Homework SourseLet fg be continuous function on ab Suppose fagb Prove that
Let f,g be continuous function on [a,b]. Suppose f(a)<g(a) and f(b)>g(b). Prove that there exists x sub zero belongs to (a,b) such that f(x sub zero)=g(x sub zero).
Solution
Define:
h(x)=f(x)-g(x)
h(a)=f(a)-g(a)<0
h(b)=f(b)-g(b)>0
h is continous on [a,b] because f and g are continous on [a,b]
Hence by INtermediate value theorem
h(x_0)=0 for some x_0 in (a,b)
ie f(x_0)-g(x_0)=0 for some x_0 in (a,b)
![Let f,g be continuous function on [a,b]. Suppose f(a)<g(a) and f(b)>g(b). Prove that there exists x sub zero belongs to (a,b) such that f(x sub zero)=g(x](/WebImages/6/let-fg-be-continuous-function-on-ab-suppose-fagb-prove-that-985678-1761506379-0.webp "Let f,g be continuous function on [a,b]. Suppose f(a)<g(a) and f(b)>g(b). Prove that there exists x sub zero belongs to (a,b) such that f(x sub zero)=g(x")
