2 Answers

Hennr · Answer 1 · 2023-02-28T14:45:57+0000

Answer:

$\large\boxed{\boxed{\underline{\underline{\maltese{\pink{\pmb{\sf{\: Solution \dashrightarrow (5)/(2)-(7)/(2)i  }}}}}}}}$

Explanation:

$\frac { 6 - i } { 1 + i }\\$

Multiply the numerator & denominstor by the conjugate of 1 - i.

$(\left(6-i\right)\left(1-i\right))/(\left(1+i\right)\left(1-i\right)) \\$

We can solve the denominator by using the identity: a² - b² = (a + b) (a - b). So,

$(\left(6-i\right)\left(1-i\right))/(1^(2)-i^(2))$

We know that, i² = - 1. Then, on solving..

$(\left(6-i\right)\left(1-i\right))/(2)$

Now, simplify this expression,

$(6* 1+6\left(-i\right)-i-\left(-i^(2)\right))/(2) \\= (6* 1+6\left(-i\right)-i-\left(-\left(-1\right)\right))/(2) \\= (6-6i-i-1)/(2)$

Combine the real & imaginary parts in 6 - 6i - i - 1.

$(6-1+\left(-6-1\right)i)/(2)$

Simplify it again by adding.

$(5-7i)/(2) \\$

Now seperate the fraction by dividing 5 & -7i by 2.

$\large{\boxed{\sf(5)/(2)-(7)/(2)i }}$

__________

$\sf{Hope \: it \: helps}\\\mathfrak{Lucazz}$

Your comment on this question: