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Quizzes > Quizzes for Business > Education

Master Your Vocabulary and Integer Knowledge Assessment

Challenge Your Word and Number Skills Now

Difficulty: Moderate
Questions: 20
Learning OutcomesStudy Material
Colorful paper art displaying quiz elements for Vocabulary and Integer Knowledge Assessment

Discover how well you know key words and number concepts with this engaging Vocabulary and Integer Knowledge Assessment quiz. Designed for students and educators, it features multiple-choice questions that challenge vocabulary understanding and integer operations. You can easily modify the quiz in our editor to fit your lesson plans or study goals. For more practice, explore the Vocabulary Quiz or test your skills with the Integer Operations Quiz. Browse additional quizzes to keep learning fun and flexible.

Which of the following is an integer?
3
2.5
0.5
√2
An integer is a whole number without fractional or decimal parts. Among the options, only 3 is a whole number. Decimal and irrational values like 2.5 and √2 are not integers.
The term "sum" refers to which arithmetic operation?
Multiplication
Division
Addition
Subtraction
In mathematics, the word "sum" denotes the result of adding numbers together. Subtraction yields a difference, multiplication a product, and division a quotient. Therefore, addition is the correct operation.
Which of these represents a negative integer?
0.5
-5
2
An integer can be positive, negative, or zero without fractional parts. -5 is a whole number with a negative sign. The others are either positive or fractional and thus not negative integers.
What is the absolute value of -7?
1
0
-7
7
Absolute value measures distance from zero on the number line, which is always nonnegative. The distance of -7 from zero is 7. It cannot be negative or zero in this context.
An integer that is divisible by 2 is called:
Prime integer
Composite integer
Even integer
Odd integer
By definition, an even integer is any integer that can be divided by 2 without a remainder. Odd integers leave a remainder of 1 when divided by 2. Prime and composite refer to factors greater than 1.
A temperature drops by 15°C from 8°C. What is the new temperature?
23°C
-7°C
7°C
-23°C
Dropping by 15°C means subtracting 15 from 8, giving 8−15=−7. The result is −7°C, reflecting a temperature below zero.
In mathematics, the term "quotient" refers to which operation?
Multiplication
Addition
Subtraction
Division
The quotient is the result obtained when one number is divided by another. Multiplication gives a product, addition a sum, and subtraction a difference, so division is correct.
What is the value of -3 minus 4?
7
-1
1
-7
Subtracting 4 from -3 means moving four units further negative: -3−4=−7. This keeps the negative sign and increases magnitude accordingly.
If the temperature rises by 12°C from -5°C, what is the resulting temperature?
17°C
-17°C
-7°C
7°C
Rising by 12°C adds 12 to -5, giving -5+12=7. A negative starting point moving upward crosses zero into positive territory.
An integer not divisible by 2 is known as:
Odd integer
Prime integer
Even integer
Composite integer
Odd integers leave a remainder of 1 when divided by 2. Even integers divide evenly, while prime/composite refer to factorization properties rather than parity.
What is the product of -2 and 3?
-5
6
-6
5
Multiplying a negative number by a positive number yields a negative result: -2×3=−6. The magnitude is the product of 2 and 3, and the sign is negative.
Identify the part of speech for the word "subtract."
Adverb
Noun
Verb
Adjective
"Subtract" is an action word indicating the operation of taking one quantity away from another, which classifies it as a verb. It is not a noun, adjective, or adverb in this usage.
Evaluate the expression: -5 * 3 = ?
15
-15
8
-8
Multiplying -5 by 3 gives -15 since a negative times a positive yields a negative. The magnitude is the product of 5 and 3.
Compute the value of | -4 | + (-3).
7
-1
1
-7
The absolute value of -4 is 4, then adding -3 gives 4+(-3)=1. You add a positive and a negative accordingly.
Which integer is greater: -2 or -5?
-5
Cannot determine
They are equal
-2
On the number line, -2 is two units below zero while -5 is five units below, making -2 closer to zero and thus greater than -5.
Jenna owes $8 to each of her 4 friends. Represent and compute the net change as an integer.
-4
-32
12
32
Owing money is represented with negative values: -8 per friend times 4 friends equals -32. Positive 32 would imply gaining money, which is incorrect.
In the sentence "Despite the decline of 7 participants, the event was successful," what is the function of the word "decline"?
Adjective
Verb
Adverb
Noun
Here "decline" refers to the act or instance of participants dropping out, functioning as a noun. As a noun, it names something, rather than describing or modifying an action.
Given integers a = -3 and b = 5, what is a² + b?
-2
-4
2
14
Squaring a gives (-3)²=9, then adding b yields 9+5=14. You always square before adding the second integer.
Find the integer x if x + (-4) = 2.
6
-2
2
-6
To isolate x, add 4 to both sides: x = 2+4 = 6. This undoes the addition of -4 correctly.
What is the least common multiple (LCM) of -4 and 6?
2
-12
12
-2
LCM uses absolute values to determine common multiples, so LCM(4,6)=12. Negative signs do not change the least common multiple result.
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Learning Outcomes

