Wilred & Alvin's Math Project '08

DEVELOPING EXPERT VOICES 2008 APPLIED MATH 40S Please click on this link http://youtube.com/watch?v=sSvE_dG7BGk

PROB ABIL & TIST ICS ITY STA Flickr by: bcsia Flickr by: mac steve

PR OB AB I CS ILI I ST TY A T ST & What is Probability? What is Statistics? a measure of how likely it is that a mathematical science relevant some event will occur; a number to the collection, analysis, expressing the ratio of favorable interpretation or explanation, and cases to the whole number of presentation of data. cases possible. Flickr by: bcsia Flickr by: mac steve

Good evening CounterTerrorist. I have commanded my terrorist team to plant a bomb somewhere in your training facility. The only way to defuse the bomb is to answer these 5 questions that will help you figure out the 5 digit codes.

http://www.onlinestopwatch.com/bombcountdown/fullscreen/ Good evening CounterTerrorist. I have commanded my terrorist team to plant a bomb somewhere in your training facility. The only way to defuse the bomb is to answer these 5 questions that will help you figure out the 5 digit codes. Remember... if the bomb has been successfully defused, then we will surrender our weapons to you. However, if you fail to defuse it, the victory will be ours. You will surrender the rest of your weapons and you will be in our control. Click on the link on top and set your timer to 15 minutes only. When time runs out then you're out of luck and the last laugh will be mine.

CHALLENGE #1

1. In the game of Counter Strike there are two teams battling against each other. The Counter Terrorist and the Terrorist. In this case the Terrorist need to plant the bomb at the BOMBSITE. In order to do this they need to take short routes to reach their destination and plant the bomb. So now the terrorists need to find the shortest route. a.) How many ways can you go to T SPAWN to the Bombsite? b.)How many ways can you get to the bombsite without going through the enemies territory? c.) What is the probability that you will not walk through the enemy territory?

a.) How many ways can you from T SPAWN to the Bombsite? T SPAWN BOMBSITE

a.) How many ways can you go from T SPAWN to the Bombsite? T SPAWN 1 1 1 1 1 1 The only way to 2 3 4 5 6 7 solve this 1 problem is by using Pascal's 3 Triangle. 6 10 15 21 28 1 4 10 20 35 36 64 1 5 15 35 70 106 170 1 BOMBSITE 6 21 56 232 402 126 1

a.) How many ways can you go from T SPAWN to the Bombsite? T SPAWN 1 1 1 1 1 1 The only way to 2 3 4 5 6 7 solve this 1 problem is by using Pascal's Triangle. 3 10 15 6 21 28 1 Pascal's Triangle works by adding the top 4 10 20 35 36 64 square from the 1 square that you want to figure out by the left 5 15 35 70 106 170 side's number. 1 BOMBSITE 6 21 56 232 402 126 1

a.) How many ways can you go from T SPAWN to the Bombsite? T SPAWN 1 1 1 1 1 1 The only way to 2 3 4 5 6 7 solve this 1 problem is by using Pascal's Triangle. 3 10 15 6 21 28 1 Pascal's Triangle works by adding the top 4 10 20 35 36 64 square from the 1 square that you want to figure out by the left 5 15 35 70 106 170 side's number. 1 BOMBSITE 6 21 56 232 402 126 1 *You have 402 ways to get from T SPAWN to the BOMBSITE

b.)How many ways can you get to the bombsite without going in the enemy's territory? T SPAWN CT SPAWN BOMBSITE

b.)How many ways can you get to the bombsite without going in the enemy's territory? 1 1 1 T SPAWN 1 1 1 2 3 4 5 6 7 1 3 6 11 18 1 5 4 10 10 15 26 44 1 5 15 25 40 66 110 1 BOMBSITE 6 21 51 152 262 86 1

b.)How many ways can you get to the bombsite without going in the enemy's territory? 1 1 1 T SPAWN 1 1 1 The enemy's territory is in blue. To do this you need to use the Pascal's 2 3 4 5 6 7 1 Triangle. This time we got 10 in red font by just copying the 10 below 3 6 11 18 the 6 1 5 4 10 10 15 26 44 1 5 15 25 40 66 110 1 BOMBSITE 6 21 51 152 262 86 1

