In Exercises 11–26, plot each complex number. Then write the comp...

Question

In Exercises 11–26, plot each complex number. Then write the complex number in polar form. You may express the argument in degrees or radians.

−3 + 4i

Accepted Answer

Hello, today we're going to be plotting the given complex number. Then we're going to express the complex number in polar form. So what we are given is the complex number negative plus five. I now one thing to note is that this complex number is in rectangular form and a complex number in rectangular form has a generalized form of X plus Y multiplied by I. What this means is that the X term is the real number in the complex number which in this case is negative 12 and Y is the coefficient in front of the I term, which in this case will be positive five. So using the generalized form of a rectangular complex number, we can set X is equal to negative 12 and Y is equal to five. Now let's start by graphing this complex number, we're going to draw an axis. And since this is a complex number, there is a real portion and imaginary portion to the number. So the X axis is going to represent the real axis and the Y axis is going to represent the I axis or the imaginary axis. So let's start by graphing the amount of units needed to reach the X value. Since X is negative 12, we're going to be traveling 12 units in the negative direction. And since the imaginary value is five, we're going to be traveling positive five units in the imaginary direction. So the coordinate with respect to the real and imaginary axis can be labeled as negative 12 comma five. This will be the location of the given complex number. Now that we've plotted the complex number, let's go ahead and find the polar form of the complex number. Now recall that a polar form of a complex number is given to us as Z is equal to R multiplied by the quantity cosine theta plus I multiplied by sign of data. In order to write the comp the polar form of the complex number, we're going to need our R term and we're going to need our theta term. And whenever we're trying to find these terms from a rectangular complex number, we can use the following conversion methods. We have R is equal to the square root of X squared plus Y squared. And we have theta is equal to tangent inverse of Y over X. So we're going to need our X and Y values in order to get R and the, but we did label our X and Y values earlier X is equal to negative and Y is equal to five. So let's start by using these values to find our R term. So R is going to equal to the square root of X squared, which will be negative 12 squared plus Y squared, which will be five squared, negative 12 squared will simplify to leave us with positive 144 and five squared will simplify to leave us with positive 25. So we have the square root of 144 plus 25. And the sum of these two values will leave us with 169. So R is equal to the square root of which will simplify to give us the value of 13. So we have an R value of 13. Now we can use this X and Y value to calculate the. So again, theta is equal to tangent inverse of Y over XY is equal to five and X is equal to negative 12. So the insight argument of tangent inverse will be negative 5/12. And this value of theta will simplify to leave us with the value of 157.4 degrees. So now that we have our R term and we have our angle theta, we can plug in these values to the generalized form of a complex number in polar form. So using the R and the term we have Z is equal to 13 multiplied by the quantity of cosine of 157.4 plus I multiplied by sine of 157.4. This is going to be the polar form of the given complex number in rectangular form. So just to summarize the general form of a complex number in polar form is given to us as Z is equal to R multiplied by cosine theta plus I sine data. And if you're trying to convert a rectangular complex number into a polar complex number, you can, can use these conversion factors which is R is equal to the square root of X squared plus Y squared and data is equal to tangent inverse of Y over X. So the solution for the polar form is 13 multiplied by cosine of 157.4 plus I multiplied by sine of 157.4. And the location when graphed on the imaginary and real axis is negative 12 comma five. So I hope this video helps you in understanding how to approach this problem. And I'll go ahead and see you all in the next video.

In Exercises 11–26, plot each complex number. Then write the complex number in polar form. You may express the argument in degrees or radians. −3 + 4i

Key Concepts

Complex Numbers

Polar Form of Complex Numbers

Magnitude and Argument

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