7. 设AB、CD、EF是同一平面内三条互相平行的直线. 已知AB与CD之间的距离是12 cm,EF与CD之间的距离是5 cm,则AB与EF之间的距离是________.
答案
7 cm或17 cm
8. 如图,在矩形ABCD中,AB = 6,AD = 8,且有一点P从点B出发,沿着BD往点D移动,过点P作AB的垂线,交AB于点E,过点P作AD的垂线,交AD于点F,连接EF,则EF长的最小值为________.
答案
$\frac{24}{5}$ 解析:根据题意,得四边形AEPF为矩形,连接AP,则
AP = EF,将求EF长的最小值转化成求AP长的最小值. 由于垂线段最短,因此当AP⊥BD时,AP的长取得最小值. 此时
$S_{\triangle ABD}=\frac{1}{2}AB\cdot AD=\frac{1}{2}BD\cdot AP$,得$AP=\frac{24}{5}$,∴EF长的最小值为$\frac{24}{5}$.
AP = EF,将求EF长的最小值转化成求AP长的最小值. 由于垂线段最短,因此当AP⊥BD时,AP的长取得最小值. 此时
$S_{\triangle ABD}=\frac{1}{2}AB\cdot AD=\frac{1}{2}BD\cdot AP$,得$AP=\frac{24}{5}$,∴EF长的最小值为$\frac{24}{5}$.
9.(2024·贵州)如图,四边形ABCD的对角线AC与BD相交于点O,AD//BC,∠ABC = 90°,________. 有以下条件:① AB//CD;② AD = BC.
(1)请从①②中任选1个填到横线上(填序号),求证:四边形ABCD是矩形;
(2)在(1)的条件下,若AB = 3,AC = 5,求四边形ABCD的面积.
(1)请从①②中任选1个填到横线上(填序号),求证:四边形ABCD是矩形;
(2)在(1)的条件下,若AB = 3,AC = 5,求四边形ABCD的面积.
答案
(1)选择不唯一,如选择① ∵AD//BC,AB//CD,∴四边形ABCD是平行四边形. ∵∠ABC = 90°,∴四边形ABCD是矩形 (2)∵∠ABC = 90°,AB = 3,AC = 5,∴BC = $\sqrt{AC^{2}-AB^{2}}$ = 4. ∵四边形ABCD是矩形,∴四边形ABCD的面积 = AB·BC = 3×4 = 12
10. 如图,AC = AB,AD = AE,DE = BC,∠BAD = ∠CAE. 求证:四边形BCDE是矩形(用两种不同的矩形判定方法证明).
答案
证法一:∵∠BAD = ∠CAE,∴∠BAD - ∠BAC = ∠CAE - ∠BAC,即∠CAD = ∠BAE. 又∵AC = AB,AD = AE,∴△CAD≌△BAE. ∴∠CDA = ∠BEA,CD = BE. 又∵DE = BC,∴四边形BCDE是平行四边形. ∴BE//CD.
∴∠CDE + ∠BED = 180°. ∵AD = AE,∴∠ADE = ∠AED.
∴∠CDA - ∠ADE = ∠BEA - ∠AED,即∠CDE = ∠BED.
∴∠CDE = ∠BED = 90°. ∴四边形BCDE是矩形 证法二:同证法一,得△CAD≌△BAE,∴CD = BE. 又∵DE = BC,
∴四边形BCDE是平行四边形. 连接BD、CE. ∵AB = AC,∠BAD = ∠CAE,AD = AE,∴△BAD≌△CAE. ∴BD = CE. ∴四边形BCDE是矩形
∴∠CDE + ∠BED = 180°. ∵AD = AE,∴∠ADE = ∠AED.
∴∠CDA - ∠ADE = ∠BEA - ∠AED,即∠CDE = ∠BED.
∴∠CDE = ∠BED = 90°. ∴四边形BCDE是矩形 证法二:同证法一,得△CAD≌△BAE,∴CD = BE. 又∵DE = BC,
∴四边形BCDE是平行四边形. 连接BD、CE. ∵AB = AC,∠BAD = ∠CAE,AD = AE,∴△BAD≌△CAE. ∴BD = CE. ∴四边形BCDE是矩形