b.)How many ways can you get to the bombsite without going in the enemy's territory? 1 1 1 T SPAWN 1 1 1 The enemy's territory is in blue. To do this you need to use the Pascal's 2 3 4 5 6 7 1 Triangle. This time we got 10 in red font by just copying the 10 below 3 6 11 18 the 6 1 5 Now we do the same 15 thing for the number 5 1 4 10 10 26 44 since we're considering this whole BLUE box as one SQUARE so we 5 15 25 40 66 110 just add them up and 1 use the Pascal's triangle. BOMBSITE 6 21 51 152 262 86 1

b.)How many ways can you get to the bombsite without going in the enemy's territory? 1 1 1 T SPAWN 1 1 1 The enemy's territory is in blue. To do this you need to use the Pascal's 2 3 4 5 6 7 1 Triangle. This time we got 10 in red font by just copying the 10 below 3 6 11 18 the 6 1 5 Now we do the same 15 thing for the number 5 1 4 10 10 26 44 since we're considering this whole BLUE box 5 66 110 as one SQUARE so we 15 25 40 1 just add them up and use the Pascal's triangle. BOMBSITE 6 21 51 152 262 86 1 * Therefore, after you use the Pascal's triangle you should get an answer of 262 ways of going to the BOMBSITE without going in the enemies territory.

b.)How many ways can you get to the bombsite without going in the enemy's territory? CT SPAWN 1 1 1 T SPAWN 1 1 1 The enemy's territory is in blue. To do this you need to use the Pascal's 2 3 4 5 6 7 1 Triangle. This time we got 10 in red font by just copying the 10 below 3 6 11 18 the 6 1 5 Now we do the same 15 thing for the number 5 1 4 10 10 26 44 since we're considering this whole BLUE box 5 66 110 as one SQUARE so we 15 25 40 1 just add them up and use the Pascal's triangle. BOMBSITE 6 21 51 152 262 86 1 * Therefore, after you use the Pascal's triangle you should get an answer of 262 ways of going to the BOMBSITE without going in the enemies territory.

c.) What is the probability that you will not walk in the enemy's territory? 1 1 1 1 1 1 2 3 4 5 6 7 1 262 131 1 3 6 10 15 21 28 = 402 201 4 10 20 35 36 64 5 15 35 70 106 170 1 BOMBSITE 6 21 56 232 402 126 T SPAWN 1 1 1 1 1 1 262 131 1 2 3 4 5 6 7 = CT SPAWN 3 6 11 18 402 201 1 5 4 10 10 15 26 44 1 * For this problem you just need to 1 5 15 25 40 66 110 simplify 262 and 402 to get the probability BOMBSITE 6 21 51 152 262 86 1

CHALLENGE #2

2. There are 20 CounterTerrorists all around the map. 5 of them carry a grenade, which is 25 percent, and the rest of them do not have enough money to buy some. a.) Calculate the 95 percent confidence interval for the number of people carrying a grenade. b.) Calculate the 95 percent confidence interval for the percent of people carrying a grenade. c.) Calculate the percent margin of error.

2. There are 20 CounterTerrorists all around the map. 5 of them carry a grenade, which is 25 percent, and the rest of them do not have enough money to buy some. ±1.95 = .9488 a.) Calculate the 95 percent confidence interval for the number of people carrying a grenade. ±1.96 = .9500 n = 20 ±1.97 = .9505 p= .25 q= .75 N = Number of trials m= np = 20 = 5 P= probability of success nq= 15 Q= probability of failure Dist. is approx. normal m= np= means number of trials x the probability that they carry a grenade. 20(.25)(.75) = 1.9364 Sigma sign (a.k.a) Standard Deviation ±1.96 = .9500 The Magic Number for finding the 95% confidence interval

2. There are 20 CounterTerrorists all around the map. 5 of them carry a grenade, which is 25 percent, and the rest of them do not have enough money to buy some. ±1.95 = .9488 a.) Calculate the 95 percent confidence interval for the number of people carrying a grenade. ±1.96 = .9500 n = 20 ±1.97 = .9505 p= .25 q= .75 5 1.96(1.94) = 1.2 m= np = 20 = 5 5 + 1.96 (1.94= 8.8 nq= 15 Dist. is approx. normal 20(.25)(.75) Remember: The magic number for = 1.9364 finding the 95% confidence interval is 1.96

