Started 3 weeks ago by Avdhesh Kumar in
ABC is an equilateral triangle. Point D is on AC and point E is on BC, such that AD = 2CD and CE = EB. If we draw perpendiculars from D and E to other two sides and find the sum of the length of two perpendiculars for each set, that is, for D and E individually and denote them as per (D) and per (E) respectively, then which of the following option will be correct.(a) per (D) per (E) (b) per (D) per (E) (c) per (D) = per (E) (d) None of these
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3 Replies
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@aaditya-cat-995-percentile2037
Replied 11 months ago
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@avdheshku672
Replied 3 weeks ago
Geometry triangle ABC is an equilateral triangle. Point D is on AC and point E is on BC, such that AD = 2CD and CE = EB. If we draw perpendiculars from D and E to other two sides and find the sum of the length of two perpendiculars for each set, that is, for D and E individually and denote them as per (D) and per (E) respectively, then which of the following option will be correct.(a) per (D) per (E) (b) per (D) per (E) (c) per (D) = per (E) (d) None of these
@avdheshku672
Replied 3 weeks ago
Geometry triangle ABC is an equilateral triangle. Point D is on AC and point E is on BC, such that AD = 2CD and CE = EB. If we draw perpendiculars from D and E to other two sides and find the sum of the length of two perpendiculars for each set, that is, for D and E individually and denote them as per (D) and per (E) respectively, then which of the following option will be correct.(a) per (D) per (E) (b) per (D) per (E) (c) per (D) = per (E) (d) None of these