微元法 我们先回忆一下求曲边梯形面积S 的步骤:对区间[, ] a b 作划分 ax x x x b = 012 < < <\< n = , 然后在小区间 ],[ 1 ii xx − 中任取点ξ i ,并记 =Δ − iii −1 xxx ,这样就得到了小 曲边梯形面积的近似值 i ii Δ ≈ ξ )( ΔxfS 。最后,将所有的小曲边梯形面积 的近似值相加,再取极限,就得到
紧集上的连续映射 为了将一元连续函数在闭区间上的重要性质推广到多元连续函 数,为此先定义多元函数在点集的边界点连续的概念。 定义 11.3.1 设点集 K ⊂ n R ,f : K→ m R 为映射(向量值函数), x K 0 ∈ 。如果对于任意给定的ε > 0,存在δ > 0,使得当 0 xx K ∈O( ,) δ ∩ 时
General Description de range of applica is local on card bypassing is needed only if the regulator is located far from 9 gulation, eliminating the distribution problems associated the filter capacitor of the power supply
General Description hese devices need only one external com ation capacitor at the output. Tthe LM? aged in the to-220 power package and is capable applications requiring other voltages, see LM137 data 4 supplying 1.5A of output current These regulators employ internal current limiting safe area Features a Thermal, short circuit and sa tually all overload conditions