The author posted a question in Homework
how do you find the radius of the circle circumscribed around a triangle? and got a better answer
Response from Дима[+++]
More Sasha can be found by the sine theorem a/ sinA=b/ sinB=c/ sinC=2R where a, c, c-sides of the tr. A. V. C- angles opposite to these sides?
Response from 0[+++++]
More Sasha you can find by the sine theorem a sinA=b sinB=c sinC=2R where a in c-sides of the trk. A. B. C are angles opposite to these sides
More Sasha you can find by the sine theorem a sinA=b sinB=c sinC=2R where a in c-sides of the trk. A. B. C are angles opposite to these sides
Response from 0[+++++]
if a triangle is an equilateral triangle, divide the side by the square root of three
if a triangle is an equilateral triangle, divide the side by the square root of three