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OpenStudy (anonymous):
d/dx ln(x2+x) find the indicated derivative and simply. The ln(x2+x) is under a radical
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OpenStudy (anonymous):
\[d/dx \sqrt{\ln(x^{2}+x)}\]=(ln(x^{2}+x)^(1/2) Then you can use the rule of powers to find the derivative. The rule of powers says d/dx (u^n)=n(u^(n+1)). The derivative of ln v=1/v. By combining these two rules you can find the derivative of your function
OpenStudy (anonymous):
Thank you
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