Q. In the polynomial P(x) = 3x^4 - 2x^3 + x - 7, what is the constant term?
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Solution
The constant term in the polynomial P(x) is the term that does not contain any variable, which is -7.
Correct Answer: D — -7
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Q. In the quadratic equation x^2 + 6x + 9 = 0, what type of roots does it have?
A.
Real and distinct
B.
Real and equal
C.
Complex
D.
Imaginary
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Solution
The discriminant is zero, indicating that the roots are real and equal.
Correct Answer: B — Real and equal
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Q. In the quadratic equation x² + 6x + 9 = 0, what is the nature of the roots?
A.
Real and distinct
B.
Real and equal
C.
Complex
D.
Imaginary
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Solution
The discriminant is 0 (b² - 4ac = 0), indicating that the roots are real and equal.
Correct Answer: B — Real and equal
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Q. In the series 2, 5, 10, 17, what is the pattern in the differences between consecutive terms? (2023)
A.
Increasing by 1
B.
Increasing by 2
C.
Increasing by 3
D.
Increasing by 4
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Solution
The differences are 3, 5, 7, which are increasing by 2 each time.
Correct Answer: C — Increasing by 3
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Q. In the series 2, 5, 10, 17, what is the pattern used to generate the next term? (2023)
A.
Add consecutive odd numbers
B.
Add consecutive even numbers
C.
Multiply by 2
D.
Subtract 1
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Solution
The pattern is to add consecutive odd numbers: 2 + 3 = 5, 5 + 5 = 10, 10 + 7 = 17. The next term is 17 + 9 = 26.
Correct Answer: A — Add consecutive odd numbers
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Q. In triangle ABC, if angle A is 30 degrees and angle B is 60 degrees, what is the measure of angle C?
A.
30 degrees
B.
60 degrees
C.
90 degrees
D.
120 degrees
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Solution
Using the property that the sum of angles in a triangle is 180 degrees, angle C can be calculated as 180 - (30 + 60) = 90 degrees.
Correct Answer: C — 90 degrees
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Q. In triangle DEF, if angle D is 45 degrees and angle E is 45 degrees, what type of triangle is DEF?
A.
Scalene
B.
Isosceles
C.
Equilateral
D.
Right-angled
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Solution
Since two angles are equal (45 degrees each), triangle DEF is an isosceles triangle.
Correct Answer: B — Isosceles
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Q. In triangle XYZ, if side XY is 8 cm, side YZ is 6 cm, and side XZ is 10 cm, which of the following is true?
A.
It is a right triangle.
B.
It is an isosceles triangle.
C.
It is an equilateral triangle.
D.
It is a scalene triangle.
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Solution
Since all sides are of different lengths, triangle XYZ is a scalene triangle.
Correct Answer: D — It is a scalene triangle.
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Q. In triangle XYZ, if XY = 8 cm, YZ = 6 cm, and XZ = 10 cm, which of the following is true?
A.
It is an equilateral triangle.
B.
It is an isosceles triangle.
C.
It is a scalene triangle.
D.
It is a right triangle.
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Solution
Since all sides are of different lengths, triangle XYZ is a scalene triangle.
Correct Answer: C — It is a scalene triangle.
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Q. In triangle XYZ, if XY = 8 cm, YZ = 6 cm, and XZ = 10 cm, which side is the longest?
A.
XY
B.
YZ
C.
XZ
D.
All sides are equal
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Solution
The longest side in triangle XYZ is XZ, which measures 10 cm.
Correct Answer: C — XZ
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Q. The ages of two siblings are in the ratio 4:5. If the sum of their ages is 72, what is the age of the older sibling? (2023)
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Solution
Let the ages be 4x and 5x. Then, 4x + 5x = 72, leading to 9x = 72, so x = 8. The older sibling's age is 5x = 40.
Correct Answer: A — 40
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Q. The area of a parallelogram is 120 square meters, and its base is 15 meters. What is the height?
A.
8 m
B.
10 m
C.
12 m
D.
15 m
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Solution
Area = base × height. Thus, 120 = 15 × height, giving height = 120/15 = 8 m.
Correct Answer: B — 10 m
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Q. The area of a parallelogram is 120 square units, and its base is 15 units. What is the height?
A.
8 units
B.
10 units
C.
12 units
D.
15 units
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Solution
Area = base × height. Thus, 120 = 15 × height, giving height = 120/15 = 8 units.
Correct Answer: B — 10 units
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Q. The area of a rhombus is 48 square cm and one diagonal is 8 cm. What is the length of the other diagonal?
A.
12 cm
B.
10 cm
C.
8 cm
D.
6 cm
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Solution
Area = (1/2) × d1 × d2. Thus, 48 = (1/2) × 8 × d2, giving d2 = 12 cm.
Correct Answer: A — 12 cm
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Q. The area of a rhombus is 60 square cm and one diagonal is 10 cm. What is the length of the other diagonal?
A.
12 cm
B.
15 cm
C.
10 cm
D.
8 cm
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Solution
Area = (1/2) × d1 × d2. Thus, 60 = (1/2) × 10 × d2, giving d2 = 12 cm.
