4.無論a取何值��,過點(diǎn)P(4�,6+2a)和Q(1����,3a)的直線總過第一、二象限�����,則實(shí)數(shù)a的取值范圍是($\frac{3}{5}����,6$).
分析 由題意畫出圖形�,把過點(diǎn)P(4����,6+2a)和Q(1,3a)的直線總過第一��、二象限轉(zhuǎn)化為過點(diǎn)P�、Q與過點(diǎn)O、P的直線的斜率間的關(guān)系求解.
解答 
解:如圖
${k}_{PQ}=\frac{6+2a-3a}{4-1}=\frac{6-a}{3}$��,${k}_{OP}=\frac{6+2a}{4}=\frac{3+a}{2}$��,
要使過點(diǎn)P(4,6+2a)和Q(1���,3a)的直線總過第一、二象限���,
則$\left\{\begin{array}{l}{{k}_{PQ}>0}\\{{k}_{OP}>{k}_{PQ}}\end{array}\right.$或$\left\{\begin{array}{l}{{k}_{PQ}<0}\\{{k}_{OP}<{k}_{PQ}}\end{array}\right.$,
即$\left\{\begin{array}{l}{\frac{6-a}{3}>0}\\{\frac{3+a}{2}>\frac{6-a}{3}}\end{array}\right.$①�,或$\left\{\begin{array}{l}{\frac{6-a}{3}<0}\\{\frac{3+a}{2}<\frac{6-a}{3}}\end{array}\right.$②
解①得:$\frac{3}{5}<a<6$�����;
解②得:a∈∅.
∴實(shí)數(shù)a的取值范圍是($\frac{3}{5},6$).
故答案為:($\frac{3}{5}�,6$).
點(diǎn)評 本題考查直線的斜率����,考查了數(shù)形結(jié)合的解題思想方法和數(shù)學(xué)轉(zhuǎn)化思想方法���,是中檔題.