2. There are 20 CounterTerrorists all around the map. 5 of them carry a grenade, which is 25 percent, and the rest of them do not have enough money to buy some. ±1.95 = .9488 a.) Calculate the 95 percent confidence interval for the number of people carrying a grenade. ±1.96 = .9500 n = 20 ±1.97 = .9505 p= .25 q= .75 5 1.96(1.94) = 1.2 m= np = 20 = 5 5 + 1.96 (1.94= 8.8 nq= 15 Dist. is approx. normal 20(.25)(.75) Remember: The magic number for a 95% confidence interval is 1.96 = 1.9364 Therefore, confidence interval for the number of people carrying a grenade is 1.2 to 8.8

2. There are 20 CounterTerrorists all around the map. 5 of them carry a grenade, which is 25 percent, and the rest of them do not have enough money to buy some. b.) Calculate the 95 percent confidence interval for the percent of people carrying a grenade. 1.2 to 8.8 confidence interval in percent 1.2 = .06x100 20 = 6% (6 , 44) is the confidence interval for the percent of 8.8 = .44x100 people carrying a grenade 20 = 44%

2. There are 20 CounterTerrorists all around the map. 5 of them carry a grenade, which is 25 percent, and the rest of them do not have enough money to buy some. c.) Calculate the number margin of error. ±1.96(1.94) = 3.80 * 3.80 is the number of margin error

CHALLENGE #3

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row.

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. First off, we lay down 6 underlines symbolizing the guns and how they are lined up. Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. First off, we lay down 6 underlines symbolizing the guns and how they are lined up. Now, looking at \"Gun 1\". Since there are 6 players Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6 that are currently without a weapon. It means that anyone of them can have the gun.

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. First off, we lay down 6 underlines symbolizing the 6 guns and how they are lined up. Now, looking at \"Gun 1\". Since there are 6 players Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6 that are currently without a weapon. It means that anyone of them can have the gun. Then the number over it will be a 6, symbolizing that 6 players have a chance to aquire \"Gun 1\".

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. 6 Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. Now for the \"Gun 2\", since there are only 5 players who do not have a gun yet, the number on it shall be 5. 6 Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. Now for the \"Gun 2\", since there are only 5 players who do not have a gun yet, the number on it shall be 5. 6 5 5 symbolizes how many players have a chance on Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6 aquiring the second gun.

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. Now for the \"Gun 2\", since there are only 5 players who do not have a gun yet, the number on it shall be 5. 6 5 5 symbolizes how many players have a chance on Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6 aquiring the second gun. The same thing will also be done in \"Gun 3\", since 2 players now have a gun, the remaining 4 players now have the chance to pick the third gun.

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. Now for the \"Gun 2\", since there are only 5 players who do not have a gun yet, the number on it shall be 5. 6 5 4 5 symbolizes how many players have a chance on Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6 aquiring the second gun. The same thing will also be done in \"Gun 3\", since 2 players now have a gun, the remaining 4 players now have the chance to pick the third gun. Therefore, the number 4 symbolizes how many players are left to have the chance to aquire the third gun.

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. 6 5 4 As the players choose there weapons, fewer and fewer selections are left for the remaining players. Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. 6 5 4 As the players choose there weapons, fewer and fewer selections are left for the remaining players. Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6 ...lets go ahead and fill in the rest.

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. 6 5 4 3 As the players choose there weapons, fewer and fewer selections are left for the remaining players. Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6 ...lets go ahead and fill in the rest. 3 on Gun 4

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. 6 5 4 3 2 As the players choose there weapons, fewer and fewer selections are left for the remaining players. Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6 ...lets go ahead and fill in the rest. 3 on Gun 4 2 on Gun 5

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. 6 5 4 3 2 1 As the players choose there weapons, fewer and fewer selections are left for the remaining players. Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6 ...lets go ahead and fill in the rest. 3 on Gun 4 2 on Gun 5 ...and 1 on Gun 6

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. Now to find out how many ways the players can 6 x 5 x 4 x 3 x 2 x 1 be positioned after picking up there guns, we will have to multiply them. Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. Now to find out how many ways the players can 6 x 5 x 4 x 3 x 2 x 1 be positioned after picking up there guns, we will have to multiply them. Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6 ...multiplying them will give us...

