Continuity Theorems – Intermediate value theorem – Exercise 1040 Post category:Continuity Theorems Post comments:0 Comments Exercise The function f(x) Is continuous for all real numbers and the following holds |f(x)|\leq 4 For all real x. Prove that the equation 2x = 8- f(x) Has at least one real solution. Proof Coming soon Share with Friends Read more articles Previous PostContinuity Theorems – Intermediate value theorem – Exercise 1053 Next PostContinuity Theorems – Intermediate value theorem – Exercise 1033 You Might Also Like Continuity Theorems – Intermediate value theorem – Exercise 5878 June 30, 2019 Continuity Theorems – Intermediate value theorem – Exercise 6900 July 29, 2019 Continuity Theorems – Intermediate value theorem – Exercise 5881 June 30, 2019 Continuity Theorems – Intermediate value theorem – Exercise 6905 July 29, 2019 Continuity Theorems – Intermediate value theorem – Exercise 1033 December 9, 2018 Continuity Theorems – Intermediate value theorem – Exercise 1053 December 10, 2018 Leave a Reply Cancel replyCommentEnter your name or username to comment Enter your email address to comment Enter your website URL (optional) Δ