Textbook Question
In Exercises 49–58, convert each rectangular equation to a polar equation that expresses r in terms of θ. (x − 2)² + y² = 4
876
views
Ch. 5 - Complex Numbers, Polar Coordinates and Parametric Equations
Blitzer3rd EditionTrigonometryISBN: 9780137316601
Not the one you use?Change textbookSelect a different textbook
Table of contents
All textbooks
Blitzer 3rd EditionCh. 5 - Complex Numbers, Polar Coordinates and Parametric EquationsProblem 5
Blitzer 3rd EditionCh. 5 - Complex Numbers, Polar Coordinates and Parametric EquationsProblem 5Chapter 5, Problem 5
In Exercises 1–10, plot each complex number and find its absolute value. z = 3 + 2i
Verified step by step guidance1
Identify the complex number given: \(z = 3 + 2i\), where the real part is 3 and the imaginary part is 2.
Plot the complex number on the complex plane by marking the point with coordinates \((3, 2)\), where the x-axis represents the real part and the y-axis represents the imaginary part.
Recall that the absolute value (or modulus) of a complex number \(z = a + bi\) is given by the formula \(|z| = \sqrt{a^2 + b^2}\).
Substitute the values of the real part \(a = 3\) and the imaginary part \(b = 2\) into the formula: \(|z| = \sqrt{3^2 + 2^2}\).
Simplify the expression under the square root to find the absolute value, which represents the distance of the point from the origin in the complex plane.
Verified video answer for a similar problem:
This video solution was recommended by our tutors as helpful for the problem above.
Video duration:
1mWas this helpful?
Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Complex Numbers and the Complex Plane
A complex number is expressed as z = a + bi, where a is the real part and b is the imaginary part. It can be represented as a point or vector in the complex plane, with the horizontal axis for the real part and the vertical axis for the imaginary part.
Recommended video:
4:22
Dividing Complex Numbers
Plotting Complex Numbers
To plot a complex number, locate the point corresponding to its real part on the x-axis and its imaginary part on the y-axis. For z = 3 + 2i, plot the point at (3, 2) in the complex plane.
Recommended video:
03:47How To Plot Complex Numbers
Absolute Value (Modulus) of a Complex Number
The absolute value or modulus of a complex number z = a + bi is the distance from the origin to the point (a, b) in the complex plane. It is calculated as |z| = √(a² + b²), representing the magnitude of the complex number.
Recommended video:
4:22Dividing Complex Numbers
Related Practice
Textbook Question
In Exercises 49–58, convert each rectangular equation to a polar equation that expresses r in terms of θ. x² + y² = 9
727
views
Textbook Question
In Exercises 37–52, perform the indicated operations and write the result in standard form.
( −6 − √(−12)) / 48
650
views
Textbook Question
Evaluate x²+19 / 2−x for x = 3i.
721
views
Textbook Question
In Exercises 1–8, parametric equations and a value for the parameter t are given. Find the coordinates of the point on the plane curve described by the parametric equations corresponding to the given value of t. x = 4 + 2 cos t, y = 3 + 5 sin t; t = π/2
703
views
Textbook Question
Evaluate x² − 2x + 2 for x = 1 + i.
751
views