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. Now to find out how many ways the players can 6 x 5 x 4 x 3 x 2 x 1 be positioned after picking up there guns, we will have to multiply them. Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6 ...multiplying them will give us... Therefore there are 720 ways that they can be arranged!

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. Now to find out how many ways the players can 6 x 5 x 4 x3 2 x 1x be positioned after picking up there guns, we will have to multiply them. Another way of solving this problem is by using Factorial Notation. Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6 ...multiplying them will give us... = there are 720 ways that they can be arranged!

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. Now to find out how many ways the players can 6 x 5 x 4 x3 2 x 1x be positioned after picking up there guns, we will have to multiply them. Another way of solving this problem is by using Factorial Notation. Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6 ...multiplying them will give us... Factorial Notation is used when we want to multiply all natural numbers from a particular number down to 1. Like so... = there are 720 ways that they can be arranged!

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. Now to find out how many ways the players can 6 x 5 x 4 x3 2 x 1x be positioned after picking up there guns, we will have to multiply them. Another way of solving this problem is by using Factorial Notation. Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6 ...multiplying them will give us... Factorial Notation is used when we want to multiply all natural numbers from a particular number down to 1. Like so... = there are 720 ways that they can be arranged! 6! = 6 x 5 x 4 x 3 x 2 x 1 = 720

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. Now to find out how many ways the players can 6 x 5 x 4 x3 2 x 1x be positioned after picking up there guns, we will have to multiply them. Another way of solving this problem is by using Factorial Notation. Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6 ...multiplying them will give us... Factorial Notation is used when we want to multiply all natural numbers from a particular number down to 1. Like so... = there are 720 ways that they can be arranged! 6! = 6 x 5 x 4 x 3 x 2 x 1 = 720 The \"!\" is the Factorial Symbol. You can find this on your TI83 calculator by following this button sequence.

In the counterterrorist's side. Leet, Chet, Montrose, Cortez, Ahmad and Player. There are 6 different kinds of weapons on the floor in a row. a.) How many ways can they arrange themselves if they don't move from the place where they picked up there guns. Now to find out how many ways the players can 6 x 5 x 4 x3 2 x 1x be positioned after picking up there guns, we will have to multiply them. Another way of solving this problem is by using Factorial Notation. Gun 1 Gun 2 Gun 3 Gun 4 Gun 5 Gun 6 ...multiplying them will give us... Factorial Notation is used when we want to multiply all natural numbers from a particular number down to 1. Like so... = there are 720 ways that they can be arranged! 6! = 6 x 5 x 4 x 3 x 2 x 1 = 720 The \"!\" is the Factorial Symbol. You can find this on your TI83 calculator by following this button sequence. [MATH] > Press the left arrow to move to the far right (Prb) > [4]

CHALLENGE #4

Jason, Rob, Allan and Kyle were in a marksman competition. General Rad made a bet that Jason and Rob will be in the top 2. General McArthur, on the other hand, made a bet that Allan will be in first place and Kyle on second place. They all have the same level of skills.

Jason, Rob, Allan and Kyle were in a marksman competition. General Rad made a bet that Jason and Rob will be in the top 2. General McArthur, on the other hand, made a bet that Allan will be in first place and Kyle on second place. They all have the same level of skills. a.) What is the probability that General Rad will win the bet?

Jason, Rob, Allan and Kyle were in a marksman competition. General Rad made a bet that Jason and Rob will be in the top 2. General McArthur, on the other hand, made a bet that Allan will be in first place and Kyle on second place. They all have the same level of skills. b.) What is the probability that General McArthur will win the bet?

To find the answers for this question, we will have to construct a Tree Diagram.

To find the answers for this question, we will have to construct a Tree Diagram. A tree diagram is used to show all of the possible outcomes or combinations of an event. H = Heads T = Tails H T For example, this tree represents 3 coins.

To find the answers for this question, we will have to construct a Tree Diagram. A tree diagram is used to show all of the possible outcomes or combinations of an event. H = Heads H T = Tails H T H T T For example, this tree represents 3 coins.

