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Quizzes > High School Quizzes > Mathematics

Primary 6 Percentage Practice Quiz

Enhance exam success with percentage practice questions

Difficulty: Moderate
Grade: Grade 6
Study OutcomesCheat Sheet
Colorful paper art promoting Percents Made Easy trivia quiz for middle school students.

What is 50% expressed as a decimal?
50
0.05
0.5
5
50% means 50 out of 100, which equals 0.5 when expressed as a decimal. The conversion is done by dividing the percentage by 100.
What is 25% of 80?
15
30
20
25
To calculate 25% of 80, convert 25% to 0.25 and multiply by 80 to get 20. This illustrates the basic method of calculating percentages.
Convert 0.2 to a percentage.
2%
200%
20%
0.02%
Multiplying 0.2 by 100 gives 20%, which is the correct percentage form. This conversion involves moving the decimal point two places to the right.
Which fraction is equivalent to 75%?
1/3
7/8
3/4
1/4
75% is equal to 75/100, which simplifies to 3/4. This conversion reinforces the understanding of the relationship between percentages and fractions.
What percent does the ratio 1:4 represent?
20%
25%
75%
50%
The ratio 1:4 means one part out of four, which is 1/4. Converting 1/4 to a percentage gives 25% when multiplied by 100.
How do you express 0.08 as a percentage?
0.08%
8%
0.8%
80%
Multiplying 0.08 by 100 gives 8%, which is the correct way to convert a decimal to a percentage. This reinforces basic conversion skills.
What is 150% of 40?
100
40
80
60
150% is equivalent to 1.5 in decimal form; multiplying 1.5 by 40 gives 60. This demonstrates how to work with percentages over 100.
If 30% of a number is 18, what is the number?
60
50
30
90
Dividing 18 by 0.3 gives the original number, 60. This problem teaches how to solve simple percentage equations.
What is the discount amount when an item priced at $50 is reduced by 20%?
$8
$10
$20
$5
Calculating 20% of $50 results in $10, which is the discount amount. This question reinforces the concept of applying a percentage to a monetary value.
Alice scored 20% higher than Bob on a test. If Bob scored 70, what did Alice score?
90
84
80
94
Increasing Bob's score of 70 by 20% adds 14 points, resulting in 84. This tests the understanding of percentage increase calculations.
Convert the fraction 3/5 into a percentage.
50%
65%
75%
60%
Dividing 3 by 5 gives 0.6, and multiplying by 100 converts it to 60%. This reinforces the link between fractions and percentages.
What is 10% of 250?
50
20
25
10
Multiplying 250 by 0.1 results in 25, which is 10% of 250. This simple calculation reinforces the concept of percents.
If a shirt originally costs $40 and is on sale for 25% off, what is the discount amount?
$5
$10
$12
$8
Calculating 25% of $40 gives $10, which is the discount on the shirt. This question helps students practice applying percentages to real-life scenarios.
If a population increases by 10% to become 110, what was the original population?
100
95
90
105
An increase of 10% means the final population is 110% of the original; dividing 110 by 1.1 yields 100. This reinforces reverse percentage calculations.
Convert 125% to its decimal form.
1.25
0.125
12.5
0.0125
Dividing 125 by 100 converts it to the decimal 1.25. This question reinforces the method for converting percentages greater than 100.
If 40% of x equals 24, what is 25% of x?
12
18
15
24
First, solve for x by dividing 24 by 0.4, which gives 60. Then, 25% of 60 is calculated by multiplying 60 by 0.25, resulting in 15.
A toy's price increased by 30% to become $65. What was its original price?
$45
$50
$60
$55
The original price can be found by dividing the new price $65 by 1.3 (which includes the 30% increase). This gives an original price of $50.
If a candidate received 60% of the votes in an election with 300 votes cast, how many votes did they get?
200
150
240
180
Multiplying 300 by 0.6 yields 180, which is the number of votes received. This problem reinforces straightforward percentage calculations.
If a student answers 75% of 120 questions correctly, how many questions did they answer correctly?
90
75
85
95
Calculating 75% of 120 by multiplying 120 by 0.75 results in 90 correct answers. This problem tests percentage application on a set quantity.
A recipe requires that 20% of the ingredients are sugar. If you have 250 grams of ingredients, how many grams of sugar are needed?
100
75
25
50
Multiplying 250 grams by 0.2 gives 50 grams of sugar. This question applies percentage concepts to measure portions.
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Study Outcomes

