information handling - UWS Mahara
... (b) An equilateral triangle can be drawn using fewer commands with a repeat procedure. Write down a repeat procedure to draw an equilateral triangle. (c) Name three aspects of Mathematics which can be developed through the use of LOGO. ...
... (b) An equilateral triangle can be drawn using fewer commands with a repeat procedure. Write down a repeat procedure to draw an equilateral triangle. (c) Name three aspects of Mathematics which can be developed through the use of LOGO. ...
LAGRANGE PREPARATORY TEST 2015
... there are 5 different values of n for which there is a triangle with sides of lengths 3, 8, and n. These triangles are ...
... there are 5 different values of n for which there is a triangle with sides of lengths 3, 8, and n. These triangles are ...
2012 Contest with solutions
... 17. Suppose you repeatedly toss a fair coin until you get two heads in a row. What is the probability that you stop on the 8th toss? Solution: a. There are 28 = 256 possible outcomes when one flips a coin 8 times. Let Ti be the result of the ith flip. We want to compute the number of possible outco ...
... 17. Suppose you repeatedly toss a fair coin until you get two heads in a row. What is the probability that you stop on the 8th toss? Solution: a. There are 28 = 256 possible outcomes when one flips a coin 8 times. Let Ti be the result of the ith flip. We want to compute the number of possible outco ...
Name_______________________Period__
... h. A jewelry maker spends $1650 on operating costs and $35 for each necklace made. The necklaces are then sold for $85 each. How many necklaces does the jewelry maker need to sell in order to break even? ...
... h. A jewelry maker spends $1650 on operating costs and $35 for each necklace made. The necklaces are then sold for $85 each. How many necklaces does the jewelry maker need to sell in order to break even? ...
Weber problem
In geometry, the Weber problem, named after Alfred Weber, is one of the most famous problems in location theory. It requires finding a point in the plane that minimizes the sum of the transportation costs from this point to n destination points, where different destination points are associated with different costs per unit distance.The Weber problem generalizes the geometric median, which assumes transportation costs per unit distance are the same for all destination points, and the problem of computing the Fermat point, the geometric median of three points. For this reason it is sometimes called the Fermat–Weber problem, although the same name has also been used for the unweighted geometric median problem. The Weber problem is in turn generalized by the attraction–repulsion problem, which allows some of the costs to be negative, so that greater distance from some points is better.