In Exercises 45-52, find the quotient z 1 z 2 of the complex numbers. Leave answers in polar form. In Exercises 49-50, express the argument as an angle between 0° and 360°. z 1 = 3 ( cos 5 π 18 + i sin 5 π 18 ) z 2 = 10 ( cos π 16 + i sin π 16 )
In Exercises 45-52, find the quotient z 1 z 2 of the complex numbers. Leave answers in polar form. In Exercises 49-50, express the argument as an angle between 0° and 360°. z 1 = 3 ( cos 5 π 18 + i sin 5 π 18 ) z 2 = 10 ( cos π 16 + i sin π 16 )
Solution Summary: The author explains how the division of two complex numbers in polar form is calculated as lz_1=3(mathrm
In Exercises 45-52, find the quotient
z
1
z
2
of the complex numbers. Leave answers in polar form. In Exercises 49-50, express the argument as an angle between 0° and 360°.
z
1
=
3
(
cos
5
π
18
+
i
sin
5
π
18
)
z
2
=
10
(
cos
π
16
+
i
sin
π
16
)
Combination of a real number and an imaginary number. They are numbers of the form a + b , where a and b are real numbers and i is an imaginary unit. Complex numbers are an extended idea of one-dimensional number line to two-dimensional complex plane.
A research study in the year 2009 found that there were 2760 coyotes
in a given region. The coyote population declined at a rate of 5.8%
each year.
How many fewer coyotes were there in 2024 than in 2015?
Explain in at least one sentence how you solved the problem. Show
your work. Round your answer to the nearest whole number.
Answer the following questions related to the following matrix
A =
3
³).
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