Proof Let be a continuous function such that over a region of area 1. Prove that
Chapter 14, Problem 43(choose chapter or problem)
Let f be a continuous function such that \(0 \leq f(x, y) \leq 1\) over a region R of area 1. Prove that \(0 \leq \int_{R} \int f(x, y) d A \leq 1\).
Text Transcription:
0 leq f(x, y) leq 1
(0 leq int_R int f(x, y) d A leq 1
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