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Polar Representation of a Complex Number- 2 Video Lecture | Mathematics (Maths) Class 11 - Commerce

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Video Timeline
Video Timeline
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00:03 Polar Representation of a Complex Number
00:59 Pythagorean Theorem & Argument of Z
01:53 Trigonometric Identities
04:09 Uses of Polar Form of Complex Number

FAQs on Polar Representation of a Complex Number- 2 Video Lecture - Mathematics (Maths) Class 11 - Commerce

1. What is the polar representation of a complex number?
Ans. The polar representation of a complex number is a way to express a complex number in terms of its magnitude (also known as modulus or absolute value) and its angle (also known as argument or phase). It is typically represented as r ∠ θ, where r is the magnitude and θ is the angle.
2. How can I convert a complex number to polar form?
Ans. To convert a complex number to polar form, you can use the following formula: r = √(a^2 + b^2), where a is the real part of the complex number and b is the imaginary part. Then, the angle θ can be determined using the formula: θ = atan(b/a). Finally, you can express the complex number in polar form as r ∠ θ.
3. What is the significance of the angle in the polar representation of a complex number?
Ans. The angle in the polar representation of a complex number represents the direction or rotation of the complex number in the complex plane. It provides information about the phase or position of the complex number relative to the real axis. The angle is usually measured in radians or degrees.
4. How can I convert a complex number in polar form to its rectangular form?
Ans. To convert a complex number in polar form (r ∠ θ) to its rectangular form (a + bi), you can use the following formulas: a = r * cos(θ) and b = r * sin(θ). Here, r represents the magnitude and θ represents the angle of the complex number in polar form.
5. What advantages does the polar representation of complex numbers offer over the rectangular form?
Ans. The polar representation of complex numbers offers certain advantages over the rectangular form. It simplifies multiplication and division of complex numbers as it involves multiplying/dividing their magnitudes and adding/subtracting their angles. It also provides a clear geometric interpretation of complex numbers, making it easier to visualize their properties and relationships.
Video Timeline
Video Timeline
arrow
00:03 Polar Representation of a Complex Number
00:59 Pythagorean Theorem & Argument of Z
01:53 Trigonometric Identities
04:09 Uses of Polar Form of Complex Number
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