Let $ f,g: U \to \mathbb{R}^+$ be integrable functions, where $ U$ is a bounded subset of $ \mathbb{R}^n$ .

Under what assumptions on $ f$ is it true that $ $ f(x)\int_{U} g(x) dx \le \int_U f(x) g(x) dx \ ?$ $

Skip to content
# Tag: $fx\int_{U}

## When is it true that $f(x)\int_{U} g(x) dx \le \int_U f(x) g(x)$ ($f$ non constant)?

100% Private Proxies – Fast, Anonymous, Quality, Unlimited USA Private Proxy!

Get your private proxies now!

Let $ f,g: U \to \mathbb{R}^+$ be integrable functions, where $ U$ is a bounded subset of $ \mathbb{R}^n$ .

Under what assumptions on $ f$ is it true that $ $ f(x)\int_{U} g(x) dx \le \int_U f(x) g(x) dx \ ?$ $

DreamProxies - Cheapest USA Elite Private Proxies
100 Cheap Private Proxies
200 Cheap Private Proxies
400 Cheap Private Proxies
1000 Cheap Private Proxies
2000 Cheap Private Proxies
5000 Cheap Private Proxies
ExtraProxies.com - Buy Cheap Private Proxies
Buy 50 Private Proxies
Buy 100 Private Proxies
Buy 200 Private Proxies
Buy 500 Private Proxies
Buy 1000 Private Proxies
Buy 2000 Private Proxies
Proxies-free.com