  1. Understand how to calculate a percentage of a given number.
  2. Convert between fractions, decimals, and percentages accurately.
  3. Apply percent formulas to solve real-world math problems.
  4. Analyze scenarios to determine percent increases or decreases.
  5. Evaluate percent problem solutions to boost exam confidence.

Primary 6 Percentage Questions Cheat Sheet

  1. Percentage as a fraction of 100 - Think of a percentage like slices of a hundred-piece pizza; saying 25% means you've eaten 25 out of 100 slices. This tasty metaphor makes conversions between decimals and fractions a breeze. Try imagining scores on quizzes or price tags as pizza slices to lock in the concept. Byju's Percentage Basics
    2. byjus.com
  2. Fraction to Percentage - Turn 3/4 into a percent by dividing 3 by 4 to get 0.75, then multiply by 100 to reveal 75%. Master this move and you'll breeze through any fraction-to-percent challenge on homework or standardized tests alike. Spice up your practice by converting quirky fractions like 11/16 and watch your confidence soar. Fraction-to-Percent Guide
    3. openpsyhometrics.com
  3. Decimal to Percentage - Multiply a decimal like 0.85 by 100, add the % sign, and voilà - you've got 85%! This quick trick is perfect for interpreting stats in news articles, graphs in class, or sale discounts while shopping. Once you nail shifting the decimal two places, you'll never sweat decimal-to-percent conversions again. Decimal-to-Percent Tip
    4. openpsyhometrics.com
  4. Finding a percentage of a number - To find, say, 20% of 150, convert 20% to 0.20 and multiply by 150 to get 30. This skill pops up when calculating tips, discounts, or even nutrition facts on food labels. Practice with different percentages and totals to make it instinctive. Percent-of-Number Formula
    5. openpsyhometrics.com
  5. What percent one number is of another - Divide the part by the whole (e.g., 30 ÷ 150) and multiply by 100 to discover that it's 20%. This reverse-engineering skill helps decode statistics like batting averages or grades on report cards. Keep a mental checklist: part/whole → decimal → percent. Part-to-Whole Percent
    6. openpsyhometrics.com
  6. Reverse percentage to find the original - If 30 is 20% of some number, divide 30 by 0.20 to uncover 150. This comes in handy when determining original prices before a discount or full marks before partial scores. Remember: value ÷ (percent as decimal) = original amount. Reverse Percent Trick
    7. openpsyhometrics.com
  7. Calculating percentage increase or decrease - Subtract the original value from the new value, divide by the original, then multiply by 100. So, jumping from 50 to 60 yields (10 ÷ 50) × 100 = 20% increase. This formula is key for tracking growth rates in finance, science projects, or daily habits. Percent Change Method
    8. openpsyhometrics.com
  8. Practice with real-life problems - Strengthen your skills by tackling discounts, sales tax, and tipping scenarios. The more you calculate restaurant tips or sale prices in your daily routine, the more natural percentages will feel. Turn chores into math puzzles and watch your confidence grow! Real-World Percentage Problems
    9. analyzemath.com
  9. Use mnemonic devices - Remember "percent means per hundred" to keep the idea of "out of 100" front and center. Fun phrases or rhymes can lock this concept into memory so you never forget the basic definition. Create your own catchy jingle to make it stick! Percent Mnemonic
    10. byjus.com
  10. Regular practice for mastery - Consistent drills on percentage problems build speed and accuracy, turning a once-daunting topic into second nature. Challenge yourself with timed quizzes or flashcards to track improvement. The more you practice, the more you'll ace that next exam! Percentage Practice Drills
    11. mathgoodies.com
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