Which option is the definition of analogy?(1 point)
Responses
a word that has the opposite meaning of another word
a word that has the opposite meaning of another word
a relationship between words in which one is an item and the other is a category
a relationship between words in which one is an item and the other is a category
a comparison of two things based on a relationship between those two things
a comparison of two things based on a relationship between those two things
something that happens as a result of something else
a comparison of two things based on a relationship between those two things
poet : poem :: baker : pie
Which of the following sentences is the correct way to read the analogy?
(1 point)
Responses
A poet is to a poem as a baker is to a pie.
A poet is to a poem as a baker is to a pie.
A poet likes poems as a baker eats pies.
A poet likes poems as a baker eats pies.
A poet is a type of poem as a baker is a type of pie.
A poet is a type of poem as a baker is a type of pie.
A poem is part of a poet as a pie is a part of a baker.
A poem is part of a poet as a pie is a part of a baker.
A poet is to a poem as a baker is to a pie.
A Baltimore oriole is a kind of bird.
Which type of relationship is described in this sentence?
(1 point)
Responses
cause-effect
cause-effect
item-category
item-category
part-whole
part-whole
object-function
item-category
Which word means to have the same or similar meaning as another word?(1 point)
Responses
cause
cause
synonym
synonym
analogy
analogy
effect
synonym
My friend is tall, whereas I am short.
Which kind of relationship is Sophia using to make an analogy in this sentence?
(1 point)
Responses
Sophia is using an item-category relationship to make an analogy.
Sophia is using an item-category relationship to make an analogy.
Sophia is using a cause-effect relationship to make an analogy.
Sophia is using a cause-effect relationship to make an analogy.
Sophia is using a synonym to make an analogy.
Sophia is using a synonym to make an analogy.
Sophia is using an antonym to make an analogy.
Sophia is using an antonym to make an analogy.
What are the medians of the two datasets listed?
Dataset 1: (5,19,14,3,8,14,25,0,3,5,1)
Dataset 2: (5,19,14,3,8,14,25,0,3,5,1,7)
(1 point)
Dataset 1:
Dataset 2:
Dataset 1: The medians is 5.
Dataset 2: The medians is 7.
the last is wrong
I apologize for the incorrect response earlier. To find the median, we need to arrange the numbers in ascending order.
Dataset 1: (0, 1, 3, 3, 5, 5, 8, 14, 14, 19, 25)
The median of Dataset 1 is (5+8)/2 = 6.5.
Dataset 2: (0, 1, 3, 3, 5, 5, 7, 8, 14, 14, 19, 25)
The median of Dataset 2 is (5+7)/2 = 6.
What are the modes of the two datasets listed?
Dataset 1: (9,16,24,23,12,10,15,25,9,12,15,22,16,9,12,16,9)
Dataset 2: (9,16,24,23,12,10,15,25,9,12,15,22,16,9,12,9)
(1 point)
Dataset 1:
Dataset 2:
Dataset 1: The modes of the Dataset 1 are 9 and 12.
Dataset 2: The mode of the Dataset 2 is 9.
What are the means of the two datasets listed? (Round your answers to the nearest thousandth if necessary.)
Dataset 1: (22,29,3,10,15,22,29,8,13,11,23)
Dataset 2: (22,29,3,10,15,22,29,8,13,11)
(1 point)
Dataset 1:
Dataset 2:
To find the mean, we need to sum up all the numbers in the dataset and divide by the total number of elements.
Dataset 1: (22, 29, 3, 10, 15, 22, 29, 8, 13, 11, 23)
The mean of Dataset 1 is (22 + 29 + 3 + 10 + 15 + 22 + 29 + 8 + 13 + 11 + 23) / 11 = 185 / 11 = 16.818 (rounded to the nearest thousandth).
Dataset 2: (22, 29, 3, 10, 15, 22, 29, 8, 13, 11)
The mean of Dataset 2 is (22 + 29 + 3 + 10 + 15 + 22 + 29 + 8 + 13 + 11) / 10 = 162 / 10 = 16.200 (rounded to the nearest thousandth).
Dataset 1: 16.818
Dataset 2: 16.200
Which measures of center will change when a value is added to this dataset?
Original dataset: (12,28,14,26,16,24,18,26,18,14,12,14)
New dataset with the value 14 inserted: (14,18,26,18,24,16,26,14,28,12,14,12,14)
Option #1: The mean and median will change.
Option #2: The mean and mode will change.
Option #3: The mode and median will change.
(1 point)
Option #
is the correct answer.
Option #1: The mean and median will change.
If the value 0 was added to dataset 1, which measures of center would stay the same?
Dataset 1: (9,4,12,44,21,7,11,10,10,9,4,12,10,4,12,44,21,9)
Dataset 2 with the added value: (9,4,12,44,21,7,11,10,10,9,4,12,10,4,12,44,21,9,0)
Option #1: The median and mean will be the same.
Option #2: The median and mode will be the same.
Option #3: The mean and mode will be the same.
(1 point)
Option #
is the correct answer.