Interactive Real Analysis - part of MathCS.org

• Real Analysis
• 1. Sets and Relations
• 2. Infinity and Induction
• 3. Sequences of Numbers
• 4. Series of Numbers
• 5. Topology
• 6. Limits, Continuity, and Differentiation
• 7. The Integral
• 8. Sequences of Functions
• 8.1. Pointwise Convergence
• 8.2. Uniform Convergence
• 8.3. Series and Power Series
• 8.4. Taylor Series
• 8.5. Approximation Theory
• 9. Historical Tidbits
• Java Tools

Theorem 8.2.7: Uniform Convergence and Integration

Why these ads ...

Let f_n(x) be a sequence of continuous functions defined on the interval [a, b] and assume that f_n converges uniformly to a function f. Then f is Riemann-integrable and

f_n(x) dx = f_n(x) dx = f(x) dx

Context

Since f_n are continuous and converge uniformly to f, the limit function must be continuous. In particular all functions must therefore be Riemann integrable. Also: