* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project
Download cycle.001 - The Math Forum @ Drexel
Mathematics of radio engineering wikipedia , lookup
Location arithmetic wikipedia , lookup
Infinite monkey theorem wikipedia , lookup
Birthday problem wikipedia , lookup
Inductive probability wikipedia , lookup
Law of large numbers wikipedia , lookup
Elementary mathematics wikipedia , lookup
********************************** MathMagic Cycle 94-1 Level 7-9 R ********************************** GEOMETRIC PROBABILITY Geometric probability is the study of probability in which the possibilities are based on areas of geometric figures. For example. Draw a square ABCD with AB=4. Connect BD. Shade Triangle BCD. A dart is thrown and hits the interior of the square. The probability that it hits the shaded region = Area of SHADED divided by Area of TOTAL REGION. So, the probability = 8/16 = 1/2 = 0.5 Use this concept to find the following probabilities that a dart which falls at random on the given geometric figure, will fall in the shaded region described. 1) Rectangle ABCD. Draw the diagonals and label the intersection E. Shade triangle DEC. 2) Two concentric circles with radii 2 and 3 respectively. Shade inside the large circle but outside the small one. 3) A circle of radius 6 with a circle inside it whose diameter is the radius of the first circle. Shade inside the large but outside the small. 4) Inscribe a square in a circle of diameter 6. Shade the area inside the circle but outside the square. (HINT: to find the area of the square, remember that a square is also a rhombus.) 5) Now draw a scalene triangle. Describe how to divide and shade it so that the probability of hitting the shaded region is 1/2. 6) If a dart is dropped on a map of the world, what is the probability it will land on: A) water B) the United States C) Your State or Country ********************************** MathMagic Cycle 94-1 Level 7-9 H ********************************** PRIMO MATHEMATICS 1) Can you find 2 prime numbers whose sum is prime? 2) Can you find 2 prime numbers whose product is prime? 3) What is the smallest positive number divisible by 1, 2, 3, 4, 5, and 6. 4) What is the smallest non-negative number divisible by 1, 2, 3, 4, 5, and 6. 5) What is the smallest number divisible by 1, 2, 3, 4, 5, and 6. 6) The numbers 24, 25, 26, 27, 28 is a string of 5 consecutive composite numbers. Can you find another string of five consecutive composite numbers less than 100. 7) What is the longest string of consecutive composites less than 200. 8) Twin primes are 2 primes that differ by 2. List all twin primes less than 30. 9)A Mersenne prime is any prime number of the form 2^p - 1, where p is prime. Find 3 mersenne primes. Is 199 a mersenne prime? Is 63 a mersenne prime? 10)If a prime is mersenne, then it can be used to produce a perfect number. A perfect number is any whole number whose sum of proper divisors is equal to the number itself. If 2^p - 1 is prime then (2^p - 1)(2^(p-1)) is a perfect number. Find at least 3 perfect numbers and check. 11) Find the sum of the reciprocals of ALL the divisors of each perfect number in #10. What do you notice? **********************************