Simplify ( 2 + sqrt-3 / 2) (2 - sqrt-3 / 2)

Question

asked Jun 20, 2020 25.8k views

1 Answer

Fatti Khan · Answer 1 · 2020-06-25T01:00:12+0000

Answer:

2.5

Explanation:

The given radical expression is

$(2+\sqrt{-(3)/(2) }) (2-\sqrt{-(3)/(2) })$

Observe that, the given expression can be written as difference of two squares.

That is;
(x+y)(x-y)=x^2-y^2

We apply this property to obtain:

$(2+\sqrt{-(3)/(2) }) (2-\sqrt{-(3)/(2) })=2^2-(\sqrt{-(3)/(2) })^2$

We now simplify to get:

$(2+\sqrt{-(3)/(2) }) (2-\sqrt{-(3)/(2) })=4-(3)/(2)$

This simplifies to:

$(2+\sqrt{-(3)/(2) }) (2-\sqrt{-(3)/(2) })=(5)/(2)=2.5$