3. As shown in Figure 2, in △ABC, ∠B is equal to ∠ c and ad is equal to ∠BAC, which shows why ∠ADB-∠ADC=∠C-∠B is established. See figure:
3. As shown in Figure 3, it is known that BO bisects ∠CBA, CO bisects ∠ ACB, Mn ‖ BC, AB = 12, AC = 18, and the circumference of △AMN is found. See figure:
4. As shown in Figure 4, it is known that in △ABC, AD is the high line on the side of BC and AE is the bisector of ∠BAC. If ∠EAD=a, find ∠ C-∠ B. (expressed by the algebraic expression of A), as shown in the figure:
5. As shown in Figure 5, it is known that AB=AC, AD=AE, ∠ 1=∠2. CE=BD? Explain why. See figure:
6. As shown in Figure 6, make equilateral triangles BCE and CDF from the sides BC and CD of the square ABCD, and connect AE, AF and EF, which proves that △AEF is equilateral triangle. See figure: