In an equilateral triangle, three coins ...

In an equilateral triangle, three coins of radii 1 unit each are kept so that they touch each other and also the sides of the triangle. The area of the triangle is (fig) `4:2sqrt(3)` (b) `6+4sqrt(3)` `12+(7sqrt(3))/4` (d) `3+(7sqrt(3))/4`

Similar Questions

Explore conceptually related problems

In an equilateral triangle,three coins of radii 1 unit each are kept so that they touch each other and also the sides of the triangle.The area of the triangle ABC is

In an equilateral triangle, three coins of radii 1 unit each are kept so that they touch each other and also the sides of the triangle. The area of the triangle is 2sqrt(3) (b) 6+4sqrt(3) 12+(7sqrt(3))/4 (d) 3+(7sqrt(3))/4

In an equilateral triangle, three identical coins of radii 1 units each, are kept so that they touch each other and also the sides of a triangle. Find the area of the triangle.

In an equilateral triangle 3 coins of radii 1 unit each are kept so that they touch each other and also the sides of the triangle. Are of the triangle is- 4+2sqrt(3) b. 6+4sqrt(3) c. 12+(7sqrt(3))/4 d. 3+(7sqrt(3))/4

In an equilateral triangle,3 coins of radii 1 unit each are kept so each other and also the side of the triangle.the area of the triangle is:

In an equilateral triangle with side a, prove that, the area of the triangle (sqrt(3))/(4)a^(2) .

An equilateral triangle S A B is inscribed in the parabola y^2=4a x having its focus at Sdot If chord A B lies towards the left of S , then the side length of this triangle is 2a(2-sqrt(3)) (b) 4a(2-sqrt(3)) a(2-sqrt(3)) (d) 8a(2-sqrt(3))

If A(1,-1,2),B(2,1,-1)C(3,-1,2) are the vertices of a triangle then the area of triangle ABC is (A) sqrt(12) (B) sqrt(3) (C) sqrt(5) (D) sqrt(13)

In an equilateral triangle, three coins of radii 1 unit each are kept so that they touch each other and also the sides of the triangle. The area of the triangle is (fig) `4:2sqrt(3)` (b) `6+4sqrt(3)` `12+(7sqrt(3))/4` (d) `3+(7sqrt(3))/4`

Similar Questions

Recommended Questions