Tree Diagrams - PROJECT MATHS REVISION
... are red and 7 are blue. She decides it would be fun to remove a cube at random from the bag and note the colour before replacing it. For even more fun she then chooses a second cube at random. What is the probability she pulls out two beads of the same colour? Okay, so what are the things we should ...
... are red and 7 are blue. She decides it would be fun to remove a cube at random from the bag and note the colour before replacing it. For even more fun she then chooses a second cube at random. What is the probability she pulls out two beads of the same colour? Okay, so what are the things we should ...
The design argument
... One might think that LIFE provides us with extremely strong evidence for the existence of the multiverse. After all, isn’t the probability that a universe is life-permitting given the existence of the multiverse higher than if not? If so, the principle of confirmation itself seems to count strongly ...
... One might think that LIFE provides us with extremely strong evidence for the existence of the multiverse. After all, isn’t the probability that a universe is life-permitting given the existence of the multiverse higher than if not? If so, the principle of confirmation itself seems to count strongly ...
This is just a test to see if notes will appear here…
... are red and 7 are blue. She decides it would be fun to remove a cube at random from the bag and note the colour before replacing it. For even more fun she then chooses a second cube at random. What is the probability she pulls out two beads of the same colour? Okay, so what are the things we should ...
... are red and 7 are blue. She decides it would be fun to remove a cube at random from the bag and note the colour before replacing it. For even more fun she then chooses a second cube at random. What is the probability she pulls out two beads of the same colour? Okay, so what are the things we should ...
Why Dembski`s Design Inference Doesn`t Work
... Suppose someone did not know about the chaos game. Since the area of the original triangle is zero, if a point in it were picked at random, it would have zero probability of being in the Sierpinski triangle. Similarly, any random sequence of points in the original triangle would seem to have zero ch ...
... Suppose someone did not know about the chaos game. Since the area of the original triangle is zero, if a point in it were picked at random, it would have zero probability of being in the Sierpinski triangle. Similarly, any random sequence of points in the original triangle would seem to have zero ch ...
Students-chapter5-S07
... Even though individual flips of a coin are unpredictable, if we flip the coin a large number of times, a pattern will emerge. Roughly half of the flips will be heads and half will be tails. This long-run regularity of a random event is described with probability. Our discussions of randomness will b ...
... Even though individual flips of a coin are unpredictable, if we flip the coin a large number of times, a pattern will emerge. Roughly half of the flips will be heads and half will be tails. This long-run regularity of a random event is described with probability. Our discussions of randomness will b ...
Discrete Random Variables File
... described by some well-prescribed subset of values for X, then P (E) = i∈E pi . The behaviour of the random variable X is largely determined by the collection (pi )i which is called its probability distribution. We can “plot” it like the histograms of frequency we plotted earlier. For example, suppo ...
... described by some well-prescribed subset of values for X, then P (E) = i∈E pi . The behaviour of the random variable X is largely determined by the collection (pi )i which is called its probability distribution. We can “plot” it like the histograms of frequency we plotted earlier. For example, suppo ...
AP STATS – Chapter 8 Binomial vs. Geometric Probabilities Name 1
... i. Her first bull’s-eye comes on the third arrow. ii. She misses the bull’s-eye at least once. iii. Her first bull’s-eye comes on the fourth or fifth arrow. iv. She gets exactly 4 bull’s-eyes. v. She gets at least 4 bull’s-eyes. vi. She gets at most 4 bull’s-eyes. e) How many bull’s-eyes do you expe ...
... i. Her first bull’s-eye comes on the third arrow. ii. She misses the bull’s-eye at least once. iii. Her first bull’s-eye comes on the fourth or fifth arrow. iv. She gets exactly 4 bull’s-eyes. v. She gets at least 4 bull’s-eyes. vi. She gets at most 4 bull’s-eyes. e) How many bull’s-eyes do you expe ...
Basic statistics and n
... In the case of a die, we know all of the possible outcomes ahead of time, and we also know a priori what the likelihood of a certain outcome is. But in many other situations in which we would like to estimate the likelihood of an event, this is not the case. For example, suppose that we would like t ...
... In the case of a die, we know all of the possible outcomes ahead of time, and we also know a priori what the likelihood of a certain outcome is. But in many other situations in which we would like to estimate the likelihood of an event, this is not the case. For example, suppose that we would like t ...
Topic 9
... – Discrete random variables can take one of a countable number of distinct outcomes. • Example: Number of credit hours, amount of people at an event – Continuous random variables can take any numeric value within a range of values. • Example: Cost of books this term, daily temperature • The probabil ...
... – Discrete random variables can take one of a countable number of distinct outcomes. • Example: Number of credit hours, amount of people at an event – Continuous random variables can take any numeric value within a range of values. • Example: Cost of books this term, daily temperature • The probabil ...
