Elizabeth read 1920 of her book.
What percentage is equivalent to the fraction of the book that Elizabeth read?
Responses
A 80%80%
B 95%95%
C 75%75%
D 90%
To find the percentage equivalent to the fraction, we need to divide the numerator of the fraction by the denominator and then multiply by 100.
Fraction of the book Elizabeth read: 1920/total number of pages in the book
Since we are not given the total number of pages in the book, we cannot determine the exact fraction. Therefore, we cannot determine the exact percentage equivalent.
Elizabeth read 19/20 of her book.
What percentage is equivalent to the fraction of the book that Elizabeth read?
Responses
A 80%80%
B 95%95%
C 75%75%
D 90%
To find the percentage equivalent to the fraction, we need to divide the numerator (19) by the denominator (20) and then multiply by 100.
(19/20) * 100 = 95
Therefore, the percentage equivalent to the fraction 19/20 is 95%.
The correct answer is B, 95%.
3/10 of the race left to run.
Which value is equivalent to 3/10?
Responses
A 0.030.03
B 33%33%
C 32%32%
D 0.3
To determine which value is equivalent to 3/10, we need to express the fraction as a decimal or a percentage.
3/10 is equal to 0.3 in decimal form.
Therefore, the correct answer is D, 0.3.
Which set of numbers are equivalent?
Responses
A 3310, 0.33, 33%33 10 , 0.33, 33%
B 147, 0.47, 47%1 47 , 0.47, 47%
C 14, 0.25, 25%1 4 , 0.25, 25%
D 1200, 0.20, 20%
To determine which set of numbers are equivalent, we need to evaluate each set and see if they represent the same value.
Set A:
3310, 0.33, 33%
Set B:
147, 0.47, 47%
Set C:
14, 0.25, 25%
Set D:
1200, 0.20, 20%
Looking at the sets, Set A consists of numbers that do not match in terms of decimal places or percentages. Set B also consists of numbers that do not match.
Set C consists of numbers that do not match either.
Set D consists of numbers that do not match in terms of decimal places or percentages.
None of the sets have numbers that are equivalent.
Which set of numbers are equivalent?
Responses
A 33/10, 0.33, 33%33 10 , 0.33, 33%
B 1/47, 0.47, 47%1 47 , 0.47, 47%
C 1/4, 0.25, 25%1 4 , 0.25, 25%
D 1/200, 0.20, 20%
To determine which set of numbers are equivalent, we need to evaluate each set and see if they represent the same value.
Set A:
33/10, 0.33, 33%
Set B:
1/47, 0.47, 47%
Set C:
1/4, 0.25, 25%
Set D:
1/200, 0.20, 20%
Looking at the sets, it appears that Set C consists of numbers that are equivalent.
1/4 is equal to 0.25 in decimal form and is equivalent to 25% in percentage form.
Therefore, the correct answer is C, 1/4, 0.25, 25%.
Daniel ate 0.55 of a candy bar. Which fraction represents the part of the candy bar that Daniel ate?
Responses
A 10/22
B 11/20
C 2/5
D 3/4
To find the fraction that represents the part of the candy bar that Daniel ate, we need to express the decimal 0.55 as a fraction.
0.55 can be written as 55/100.
We can simplify this fraction by dividing both the numerator and denominator by the greatest common divisor, which is 5.
55/100 ÷ 5/5 = 11/20
Therefore, the fraction that represents the part of the candy bar that Daniel ate is 11/20.
The correct answer is B, 11/20.
Landry took a survey of all the sixth-grade students at Irvine Park Middle School and discovered that 35% of sixth-graders play sports.
What fraction of sixth-graders play sports?
Responses
A 7/20
B 35/50
C 3/5
D 7/8
To find the fraction of sixth-graders that play sports, we need to convert the percentage to a fraction.
35% can be written as 35/100.
We can simplify this fraction by dividing both the numerator and denominator by the greatest common divisor, which is 5.
35/100 ÷ 5/5 = 7/20
Therefore, the fraction of sixth-graders that play sports is 7/20.
The correct answer is A, 7/20.
The Frisco Falcons Soccer Team won 3/5 of their soccer games.
What percentage is equivalent to the fraction of games the Falcons won?
Responses
A 35%35%
B 60%60%
C 45%45%
D 50%
To find the percentage equivalent to the fraction, we need to divide the numerator (3) by the denominator (5) and then multiply by 100.
(3/5) * 100 = 60
Therefore, the percentage equivalent to the fraction 3/5 is 60%.
The correct answer is B, 60%.
In Jamie's class, 15 of the students are boys. What percent of the students in Jamie’s class are boys?
Responses
A 1.5%1.5%
B 5%5%
C 15%15%
D 20%
To find the percentage of students in Jamie's class that are boys, we need to divide the number of boys (15) by the total number of students in the class and then multiply by 100.
Let's say the total number of students in Jamie's class is n.
Percentage of boys = (Number of boys / Total number of students) * 100
Given that 15 students are boys, we can set up the equation as:
(15 / n) * 100
We don't have the exact value of n, so we cannot determine the exact percentage. However, we can say that the percentage will be greater than 1.5% (option A), 5% (option B), and 15% (option C) since 15 boys is larger than those percentages.
Therefore, the closest option to the actual percentage is D, 20%.
Which set of numbers are equivalent?
Responses
A 0.4, 4%, 4100.4, 4%, 4/10
B 0.062, 62%, 6210000.062, 62%, 62/1000
C 0.80, 80%, 450.80, 80%, 4/5
D 0.84, 84%, 10/84
To determine which set of numbers are equivalent, we need to evaluate each set and see if they represent the same value.
Set A:
0.4, 4%, 4/10
Set B:
0.062, 62%, 62/1000
Set C:
0.80, 80%, 4/5
Set D:
0.84, 84%, 10/84
Looking at the sets, Set A consists of numbers that do not match in terms of decimal places or percentages.
Set B consists of numbers that do not match either.
Set C consists of numbers that do not match in terms of decimal places or fractions.
Set D consists of numbers that are equivalent.
0.84 in decimal form is equal to 84% in percentage form.
Therefore, the correct answer is D, 0.84, 84%, 10/84.
Which set of numbers are equivalent?
Responses
A 3%, 0.3, 31003%, 0.3, 3/100
B 20%, 0.2, 21020%, 0.2, 2/10
C 40%, 0.4, 410040%, 0.4, 4/100
D 50%, 0.05, 5/10
To determine which set of numbers are equivalent, we need to evaluate each set and see if they represent the same value.
Set A:
3%, 0.3, 3/100
Set B:
20%, 0.2, 2/10
Set C:
40%, 0.4, 4/100
Set D:
50%, 0.05, 5/10
Looking at the sets, Set A consists of numbers that do not match in terms of decimal places or fractions.
Set B consists of numbers that are equivalent.
20% in percentage form is equal to both 0.2 in decimal form and 2/10 in fraction form.
Therefore, the correct answer is B, 20%, 0.2, 2/10.