A biologist looked at the relationship between number of seeds a plant produces and the percent of those seeds that sprout. The results of the survey are shown below. Seeds Produced 48 48 42 51 56 43 53 Sprout Percent 59 68 60 55.5 49 64.5 48.5

Glencoe Algebra 1, Student Edition, 9780079039897, 0079039898, 2018
18th Edition
ISBN:9780079039897
Author:Carter
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Chapter4: Equations Of Linear Functions
Section4.5: Correlation And Causation
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A biologist looked at the relationship between number of seeds a plant produces and the percent of those
seeds that sprout. The results of the survey are shown below.
Seeds Produced
48
48
42
51
56
43
53
Sprout Percent
59
68
60
55.5
49
64.5
48.5
a. Find the correlation coefficient: r =
-0.76
* Round to 2 decimal places.
b. The null and alternative hypotheses for correlation are:
Ho: pv
H1: pv
The p-value is: 0.0474
o (Round to four decimal places)
c. Use a level of significance of a = 0.05 to state the conclusion of the hypothesis test in the context
of the study.
O There is statistically significant evidence to conclude that a plant that produces more seeds
will have seeds with a lower sprout rate than a plant that produces fewer seeds.
O There is statistically insignificant evidence to conclude that there is a correlation between the
number of seeds that a plant produces and the percent of the seeds that sprout. Thus, the use
of the regression line is not appropriate.
O There is statistically insignificant evidence to conclude that a plant that produces more seeds
will have seeds with a lower sprout rate than a plant that produces fewer seeds.
There is statistically significant evidence to conclude that there is a correlation between the
number of seeds that a plant produces and the percent of the seeds that sprout. Thus, the
regression line is useful.
d. p2
(Round to two decimal places)
e. Interpret r2
O 58% of all plants produce seeds whose chance of sprouting is the average chance of sprouting.
O There is a 58% chance that the regression line will be a good predictor for the percent of seeds
that sprout based on the number of seeds produced.
O There is a large variation in the percent of seeds that sprout, but if you only look at plants
that produce a fixed number of seeds, this variation on average is reduced by 58%.
O Given any group of plants that all produce the same number of seeds, 58% of all of these
plants will produce seeds with the same chance of sprouting.
f. The equation of the linear regression line is:
=
* (Please show your answers to two decimal places)
g. Use the model to predict the percent of seeds that sprout if the plant produces 58 seeds.
Percent sprouting =
(Please round your answer to the nearest whole number.)
h. Interpret the slope of the regression line in the context of the question:
O For every additional seed that a plant produces, the chance for each of the seeds to sprout
tends to decrease by 1.10 percent.
O As x goes up, y goes down.
O The slope has no practical meaning since it makes no sense to look at the percent of the seeds
that sprout since you cannot have a negative number.
i. Interpret the y-intercept in the context of the question:
O The average sprouting percent is predicted to be 111.2.
O The best prediction for a plant that has 0 seeds is 111.2 percent.
O The y-intercept has no practical meaning for this study.
O If plant produces no seeds, then that plant's sprout rate will be 111.2.
Transcribed Image Text:A biologist looked at the relationship between number of seeds a plant produces and the percent of those seeds that sprout. The results of the survey are shown below. Seeds Produced 48 48 42 51 56 43 53 Sprout Percent 59 68 60 55.5 49 64.5 48.5 a. Find the correlation coefficient: r = -0.76 * Round to 2 decimal places. b. The null and alternative hypotheses for correlation are: Ho: pv H1: pv The p-value is: 0.0474 o (Round to four decimal places) c. Use a level of significance of a = 0.05 to state the conclusion of the hypothesis test in the context of the study. O There is statistically significant evidence to conclude that a plant that produces more seeds will have seeds with a lower sprout rate than a plant that produces fewer seeds. O There is statistically insignificant evidence to conclude that there is a correlation between the number of seeds that a plant produces and the percent of the seeds that sprout. Thus, the use of the regression line is not appropriate. O There is statistically insignificant evidence to conclude that a plant that produces more seeds will have seeds with a lower sprout rate than a plant that produces fewer seeds. There is statistically significant evidence to conclude that there is a correlation between the number of seeds that a plant produces and the percent of the seeds that sprout. Thus, the regression line is useful. d. p2 (Round to two decimal places) e. Interpret r2 O 58% of all plants produce seeds whose chance of sprouting is the average chance of sprouting. O There is a 58% chance that the regression line will be a good predictor for the percent of seeds that sprout based on the number of seeds produced. O There is a large variation in the percent of seeds that sprout, but if you only look at plants that produce a fixed number of seeds, this variation on average is reduced by 58%. O Given any group of plants that all produce the same number of seeds, 58% of all of these plants will produce seeds with the same chance of sprouting. f. The equation of the linear regression line is: = * (Please show your answers to two decimal places) g. Use the model to predict the percent of seeds that sprout if the plant produces 58 seeds. Percent sprouting = (Please round your answer to the nearest whole number.) h. Interpret the slope of the regression line in the context of the question: O For every additional seed that a plant produces, the chance for each of the seeds to sprout tends to decrease by 1.10 percent. O As x goes up, y goes down. O The slope has no practical meaning since it makes no sense to look at the percent of the seeds that sprout since you cannot have a negative number. i. Interpret the y-intercept in the context of the question: O The average sprouting percent is predicted to be 111.2. O The best prediction for a plant that has 0 seeds is 111.2 percent. O The y-intercept has no practical meaning for this study. O If plant produces no seeds, then that plant's sprout rate will be 111.2.
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