Final answer:
To differentiate the function Y=(X^2+3)Ln(X^2+3), we can simplify the function using the properties of logarithms. The derivative of Y is 1 + ln(X^2+3) + 2X.
Step-by-step explanation:
To differentiate the function Y=(X2+3)Ln(X2+3), we can simplify the function using the properties of logarithms. The given function can be simplified as Y=(X2+3)ln(X2+3), where ln represents the natural logarithm. We can differentiate this function using the product rule and the chain rule.
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- First, let's simplify the function by applying the properties of logarithms. We have Y=(X2+3)ln(X2+3).
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- Next, let's differentiate the function using the product rule: y' = (X2+3) * (d/dx(ln(X2+3))) + ln(X2+3) * (d/dx(X2+3)).
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- To find the derivative of ln(X2+3), we use the chain rule: d/dx(ln(X2+3)) = 1/(X2+3) * d/dx(X2+3).
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- Substituting this back into the equation, we have y' = (X2+3) * (1/(X2+3) * d/dx(X2+3)) + ln(X2+3) * (d/dx(X2+3)).
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- Simplifying further, we get y' = 1 + ln(X2+3) + 2X.
Learn more about Differentiating a logarithmic function