration by parts as shown in the attachment
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ur wlcm akshay
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HeY!!!
here is your answer,
Use the UV Rule for integration.Integral(uv.dx) = u×[integral v]dx -{(integral[du/dx])×[integral v]dx }dxSelect the value of u and v according to the LIATE Rule. Take the value of u according to the priority of LIATEL: Logarithmic functionI: Inverse trigonometric functionA: Arithmetic functionT: Trigonometric functionE: Exponential function(If you have a logarithmic function, then take it as u as the log function gets highest priority by this rule).The answer comes to be (logx)×(0.5x^2)-(0.25x^2)hope it helps
mrk as brainliest
here is your answer,
Use the UV Rule for integration.Integral(uv.dx) = u×[integral v]dx -{(integral[du/dx])×[integral v]dx }dxSelect the value of u and v according to the LIATE Rule. Take the value of u according to the priority of LIATEL: Logarithmic functionI: Inverse trigonometric functionA: Arithmetic functionT: Trigonometric functionE: Exponential function(If you have a logarithmic function, then take it as u as the log function gets highest priority by this rule).The answer comes to be (logx)×(0.5x^2)-(0.25x^2)hope it helps
mrk as brainliest
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