Stat Test 2

If two events have no outcomes in common, they are said to be?

Mutually exclusive

Suppose i roll two fair dice. How likely is it that I will roll snake eyes?

6x6= 36 1/36 chance

% of curve 2 standard deviation

95%

% of curve 3 standard deviation

99.7%

random phenomenon

A phenomenon is random if we know what outcomes could happen, but not which particular values will happen.

The least squares regression line for predicting y from x is y=500-20x, what is the predicted value of y when x=10?

Answer: 300

Which statistical measure is not strongly affected by a few outliers in the data? A.) The Mean B.) The Median C.) The Standard Deviation D.)The correlation coefficient

B.) The Median

Which Correlation indicates almost no straight-line relationship? A.) -0.84 B.) 0.75 C.) 1.5 D.) 0.04 E.) 0.99

C.) 0.04

Suppose we want to study the relationship between the cost of peaches and the number of peaches sold. Which is the explanatory variable? Which is the response? Positive or negative correlation?

EX: COST OF PEACHES R: #OF PEACHES NEGATIVE

What does R^2 tell us?

How successful the regression was in explaining the response variable

evidence of causation

Plausible Association is strong Consistent

Where does the best evidence for causation come from?

Randomized comparative experiments

The ______ of a statistic indicates what values the statistic takes in repeated samples from the same population and how often it takes those values.

Sampling distribution

What is the most common way to display the relationship between two quantitative variables?

Scatterplot

R=0.1 Strength of relationship?

WEAK

Is r affected by outliers?

Yes. Strongly

WHATS ANOTHER NAME FOR THE TEST STATISTIC?

Z-SCORE

statistic

a number that describes a sample

type 2 error

false negative

Type 1 error

false positive

haphazard

marked by lack of any plan, order, or direction

Parameter

numerical summary of a population

If a significance test gives P-value 0.005

we do have convincing evidence against the null hypothesis.

y = a+bx y = x= b= a=

y = how far up x = how far along b= slope (how steep the line is) a = the Y Intercept (where the line crosses the Y axis)

least squares regression line equation

y = mx + b

LEBRON makes 80% of his free throws. How could we assign random digits to simulated his free throws?

0,1 = Miss 2,3,4,5,6,7,8,9 = Make

% of curve 1 standard deviation

68%

confidence level

A PROBABILITY THAT SAYS HOW OFTEN IN MANY SAMPLES THE METHOD WOULD PRODUCE AN INTERVAL THAT CONTAINS THE ACTUAL PARAMETER VALUE

What is the correlation between size of engine and horse power? Which is the response? Which is the explanatory?

Positive Correlation R=Horsepower E=Engine Size

The response variable should always be on which axis?

The Y-axis

Suppose flights at a large metro airport are on-time 68% of the time and late 32% of the time. How could we assign random digits to represent this probability model? Make sure to know equation of proportions too.

Using random digits table: 00-68 = on time 68-99 = late Pr(on-time) = 0.68 Pr(late) = 0.32

extrapolation

projecting outside data set. Risky.

How is correlation usually abbreviated?

r

What cab we say about the relationship between correlation r and the slope b of the least-squares line for the same set of data?

r (correlation) b(direction) always have the same sign( + or - )

chance behavior

unpredictable in the short run but has a regular and predictable pattern in the long run

null hypothesis

usually a statement of "no effect" or "no difference"

What values does r always fall under?

-1 and 1

How do you find the proportion of the variation in y that is explained by the least squares regression line?

(r^2)

What is the correlation between size of engine and gas milage?

Negative correlation.