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2023年12月13日 · 圓的基本性質 Basic Properties of Circles 1. 圓心至弦的垂線平分弦(⊥from centre to chord bisects chord) 2. 圓心至弦中點的連線垂直弦(line joining centre and mid-pt. of chord ⊥chord) 3. 弦的垂直平分線穿過圓心(⊥bisector of chord passes through centre) 4. 等
圓內接四邊形相關的特性 (Properties related to Cyclic quadrilateral) 圓切線特性 Tangent properties of circle. 本網站剛遭到不知名攻擊,其中某些網頁會自動連接去一些色情網站。 我們將會排定時間修復,敬請原諒! 圓心至弦的垂線 (Perpendiculars to Chords) 圓心至弦的垂線平分弦 (⊥from centre to chord bisects chord) 圓心至弦的垂線平分弦 若 ON ⊥ AB,則 AN = NB. 圓心至弦中點的連線垂直弦 (line joining centre to mid-pt. of chord ⊥ chord) 圓心至弦中點的連線垂直弦 若 AN=NB,則 ON AB.
2024年2月19日 · 喺DSE考核範圍裡面,大家需要識得圓形、切線、半徑、直徑、圓內接三角形或四邊形、弦弧線之間嘅關係。. AfterSchool 為你整合出最詳細嘅Basic Properties of Circles,幫助你輕鬆重溫!. 想學埋其他形狀嘅性質及證明?. 即撳: 【圖形性質 Reason 列表】Geometry prove reason ...
分節內容:00:00 Introduction 簡介01:36 Reason Type 1-Bisection of Chord 原因一-平分弦03:05 Reason Type 2-Relationship between Chord and Centre 原因二-弦與圓心關係03:37 ...
- 13 分鐘
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- Beyond Math
本課件展示了切線上的兩個弦切角與對應的兩個弧的大小關係,以說明弧長在弦切角與內錯弓形圓周角的關係中擔當了中介角色,加深學生對定理的理解。 15 圓內接四邊形對角 (與弦切角的關係) | Opposite Angles of Cyclic Quadrilaterals (with tangent-chord angles) 一般課本會將圓內接四邊形對角轉化為一對總和是360度的圓心角,從而証明圓內接四邊形對角之和是180度。 本課件在學生學習內錯弓形的圓周角後,嘗試用另一角度理解圓內接四邊形對角之和。 16 三個圓定理的關係 | Relationships among 3 Circle Theorems.
11.2 理解 圓上角的性質 (Understand the Angle Properties of a Circle) 圓上角的性質 應該係DSE圓形平面幾何入面考得最多嘅定理。 要學好,首先要學點分囻上面嘅兩種角:圓周角及圓心角。
11.6 使用圓的基本性質作簡單幾何證明 (Use the Basic Properties of Circles to Perform Simple Geometric Proof) 喺演釋幾何入面除咗“俾幅圖你,要你計未知角”嘅題目之外,另一種題目就係“證明題” (Geometric Proof)。. 做證明題唔同計未知角,題目要你證明嘅嘢係一定啱嘅。.
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