To find the answers for this question, we will have to construct a Tree Diagram. A tree diagram is used to show all of the possible outcomes or combinations of an event. H H = Heads T H T = Tails H H T T H H T T T H T For example, this tree represents 3 coins. You can tell that there are 3 coins because there are 3 columns of branches spread out after another.

To find the answers for this question, we will have to construct a Tree Diagram. A tree diagram is used to show all of the possible outcomes or combinations of an event. H H = Heads H T T = Tails H 1st coin H T T H H T T T H T For example, this tree represents 3 coins. You can tell that there are 3 coins because there are 3 columns of branches spread out after another. The RED branches represent the first coin.

To find the answers for this question, we will have to construct a Tree Diagram. A tree diagram is used to show all of the possible outcomes or combinations of an event. H H = Heads T 2nd coin H T = Tails H 1st coin H T T H H T T T H T For example, this tree represents 3 coins. You can tell that there are 3 coins because there are 3 columns of branches spread out after another. The RED branches represent the first coin. BLUE the second.

To find the answers for this question, we will have to construct a Tree Diagram. A tree diagram is used to show all of the possible outcomes or combinations of an event. 3rd coin H H = Heads H T 2nd coin T = Tails H 1st coin H T T H H T T T H T For example, this tree represents 3 coins. You can tell that there are 3 coins because there are 3 columns of branches spread out after another. The RED branches represent the first coin. BLUE the second. GREEN the third.

To find the answers for this question, we will have to construct a Tree Diagram. A tree diagram is used to show all of the possible outcomes or combinations of an event. HHH H T HHT H = Heads H T = Tails HTH H H T HTT T H THH H T T THT T H TTH T TTT Now, to find out the all the different outcomes of flipping 3 coins...

To find the answers for this question, we will have to construct a Tree Diagram. A tree diagram is used to show all of the possible outcomes or combinations of an event. HHH H T HHT H = Heads H T = Tails HTH H H T HTT T H THH H T T THT T H TTH T TTT Now, to find out the all the different outcomes of flipping 3 coins... ...all we have to do is trace the branches like so...

To find the answers for this question, we will have to construct a Tree Diagram. A tree diagram is used to show all of the possible outcomes or combinations of an event. HHH H T HHT H = Heads H T = Tails HTH H H T HTT T H THH H T T THT T H TTH T TTT Now, to find out the all the different outcomes of flipping 3 coins... ...all we have to do is trace the branches like so... ...and so on.

To find the answers for this question, we will have to construct a Tree Diagram. A tree diagram is used to show all of the possible outcomes or combinations of an event. HHH H T HHT H = Heads H T = Tails HTH H H T HTT T H THH H T T THT T H TTH T TTT If we want to find out what the probability is that 2 out of 3 coins will be heads, all we have to do is check how many of the outcomes have 2 \"H\"s on them.

To find the answers for this question, we will have to construct a Tree Diagram. A tree diagram is used to show all of the possible outcomes or combinations of an event. HHH H HHT H = Heads T = Tails H T HTH 3/8 H H T HTT T H THH H T T THT T H TTH T TTT If we want to find out what the probability is that 2 out of 3 coins will be heads, all we have to do is check how many of the outcomes have 2 \"H\"s on them. Once we have the number of them with 2 \"H\"s, we then divide it by the number of all the outcomes.

To find the answers for this question, we will have to construct a Tree Diagram. A tree diagram is used to show all of the possible outcomes or combinations of an event. HHH H HHT H = Heads T = Tails H T HTH 3/8 H H T HTT T H H THH = .375 T T THT H T T TTH =37.5% TTT If we want to find out what the probability is that 2 out of 3 coins will be heads, all we have to do is check how many of the outcomes have 2 \"H\"s on them. Once we have the number of them with 2 \"H\"s, we then divide it by the number of all the outcomes. When you have the answer, move the decimal down by 2 numbers, and that should give you the percentage.

