Proof of Continuity – A split function with polynomial functions and a parameter – Exercise 5874 Post category:Continuity by Definition Post comments:0 Comments Exercise Given the function f(x)={x+k,x≤25−x,x>2f(x) = \begin{cases}x+k, &\quad x\leq 2\\ 5-x, &\quad x > 2\\ \end{cases}f(x)={x+k,5−x,x≤2x>2 k is a parameter. For what values of the parameter the function is continuous? Final Answer Show final answer k=1k=1k=1 Solution Coming soon… Share with Friends Read more articles Previous PostProof of Continuity – A split function with a polynomial and a rational function – Exercise 5871 Next PostProof of Continuity – A split function with polynomial functions and a parameter – Exercise 5876 You Might Also Like Proof of Continuity – A split function with exponential functions – Exercise 6230 July 5, 2019 Proof of Continuity – A split function with ln and a third root – Exercise 6240 July 5, 2019 Proof of Continuity – A split function with a function to the power of a function – Exercise 6236 July 5, 2019 Proof of Continuity – A split function with polynomial functions and a parameter – Exercise 5876 June 30, 2019 Proof of Continuity – A split function with exponential functions with a parameter – Exercise 6248 July 5, 2019 Proof of Continuity – A split function with rational functions and parameters – Exercise 6594 July 16, 2019 Leave a Reply Cancel replyCommentEnter your name or username to comment Enter your email address to comment Enter your website URL (optional) Δ
Proof of Continuity – A split function with a function to the power of a function – Exercise 6236 July 5, 2019
Proof of Continuity – A split function with polynomial functions and a parameter – Exercise 5876 June 30, 2019
Proof of Continuity – A split function with exponential functions with a parameter – Exercise 6248 July 5, 2019
Proof of Continuity – A split function with rational functions and parameters – Exercise 6594 July 16, 2019