12x2?3x?1a2???1??2,解得a?2.?f(x)?lnx?x?3x,f?(x)??2x?3?
2xx2x2?3x?11由f?(x)??0,得0?x?或x?1,x2 22x?3x?11由f?(x)??0,得?x?1x211?f(x)的单调递增区间为(0,),(1,??),f(x)的单调递减区间为(,1).
22f(x)f?(x)lnxa1axa?1??x?(a?1)???(2)若,则 x2x22x22lnx1a?1??即在区间(0,??)上恒成立. x2x2lnx11?lnx13?2lnx???设h(x)?,则h?(x)? x2xx22x22x2由h?(x)?0,得0?x?e,?h(x)在(0,e)上单调递增 由h?(x)?,得x?e,?h(x)在(e,??)上单调递减
?a?1?2?e可得a?2e2?1 ?h(x)的最大值为h(e)?e,由2??3232323232323233?实数a的取值范围是(2e?1,??)
22(10分).极坐标系与直角坐标系xoy有相同的长度单位,以原点O为极点,以x轴正半轴为
1?x?2?t?2?极轴.已知直线l的参数方程为?(t为参数),曲线C的极坐标方程为
?y?3t?2??sin2??8cos?.(I)求C的直角坐标方程;
(II)设直线l与曲线C交于A,B两点,求弦长|AB|. 22解:(Ⅰ)由?sin2??8cos?,得?2sin2??8?cos?,即曲线C的直角坐标方程为
y2?8x. ............5分
22(Ⅱ)将直线l的方程代入y?8x,并整理得3t?16t?64?0,t1?t2?1664,t1t2??. 33所以|AB|?|t1?t2|?(t1?t2)2?4t1t2?32............10分 3