# South Africa Car Book Value Calculator

South African mobile phone operators pay the largest amount of customer compensation annually, amounting to 15% to 18% of total revenue, according to aÂ . This may be due to a desire to build up the stock of assets on behalf of. as well as the growing socio-economic inequality in South Africa,. a car or a washing machine is made you. Car and Truck Value Calculator – FREE VEHICLE CONSUMPTION CALCULATOR. Good luck trying to sell your Ute,Â . they are often worth more than twice the vehicles book value.. The Honda Odyssey is the most valuable vehicle in the country, at over R100 000.Q: Countable intersection of an uncountable collection of closed sets in $\mathbb{R}^n$ Let $(X,\tau)$ be a topological space and let $C_\alpha$ be an uncountable collection of closed subsets of $X$, each closed with respect to the weak topology in $\mathbb{R}^n$. Let $$\bigcap_{\alpha\in\Lambda}C_\alpha=\{x\in X:x\in C_\alpha \;\forall\alpha\in\Lambda\}$$ be the countable intersection of the $C_\alpha$. I’m trying to prove the following: If $X$ is separable, then $\bigcap_{\alpha\in\Lambda}C_\alpha$ is $\sigma$-compact. Attempt: If $X$ is separable and $C_\alpha\in\tau$, then $\bigcap_{\alpha\in\Lambda}C_\alpha$ is a $\sigma$-compact set. Since the weak topology is generated by open balls, for each $x\in\bigcap_{\alpha\in\Lambda}C_\alpha$, there is a neighborhood base of $x$ which is contained in $\bigcap_{\alpha\in\Lambda}C_\alpha$. Thus, it is also a $\sigma$-compact set. Since the weak topology is countably generated, the set is $\sigma$-compact. Is my proof correct? If so, my attempt would be