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- 9. The fifth power of (a + b) and the third power of (B + a)=
- 10. What's 10 times 3 / 5?
- 11. As shown in the figure, in the isosceles △ ABC, ab = AC, ∠ BAC = 120 °, ad is the height on the edge of BC, passing through point d to make de ‖ AB, intersecting AC at point E. in addition to △ ABC, is there any isosceles triangle in the figure? If yes, please point out and give reasons
- 12. It is known that: as shown in the figure, in △ ABC, ∠ BAC = 120 ° AB = AC, the vertical bisector on the side of AB intersects BC at point D, intersects AB at point E, and connects ad, Verification: CD = 2bd
- 13. As shown in the figure, D is any point on the bottom edge BC of the isosceles triangle ABC, take a point E, AE = ad on the ray AC, and verify the angle bad = 2 EDC
- 14. If P is a point outside the plane where △ ABC is located and the lines AP, BP and CP are perpendicular, then the projection of P on plane ABC is ()
- 15. It is known that △ ABC is inscribed in ⊙ o, and ab is the diameter of ⊙ O. the bisector of ∠ ACB intersects ⊙ o at point D. if AB = 2cm, then ad=______ cm.
- 16. It is known that: as shown in the figure, △ ABC is the inscribed triangle of ⊙ o, ⊙ O's diameter BD intersects AC at e, AF ⊥ BD at F, extending AF intersects BC at g. the proof is AB2 = BG · BC
- 17. It is known that: as shown in the figure, △ ABC is the inscribed triangle of O, the bisector of angle ACB intersects circle O at point D, and makes tangent l of circle O through point D. prove that AB is parallel to L
- 18. AB is the diameter of the circle O, Pb tangents the circle O to B, D on the circle O, ad ‖ Po, prove that PD is the tangent of the circle o
- 19. As shown in the figure, AB is the diameter of ⊙ o, Pb is tangent to ⊙ o at point B, the extension line of chord AC ∥ OP and PC intersects BA at point D, proving that PD is tangent to ⊙ o
- 20. EA is the tangent line of circle O, a is the tangent point, the chord BC intersects OA at D, through B makes Pb, vertical CB intersects EA extension line at P