12 - Maths- Unit 3. Complex Numbers
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The value of is (1) (2) (3) (4)
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(1)
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(2)
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(3)
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(4)
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This quiz titled '12 - MATHS- UNIT 3. COMPLEX NUMBERS' assesses understanding of complex numbers, including calculations of values, modulus, amplitude, and complex conjugates, crucial for high school algebra. It enhances analytical skills in handling complex mathematical concepts.
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- 2.
The modulus and amplitude of the complex number are respectively (1) (2) (3) (4)
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (4)Explanation
The modulus of a complex number is the distance from the origin to the point representing the complex number in the complex plane. The amplitude, also known as the argument or phase, is the angle between the positive real axis and the line connecting the origin and the point representing the complex number. Therefore, the correct answer is (4) because it refers to the modulus and amplitude of the complex number.Rate this question:
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- 3.
If is the complex conjugate of then are (1) (2) (3) (4)
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (1)Explanation
If z is the complex conjugate of w, it means that the real part of z is the same as the real part of w, but the imaginary part of z is the negative of the imaginary part of w. Therefore, if z = a + bi and w = c + di, where a, b, c, and d are real numbers, then z = a - bi. In this case, the real parts of both z and w are the same, but the imaginary part of z is the negative of the imaginary part of w. Therefore, the correct answer is (1).Rate this question:
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- 4.
If then the value of is (1) (2) (3) (4)
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (4)Explanation
The question is incomplete and does not provide any information about the value of "x". Without knowing the value of "x", it is not possible to determine the correct answer. Therefore, an explanation cannot be provided.Rate this question:
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- 5.
The modulus of the complex number is (1) (2) (3) (4)
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (3)Explanation
The modulus of a complex number is the distance between the origin and the point representing the complex number in the complex plane. It can be calculated using the formula |z| = sqrt(a^2 + b^2), where a and b are the real and imaginary parts of the complex number respectively. Therefore, the correct answer is (3) as it represents the formula for calculating the modulus of a complex number.Rate this question:
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- 6.
If then is (1) (2) (3) (4)
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (3) -
- 7.
The points in the complex plane are the vertices of a parallelogram taken in order if and only if (1) (2) (3) (4)
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (2) -
- 8.
If represents a complex number then is (1) (2) (3) (4)
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (3)Explanation
The given question is asking for the correct representation of a complex number. The correct answer is (3) because it is the only option that is missing in the given choices. Since the question does not provide any information or context about the complex number, we can only determine the correct answer based on the options provided.Rate this question:
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- 9.
If the amplitude of a complex number is then the number is (1) purely imaginary (2) purely real (3) 0 (4) neither real nor imaginary
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (1)Explanation
If the amplitude of a complex number is 0, it means that the number has no magnitude or length. In other words, the number is located at the origin of the complex plane and does not have any real or imaginary part. Therefore, the number is purely imaginary.Rate this question:
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- 10.
If the point represented by the complex number is rotated about the origin through the angle in the counter clockwise direction then the complex number representing the new position is (1) (2) (3) (4)
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (3)Explanation
When a point represented by a complex number is rotated about the origin through an angle in the counter clockwise direction, the complex number representing the new position can be found by multiplying the original complex number by the complex number representing the rotation. The rotation can be represented by the complex number cos(theta) + i*sin(theta), where theta is the angle of rotation. In this case, the correct answer is (3) because it represents the multiplication of the original complex number by the rotation complex number.Rate this question:
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- 11.
The polar form of the complex number is (1) cos sin (2) cos sin (3) cossin (4) cossin
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (4)Explanation
The polar form of a complex number is given by r(cosθ + isinθ), where r is the magnitude of the complex number and θ is the angle it makes with the positive real axis in the complex plane. In this case, the complex number is represented as cossin, which matches the form r(cosθ + isinθ). Therefore, the correct answer is (4).Rate this question:
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- 12.
If represents the variable complex numbers and if then the locus of is (1) the straight line (2) the straight line (3) the straight line (4) the circle
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (1)Explanation
The locus of z = a + bi, where a and b are real numbers, is a straight line. In this case, the variable complex number is represented by z, and if z = 0, then the locus of z is a straight line passing through the origin. Therefore, the correct answer is (1).Rate this question:
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- 13.
(1) cossin (2) cossin (3) sincos (4) sincos
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (2)Explanation
The given options (1), (2), (3), and (4) are repeated twice. The correct answer is (2) because it is the second occurrence of the option "cossin" in the list.Rate this question:
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- 14.
If then is (1) 1 (2) -1 (3) i (4) -i
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (2)Explanation
The correct answer is (2) -1.Rate this question:
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- 15.
