Calculating Limit of Function – A ln function divided by a polynomial – Exercise 5961 Post category:Calculating Limit of Function Post comments:0 Comments Exercise Evaluate the following limit: limx→0ln(1+x2)2x2\lim _ { x \rightarrow 0} \frac{\ln (1+x^2)}{2x^2}x→0lim2x2ln(1+x2) Final Answer Show final answer limx→0ln(1+x2)2x2=12\lim _ { x \rightarrow 0} \frac{\ln (1+x^2)}{2x^2}=\frac{1}{2}x→0lim2x2ln(1+x2)=21 Solution Coming soon… Share with Friends Read more articles Previous PostCalculating Limit of Function – A rational function – Exercise 5956 Next PostCalculating Limit of Function – A ln function divided by x – Exercise 5965 You Might Also Like Calculating Limit of Function – A quotient of polynomials – Exercise 6023 July 3, 2019 Calculating Limit of Function – An exponential function divided by a polynomial- Exercise 5979 July 2, 2019 Calculating Limit of Function – A quotient of polynomials to the power of a quotient – Exercise 5996 July 2, 2019 Calculating Limit of Function – A function with e in the power of a function with e to infinity – Exercise 6329 July 6, 2019 Calculating Limit of Function – A rational function – Exercise 6192 July 4, 2019 Calculating Limit of Function – A quotient of polynomials of second degree – Exercise 5917 June 30, 2019 Leave a Reply Cancel replyCommentEnter your name or username to comment Enter your email address to comment Enter your website URL (optional) Δ
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