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Quizzes > High School Quizzes > English Language Arts

STAAR Review Games Practice Quiz

Engaging review questions to boost exam readiness

Difficulty: Moderate
Grade: Grade 7
Study OutcomesCheat Sheet
Colorful paper art promoting STARR Review Rumble, a fast-paced math quiz for middle school students.

What is 7/8 + 1/8?
1
7/16
8/9
7/8
Adding 7/8 and 1/8 gives a common denominator and sums to 8/8 which simplifies to 1. This demonstrates understanding of basic fraction addition.
What is the result of 3 * (2 + 4)?
18
12
20
6
First, add 2 and 4 to get 6, then multiply by 3 to obtain 18. This reinforces the order of operations.
What is the decimal equivalent of 15%?
0.15
1.5
0.015
15
15% means 15 per 100, which converts to 0.15 as a decimal. This conversion is fundamental in understanding percentages.
What is the product of 6 and -3?
-18
18
-9
9
Multiplying a positive number by a negative number results in a negative number. Here, 6 multiplied by -3 equals -18.
A rectangle has a length of 8 and a width of 5. What is its area?
40
13
20
26
The area of a rectangle is found by multiplying the length by the width. Therefore, 8 multiplied by 5 equals 40.
Solve for x: 2x - 5 = 9. What is the value of x?
7
2
9
8
Adding 5 to both sides gives 2x = 14, and dividing both sides by 2 results in x = 7. This problem tests basic linear equation solving.
Which fraction is equivalent to the decimal 0.5?
1/2
2/3
3/4
1/3
0.5 is the decimal representation of one half, or 1/2. Recognizing equivalent forms is important in comparing numbers.
What is the least common multiple (LCM) of 4 and 6?
12
18
24
6
The multiples of 4 are 4, 8, 12, 16,... and the multiples of 6 are 6, 12, 18,... The smallest common multiple is 12.
In a ratio of boys to girls of 3:4, if there are 21 boys, how many girls are there?
28
24
21
14
The ratio 3:4 indicates that for every 3 boys, there are 4 girls. If there are 21 boys, multiplying by 4/3 gives 28 girls.
What is 25% of 200?
50
25
75
100
To find 25% of 200, convert the percentage to a decimal (0.25) and multiply by 200, which results in 50. This tests the ability to handle percentage calculations.
Simplify the expression: 4(3 + x) - 2x.
12 + 2x
12 + x
2x
4x
Distribute 4 to get 12 + 4x, then subtract 2x leading to 12 + 2x. This problem involves applying the distributive property and combining like terms.
A triangle has angles that measure 35° and 65°. What is the measure of the third angle?
80°
90°
70°
75°
The sum of the angles in a triangle is 180°. Subtracting 35° and 65° from 180° gives the third angle as 80°.
What is the perimeter of a square with a side length of 9?
36
18
9
27
A square has four equal sides, so the perimeter is 4 multiplied by the side length. Multiplying 4 by 9 gives 36.
Convert the decimal 0.75 to a fraction in simplest form.
3/4
75/100
1/2
2/3
0.75 is equivalent to 75/100, which simplifies to 3/4 after dividing both the numerator and the denominator by 25. This conversion is key for understanding fractions and decimals.
What is the value of the expression 2^3 + 3^2?
17
15
11
14
Calculating the exponents gives 2^3 = 8 and 3^2 = 9, and adding these results in 17. This question reinforces understanding of exponents.
Solve for x: (3/4)x = 9. What is the value of x?
12
7
9
3
Multiply both sides of the equation by 4/3 to solve for x, which gives x = 12. This problem uses fractional coefficients in a linear equation.
If the sum of two consecutive integers is 29, what is the larger integer?
15
14
16
13
Let the two consecutive integers be n and n+1. The equation n + (n + 1) = 29 simplifies to 2n + 1 = 29, so n = 14 and the larger integer is 15. This problem tests the application of simple algebra in a real-world context.
Find the volume of a rectangular prism with a length of 4, width of 5, and height of 3.
60
12
20
30
The volume of a rectangular prism is found by multiplying its length, width, and height. Multiplying 4, 5, and 3 results in a volume of 60.
Solve the equation: 2(x - 3) = x + 4.
10
7
4
5
Expanding the equation we get 2x - 6 = x + 4. Subtracting x from both sides gives x - 6 = 4, and adding 6 to both sides results in x = 10. This question tests the ability to solve linear equations using algebraic manipulations.
Find the missing number in the sequence: 3, 7, 13, ?, 31, given that the difference between consecutive terms increases by 2 each time.
21
20
19
23
The differences between the terms are increasing by 2: from 3 to 7 the difference is 4, from 7 to 13 it is 6, so the next difference should be 8. Adding 8 to 13 gives 21, which fits the pattern when the subsequent difference is 10 to reach 31.
0
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Study Outcomes

