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Evaluate:
For any two complex numbersz1 and z2, prove that
Re (z1z2)= Re z1 Re z2 – Im z1 Im z2
Reduce to the standard form.
If x – iy =prove that.
Solve the equation
The given quadratic equation is
This equation can also be written as
On comparing this equation with ax2 + bx + c = 0, we obtain
a = 2, b = –4, and c = 3
Therefore, the discriminant of the given equation is
D = b2 – 4ac = (–4)2 – 4 × 2 × 3 = 16 – 24 = –8
Therefore, the required solutions are
Solve the equation 27x2 – 10x + 1 = 0
The given quadratic equation is 27x2 – 10x + 1 = 0
On comparing the given equation with ax2 + bx + c = 0, we obtain
a = 27, b = –10, and c = 1
Therefore, the discriminant of the given equation is
D = b2 – 4ac = (–10)2 – 4 × 27 × 1 = 100 – 108 = –8
Therefore, the required solutions are
Solve the equation 21x2 – 28x + 10 = 0
The given quadratic equation is 21x2 – 28x + 10 = 0
On comparing the given equation with ax2 + bx + c = 0, we obtain
a = 21, b = –28, and c = 10
Therefore, the discriminant of the given equation is
D = b2 – 4ac = (–28)2 – 4 × 21 × 10 = 784 – 840 = –56
Therefore, the required solutions are
If find .
If a + ib =, prove that a2 + b2 =
a+ib=.......................(1)
taking conjugate on both sides ,
a-ib= ........................(2)
multiplying (1) and (2)
(a+ib)(a-ib)=*
a²+b²=[(x+i)(x-i)]²/[2x²+1]²
=
Let . Find
(i) , (ii)
(i)
On multiplying numerator and denominator by (2 – i), we obtain
On comparing real parts, we obtain
(ii)
On comparing imaginary parts, we obtain
Find the modulus and argument of the complex number.
Let, then
On squaring and adding, we obtain
Therefore, the modulus and argument of the given complex number are respectively.
Find the real numbers x and y if (x – iy) (3 + 5i) is the conjugate of –6 – 24i.
Let
It is given that,
Equating real and imaginary parts, we obtain
Multiplying equation (i) by 3 and equation (ii) by 5 and then adding them, we obtain
Putting the value of x in equation (i), we obtain
Thus, the values of x and y are 3 and –3 respectively.
Find the modulus of .
If (x + iy)3 = u + iv, then show that.
On equating real and imaginary parts, we obtain
Hence, proved.
If α and β are different complex numbers with = 1, then find.
Let α = a + ib and β = x + iy
It is given that,
Find the number of non-zero integral solutions of the equation.
Thus, 0 is the only integral solution of the given equation. Therefore, the number of non-zero integral solutions of the given equation is 0.
If (a + ib) (c + id) (e + if) (g + ih) = A + iB, then show that
(a2 + b2) (c2 + d2) (e2 + f2) (g2 + h2) = A2 + B2.
On squaring both sides, we obtain
(a2 + b2) (c2 + d2) (e2 + f2) (g2 + h2) = A2 + B2
Hence, proved.
If x – iy =prove that.
x-iy=......................(1)
taking conjugate on both sides,
......................(2)
multiply equations (1) and (2)
(x+iy)(x-iy)=*
squaring on both sides
(x²+y²)²==
hence proved
Solve the equation.
The given quadratic equation is
This equation can also be written as
On comparing this equation with ax2 + bx + c = 0, we obtain
a = 9, b = –12, and c = 20
Therefore, the discriminant of the given equation is
D = b2 – 4ac = (–12)2 – 4 × 9 × 20 = 144 – 720 = –576
Therefore, the required solutions are
Convert the following in the polar form:
(i) , (ii)
(i) Here,
Let r cos θ = –1 and r sin θ = 1
On squaring and adding, we obtain
r2 (cos2θ + sin2θ) = 1 + 1
⇒ r2 (cos2θ + sin2θ) = 2
⇒ r2 = 2 [cos2θ + sin2θ = 1]
∴z = r cos θ + i r sin θ
This is the required polar form.
(ii) Here,
Let r cos θ = –1 and r sin θ = 1
On squaring and adding, we obtain
r2 (cos2θ + sin2θ) = 1 + 1
⇒r2 (cos2θ + sin2θ) = 2
⇒ r2 = 2 [cos2θ + sin2θ = 1]
∴z = r cos θ + i r sin θ
This is the required polar form.
If, then find the least positive integral value of m.
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