These are true/false questions. I need explanations (using definitions) why given situations are true or false. 1) If 0≤a≤1/e , then the equation x.e-x=a has a nonnegative solution. 2) Suppose that a function y=f(x) is continuous on I=[a,b] and if the set f(I)=[f(a), f(b)], then y=f(x) is strictly increasing. 3) If y=f(x) is an increasing function on the interval (a,b) and the set {f(x): a

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
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These are true/false questions. I need explanations (using definitions) why given situations are true or false.

1) If 0≤a≤1/e , then the equation x.e-x=a has a nonnegative solution.

2) Suppose that a function y=f(x) is continuous on I=[a,b] and if the set f(I)=[f(a), f(b)], then y=f(x) is strictly increasing.

3) If y=f(x) is an increasing function on the interval (a,b) and the set {f(x): a<x<b}=f((a,b)) is also an interval, then y=f(x) is continuous on (a,b).

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