Solve for the perimeter of a triangle whose altitudes have lengths of 170, 210, and 357.
A triangle has consecutive side and height lengths for some integer n, as shown in image. What is its perimeter?
I have a quadrilateral with perimeter 4 and area 1.
Find the maximum value of the product of its diagonal lengths.
A square and an equilateral triangle have the same perimeter. If the area of the triangle is 16√3 , what is the area of the square?
A triangle, a square, a pentagon, a hexagon, an octagon and a circle all have an equal perimeter, which one has the smallest area?