  1. Analyze key mathematical concepts to solve practice problems.
  2. Apply problem-solving strategies to improve test performance.
  3. Evaluate personal understanding through rapid-response questions.
  4. Identify areas for improvement by reviewing quiz responses.
  5. Synthesize learned concepts to prepare for upcoming exams.

STAAR Review Games Cheat Sheet

  1. Master Operations with Rational Numbers - Adding, subtracting, multiplying, and dividing fractions, decimals, and integers can be a fun puzzle when you know the rules. Remember, dividing by a fraction is the same as multiplying by its reciprocal - just flip and multiply! Keep practicing these operations to build confidence and speed on test day. STAAR Math Practice Questions
  2. Understand Proportional Relationships - Proportional relationships pop up everywhere, from recipes to road trips. You'll spot them by checking if ratios stay constant - divide y by x to find your magic number, k. Represent these relationships with tables, graphs, or equations to see the patterns come to life. Proportional Relationships Practice
  3. Calculate Unit Rates - Unit rates like miles per hour or cost per item turn complicated problems into simple comparisons. Practice by dividing quantities to find the "per one" value, and you'll breeze through real-world questions. Mastering unit rates means fewer headaches when deals and distances show up on the exam. Unit Rate Practice
  4. Solve Multi-Step Percent Problems - Whether it's markdowns, markups, or tax, percent problems can feel tricky - until you break them into steps. For discounts, multiply the original price by (1 - discount rate) and watch the sale price appear. Tackle each percent change one at a time to keep your work clear and error-free. Percent Problems Guide
  5. Work with Similar Figures and Scale Drawings - Scale drawings and similar figures are all about keeping proportions in check. Corresponding sides match up in ratio, so if one side doubles, all sides double! Use these ideas to solve real-life design and map problems like a geometry whiz. Similar Figures & Scale Drawings
  6. Analyze Data Representations - Bar graphs, dot plots, and circle graphs tell stories in numbers - learn to read them! Compare data sets, spot trends, and calculate mean, median, and mode to draw solid conclusions. The more you practice, the faster you'll decode what the data is really saying. Data Representation Practice
  7. Understand Probability Concepts - Chance governs everything from dice rolls to weather forecasts - get comfortable with theoretical and experimental probability. Just divide the number of favorable outcomes by the total possible outcomes to find your chance of success. Play with coins or cards to see theory and reality meet in fun experiments. Probability Practice
  8. Calculate Volume and Surface Area - Prisms, pyramids, and composite shapes are like 3D puzzles - find the volume (space inside) and surface area (covering it) to ace those geometry questions. For rectangular prisms, it's simple: length × width × height. Break complex shapes into basic parts and add results for a winning formula. Volume & Surface Area Guide
  9. Work with Circles - Circles are everywhere, so learn the two magic formulas: circumference = π × diameter and area = π × radius². Practice plugging numbers in to see how a small change in radius makes a big difference in area. Soon you'll be spinning through circle questions with ease! Circle Formulas Tutorial
  10. Solve Two-Step Equations and Inequalities - Two-step equations and inequalities might sound tough, but reverse the order of operations to find your answer smoothly. Undo addition or subtraction first, then tackle multiplication or division to isolate the variable. With a clear strategy, you'll solve for x in no time - and even graph your inequalities like a boss. Equations & Inequalities Practice
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