If \(\begin{array}{l} \frac{6}{3^{12}}+\frac{10}{3^{11}}+\frac{20}{3^{10}}+\frac{40}{3^9}+\cdots +\frac{10240}{3}=2^n\cdot m, \end{array}\) where m is odd, then m ⋅ n is equal to ________.

\(\begin{array}{l} \frac{1}{3^{12}}+5\left(\frac{2^0}{3^{12}}+\frac{2^1}{3^{11}}+\frac{2^2}{3^{10}}+\cdots +\frac{2^{11}}{3}\right)=2^n\cdot m\end{array}\) \(\begin{array}{l} \Rightarrow\ \frac{1}{3^{12}}+5\left(\frac{1}{3^{12}}\frac{\left(\left(6\right)^2-1\right)}{\left(6-1\right)}\right)=2^n\cdot m\end{array}\) \(\begin{array}{l} \Rightarrow\ \frac{1}{3^{12}}+\frac{5}{5}\left(\frac{1}{3^{12}}\cdot2^{12}\cdot 3^{12}-\frac{1}{3^{12}}\right)=2^n\cdot m\end{array}\) \(\begin{array}{l} \Rightarrow\ \frac{1}{3^{12}}+2^{12}-\frac{1}{3^{12}}=2^n\cdot m\end{array}\) \(\begin{array}{l} \Rightarrow\ \frac{1}{3^{12}}+2^{12}-\frac{1}{3^{12}}=2^n\cdot m\end{array}\) ⇒ 2 n ⋅ m = 2 12 ⇒ m = 1 and n = 12 m ⋅ n = 12

If 6/312 + 10/311 + 20/310 + 40/39 +.....+ 10240/3 = 2n . m, where m is odd, then m.n is equal to ____

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Algebra of Complex Numbers

Algebra of complex numbers

1. Addition of two complex numbers:

Consider z₁ and z₂ are two complex numbers.

For example, z₁ = 3+4i and z₂ = 4+3i

Here a=3, b=4, c=4, d=3

∴z₁+ z₂ = (a+c)+(b+d)i

⇒z₁ + z₂ = (3+4)+(4+3)i

⇒z₁ + z₂ = 7+7i

Properties of addition of complex numbers

Closure law: While adding two complex numbers the resulting number is also a complex number.
Commutative law: For the complex numbers z₁ and z₂ , the commutation can be z₁+ z₂ = z₂+z₁
Associative law: While considering three complex numbers, (z₁+ z₂) + z?₃ = z₁ + (z₂ + z₃)
Additive identity: An Additive identity is nothing but zero complex numbers that go as 0+i0. For every complex number z, z+0 = z.
Additive inverse: Every complex number has an additive inverse denoted as -z.

2. Difference between two complex numbers

It is similar to the addition of complex numbers, such that, z₁ - z₂= z₁ + ( -z₂)

For example: (5+3i) - (2+1i) = (5-2) + (-2-1i) = 3 - 3i

3. Multiplication of complex numbers

Considering the same value of z₁ and z₂ , the product of the complex numbers are

z₁* z₂ = (ac-bd) + (ad+bc) i

For example: (5+6i) (2+3i) = (5×2) + (6×3)i = 10+18i

Properties of Multiplication of complex numbers

Note: The properties of multiplication of complex numbers are similar to the properties we discussed in addition to complex numbers.

Closure law: When two complex numbers are multiplied the result is also a complex number.
Commutative law: z₁* z₂ = z₂ * z₁

Associative law: Considering three complex numbers, (z₁ z₂) z₃ = z₁ (z₂ z₃)

Multiplicative identity: 1+0i is always denoted as 1. This is multiplicative identity. This means that z.1 = z for every complex number z.
Distributive law: Considering three complex numbers, z₁ (z₂ + z₃) =z₁ z₂ + z₁ z₃ and (z₁+ z₂) z₃ = z₁ z₂ + z₂ z₃.

4. Division of complex numbers

If z₁ / z₂ of a complex number is asked, simplify it as z₁ (1/z₂ )

For example: z₁ = 4+2i and z₂ = 2 - i

z₁ / z₂ =(4+2i)×1/(2 - i) = (4+i2)(2/(2²+(-1)² ) + i (-1)/(2²+(-1)² ))

=(4+i2) ((2+i)/5) = 1/5 [8+4i + 2(-1)+1] = 1/5 [8-2+1+41] = 1/5 [7+4i]

If \(\begin{array}{l} \frac{6}{3^{12}}+\frac{10}{3^{11}}+\frac{20}{3^{10}}+\frac{40}{3^9}+\cdots +\frac{10240}{3}=2^n\cdot m, \end{array}\)where m is odd, then m⋅n is equal to ________.

Solution and Explanation

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