a.) What is the probability that General Rad will win the bet? Kyle Allan Kyle Allan Kyle Rob Kyle Rob Rob Allan Rob Allan Allan Rob Kyle Kyle Allan Kyle Allan Jason Jason Kyle Kyle Jason Allan Kyle Allan Jason Jason Jason Allan Rob Kyle Rob Allan Kyle Rob Kyle Jason Kyle Jason Rob Kyle Jason Kyle Rob Jason Jason Rob Rob Allan Jason Allan Rob Rob Jason Allan Allan Allan Rob Jason Jason Jason Rob

Now thanks to the Tree diagram, We can clearly see the number of outcomes. All we really have to look at the branches that has the chosen peoples names on the first column or/and Kyle second. Allan Kyle Allan Kyle Rob Kyle Rob Rob Allan Rob Allan Allan Rob Kyle Kyle Allan Kyle Allan Jason Jason Kyle Kyle Jason Allan Kyle Allan Jason Jason Jason Allan Rob Kyle Rob Allan Kyle Rob Kyle Jason Kyle Jason Rob Kyle Jason Kyle Rob Jason Jason Rob Rob Allan Jason Allan Rob Rob Jason Allan Allan Allan Rob Jason Jason Jason Rob

Now thanks to the Tree diagram, We can clearly see the number of outcomes. All we really have to look at the branches that has the chosen peoples names on the first column or/and Kyle Allan a.) Allan second. Kyle Rob Kyle Rob 2/24 Kyle Rob Allan = .08 Rob Allan Allan Rob = 8% Kyle Kyle Allan Kyle Allan Jason Jason Kyle Kyle Jason Allan Kyle Allan Jason Jason Jason Allan Rob Kyle Rob Allan Kyle Rob Kyle Jason Jason Kyle Rob Kyle Jason Kyle Rob Jason Jason Rob Jason Rob Allan Allan Rob Rob Jason Allan Allan Allan Rob Jason Jason Jason Rob

Now thanks to the Tree diagram, We can clearly see the number of outcomes. All we really have to look at the branches that has the chosen peoples names on the first column or/and Kyle a.) second. Allan Allan Kyle Rob Kyle Rob 2/24 Kyle Rob Allan = .08 Rob Allan Allan Rob = 8% Kyle Kyle Allan Kyle Allan Jason Jason Kyle Kyle Jason Allan Kyle Allan Jason Jason Jason Allan Rob Kyle Rob Allan Kyle Rob Kyle Jason Kyle Jason Rob Kyle b.) Jason Kyle Rob Jason Jason Rob 1/24 Rob Allan = .04 Jason Allan Rob = 4% Rob Jason Allan Allan Allan Rob Jason Jason Jason Rob

CHALLENGE #5

A pistol factory produces 42 pistols per month. Two percent of all the pistols are defective. What is the probability of getting four defective pistols in one week? The above problem is an example of a binomial probability experiment. Some properties of a binomial experiment are: 1. There are set number of trials in this experiment. In this case, there are 42 trials

A pistol factory produces 42 pistols per month. Two percent of all the pistols are defective. What is the probability of getting four defective pistols in one week? The above problem is an example of a binomial probability experiment. Some properties of a binomial experiment are: 2. Each trial has exactly two possible outcomes: pistol fires pistol fails

A pistol factory produces 42 pistols per month. Two percent of all the pistols are defective. What is the probability of getting four defective pistols in one week? The above problem is an example of a binomial probability experiment. Some properties of a binomial experiment are: 3. Events are independent. This means that the probability of success is the same for each trial. i.e., each pistol has a 2 percent probability of being defective.

A pistol factory produces 42 pistols per month. Two percent of all the pistols are defective. What is the probability of getting four defective pistols in one week? The above problem is an example of a binomial probability experiment. Some properties of a binomial experiment are: 4. We will be looking for the probability of successes. i.e. P(four defective alarms) = ?

A pistol factory produces 42 pistols per month. Two percent of all the pistols are defective. What is the probability of getting four defective pistols in one week? The above problem is an example of a binomial probability experiment. Some properties of a binomial experiment are: 5. The total of all probabilities is 1. This means that the pistol works or fails, and that no other possibility exists.

A pistol factory produces 42 pistols per month. Two percent of all the pistols are defective. What is the probability of getting four defective pistols in one week? The above problem is an example of a binomial probability experiment. Some properties of a binomial experiment are: 6. The data in a binomial problem are always discrete. In this case, it means that the number of pistols is an integral value (1,2,3,4, et cetera) which can be counted, and is not a continuous (i.e., measured) value, as is the case in a normal distribution.

A pistol factory produces 42 pistols per month. Two percent of all the pistols are defective. What is the probability of getting four defective pistols in one week? 'S' and 'F' (Success and Failure) are the possible outcomes of a trial in a binomial experiment, and 'p' and 'q' represent the probabilities for 'S' and 'F.' • P(S) = p • P(F) = q = 1 p • n = the number of trials • x = the number of successes in n trials • p = probability of success • q = probability of failure • P(x) = probability of getting exactly x successes in n trials Remember that 'Success' in this case, is the probability of selecting a defective pistol.

A pistol factory produces 42 pistols per month. Two percent of all So how do we the pistols are defective. What is the probability of getting four answer now? I need help... defective pistols in one week? 'S' and 'F' (Success and Failure) are the possible outcomes of a trial in a binomial experiment, and 'p' and 'q' represent the probabilities for 'S' and 'F.' • P(S) = p • P(F) = q = 1 p • n = the number of trials • x = the number of successes in n trials • p = probability of success • q = probability of failure • P(x) = probability of getting exactly x successes in n trials Remember that 'Success' in this case, is the probability of selecting a defective pistol.

A pistol factory produces 42 pistols per month. Two percent of all the pistols are defective. What is the probability of getting four defective pistols in one week? Binomial PD. Data: Variable X = 4 Num.Trial=42 P=0.02 WE DO THIS BY USING THE CALCULATOR FUNCTION BINOMPDF Press: 2nd Func (VARS) press the number (0) on your calculator then enter in the following in order binompdf(42,0.02,4) then lastly press ENTER and you'll see the probability of getting four defective pistols in one week

A pistol factory produces 42 pistols per month. Two percent of all the pistols are defective. What is the probability of getting four defective pistols in one week? Binomial PD. Data: Variable binompdf(42,0.06,5) X = 4 .0083110781 Num.Trial=42 P=0.02 binompdf(42,0.02,4) =0.0083 x 100 =0.83 %

A pistol factory produces 42 pistols per month. Two percent of all the pistols are defective. What is the probability of getting four defective pistols in one week? Binomial PD. Data: Variable binompdf(42,0.06,5) X = 4 .0083110781 Num.Trial=42 P=0.02 binompdf(42,0.02,4) =0.0083 x 100 =0.83 % ∴ The probability of getting four defective pistols in one week is 0.83%

To find out what the 5 digit codes are, you will need to figure out the riddle of the whole presentation. You must be able to answer the codes correctly in order for the bomb to be defused. FINAL CHALLENGE:(BOMB DEFUSING) 1. What is 8*8 divided by 2 five times?

To find out what the 5 digit codes are, you will need to figure out the riddle of the whole presentation. You must be able to answer the codes correctly in order for the bomb to be defused. FINAL CHALLENGE:(BOMB DEFUSING) 2. What do you call the black ball in the game of billiards that is part of the first question?

To find out what the 5 digit codes are, you will need to figure out the riddle of the whole presentation. You must be able to answer the codes correctly in order for the bomb to be defused. FINAL CHALLENGE:(BOMB DEFUSING) 3. What is Mr. K's favourite number + add .5 and .5 five and you get the third code?

To find out what the 5 digit codes are, you will need to figure out the riddle of the whole presentation. You must be able to answer the codes correctly in order for the bomb to be defused. FINAL CHALLENGE:(BOMB DEFUSING) 4. Mr.K's cat passed away in 2004 by deleting the first 3 digits what do you get as how many cats does Mr.K have left?

To find out what the 5 digit codes are, you will need to figure out the riddle of the whole presentation. You must be able to answer the codes correctly in order for the bomb to be defused. FINAL CHALLENGE:(BOMB DEFUSING) 5. Mr.K's favourite number divide it by 3 and add one to it.

IF YOU GET THESE CODES CORRECTLY YOUR MISSION IS DONE AND THERE WILL BE NO MORE TERRORISM IN THIS WORLD. 2 8 7 4 3

Wilred & Alvin's Math Project '08

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