## Length of rope tied around three equal circles touching each other

Given r is the radius of three equal circles touching each other. The task is to find the length of the rope tied around the… Read More »

- Puzzle | Minimum distance for Lizard
- Number of quadrilaterals possible from the given points
- Find a point such that sum of the Manhattan distances is minimized
- Find K Closest Points to the Origin
- Rectangle with minimum possible difference between the length and the width
- Check if it is possible to move from (0, 0) to (x, y) in N steps
- Check if a point lies on or inside a rectangle | Set-2
- Intersecting rectangle when bottom-left and top-right corners of two rectangles are given
- Number of triangles that can be formed with given N points
- Largest Square that can be inscribed within a hexagon
- Check whether the point (x, y) lies on a given line
- Minimum squares to cover a rectangle
- Area of a circle inscribed in a regular hexagon
- Area of largest triangle that can be inscribed within a rectangle
- Check if any square (with one colored cell) can be divided into two equal parts
- Check if a point is inside, outside or on the ellipse
- Number of squares of side length required to cover an N*M rectangle
- Program for Area Of Square after N-th fold
- Maximum number of pieces in N cuts
- Program to find the Radius of the incircle of the triangle
- Check if a point is inside, outside or on the parabola
- Program to find the Circumcircle of any regular polygon
- Largest sphere that can be inscribed in a right circular cylinder inscribed in a frustum
- Maximum area of rectangle possible with given perimeter
- Area of Largest rectangle that can be inscribed in an Ellipse
- Program to find the angles of a quadrilateral
- Check if it is possible to create a polygon with a given angle
- Circumradius of the rectangle
- Find a point that lies inside exactly K given squares
- Find area of triangle if two vectors of two adjacent sides are given

Given r is the radius of three equal circles touching each other. The task is to find the length of the rope tied around the… Read More »

Given X and Y coordinates of N points on a Cartesian plane. The task is to find the number of possible triangles with the non-zero… Read More »

Given the P, B and H are the perpendicular, base and hypotenuse respectively of a right angled triangle. The task is to find the area… Read More »

Given an integer C which is the length of the hypotenuse of a right angled triangle of a circumcircle passing through the centre of the… Read More »

Given an integer K and an array arr each of whose element x represents a square with two of its vertices as (0, 0) and… Read More »

Given a right circular cylinder which is inscribed in a cone of height h and base radius r. The task is to find the largest… Read More »

Given here is a right circular cylinder of height h and radius r. The task is to find the volume of biggest cube that can… Read More »

Given a right circular cylinder of radius and height . The task is to find the radius of the biggest sphere that can be inscribed… Read More »

Given a sphere of radius . The task is to find volume of the biggest right circular cylinder that can be inscribed within it. Examples:… Read More »

Given a right circular cylinder of height , & radius . The task is to find the length of the longest rod that can be… Read More »

Given the length of sides of an equilateral triangle, the task is to find the area and perimeter of Incircle of the given equilateral triangle.… Read More »

Given a right circular cone of radius r and perpendicular height h. We have to find the side length of the biggest cube that can… Read More »

Given sphere of radius . The task is to find the radius of base and height of the largest right circular cone that can be… Read More »

Given here is a cube of side length a. We have to find the height and the radius of the biggest right circular cone that… Read More »

Given an array arr which represents the different angles at which a circle is cut, the task is to determine the minimum number of more… Read More »