Correct Answer: B — 15 cm
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Q. The area of a rhombus is 60 square cm. If one diagonal is 10 cm, what is the length of the other diagonal?
A.
12 cm
B.
15 cm
C.
10 cm
D.
8 cm
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Solution
Area = (1/2) × d1 × d2. Thus, 60 = (1/2) × 10 × d2, giving d2 = 60/(5) = 12 cm.
Correct Answer: B — 15 cm
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Q. The author implies that addressing inequalities requires:
A.
A collective effort from all sectors of society.
B.
A focus solely on economic factors.
C.
Ignoring historical contexts.
D.
A reduction in government involvement.
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Solution
The author implies that a collective effort is necessary to effectively address the complex issue of inequalities.
Correct Answer: A — A collective effort from all sectors of society.
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Q. The author uses the phrase 'the cycle of poverty' to illustrate:
A.
The inevitability of poverty.
B.
The interconnectedness of various forms of inequality.
C.
The temporary nature of poverty.
D.
The lack of government intervention in poverty.
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Solution
The phrase 'the cycle of poverty' highlights how different forms of inequality are interconnected and perpetuate each other.
Correct Answer: B — The interconnectedness of various forms of inequality.
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Q. The average of a set of numbers is 50. If one number is removed, the average becomes 48. What was the number that was removed?
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Solution
Let the number of items be n. Total sum = 50n. After removing one number, the new sum = 48(n - 1). Setting up the equation gives the removed number as 52.
Correct Answer: B — 52
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Q. The average of three consecutive integers is 20. What is the smallest of these integers? (2023)
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Solution
Let the integers be x, x+1, x+2. The average is (x + (x + 1) + (x + 2)) / 3 = 20. Solving gives x = 18.
Correct Answer: A — 18
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Q. The average score of a student in five subjects is 72. If the student scores 80 in the sixth subject, what will be the new average?
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Solution
New average = (72 * 5 + 80) / 6 = (360 + 80) / 6 = 440 / 6 = 73.33, which rounds to 74.
Correct Answer: C — 76
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Q. The HCF of two numbers is 1 and their LCM is 60. Which of the following pairs could represent these numbers? (2023)
A.
5 and 12
B.
3 and 20
C.
4 and 15
D.
6 and 10
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Solution
The pair 5 and 12 has an HCF of 1 and an LCM of 60.
Correct Answer: A — 5 and 12
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Q. The HCF of two numbers is 7 and their LCM is 84. If one of the numbers is 21, what is the other number? (2023)
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Solution
Using the relation HCF * LCM = Product of the numbers, we have 7 * 84 = 21 * x, which gives x = 42.
Correct Answer: B — 42
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Q. The LCM of two numbers is 120 and their HCF is 8. If one number is 32, what is the other number? (2023)
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Solution
Using the relation HCF * LCM = Product of the numbers, we have 8 * 120 = 32 * x, which gives x = 40.
Correct Answer: B — 40
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Q. The LCM of two numbers is 84 and their HCF is 12. If one of the numbers is 36, what is the other number? (2023)
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Solution
Using the relation: LCM * HCF = Product of the numbers, we have 84 * 12 = 36 * x, solving gives x = 28.
Correct Answer: A — 28
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Q. The LCM of two numbers is 84 and their HCF is 12. What are the two numbers? (2023)
A.
24 and 42
B.
12 and 84
C.
28 and 36
D.
21 and 48
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Solution
Let the two numbers be 12x and 12y. Then, LCM(12x, 12y) = 12 * LCM(x, y) = 84, which gives LCM(x, y) = 7. The pairs (x, y) that satisfy this are (3, 4) or (4, 3), leading to 24 and 42.
Correct Answer: A — 24 and 42
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Q. The sum of the first n terms of a harmonic progression is given by which of the following formulas?
A.
n/(a+b)
B.
2n/(a+b)
C.
n/(ab)
D.
2n/(ab)
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Solution
The sum of the first n terms of a harmonic progression can be expressed as 2n/(a+b) where a and b are the first two terms.
Correct Answer: B — 2n/(a+b)
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Q. Two numbers have an HCF of 7 and an LCM of 84. If one of the numbers is 21, what is the other number? (2023)
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Solution
Using the relationship between HCF, LCM, and the numbers: (21 * x) / 7 = 84. Solving gives x = 42.
Correct Answer: B — 42
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Q. Two numbers have an HCF of 8 and an LCM of 72. If one of the numbers is 16, what is the other number? (2023)
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Solution
Using the relationship LCM = (Product of the numbers) / HCF, we can find the other number: 72 = (16 * x) / 8, leading to x = 24.
Correct Answer: B — 24
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Q. What can be concluded about the domain of a function based on the passage?
A.
It includes all real numbers.
B.
It is the set of all possible output values.
C.
It is the set of all possible input values.
D.
It is always finite.
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Solution
The domain of a function refers to the set of all possible input values (x-values) for which the function is defined.
Correct Answer: C — It is the set of all possible input values.
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