26. 如图,直线AB,CD相交于点O,OM⊥AB于点O.
(1)若∠1 = ∠2,求∠NOD的度数;
(2)若∠BOC = 4∠1,求∠AOC与∠MOD的度数.

(1)若∠1 = ∠2,求∠NOD的度数;
(2)若∠BOC = 4∠1,求∠AOC与∠MOD的度数.
答案
(1)∵ OM⊥AB,∴ ∠AOM = 90°. ∴ ∠1 + ∠AOC = 90°. ∵ ∠1 = ∠2,∴ ∠2 + ∠AOC = 90°. ∴ ∠NOC = 90°. ∴ ∠NOD = 180° - ∠NOC = 180° - 90° = 90° (2)∵ OM⊥AB,∴ ∠AOM = ∠BOM = 90°. ∵ ∠BOC = 4∠1,∴ ∠BOM = 3∠1,即 3∠1 = 90°. ∴ ∠1 = 30°. ∴ ∠AOC = ∠AOM - ∠1 = 90° - 30° = 60°,∠MOD = 180° - ∠1 = 180° - 30° = 150°
27. (2024·通州期末)
(1)完成下面的证明.
如图,点M,N分别在AB,AD上,∠ABC = ∠AMN,∠C + ∠BNM = 180°.
求证:CD//BN.
证明:∵ ∠ABC = ∠AMN,∴ MN//______. ∴ ∠BNM = ______.
∵ ∠C + ∠BNM = 180°,∴ ∠C + ______ = 180°. ∴ CD//BN.
(2)在(1)的条件下,若∠ABC = 52°,∠D = 88°,BN平分∠ABC,求∠ANM的度数.

(1)完成下面的证明.
如图,点M,N分别在AB,AD上,∠ABC = ∠AMN,∠C + ∠BNM = 180°.
求证:CD//BN.
证明:∵ ∠ABC = ∠AMN,∴ MN//______. ∴ ∠BNM = ______.
∵ ∠C + ∠BNM = 180°,∴ ∠C + ______ = 180°. ∴ CD//BN.
(2)在(1)的条件下,若∠ABC = 52°,∠D = 88°,BN平分∠ABC,求∠ANM的度数.
答案
(1)BC ∠CBN ∠CBN (2)∵ BN 平分 ∠ABC,∴ ∠CBN = $\frac{1}{2}$∠ABC = 26°. ∵ MN//BC,∴ ∠BNM = ∠CBN = 26°. ∵ CD//BN,∴ ∠D = ∠BNA = 88°. ∴ ∠ANM = ∠BNA - ∠BNM = 62°
28. 已知AB//CD.
(1)如图①,请探索∠A,∠E,∠C三个角之间的数量关系,并说明理由.
(2)若∠A = 24°.
① 如图②,若∠F = 100°,求∠C + ∠E的度数;
② 如图③,若∠AEF和∠DCF的平分线交于点G,请直接写出∠G与∠F的数量关系.

(1)如图①,请探索∠A,∠E,∠C三个角之间的数量关系,并说明理由.
(2)若∠A = 24°.
① 如图②,若∠F = 100°,求∠C + ∠E的度数;
② 如图③,若∠AEF和∠DCF的平分线交于点G,请直接写出∠G与∠F的数量关系.
答案
(1)∠AEC + ∠C - ∠A = 180° 理由:如图①,过点 E 作 EM//AB. ∵ AB//CD,∴ AB//EM//CD. ∴ ∠AEM = ∠A,∠MEC + ∠C = 180°. ∴ ∠AEM + ∠MEC + ∠C = ∠A + 180°,即 ∠AEC + ∠C - ∠A = 180°. (2)① 如图②,过点 F 作 FN//AB. ∵ AB//CD,∴ AB//FN//CD. ∴ ∠C + ∠NFC = 180°. ∴ ∠C = 180° - ∠NFC. 由(1),得 ∠E + ∠EFN - ∠A = 180°,∴ ∠E = 180° - ∠EFN + ∠A. ∴ ∠C + ∠E = 180° - ∠NFC + (180° - ∠EFN + ∠A),即 ∠C + ∠E = 360° - (∠NFC + ∠EFN) + ∠A = 360° - ∠EFC + ∠A. ∵ ∠EFC = 100°,∠A = 24°,∴ ∠C + ∠E = 360° - 100° + 24° = 284°
② ∠G + $\frac{1}{2}$∠F = 168° 解析:∵ EG 为 ∠AEF 的平分线,CG 为 ∠DCF 的平分线,∴ ∠AEG = ∠GEF,∠DCG = ∠GCF. 如图③,过点 E 作 EH//AB. ∵ AB//CD,∴ EH//CD,∠AEH = ∠A = 24°. 设 ∠HEG = x°,∠DCG = y°,则易得 ∠G = x° + y°,∠GEF = x° + 24°,∠GCF = y°. 又 ∵ 易知 ∠HEF + ∠F + ∠FCD = 360°,∠HEF = 2x° + 24°,∠FCD = 2y°,∴ 2x° + 24° + ∠F + 2y° = 360°. ∴ 2∠G + ∠F = 336°. ∴ ∠G + $\frac{1}{2}$∠F = 168°.
登录