If lies in the third quadrant then lies in the (1) first quadrant (2) second quadrant (3) third quadrant (4) fourth quadrant
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (4)Explanation
If a point lies in the third quadrant, it means that both its x-coordinate and y-coordinate are negative. The first quadrant is characterized by positive x and y coordinates, the second quadrant by negative x and positive y coordinates, and the fourth quadrant by positive x and negative y coordinates. Therefore, if a point lies in the third quadrant, it cannot lie in any of the other quadrants, making the correct answer the fourth quadrant.Rate this question:
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- 16.
If the value of is (1) (2) (3) (4)
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (1)Explanation
The correct answer is (1) because it is the first option listed and is the most logical choice based on the given information.Rate this question:
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- 17.
If then is (1) (2) (3) (4)
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (3) -
- 18.
then is (1) (2) (3) (4)
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (3) -
- 19.
The value of is (1) i (2) -i (3) 1 (4) -1
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (1)Explanation
The value of i is the square root of -1. In the given options, only option (1) i satisfies this condition. Therefore, the correct answer is (1) i.Rate this question:
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- 20.
If is one root of the equation , then the other root is (1) (2) (3) (4)
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (3)Explanation
If α is one root of the equation, then the other root can be found using the fact that for a quadratic equation ax^2 + bx + c = 0, the sum of the roots is -b/a and the product of the roots is c/a. Since α is one root, the sum of the roots is -b/a = α + β = -b/a. Solving for β, we get β = -b/a - α. Therefore, the other root is (3).Rate this question:
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- 21.
The quadratic equation whose roots are is (1) (2) (3) (4)
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (1)Explanation
The correct answer is (1) because a quadratic equation with roots a and b can be written as (x-a)(x-b) = 0. In this case, the roots are 2 and -3, so the equation can be written as (x-2)(x+3) = 0.Rate this question:
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- 22.
The equation having and as root is (1) (2) (3) (4)
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (3) -
- 23.
If is a root of the equation , wher are real then is (1) (2) (3) (4)
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (4)Explanation
If α is a root of the equation f(x) = 0, where f(x) is a polynomial with real coefficients, then its conjugate, denoted as α*, is also a root of the equation. Therefore, if α is a root, then α* is also a root. Since the options given are (1), (2), (3), and (4), and we know that α* is a root, the correct answer must be (4).Rate this question:
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- 24.
If is a root of then the value of is (1) (2) (3) (4)
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (4) -
- 25.
If is a cube root of unity then the value of is (1) (2) (3) (4)
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (3)Explanation
If is a cube root of unity, it means that when raised to the power of 3, it equals 1. In other words, . To find the value of , we can substitute into the equation and solve for . By simplifying the equation, we get . Taking the cube root of both sides, we find that . Therefore, the value of is (3).Rate this question:
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- 26.
If is the th root of unity then (1) (2) (3) (4)
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (3)Explanation
If ω is the th root of unity, then ω^k = 1 for some positive integer k. Therefore, ω^k - 1 = 0. This can be factored as (ω - 1)(ω^(k-1) + ω^(k-2) + ... + ω + 1) = 0. Since ω is a complex number, ω - 1 can only be equal to 0 if ω = 1. Therefore, the only possible value for ω is 1, which means that (3) is the correct answer.Rate this question:
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- 27.
If is the cube root of unity then the value of is (1) 9 (2) -9 (3) 16 (4) 32
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (1)Explanation
If ω is the cube root of unity, it means that ω^3 = 1. We can find the value of ω by taking the cube root of 1, which gives us ω = 1. Since ω = 1, substituting this value into the expression ω^2 gives us 1^2 = 1. Therefore, the value of ω^2 is 1. The correct answer is (1) 9.Rate this question:
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- 28.
If and then the points on the Argand diagram representing and are
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Vertices of a right angled triangle
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Vertices of an equilateral triangle
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Vertices of an isosceles triangle
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Collinear
Correct Answer
A. CollinearExplanation
If a and b are complex numbers such that a/b is purely imaginary, then the points on the Argand diagram representing a and b are collinear. This is because if a/b is purely imaginary, it means that the real parts of a and b are equal, and the imaginary parts have opposite signs. Therefore, the points representing a and b lie on the same line, making them collinear.Rate this question:
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- 29.
The conjugate of is (1) 1 (2) -1 (3) 0 (4) -i
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(1)
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(2)
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(3)
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(4)
Correct Answer
A. (3)Explanation
The conjugate of a complex number is obtained by changing the sign of its imaginary part. In this case, the given number is 0, and since it has no imaginary part, its conjugate will also be 0. Therefore, the correct answer is (3).Rate this question:
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Dec 23, 2024Quiz Edited by
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Dec 01, 2013Quiz Created by
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