AD is an altitude of an equilateral tri...

AD is an altitude of an equilateral triangle ABC. On AD as base, another equilateral triangle ADE is constructed. Prove that Area ( triangle ADE ): Area ( triangle ABC )=3:4.

Similar Questions

Explore conceptually related problems

AD is an altitude of an equilateral triangle ABC .On AD as base,another equiliateral triangle ADE is constructed.Prove that Area (ADE): Area (ABC)=3:4.

AD,Â BE and CF , the altitudes of triangle ABC are equal. Prove that ABC is an equilateral triangle.

In an equilateral triangle ABC,the side BC is trisected at D.Prove that: 9AD^2=7AB^2 .

In an equilateral triangle ABC the side BC is trisected at D. Prove that 9AD^(2)=7AB^(2)

In an equilateral triangle ABC, if AD is the altitude prove that 3AB^2 = 4AD^2 .

In an equilateral triangle ABC (Fig. 6.2), AD is an altitude. Then 4AD^2 is equal to

In triangle ABC, AD is a median. Prove that AB + AC gt 2AD

AD, BE and CF are altitudes of triangle ABC. If AD = BE = CF, prove that triangle ABC is an equilateral triangle.

AD,BE and CF, the altitudes of ABC are equal.Prove that ABC is an equilateral triangle.

AD is an altitude of an equilateral triangle ABC. On AD as base, another equilateral triangle ADE is constructed. Prove that Area ( triangle ADE ): Area ( triangle ABC )=3:4.

Similar Questions

Recommended Questions