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Algebra of Complex Numbers: Problems and Solutions

Complex numbers are important to mathematics. These are numbers that can be represented in a+ib format, where a, b are real numbers, and i is the imaginary number. The value of i is (√-1). For example, we take 2+4i, then 2 is the real number, and 4i is the imaginary number. In this article, we look at the algebra of complex numbers. 

Problems and Solutions

Question 1:

Simplify the equations and answer correctly.

  1. (4 + 3i) – (9 – 6i)
  2. (3 – 5i) (12 + 11i)
  3. (- 3 – 5i) / i
  4. 8i(10+2i)

Solution:

a. (4 + 3i) – (9 – 6i)=

     -5 + 9i

b. ( 3-5i) (12+11i)

=36+33i-60i- 55i2

Taking i² =-1

=36- 27i -55 (-1)

=91-27i

c. (- 3 – 5i) / i

=(3+5i)i=3i+5i2

   =  -5 + 3i

d. 8i(10+2i)

=80i+ 16i²

Taking i²= -1

=80i-16

Question 2:

Find the value of (a + bi)(a – bi)

If (a+ bi) / i = ( 6 + 8i )  given x and y are real 

Solution:

According to the question,

(a + bi) / i = ( 6 + 8i )

(a + bi) = i(6 + 8i) = –8 + 6i

(a + bi)(a – bi) = (-8 + 6i)(-8 +6i)

 =64 + 36 = 100

Question 3:

Suppose the polynomial 

P(z) = z⁴ + a z³ + b z²+ c z + d 

where a, b, c and d are real numbers.

Determine the value of a, b, c and d if two zeros of polynomial P are the following complex numbers: 3 – i and 4 – i.

Solution:

The coefficients of given polynomial P are said to be real.

Then the complex conjugate to the given zeros are also zeros of P. 

Therefore,

X(z) = (z – (3 – i))(z – (3 + i))(z – (4 – i))(z – (4 + i)) =

= z4– 14 z3 + 75 z2  +22 z + 170

Hence: a = -14, b = 175, c = 22 and d = 170.

Question 4:

Take the following equation

z2 + 2z + 2 = 0

Find the values of z using quadratic equations.

Solution:

s1

Here a=1 b=2 and c=2 putting values in above equation give

z=-1+i or -1-i 

Question 5:

Look at the given complex number

 z = -2 + 7i

The given equation root to the equation mentioned below:

z3 + 6 z2 + 61 z + 106 = 0

Determine the real root of the equation.

Solution:

We have been given  z = -2 + 7i 

This equation is a root of the equation

And all the coefficients in the terms of the equation are real numbers, then z’, the complex conjugate of z, is also a solution. 

So to find  z3 + 6 z2 + 61 z + 106 = 0

 = (z – (-2 + 7i))(z – (-2 – 7i)) q(z)

= (z2 + 4z + 53) q(z)

q(z) = [ z3 + 6 z2 + 61 z + 106 ] / [ z2 + 4z + 53 ] = z + 2

Z + 2 is a factor of z3 + 6 z2 + 61 z + 106

 So, z = -2, which is the real root of the equation provided.

Question 6:

(5 + 3i)z + (9 – 3i)z’ = -3 + 11i  Determine all complexes that satisfies these conditions, 

where z’ and z are conjugate of each other.

Solution:

To determine these numbers, let  us assume z = x + yi      x and y are real numbers.

The complex Z can be formed in terms of a and b as follows: z’= x – yi. 

Write the values of z and z’ in the given equation 

(5 + 3i)(x+iy) + (9 – 3i)(x-iy) = -3 + 11i

Expand and separate real and imaginary parts.

(5x – 3y + 9x – 3y) + (5y + 3x – 9y – 3x )i = -3 + 11i

Two complex numbers are equal if their real parts and imaginary parts are equal. Group like terms.

14a – 6y = -3 and – 4y = 11

Solve the system of the unknown a and b to find:

b = -11/4 and a = -39/28

z =  -39/28 – (-11/4)i

Question 7:

In the complex number 2 + 4i is one of the roots to the quadratic equation x2 + bx + c = 0, where b and c are real numbers.

a. determine b and c

b. find the second root and check it.

Solution:

As we are given that b and c are real numbers so roots should be conjugate pairs of each other.

If one root is 2+4i then other will be 2-4i

So given equation can be written as (x-(2+4i))(x-(2-4i))

X2-4x+20

Value of b=-4 and value of c=20

b)We found out the second root as 2-4i

Putting this root in original equation

(2-4i)2-4(2-4i)+20

=4-16-16i-8+16i+20=0

Question 8:

Find all complex numbers of the form z = a + bi in the given equation where a and b are real numbers such that z z’= 25 and a + b = 7

where z’ is the complex conjugate of z.

Solution:

z z’ = (a + bi)(a – bi)

= a² + b² = 25

a + b = 7 gives b = 7 – a

Add values above in the equation a²+ b² = 25

a²+ (7 – a)²= 25

Now solve the mentioned equation for a and use b = 7 – a and determine the value of b.

a = 4 and b = 3 or a = 3 and b = 4

z = 4 + 3i and z = 3 + 4i have the property z z’ = 25.

Conclusion

This article explains the algebra of complex numbers and the algebraic form of complex numbers. Complex numbers are a combination of a real number and an imaginary number. One part of a complex number is real, while the other part is imaginary.

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