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Quizzes > High School Quizzes > Mathematics

Simulador para Examen de Seguros Quiz

Resuelve preguntas prácticas y mejora tu preparación

Difficulty: Moderate
Grade: Other
Study OutcomesCheat Sheet
Colorful paper art promoting Simula, Asegura, Triunfa high school math practice quiz.

Easy
What is 25% of 200?
25
50
100
75
25% of 200 is calculated by multiplying 200 by 0.25, which equals 50. This basic percentage calculation is essential in many real-life applications.
Solve for x: 5x = 20.
5
6
4
3
Dividing both sides of the equation by 5 leads to x = 4, which is the unique solution. This is a fundamental algebraic manipulation.
What is the perimeter of a square with a side length of 5 units?
25 units
15 units
10 units
20 units
Since a square has four equal sides, its perimeter is 4 multiplied by the side length, giving 20 units. Understanding perimeter is key in geometry.
If you invest $100 at a simple interest rate of 5% per year, how much interest will you earn in one year?
$5
$15
$20
$10
Simple interest is calculated by multiplying the principal by the rate, so $100 * 0.05 equals $5. This demonstrates the principle of proportional increase.
What is the mean of the set {2, 4, 6}?
4
3
6
5
The mean is found by summing the numbers (2+4+6 = 12) and dividing by the count (3), yielding 4. This basic statistic is often used to summarize data.
Medium
Solve for x: 3x - 7 = 2x + 5.
11
12
13
10
Isolating x by subtracting 2x from both sides leads to x - 7 = 5, and adding 7 gives x = 12. This simple linear equation demonstrates the basic principles of algebra.
A bag contains 5 red, 3 blue, and 2 green marbles. What is the probability of drawing a blue marble?
0.2
0.7
0.5
0.3
The probability is the number of favorable outcomes divided by the total, so 3/10, which is 0.3. Understanding ratios is fundamental in probability.
If an insurance policy's premium increases by 8% annually, what will be the premium next year for a $500 premium?
$520
$540
$550
$530
An 8% increase means multiplying the original premium by 1.08, so 500 * 1.08 equals $540. This application of percentage increases is common in financial contexts.
Factor the quadratic expression: x² - 5x + 6.
(x - 1)(x - 6)
(x - 3)(x + 2)
(x - 2)(x - 3)
(x + 2)(x + 3)
Finding factors that multiply to 6 and add to -5 gives -2 and -3, so the expression factors as (x - 2)(x - 3). This factorization is a key skill in elementary algebra.
A rectangle has an area of 36 square units and a length of 9 units. What is its width?
4 units
5 units
6 units
3 units
Dividing the area by the length gives the width, 36 ÷ 9 equals 4. This shows the relationship between area and dimensions.
Solve for y: (3y)/2 = 12.
7
6
8
9
Multiplying both sides by 2 and then dividing by 3 isolates y, resulting in y = 8. This demonstrates basic manipulation of algebraic equations.
What is the slope of a line perpendicular to a line with a slope of 1/3?
3
-1/3
-3
1/3
The slope of a perpendicular line is the negative reciprocal of the original slope. Here, the negative reciprocal of 1/3 is -3.
What is 15% of 250?
40
30
37.5
45
Multiplying 250 by 0.15 results in 37.5. This problem reinforces percentage calculations.
In a group of 50 insurance policies with an event probability of 0.02 each, what is the expected number of events?
0.5
2
10
1
The expected number is calculated by multiplying the total count by the probability of each event, yielding 1. This is an application of expected value in probability.
Simplify the expression: 2(x + 3) - 4.
2x + 2
2x + 4
2x + 1
2x + 3
Distributing the 2 gives 2x + 6, and subtracting 4 results in 2x + 2. This exercise practices basic distribution and the combination of like terms.
A car depreciates by 20% in one year. What is its value after one year if its original price is $15,000?
$12,000
$14,000
$15,000
$13,000
A 20% depreciation means the car retains 80% of its original value, so 15,000 * 0.8 equals $12,000. Depreciation calculations are important in finance.
Two numbers have a ratio of 3:5 with a sum of 64. What is the larger number?
45
30
35
40
Setting up the equation 3k + 5k = 64 gives k = 8, from which the larger number, 5k, is 40. This problem applies ratios and linear equations.
If an investment grows by a factor of 1.07 each year, what is its approximate growth factor after 3 years?
1.30
1.15
1.225
1.07
Compounding growth over 3 years is calculated as 1.07 raised to the power of 3, which is approximately 1.225. This is an example of compound interest.
Solve for z: 4(z - 2) = 2z + 8.
6
8
10
7
Expanding and rearranging the equation leads to 2z = 16, hence z = 8. This reinforces the technique of combining like terms.
A store sells an item for $120 after applying a 20% discount. What was the original price?
$100
$150
$170
$130
The original price is found by dividing the sale price by 0.8, so 120 ÷ 0.8 equals $150. This exercise shows how to reverse a percentage discount.
0
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Study Outcomes