  1. Analyse integer relationships and vocabulary usage in questions
  2. Identify essential vocabulary terms and integer properties confidently
  3. Apply integer operations to solve word-based problems
  4. Demonstrate mastery of word definitions and number concepts
  5. Evaluate sentence contexts for vocabulary and numeric accuracy
  6. Master strategies for interpreting integers within language tasks

Cheat Sheet

  1. Understand Integer Properties - Think of integers as your number”line squad: positives, negatives, and the neutral zero all hanging out together. They're closed under addition, subtraction, and multiplication, so mixing them only makes more integers - no surprises! But watch out for division, which can sometimes sneak out a pesky fraction. Wikipedia: Integer
  2. Master Integer Operations - Practice is your secret weapon: add, subtract, multiply, and divide until you dream in integers! Remember, two negatives make a positive when multiplied or divided, but adding negatives just gets more negative. Get comfy with these rules and you'll tame any integer challenge. Wikipedia: Integer
  3. Utilize Visual Aids for Word Problems - Transform hairy word problems into colorful diagrams or number”line sketches. Seeing relationships pop out on paper helps your brain connect the dots faster than you can say "solution." Make it fun - use doodles, arrows, and boxes to map out each step. Strategies for Learning Word Problems
  4. Break Down Word Problems - Big problems can feel like a dragon - but you have the sword of division (of tasks)! Slice each problem into bite”size parts and tackle them one at a time. This stepwise approach keeps you calm and on track. Breaking Down Word Problems: Strategies for Success
  5. Identify Key Information and Variables - Highlight or underline the magic numbers and terms to avoid wandering into distraction territory. Focusing on what really matters gives you a clear path to the answer. It's like using a spotlight on stage - only the important actors get center stage! Strategies for Solving Math Word Problems
  6. Translate Words into Mathematical Symbols - Words like "sum of" become +, "product of" turns into ×, and "difference" shows - . Turning English into algebraic symbols is like learning a secret code. Once you crack it, setting up equations becomes a breeze! Strategies for Solving Math Word Problems
  7. Use the Frayer Model for Vocabulary - This graphic organizer lets you define terms, list characteristics, give examples, and note non”examples - all on one page. It's like building a mini dictionary that sticks in your head. Perfect for tricky math lingo! Vocabulary Strategies for Mathematics
  8. Recognize Signal Words in Word Problems - Words such as "total" shout "add me!" while "left over" whispers "subtract me." Spotting these cues is like having a treasure map to the right operation. Keep your eyes peeled for these little hints! Best Strategies to Solve Math Word Problems
  9. Practice Estimation - Before diving into detailed work, take a quick guess at the answer to see if you're on the right track. Estimation is your error”catcher and sanity”checker rolled into one. Plus, it builds number sense, which makes every problem feel more familiar. Strategies for Solving Math Word Problems
  10. Avoid Overreliance on Keywords - Don't let words like "altogether" or "in all" fool you - context is king! Read the whole problem to understand what's really happening before choosing an operation. It's the best way to dodge keyword traps and solve correctly. Keywords for Math Word Problems
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