would go up by 3 pts. each score. I decided that I was going to keep looking for patterns in the numbers for different combanations ex. one field goal the rest touchdowns. To keep track of the patterns i was going to make a chart 1-100 of all the patterns and numbers. 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 63 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78
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Problem Statement: Some families didn’t want to travel overland to California so they took ships around Cape Horn at the tip of South America. Say a ship leaves San Francisco for New York the first of every month at noon. At the same time a ship leaves New York for san Francisco. Every ship arrives exactly 6 months after it leaves. If you were going to San Francisco from New York How many ships from San Francisco would you meet? I assumed that entering and exiting the harbor does not count
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to determine how many squares we can find altogether. By doing this problem of the week we will be able to find shapes of any checkerboard that is given. We have to find multiple ways to a 7-by-7‚ 6-by-6‚ 5-by-5‚ 4-by-4‚ 3-by-3‚ 2-by-2‚ and 1-by-1. So it is saying that‚ how many squares I can make in an 8-by-8 checkerboard? The things I checked and figured out that are wrong is that I tried to do as much squares as Possible but I always had less and I knew it was going to be way
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Problem Statement There are twelve items numbered 1 through 12. All of the values or "weights" are the same except one item whose value is either greater than or less that the other 11 by an unknown amount. One can compare the sum of the values of a number of items in a set with the sum of the values of items in a disjoint set to see which one is greater. This comparison is also called "weighing." Find the least number of ways to determine which
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Problem Statement: A spiralateral is a sequence of line segments that form a spiral like shape. To draw one you simply choose a starting point‚ and draw a line the number of units that’s first in your sequence. Always draw the first segment towards the top of your paper. Then make a clockwise 90 degree turn and draw a segment that is as long as the second number in your sequence. Continue to complete your sequence. Some spiralaterals end at their starting point where as others have no end‚ this
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Camel Camel is the animal that is known by fatty mass on its back called hump. There are two species of camels. The first is the dromedary that has a single hump and lives in North Africa and the Middle East. The other is the Bactrian camel which is living in the Central Asian.Because of adaptation to living on the waterless desert; Camel known by "the ship of the desert" .Camel has a wonderful ability to bear the thirst and ability to tolerate a lack of water in the tissues of its body. Camel
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into a formula. I got X/2-1=Y. Where X is IN (number of pegs) and Y is OUT (Area). This works in all shapes with no interior pegs‚ like Freddie described. I attached this T-Table. For Sally I followed my luck of the 3 column T-Table‚ and drew another with the same guidelines. The figure‚ the interior pegs (in)‚ and the area (out). After I filled in a few figures‚ and their properties‚ I noticed a pattern‚ and not long after‚ a formula‚ which worked for them. It was X+1=Y. This T-Table is also attached
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1) What is an Entity Manager? 1) It is the service object that manages entity life-cycle instances. 2) It is a set of entity instances. 3) It is a unique value used by the persistence provider. 4) It is a value that is used to map the entity instance to the corresponding table row in the database. Solution : 1 -------------------------------------------------------- 2) Which of the following properties of an entity specifies the propagation of the effect of an operation to associated
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POW 13 Problem Statement: The problem of the week states how many bananas can corey the camel get to the market if he has to eat one banana every mile and it s 1000 miles to the market and he has 3000 bananas and he is able to hold only 1000 bananas at a time. Process: I knew that corey had to eat one banana every mile and he had to go 1000 miles but could only carry 1000 bananas at a time and there was 3000 miles so i knew he would have to drop off bananas at certain places to be able
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Emily Shiang 6/27/13 POW Write-up In this POW write-up‚ I am trying to prove that there can be only one solution to this problem‚ and demonstrate and corroborate that all solutions work and are credible. What the problem of the week is asking is that the number that you put in the boxes 0-4 is the number of numbers in the whole 5-digit number. For example‚ if you put zero in the “one” box‚ you would be indicating that there is zero ones in the number. Another example is if you put a two in
Free Reasoning Logic Inductive reasoning