Extremum, Increase and Decrease Sections – Proof of inequality – Exercise 2222 Post category:Extremum, Increase and Decrease Sections Post comments:0 Comments Exercise Given x≥−1x\geq -1x≥−1 Prove the following 1+x≤1+x2\sqrt{1+x}\leq 1+\frac{x}{2}1+x≤1+2x Proof Coming soon… Share with Friends Read more articles Previous PostExtremum, Increase and Decrease Sections – Calculate global Extremum Points – Exercise 2225 Next PostExtremum, Increase and Decrease Sections – Proof of inequality – Exercise 2208 You Might Also Like Extremum, Increase and Decrease Sections – A quotient of functions with ln – Exercise 6837 July 25, 2019 Extremum, Increase and Decrease sections – Min/Max problems (maximal volume) – Exercise 6897 July 29, 2019 Extremum, Increase and Decrease Sections – A polynomial – Exercise 6814 July 24, 2019 Extremum, Increase and Decrease Sections – A rational function – Exercise 6820 July 24, 2019 Extremum, Increase and Decrease Sections – A polynomial – Exercise 6805 July 24, 2019 Extremum, Increase and Decrease sections – Extremum to a function with a third root in a closed interval – Exercise 6878 July 28, 2019 Leave a Reply Cancel replyCommentEnter your name or username to comment Enter your email address to comment Enter your website URL (optional) Δ
Extremum, Increase and Decrease Sections – A quotient of functions with ln – Exercise 6837 July 25, 2019
Extremum, Increase and Decrease sections – Min/Max problems (maximal volume) – Exercise 6897 July 29, 2019
Extremum, Increase and Decrease sections – Extremum to a function with a third root in a closed interval – Exercise 6878 July 28, 2019
