Homework Sourselet ab subset R be a closed bound interval let c element ab
let [a,b] subset R be a closed bound interval let c element (a,b) and let f:[a,b] -> R be a function. Suppose that f|[a,c] and f|[c,b] both satisfy the conclustion of the intermediate value theorem. Prove that f satisfies the conclusion of the intermediate value theorem
Solution
f is defined on the the closed interval [a,b]
Since f satisfies the intermediate value theorem in [a,c] f is continuous in [a,c]
so left limit of f(x) as x tends to c = f(c)
Similarly since f satisfies intermediate value theorem in [c,b] f is continuous in [c,b]
so left limit of f(x) as x tends to c = f(c)
Then there is no other possibility than f(c) = left limit = right limit
So f is continuous at c also both the sides
Hence in the interval [a,c)U(c,c)U(c,b] = [a,b], f satisfies intermediate value theorem
![let [a,b] subset R be a closed bound interval let c element (a,b) and let f:[a,b] -> R be a function. Suppose that f|[a,c] and f|[c,b] both satisfy the concl](/WebImages/17/let-ab-subset-r-be-a-closed-bound-interval-let-c-element-ab-1030541-1761534052-0.webp "let [a,b] subset R be a closed bound interval let c element (a,b) and let f:[a,b] -> R be a function. Suppose that f|[a,c] and f|[c,b] both satisfy the concl")