  1. Simulate real exam conditions to build test readiness.
  2. Assess comprehension of key high school mathematical concepts.
  3. Analyze problem-solving strategies under exam-like pressure.
  4. Apply mathematical principles in practical scenarios.
  5. Evaluate performance to pinpoint areas for improvement.

Simulador para Examen de Agente de Seguros Cheat Sheet

  1. Master the Pythagorean Theorem - This trusty formula a² + b² = c² is your go-to for unlocking the mysteries of right triangles. Use it to measure distances, build awesome ramps, or impress your friends with perfect right angles. Pythagorean Theorem Guide
  2. The 10 Most Important Mathematical Formulas for High School Students
  3. Understand the Quadratic Formula - Whether you're solving projectile problems or sketching parabolas, x = (-b ± √(b² - 4ac)) / (2a) has your back. It's the ultimate cheat code for finding the roots of any quadratic equation without breaking a sweat. Quadratic Formula Explained
  4. Math Formulas We Wish Every Student Had Memorized
  5. Learn the Distance Formula - Need to know how far apart two points are on a plane? The distance formula d = √((x₂ - x₝)² + (y₂ - y₝)²) will be your compass, guiding you through coordinate geometry adventures. Distance Formula Explained
  6. The 10 Most Important Mathematical Formulas for High School Students
  7. Grasp the Slope Formula - Slope is the steepness superstar of lines, calculated by m = (y₂ - y₝) / (x₂ - x₝). Master it to analyze hills, budget lines, or any linear relationship like a true slope sleuth! Slope Formula Breakdown
  8. Math Formulas We Wish Every Student Had Memorized
  9. Familiarize Yourself with the Midpoint Formula - Finding the exact center between two points is a breeze with M = ((x₝ + x₂)/2, (y₝ + y₂)/2). Use this gem to locate midpoints in navigation, game design, or any geometric quest. Midpoint Formula Explained
  10. The 10 Most Important Mathematical Formulas for High School Students
  11. Calculate the Area of a Triangle - Slice, dice, and conquer triangles with A = ½ × base × height. This formula is your ticket to calculating the space inside any triangle, perfect for building, art, or mind-bending puzzles. Triangle Area Cheat Sheet
  12. Math Formulas We Wish Every Student Had Memorized
  13. Remember the Area and Circumference of a Circle - Circles hold many secrets: A = πr² reveals the space inside, while C = 2πr lets you stroll around the perimeter. Embrace these to master everything round, from pizzas to planetary orbits. Circle Area & Circumference Tips
  14. The 10 Most Important Mathematical Formulas for High School Students
  15. Apply the Law of Sines - Non-right triangles need love too! With a/sin(A) = b/sin(B) = c/sin(C), the Law of Sines helps you unlock unknown sides or angles in any triangle, no right angle required. Law of Sines Simplified
  16. The 10 Most Important Mathematical Formulas for High School Students
  17. Utilize the Law of Cosines - When two sides and the included angle are given, c² = a² + b² - 2ab cos(C) is your knight in shining armor. It generalizes Pythagoras and opens the door to all triangle-solving quests. Law of Cosines Simplified
  18. The 10 Most Important Mathematical Formulas for High School Students
  19. Understand Exponential Growth and Decay - From bacteria booms to radioactive meltdowns, y = a × e^(kt) models how things grow or shrink over time. Tweak the rate k, set your timer t, and watch the magic of e unfold! Exponential Growth & Decay Guide
  20. The 10 Most Important Mathematical Formulas for High School Students
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